./Ultimate.py --spec ../sv-benchmarks/c/properties/unreach-call.prp --file ../sv-benchmarks/c/nla-digbench-scaling/hard2_valuebound5.c --full-output --architecture 32bit -------------------------------------------------------------------------------- Checking for ERROR reachability Using default analysis Version 574ddb4e Calling Ultimate with: /usr/bin/java -Dosgi.configuration.area=/storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/data/config -Xmx15G -Xms4m -jar /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/plugins/org.eclipse.equinox.launcher_1.5.800.v20200727-1323.jar -data @noDefault -ultimatedata /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/data -tc /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/config/AutomizerReach.xml -i ../sv-benchmarks/c/nla-digbench-scaling/hard2_valuebound5.c -s /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/config/svcomp-Reach-32bit-Automizer_Default.epf --cacsl2boogietranslator.entry.function main --witnessprinter.witness.directory /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux --witnessprinter.witness.filename witness.graphml --witnessprinter.write.witness.besides.input.file false --witnessprinter.graph.data.specification CHECK( init(main()), LTL(G ! call(reach_error())) ) --witnessprinter.graph.data.producer Automizer --witnessprinter.graph.data.architecture 32bit --witnessprinter.graph.data.programhash a077c1334c11d8329da2d0c58ca917b2036581fa7e949d1d304e3346ec54a811 --- Real Ultimate output --- This is Ultimate 0.2.2-?-574ddb4 [2023-02-18 18:25:35,812 INFO L177 SettingsManager]: Resetting all preferences to default values... [2023-02-18 18:25:35,815 INFO L181 SettingsManager]: Resetting UltimateCore preferences to default values [2023-02-18 18:25:35,851 INFO L184 SettingsManager]: Ultimate Commandline Interface provides no preferences, ignoring... [2023-02-18 18:25:35,851 INFO L181 SettingsManager]: Resetting Boogie Preprocessor preferences to default values [2023-02-18 18:25:35,854 INFO L181 SettingsManager]: Resetting Boogie Procedure Inliner preferences to default values [2023-02-18 18:25:35,856 INFO L181 SettingsManager]: Resetting Abstract Interpretation preferences to default values [2023-02-18 18:25:35,858 INFO L181 SettingsManager]: Resetting LassoRanker preferences to default values [2023-02-18 18:25:35,860 INFO L181 SettingsManager]: Resetting Reaching Definitions preferences to default values [2023-02-18 18:25:35,864 INFO L181 SettingsManager]: Resetting SyntaxChecker preferences to default values [2023-02-18 18:25:35,865 INFO L181 SettingsManager]: Resetting Sifa preferences to default values [2023-02-18 18:25:35,867 INFO L184 SettingsManager]: Büchi Program Product provides no preferences, ignoring... [2023-02-18 18:25:35,868 INFO L181 SettingsManager]: Resetting LTL2Aut preferences to default values [2023-02-18 18:25:35,869 INFO L181 SettingsManager]: Resetting PEA to Boogie preferences to default values [2023-02-18 18:25:35,870 INFO L181 SettingsManager]: Resetting BlockEncodingV2 preferences to default values [2023-02-18 18:25:35,871 INFO L181 SettingsManager]: Resetting ChcToBoogie preferences to default values [2023-02-18 18:25:35,872 INFO L181 SettingsManager]: Resetting AutomataScriptInterpreter preferences to default values [2023-02-18 18:25:35,872 INFO L181 SettingsManager]: Resetting BuchiAutomizer preferences to default values [2023-02-18 18:25:35,874 INFO L181 SettingsManager]: Resetting CACSL2BoogieTranslator preferences to default values [2023-02-18 18:25:35,875 INFO L181 SettingsManager]: Resetting CodeCheck preferences to default values [2023-02-18 18:25:35,876 INFO L181 SettingsManager]: Resetting InvariantSynthesis preferences to default values [2023-02-18 18:25:35,877 INFO L181 SettingsManager]: Resetting RCFGBuilder preferences to default values [2023-02-18 18:25:35,878 INFO L181 SettingsManager]: Resetting Referee preferences to default values [2023-02-18 18:25:35,879 INFO L181 SettingsManager]: Resetting TraceAbstraction preferences to default values [2023-02-18 18:25:35,887 INFO L184 SettingsManager]: TraceAbstractionConcurrent provides no preferences, ignoring... [2023-02-18 18:25:35,887 INFO L184 SettingsManager]: TraceAbstractionWithAFAs provides no preferences, ignoring... [2023-02-18 18:25:35,887 INFO L181 SettingsManager]: Resetting TreeAutomizer preferences to default values [2023-02-18 18:25:35,888 INFO L181 SettingsManager]: Resetting IcfgToChc preferences to default values [2023-02-18 18:25:35,888 INFO L181 SettingsManager]: Resetting IcfgTransformer preferences to default values [2023-02-18 18:25:35,889 INFO L184 SettingsManager]: ReqToTest provides no preferences, ignoring... [2023-02-18 18:25:35,889 INFO L181 SettingsManager]: Resetting Boogie Printer preferences to default values [2023-02-18 18:25:35,890 INFO L181 SettingsManager]: Resetting ChcSmtPrinter preferences to default values [2023-02-18 18:25:35,890 INFO L181 SettingsManager]: Resetting ReqPrinter preferences to default values [2023-02-18 18:25:35,891 INFO L181 SettingsManager]: Resetting Witness Printer preferences to default values [2023-02-18 18:25:35,892 INFO L184 SettingsManager]: Boogie PL CUP Parser provides no preferences, ignoring... [2023-02-18 18:25:35,892 INFO L181 SettingsManager]: Resetting CDTParser preferences to default values [2023-02-18 18:25:35,893 INFO L184 SettingsManager]: AutomataScriptParser provides no preferences, ignoring... [2023-02-18 18:25:35,893 INFO L184 SettingsManager]: ReqParser provides no preferences, ignoring... [2023-02-18 18:25:35,893 INFO L181 SettingsManager]: Resetting SmtParser preferences to default values [2023-02-18 18:25:35,894 INFO L181 SettingsManager]: Resetting Witness Parser preferences to default values [2023-02-18 18:25:35,894 INFO L188 SettingsManager]: Finished resetting all preferences to default values... [2023-02-18 18:25:35,895 INFO L101 SettingsManager]: Beginning loading settings from /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/config/svcomp-Reach-32bit-Automizer_Default.epf [2023-02-18 18:25:35,912 INFO L113 SettingsManager]: Loading preferences was successful [2023-02-18 18:25:35,913 INFO L115 SettingsManager]: Preferences different from defaults after loading the file: [2023-02-18 18:25:35,913 INFO L136 SettingsManager]: Preferences of UltimateCore differ from their defaults: [2023-02-18 18:25:35,913 INFO L138 SettingsManager]: * Log level for class=de.uni_freiburg.informatik.ultimate.lib.smtlibutils.quantifier.QuantifierPusher=ERROR; [2023-02-18 18:25:35,914 INFO L136 SettingsManager]: Preferences of Boogie Procedure Inliner differ from their defaults: [2023-02-18 18:25:35,914 INFO L138 SettingsManager]: * Ignore calls to procedures called more than once=ONLY_FOR_SEQUENTIAL_PROGRAMS [2023-02-18 18:25:35,915 INFO L136 SettingsManager]: Preferences of BlockEncodingV2 differ from their defaults: [2023-02-18 18:25:35,915 INFO L138 SettingsManager]: * Create parallel compositions if possible=false [2023-02-18 18:25:35,915 INFO L138 SettingsManager]: * Use SBE=true [2023-02-18 18:25:35,915 INFO L136 SettingsManager]: Preferences of CACSL2BoogieTranslator differ from their defaults: [2023-02-18 18:25:35,916 INFO L138 SettingsManager]: * sizeof long=4 [2023-02-18 18:25:35,916 INFO L138 SettingsManager]: * Overapproximate operations on floating types=true [2023-02-18 18:25:35,916 INFO L138 SettingsManager]: * sizeof POINTER=4 [2023-02-18 18:25:35,916 INFO L138 SettingsManager]: * Check division by zero=IGNORE [2023-02-18 18:25:35,917 INFO L138 SettingsManager]: * Pointer to allocated memory at dereference=IGNORE [2023-02-18 18:25:35,917 INFO L138 SettingsManager]: * If two pointers are subtracted or compared they have the same base address=IGNORE [2023-02-18 18:25:35,917 INFO L138 SettingsManager]: * Check array bounds for arrays that are off heap=IGNORE [2023-02-18 18:25:35,917 INFO L138 SettingsManager]: * sizeof long double=12 [2023-02-18 18:25:35,917 INFO L138 SettingsManager]: * Check if freed pointer was valid=false [2023-02-18 18:25:35,918 INFO L138 SettingsManager]: * Use constant arrays=true [2023-02-18 18:25:35,918 INFO L138 SettingsManager]: * Pointer base address is valid at dereference=IGNORE [2023-02-18 18:25:35,918 INFO L136 SettingsManager]: Preferences of RCFGBuilder differ from their defaults: [2023-02-18 18:25:35,918 INFO L138 SettingsManager]: * Size of a code block=SequenceOfStatements [2023-02-18 18:25:35,919 INFO L138 SettingsManager]: * SMT solver=External_DefaultMode [2023-02-18 18:25:35,919 INFO L138 SettingsManager]: * Command for external solver=z3 SMTLIB2_COMPLIANT=true -memory:2024 -smt2 -in -t:2000 [2023-02-18 18:25:35,919 INFO L136 SettingsManager]: Preferences of TraceAbstraction differ from their defaults: [2023-02-18 18:25:35,919 INFO L138 SettingsManager]: * Compute Interpolants along a Counterexample=FPandBP [2023-02-18 18:25:35,920 INFO L138 SettingsManager]: * Positions where we compute the Hoare Annotation=LoopsAndPotentialCycles [2023-02-18 18:25:35,920 INFO L138 SettingsManager]: * Trace refinement strategy=CAMEL [2023-02-18 18:25:35,920 INFO L138 SettingsManager]: * Command for external solver=z3 SMTLIB2_COMPLIANT=true -memory:2024 -smt2 -in [2023-02-18 18:25:35,920 INFO L138 SettingsManager]: * Automaton type used in concurrency analysis=PETRI_NET [2023-02-18 18:25:35,921 INFO L138 SettingsManager]: * Compute Hoare Annotation of negated interpolant automaton, abstraction and CFG=true [2023-02-18 18:25:35,921 INFO L138 SettingsManager]: * Order on configurations for Petri net unfoldings=DBO [2023-02-18 18:25:35,921 INFO L138 SettingsManager]: * SMT solver=External_ModelsAndUnsatCoreMode [2023-02-18 18:25:35,921 INFO L138 SettingsManager]: * Independence relation used for large block encoding in concurrent analysis=SYNTACTIC [2023-02-18 18:25:35,921 INFO L138 SettingsManager]: * Looper check in Petri net analysis=SEMANTIC WARNING: An illegal reflective access operation has occurred WARNING: Illegal reflective access by com.sun.xml.bind.v2.runtime.reflect.opt.Injector$1 (file:/storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/plugins/com.sun.xml.bind_2.2.0.v201505121915.jar) to method java.lang.ClassLoader.defineClass(java.lang.String,byte[],int,int) WARNING: Please consider reporting this to the maintainers of com.sun.xml.bind.v2.runtime.reflect.opt.Injector$1 WARNING: Use --illegal-access=warn to enable warnings of further illegal reflective access operations WARNING: All illegal access operations will be denied in a future release Applying setting for plugin de.uni_freiburg.informatik.ultimate.plugins.generator.cacsl2boogietranslator: Entry function -> main Applying setting for plugin de.uni_freiburg.informatik.ultimate.witnessprinter: Witness directory -> /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux Applying setting for plugin de.uni_freiburg.informatik.ultimate.witnessprinter: Witness filename -> witness.graphml Applying setting for plugin de.uni_freiburg.informatik.ultimate.witnessprinter: Write witness besides input file -> false Applying setting for plugin de.uni_freiburg.informatik.ultimate.witnessprinter: Graph data specification -> CHECK( init(main()), LTL(G ! call(reach_error())) ) Applying setting for plugin de.uni_freiburg.informatik.ultimate.witnessprinter: Graph data producer -> Automizer Applying setting for plugin de.uni_freiburg.informatik.ultimate.witnessprinter: Graph data architecture -> 32bit Applying setting for plugin de.uni_freiburg.informatik.ultimate.witnessprinter: Graph data programhash -> a077c1334c11d8329da2d0c58ca917b2036581fa7e949d1d304e3346ec54a811 [2023-02-18 18:25:36,154 INFO L75 nceAwareModelManager]: Repository-Root is: /tmp [2023-02-18 18:25:36,175 INFO L261 ainManager$Toolchain]: [Toolchain 1]: Applicable parser(s) successfully (re)initialized [2023-02-18 18:25:36,177 INFO L217 ainManager$Toolchain]: [Toolchain 1]: Toolchain selected. [2023-02-18 18:25:36,178 INFO L271 PluginConnector]: Initializing CDTParser... [2023-02-18 18:25:36,179 INFO L275 PluginConnector]: CDTParser initialized [2023-02-18 18:25:36,180 INFO L432 ainManager$Toolchain]: [Toolchain 1]: Parsing single file: /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/../sv-benchmarks/c/nla-digbench-scaling/hard2_valuebound5.c [2023-02-18 18:25:37,305 INFO L500 CDTParser]: Created temporary CDT project at NULL [2023-02-18 18:25:37,536 INFO L351 CDTParser]: Found 1 translation units. [2023-02-18 18:25:37,537 INFO L172 CDTParser]: Scanning /storage/repos/ultimate/releaseScripts/default/sv-benchmarks/c/nla-digbench-scaling/hard2_valuebound5.c [2023-02-18 18:25:37,542 INFO L394 CDTParser]: About to delete temporary CDT project at /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/data/9a431ef2f/947cece58d0846f6aab6700f973b858c/FLAGf56a80854 [2023-02-18 18:25:37,558 INFO L402 CDTParser]: Successfully deleted /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/data/9a431ef2f/947cece58d0846f6aab6700f973b858c [2023-02-18 18:25:37,560 INFO L299 ainManager$Toolchain]: ####################### [Toolchain 1] ####################### [2023-02-18 18:25:37,561 INFO L131 ToolchainWalker]: Walking toolchain with 6 elements. [2023-02-18 18:25:37,565 INFO L113 PluginConnector]: ------------------------CACSL2BoogieTranslator---------------------------- [2023-02-18 18:25:37,565 INFO L271 PluginConnector]: Initializing CACSL2BoogieTranslator... [2023-02-18 18:25:37,568 INFO L275 PluginConnector]: CACSL2BoogieTranslator initialized [2023-02-18 18:25:37,569 INFO L185 PluginConnector]: Executing the observer ACSLObjectContainerObserver from plugin CACSL2BoogieTranslator for "CDTParser AST 18.02 06:25:37" (1/1) ... [2023-02-18 18:25:37,572 INFO L205 PluginConnector]: Invalid model from CACSL2BoogieTranslator for observer de.uni_freiburg.informatik.ultimate.plugins.generator.cacsl2boogietranslator.ACSLObjectContainerObserver@1a6e1bc8 and model type de.uni_freiburg.informatik.ultimate.plugins.generator.cacsl2boogietranslator AST 18.02 06:25:37, skipping insertion in model container [2023-02-18 18:25:37,572 INFO L185 PluginConnector]: Executing the observer CACSL2BoogieTranslatorObserver from plugin CACSL2BoogieTranslator for "CDTParser AST 18.02 06:25:37" (1/1) ... [2023-02-18 18:25:37,578 INFO L145 MainTranslator]: Starting translation in SV-COMP mode [2023-02-18 18:25:37,600 INFO L178 MainTranslator]: Built tables and reachable declarations [2023-02-18 18:25:37,709 WARN L237 ndardFunctionHandler]: Function reach_error is already implemented but we override the implementation for the call at /storage/repos/ultimate/releaseScripts/default/sv-benchmarks/c/nla-digbench-scaling/hard2_valuebound5.c[526,539] [2023-02-18 18:25:37,730 INFO L210 PostProcessor]: Analyzing one entry point: main [2023-02-18 18:25:37,741 INFO L203 MainTranslator]: Completed pre-run [2023-02-18 18:25:37,751 WARN L237 ndardFunctionHandler]: Function reach_error is already implemented but we override the implementation for the call at /storage/repos/ultimate/releaseScripts/default/sv-benchmarks/c/nla-digbench-scaling/hard2_valuebound5.c[526,539] [2023-02-18 18:25:37,755 INFO L210 PostProcessor]: Analyzing one entry point: main [2023-02-18 18:25:37,768 INFO L208 MainTranslator]: Completed translation [2023-02-18 18:25:37,768 INFO L202 PluginConnector]: Adding new model de.uni_freiburg.informatik.ultimate.plugins.generator.cacsl2boogietranslator AST 18.02 06:25:37 WrapperNode [2023-02-18 18:25:37,768 INFO L132 PluginConnector]: ------------------------ END CACSL2BoogieTranslator---------------------------- [2023-02-18 18:25:37,769 INFO L113 PluginConnector]: ------------------------Boogie Procedure Inliner---------------------------- [2023-02-18 18:25:37,769 INFO L271 PluginConnector]: Initializing Boogie Procedure Inliner... [2023-02-18 18:25:37,769 INFO L275 PluginConnector]: Boogie Procedure Inliner initialized [2023-02-18 18:25:37,775 INFO L185 PluginConnector]: Executing the observer TypeChecker from plugin Boogie Procedure Inliner for "de.uni_freiburg.informatik.ultimate.plugins.generator.cacsl2boogietranslator AST 18.02 06:25:37" (1/1) ... [2023-02-18 18:25:37,780 INFO L185 PluginConnector]: Executing the observer Inliner from plugin Boogie Procedure Inliner for "de.uni_freiburg.informatik.ultimate.plugins.generator.cacsl2boogietranslator AST 18.02 06:25:37" (1/1) ... [2023-02-18 18:25:37,795 INFO L138 Inliner]: procedures = 14, calls = 23, calls flagged for inlining = 3, calls inlined = 3, statements flattened = 64 [2023-02-18 18:25:37,796 INFO L132 PluginConnector]: ------------------------ END Boogie Procedure Inliner---------------------------- [2023-02-18 18:25:37,796 INFO L113 PluginConnector]: ------------------------Boogie Preprocessor---------------------------- [2023-02-18 18:25:37,796 INFO L271 PluginConnector]: Initializing Boogie Preprocessor... [2023-02-18 18:25:37,797 INFO L275 PluginConnector]: Boogie Preprocessor initialized [2023-02-18 18:25:37,805 INFO L185 PluginConnector]: Executing the observer EnsureBoogieModelObserver from plugin Boogie Preprocessor for "de.uni_freiburg.informatik.ultimate.plugins.generator.cacsl2boogietranslator AST 18.02 06:25:37" (1/1) ... [2023-02-18 18:25:37,806 INFO L185 PluginConnector]: Executing the observer TypeChecker from plugin Boogie Preprocessor for "de.uni_freiburg.informatik.ultimate.plugins.generator.cacsl2boogietranslator AST 18.02 06:25:37" (1/1) ... [2023-02-18 18:25:37,807 INFO L185 PluginConnector]: Executing the observer ConstExpander from plugin Boogie Preprocessor for "de.uni_freiburg.informatik.ultimate.plugins.generator.cacsl2boogietranslator AST 18.02 06:25:37" (1/1) ... [2023-02-18 18:25:37,808 INFO L185 PluginConnector]: Executing the observer StructExpander from plugin Boogie Preprocessor for "de.uni_freiburg.informatik.ultimate.plugins.generator.cacsl2boogietranslator AST 18.02 06:25:37" (1/1) ... [2023-02-18 18:25:37,811 INFO L185 PluginConnector]: Executing the observer UnstructureCode from plugin Boogie Preprocessor for "de.uni_freiburg.informatik.ultimate.plugins.generator.cacsl2boogietranslator AST 18.02 06:25:37" (1/1) ... [2023-02-18 18:25:37,814 INFO L185 PluginConnector]: Executing the observer FunctionInliner from plugin Boogie Preprocessor for "de.uni_freiburg.informatik.ultimate.plugins.generator.cacsl2boogietranslator AST 18.02 06:25:37" (1/1) ... [2023-02-18 18:25:37,815 INFO L185 PluginConnector]: Executing the observer LTLStepAnnotator from plugin Boogie Preprocessor for "de.uni_freiburg.informatik.ultimate.plugins.generator.cacsl2boogietranslator AST 18.02 06:25:37" (1/1) ... [2023-02-18 18:25:37,817 INFO L185 PluginConnector]: Executing the observer BoogieSymbolTableConstructor from plugin Boogie Preprocessor for "de.uni_freiburg.informatik.ultimate.plugins.generator.cacsl2boogietranslator AST 18.02 06:25:37" (1/1) ... [2023-02-18 18:25:37,818 INFO L132 PluginConnector]: ------------------------ END Boogie Preprocessor---------------------------- [2023-02-18 18:25:37,820 INFO L113 PluginConnector]: ------------------------RCFGBuilder---------------------------- [2023-02-18 18:25:37,820 INFO L271 PluginConnector]: Initializing RCFGBuilder... [2023-02-18 18:25:37,820 INFO L275 PluginConnector]: RCFGBuilder initialized [2023-02-18 18:25:37,821 INFO L185 PluginConnector]: Executing the observer RCFGBuilderObserver from plugin RCFGBuilder for "de.uni_freiburg.informatik.ultimate.plugins.generator.cacsl2boogietranslator AST 18.02 06:25:37" (1/1) ... [2023-02-18 18:25:37,830 INFO L173 SolverBuilder]: Constructing external solver with command: z3 SMTLIB2_COMPLIANT=true -memory:2024 -smt2 -in -t:2000 [2023-02-18 18:25:37,847 INFO L189 MonitoredProcess]: No working directory specified, using /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 [2023-02-18 18:25:37,858 INFO L229 MonitoredProcess]: Starting monitored process 1 with /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 SMTLIB2_COMPLIANT=true -memory:2024 -smt2 -in -t:2000 (exit command is (exit), workingDir is null) [2023-02-18 18:25:37,869 INFO L327 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 SMTLIB2_COMPLIANT=true -memory:2024 -smt2 -in -t:2000 (1)] Waiting until timeout for monitored process [2023-02-18 18:25:37,914 INFO L130 BoogieDeclarations]: Found specification of procedure #Ultimate.allocInit [2023-02-18 18:25:37,914 INFO L130 BoogieDeclarations]: Found specification of procedure write~init~int [2023-02-18 18:25:37,914 INFO L130 BoogieDeclarations]: Found specification of procedure ULTIMATE.start [2023-02-18 18:25:37,915 INFO L138 BoogieDeclarations]: Found implementation of procedure ULTIMATE.start [2023-02-18 18:25:37,915 INFO L130 BoogieDeclarations]: Found specification of procedure __VERIFIER_assert [2023-02-18 18:25:37,917 INFO L138 BoogieDeclarations]: Found implementation of procedure __VERIFIER_assert [2023-02-18 18:25:37,973 INFO L235 CfgBuilder]: Building ICFG [2023-02-18 18:25:37,975 INFO L261 CfgBuilder]: Building CFG for each procedure with an implementation [2023-02-18 18:25:38,095 INFO L276 CfgBuilder]: Performing block encoding [2023-02-18 18:25:38,100 INFO L295 CfgBuilder]: Using the 1 location(s) as analysis (start of procedure ULTIMATE.start) [2023-02-18 18:25:38,101 INFO L300 CfgBuilder]: Removed 2 assume(true) statements. [2023-02-18 18:25:38,102 INFO L202 PluginConnector]: Adding new model de.uni_freiburg.informatik.ultimate.plugins.generator.rcfgbuilder CFG 18.02 06:25:38 BoogieIcfgContainer [2023-02-18 18:25:38,102 INFO L132 PluginConnector]: ------------------------ END RCFGBuilder---------------------------- [2023-02-18 18:25:38,104 INFO L113 PluginConnector]: ------------------------TraceAbstraction---------------------------- [2023-02-18 18:25:38,104 INFO L271 PluginConnector]: Initializing TraceAbstraction... [2023-02-18 18:25:38,106 INFO L275 PluginConnector]: TraceAbstraction initialized [2023-02-18 18:25:38,106 INFO L185 PluginConnector]: Executing the observer TraceAbstractionObserver from plugin TraceAbstraction for "CDTParser AST 18.02 06:25:37" (1/3) ... [2023-02-18 18:25:38,107 INFO L205 PluginConnector]: Invalid model from TraceAbstraction for observer de.uni_freiburg.informatik.ultimate.plugins.generator.traceabstraction.TraceAbstractionObserver@54dfa772 and model type de.uni_freiburg.informatik.ultimate.plugins.generator.traceabstraction AST 18.02 06:25:38, skipping insertion in model container [2023-02-18 18:25:38,107 INFO L185 PluginConnector]: Executing the observer TraceAbstractionObserver from plugin TraceAbstraction for "de.uni_freiburg.informatik.ultimate.plugins.generator.cacsl2boogietranslator AST 18.02 06:25:37" (2/3) ... [2023-02-18 18:25:38,107 INFO L205 PluginConnector]: Invalid model from TraceAbstraction for observer de.uni_freiburg.informatik.ultimate.plugins.generator.traceabstraction.TraceAbstractionObserver@54dfa772 and model type de.uni_freiburg.informatik.ultimate.plugins.generator.traceabstraction AST 18.02 06:25:38, skipping insertion in model container [2023-02-18 18:25:38,108 INFO L185 PluginConnector]: Executing the observer TraceAbstractionObserver from plugin TraceAbstraction for "de.uni_freiburg.informatik.ultimate.plugins.generator.rcfgbuilder CFG 18.02 06:25:38" (3/3) ... [2023-02-18 18:25:38,109 INFO L112 eAbstractionObserver]: Analyzing ICFG hard2_valuebound5.c [2023-02-18 18:25:38,124 INFO L203 ceAbstractionStarter]: Automizer settings: Hoare:true NWA Interpolation:FPandBP Determinization: PREDICATE_ABSTRACTION [2023-02-18 18:25:38,124 INFO L162 ceAbstractionStarter]: Applying trace abstraction to program that has 1 error locations. [2023-02-18 18:25:38,163 INFO L356 AbstractCegarLoop]: ======== Iteration 0 == of CEGAR loop == AllErrorsAtOnce ======== [2023-02-18 18:25:38,168 INFO L357 AbstractCegarLoop]: Settings: SEPARATE_VIOLATION_CHECK=true, mInterprocedural=true, mMaxIterations=1000000, mWatchIteration=1000000, mArtifact=RCFG, mInterpolation=FPandBP, mInterpolantAutomaton=STRAIGHT_LINE, mDumpAutomata=false, mAutomataFormat=ATS_NUMERATE, mDumpPath=., mDeterminiation=PREDICATE_ABSTRACTION, mMinimize=MINIMIZE_SEVPA, mHoare=true, mAutomataTypeConcurrency=PETRI_NET, mHoareTripleChecks=INCREMENTAL, mHoareAnnotationPositions=LoopsAndPotentialCycles, mDumpOnlyReuseAutomata=false, mLimitTraceHistogram=0, mErrorLocTimeLimit=0, mLimitPathProgramCount=0, mCollectInterpolantStatistics=true, mHeuristicEmptinessCheck=false, mHeuristicEmptinessCheckAStarHeuristic=ZERO, mHeuristicEmptinessCheckAStarHeuristicRandomSeed=1337, mHeuristicEmptinessCheckSmtFeatureScoringMethod=DAGSIZE, mSMTFeatureExtraction=false, mSMTFeatureExtractionDumpPath=., mOverrideInterpolantAutomaton=false, mMcrInterpolantMethod=WP, mPorIndependenceSettings=[Lde.uni_freiburg.informatik.ultimate.lib.tracecheckerutils.partialorder.independence.IndependenceSettings;@12c8f1c8, mLbeIndependenceSettings=[IndependenceType=SYNTACTIC, AbstractionType=NONE, UseConditional=, UseSemiCommutativity=, Solver=, SolverTimeout=] [2023-02-18 18:25:38,169 INFO L358 AbstractCegarLoop]: Starting to check reachability of 1 error locations. [2023-02-18 18:25:38,172 INFO L276 IsEmpty]: Start isEmpty. Operand has 26 states, 16 states have (on average 1.625) internal successors, (26), 17 states have internal predecessors, (26), 7 states have call successors, (7), 1 states have call predecessors, (7), 1 states have return successors, (7), 7 states have call predecessors, (7), 7 states have call successors, (7) [2023-02-18 18:25:38,178 INFO L282 IsEmpty]: Finished isEmpty. Found accepting run of length 10 [2023-02-18 18:25:38,179 INFO L187 NwaCegarLoop]: Found error trace [2023-02-18 18:25:38,179 INFO L195 NwaCegarLoop]: trace histogram [1, 1, 1, 1, 1, 1, 1, 1, 1] [2023-02-18 18:25:38,180 INFO L420 AbstractCegarLoop]: === Iteration 1 === Targeting __VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION === [__VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION] === [2023-02-18 18:25:38,184 INFO L144 PredicateUnifier]: Initialized classic predicate unifier [2023-02-18 18:25:38,185 INFO L85 PathProgramCache]: Analyzing trace with hash -586848446, now seen corresponding path program 1 times [2023-02-18 18:25:38,192 INFO L118 FreeRefinementEngine]: Executing refinement strategy CAMEL [2023-02-18 18:25:38,192 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleSmtInterpolCraig [409623290] [2023-02-18 18:25:38,193 INFO L95 rtionOrderModulation]: Keeping assertion order NOT_INCREMENTALLY [2023-02-18 18:25:38,193 INFO L127 SolverBuilder]: Constructing new instance of SMTInterpol with explicit timeout -1 ms and remaining time -1 ms [2023-02-18 18:25:38,267 INFO L136 AnnotateAndAsserter]: Conjunction of SSA is unsat [2023-02-18 18:25:38,338 INFO L134 CoverageAnalysis]: Checked inductivity of 0 backedges. 0 proven. 0 refuted. 0 times theorem prover too weak. 0 trivial. 0 not checked. [2023-02-18 18:25:38,338 INFO L136 FreeRefinementEngine]: Strategy CAMEL found an infeasible trace [2023-02-18 18:25:38,339 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleSmtInterpolCraig [409623290] [2023-02-18 18:25:38,339 INFO L157 FreeRefinementEngine]: IpTcStrategyModuleSmtInterpolCraig [409623290] provided 1 perfect and 0 imperfect interpolant sequences [2023-02-18 18:25:38,340 INFO L184 FreeRefinementEngine]: Found 1 perfect and 0 imperfect interpolant sequences. [2023-02-18 18:25:38,340 INFO L197 FreeRefinementEngine]: Number of different interpolants: perfect sequences [2] imperfect sequences [] total 2 [2023-02-18 18:25:38,341 INFO L121 tionRefinementEngine]: Using interpolant automaton builder IpAbStrategyModuleStraightlineAll [106763713] [2023-02-18 18:25:38,342 INFO L85 oduleStraightlineAll]: Using 1 perfect interpolants to construct interpolant automaton [2023-02-18 18:25:38,345 INFO L571 AbstractCegarLoop]: INTERPOLANT automaton has 2 states [2023-02-18 18:25:38,345 INFO L100 FreeRefinementEngine]: Using predicate unifier PredicateUnifier provided by strategy CAMEL [2023-02-18 18:25:38,377 INFO L143 InterpolantAutomaton]: Constructing interpolant automaton starting with 2 interpolants. [2023-02-18 18:25:38,378 INFO L145 InterpolantAutomaton]: CoverageRelationStatistics Valid=1, Invalid=1, Unknown=0, NotChecked=0, Total=2 [2023-02-18 18:25:38,380 INFO L87 Difference]: Start difference. First operand has 26 states, 16 states have (on average 1.625) internal successors, (26), 17 states have internal predecessors, (26), 7 states have call successors, (7), 1 states have call predecessors, (7), 1 states have return successors, (7), 7 states have call predecessors, (7), 7 states have call successors, (7) Second operand has 2 states, 2 states have (on average 4.0) internal successors, (8), 2 states have internal predecessors, (8), 1 states have call successors, (1), 1 states have call predecessors, (1), 0 states have return successors, (0), 0 states have call predecessors, (0), 0 states have call successors, (0) [2023-02-18 18:25:38,399 INFO L144 Difference]: Subtrahend was deterministic. Have not used determinization. [2023-02-18 18:25:38,399 INFO L93 Difference]: Finished difference Result 49 states and 83 transitions. [2023-02-18 18:25:38,400 INFO L141 InterpolantAutomaton]: Switched to read-only mode: deterministic interpolant automaton has 2 states. [2023-02-18 18:25:38,401 INFO L78 Accepts]: Start accepts. Automaton has has 2 states, 2 states have (on average 4.0) internal successors, (8), 2 states have internal predecessors, (8), 1 states have call successors, (1), 1 states have call predecessors, (1), 0 states have return successors, (0), 0 states have call predecessors, (0), 0 states have call successors, (0) Word has length 9 [2023-02-18 18:25:38,401 INFO L84 Accepts]: Finished accepts. some prefix is accepted. [2023-02-18 18:25:38,407 INFO L225 Difference]: With dead ends: 49 [2023-02-18 18:25:38,407 INFO L226 Difference]: Without dead ends: 22 [2023-02-18 18:25:38,410 INFO L412 NwaCegarLoop]: 0 DeclaredPredicates, 2 GetRequests, 2 SyntacticMatches, 0 SemanticMatches, 0 ConstructedPredicates, 0 IntricatePredicates, 0 DeprecatedPredicates, 0 ImplicationChecksByTransitivity, 0.0s TimeCoverageRelationStatistics Valid=1, Invalid=1, Unknown=0, NotChecked=0, Total=2 [2023-02-18 18:25:38,413 INFO L413 NwaCegarLoop]: 34 mSDtfsCounter, 0 mSDsluCounter, 0 mSDsCounter, 0 mSdLazyCounter, 0 mSolverCounterSat, 0 mSolverCounterUnsat, 0 mSolverCounterUnknown, 0 mSolverCounterNotChecked, 0.0s Time, 0 mProtectedPredicate, 0 mProtectedAction, 0 SdHoareTripleChecker+Valid, 34 SdHoareTripleChecker+Invalid, 0 SdHoareTripleChecker+Unknown, 0 SdHoareTripleChecker+Unchecked, 0.0s SdHoareTripleChecker+Time, 0 IncrementalHoareTripleChecker+Valid, 0 IncrementalHoareTripleChecker+Invalid, 0 IncrementalHoareTripleChecker+Unknown, 0 IncrementalHoareTripleChecker+Unchecked, 0.0s IncrementalHoareTripleChecker+Time [2023-02-18 18:25:38,414 INFO L414 NwaCegarLoop]: SdHoareTripleChecker [0 Valid, 34 Invalid, 0 Unknown, 0 Unchecked, 0.0s Time], IncrementalHoareTripleChecker [0 Valid, 0 Invalid, 0 Unknown, 0 Unchecked, 0.0s Time] [2023-02-18 18:25:38,427 INFO L82 GeneralOperation]: Start minimizeSevpa. Operand 22 states. [2023-02-18 18:25:38,441 INFO L88 GeneralOperation]: Finished minimizeSevpa. Reduced states from 22 to 22. [2023-02-18 18:25:38,442 INFO L82 GeneralOperation]: Start removeUnreachable. Operand has 22 states, 13 states have (on average 1.3076923076923077) internal successors, (17), 14 states have internal predecessors, (17), 7 states have call successors, (7), 1 states have call predecessors, (7), 1 states have return successors, (6), 6 states have call predecessors, (6), 6 states have call successors, (6) [2023-02-18 18:25:38,443 INFO L88 GeneralOperation]: Finished removeUnreachable. Reduced from 22 states to 22 states and 30 transitions. [2023-02-18 18:25:38,445 INFO L78 Accepts]: Start accepts. Automaton has 22 states and 30 transitions. Word has length 9 [2023-02-18 18:25:38,445 INFO L84 Accepts]: Finished accepts. word is rejected. [2023-02-18 18:25:38,445 INFO L495 AbstractCegarLoop]: Abstraction has 22 states and 30 transitions. [2023-02-18 18:25:38,445 INFO L496 AbstractCegarLoop]: INTERPOLANT automaton has has 2 states, 2 states have (on average 4.0) internal successors, (8), 2 states have internal predecessors, (8), 1 states have call successors, (1), 1 states have call predecessors, (1), 0 states have return successors, (0), 0 states have call predecessors, (0), 0 states have call successors, (0) [2023-02-18 18:25:38,446 INFO L276 IsEmpty]: Start isEmpty. Operand 22 states and 30 transitions. [2023-02-18 18:25:38,446 INFO L282 IsEmpty]: Finished isEmpty. Found accepting run of length 10 [2023-02-18 18:25:38,447 INFO L187 NwaCegarLoop]: Found error trace [2023-02-18 18:25:38,447 INFO L195 NwaCegarLoop]: trace histogram [1, 1, 1, 1, 1, 1, 1, 1, 1] [2023-02-18 18:25:38,447 WARN L477 AbstractCegarLoop]: Destroyed unattended storables created during the last iteration: SelfDestructingSolverStorable0 [2023-02-18 18:25:38,447 INFO L420 AbstractCegarLoop]: === Iteration 2 === Targeting __VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION === [__VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION] === [2023-02-18 18:25:38,448 INFO L144 PredicateUnifier]: Initialized classic predicate unifier [2023-02-18 18:25:38,448 INFO L85 PathProgramCache]: Analyzing trace with hash 1188158916, now seen corresponding path program 1 times [2023-02-18 18:25:38,449 INFO L118 FreeRefinementEngine]: Executing refinement strategy CAMEL [2023-02-18 18:25:38,449 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleSmtInterpolCraig [879738339] [2023-02-18 18:25:38,449 INFO L95 rtionOrderModulation]: Keeping assertion order NOT_INCREMENTALLY [2023-02-18 18:25:38,449 INFO L127 SolverBuilder]: Constructing new instance of SMTInterpol with explicit timeout -1 ms and remaining time -1 ms [2023-02-18 18:25:38,466 INFO L136 AnnotateAndAsserter]: Conjunction of SSA is unsat [2023-02-18 18:25:38,563 INFO L134 CoverageAnalysis]: Checked inductivity of 0 backedges. 0 proven. 0 refuted. 0 times theorem prover too weak. 0 trivial. 0 not checked. [2023-02-18 18:25:38,564 INFO L136 FreeRefinementEngine]: Strategy CAMEL found an infeasible trace [2023-02-18 18:25:38,564 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleSmtInterpolCraig [879738339] [2023-02-18 18:25:38,564 INFO L157 FreeRefinementEngine]: IpTcStrategyModuleSmtInterpolCraig [879738339] provided 1 perfect and 0 imperfect interpolant sequences [2023-02-18 18:25:38,565 INFO L184 FreeRefinementEngine]: Found 1 perfect and 0 imperfect interpolant sequences. [2023-02-18 18:25:38,565 INFO L197 FreeRefinementEngine]: Number of different interpolants: perfect sequences [5] imperfect sequences [] total 5 [2023-02-18 18:25:38,565 INFO L121 tionRefinementEngine]: Using interpolant automaton builder IpAbStrategyModuleStraightlineAll [1857589295] [2023-02-18 18:25:38,565 INFO L85 oduleStraightlineAll]: Using 1 perfect interpolants to construct interpolant automaton [2023-02-18 18:25:38,566 INFO L571 AbstractCegarLoop]: INTERPOLANT automaton has 5 states [2023-02-18 18:25:38,567 INFO L100 FreeRefinementEngine]: Using predicate unifier PredicateUnifier provided by strategy CAMEL [2023-02-18 18:25:38,567 INFO L143 InterpolantAutomaton]: Constructing interpolant automaton starting with 5 interpolants. [2023-02-18 18:25:38,567 INFO L145 InterpolantAutomaton]: CoverageRelationStatistics Valid=7, Invalid=13, Unknown=0, NotChecked=0, Total=20 [2023-02-18 18:25:38,568 INFO L87 Difference]: Start difference. First operand 22 states and 30 transitions. Second operand has 5 states, 5 states have (on average 1.6) internal successors, (8), 4 states have internal predecessors, (8), 1 states have call successors, (1), 1 states have call predecessors, (1), 0 states have return successors, (0), 0 states have call predecessors, (0), 0 states have call successors, (0) [2023-02-18 18:25:38,655 INFO L144 Difference]: Subtrahend was deterministic. Have not used determinization. [2023-02-18 18:25:38,668 INFO L93 Difference]: Finished difference Result 35 states and 47 transitions. [2023-02-18 18:25:38,669 INFO L141 InterpolantAutomaton]: Switched to read-only mode: deterministic interpolant automaton has 6 states. [2023-02-18 18:25:38,670 INFO L78 Accepts]: Start accepts. Automaton has has 5 states, 5 states have (on average 1.6) internal successors, (8), 4 states have internal predecessors, (8), 1 states have call successors, (1), 1 states have call predecessors, (1), 0 states have return successors, (0), 0 states have call predecessors, (0), 0 states have call successors, (0) Word has length 9 [2023-02-18 18:25:38,670 INFO L84 Accepts]: Finished accepts. some prefix is accepted. [2023-02-18 18:25:38,671 INFO L225 Difference]: With dead ends: 35 [2023-02-18 18:25:38,671 INFO L226 Difference]: Without dead ends: 33 [2023-02-18 18:25:38,671 INFO L412 NwaCegarLoop]: 0 DeclaredPredicates, 6 GetRequests, 2 SyntacticMatches, 0 SemanticMatches, 4 ConstructedPredicates, 0 IntricatePredicates, 0 DeprecatedPredicates, 0 ImplicationChecksByTransitivity, 0.0s TimeCoverageRelationStatistics Valid=11, Invalid=19, Unknown=0, NotChecked=0, Total=30 [2023-02-18 18:25:38,673 INFO L413 NwaCegarLoop]: 29 mSDtfsCounter, 12 mSDsluCounter, 63 mSDsCounter, 0 mSdLazyCounter, 27 mSolverCounterSat, 1 mSolverCounterUnsat, 0 mSolverCounterUnknown, 0 mSolverCounterNotChecked, 0.0s Time, 0 mProtectedPredicate, 0 mProtectedAction, 18 SdHoareTripleChecker+Valid, 92 SdHoareTripleChecker+Invalid, 28 SdHoareTripleChecker+Unknown, 0 SdHoareTripleChecker+Unchecked, 0.0s SdHoareTripleChecker+Time, 1 IncrementalHoareTripleChecker+Valid, 27 IncrementalHoareTripleChecker+Invalid, 0 IncrementalHoareTripleChecker+Unknown, 0 IncrementalHoareTripleChecker+Unchecked, 0.1s IncrementalHoareTripleChecker+Time [2023-02-18 18:25:38,673 INFO L414 NwaCegarLoop]: SdHoareTripleChecker [18 Valid, 92 Invalid, 28 Unknown, 0 Unchecked, 0.0s Time], IncrementalHoareTripleChecker [1 Valid, 27 Invalid, 0 Unknown, 0 Unchecked, 0.1s Time] [2023-02-18 18:25:38,675 INFO L82 GeneralOperation]: Start minimizeSevpa. Operand 33 states. [2023-02-18 18:25:38,682 INFO L88 GeneralOperation]: Finished minimizeSevpa. Reduced states from 33 to 26. [2023-02-18 18:25:38,682 INFO L82 GeneralOperation]: Start removeUnreachable. Operand has 26 states, 16 states have (on average 1.25) internal successors, (20), 17 states have internal predecessors, (20), 7 states have call successors, (7), 2 states have call predecessors, (7), 2 states have return successors, (6), 6 states have call predecessors, (6), 6 states have call successors, (6) [2023-02-18 18:25:38,683 INFO L88 GeneralOperation]: Finished removeUnreachable. Reduced from 26 states to 26 states and 33 transitions. [2023-02-18 18:25:38,688 INFO L78 Accepts]: Start accepts. Automaton has 26 states and 33 transitions. Word has length 9 [2023-02-18 18:25:38,689 INFO L84 Accepts]: Finished accepts. word is rejected. [2023-02-18 18:25:38,690 INFO L495 AbstractCegarLoop]: Abstraction has 26 states and 33 transitions. [2023-02-18 18:25:38,690 INFO L496 AbstractCegarLoop]: INTERPOLANT automaton has has 5 states, 5 states have (on average 1.6) internal successors, (8), 4 states have internal predecessors, (8), 1 states have call successors, (1), 1 states have call predecessors, (1), 0 states have return successors, (0), 0 states have call predecessors, (0), 0 states have call successors, (0) [2023-02-18 18:25:38,692 INFO L276 IsEmpty]: Start isEmpty. Operand 26 states and 33 transitions. [2023-02-18 18:25:38,692 INFO L282 IsEmpty]: Finished isEmpty. Found accepting run of length 15 [2023-02-18 18:25:38,692 INFO L187 NwaCegarLoop]: Found error trace [2023-02-18 18:25:38,693 INFO L195 NwaCegarLoop]: trace histogram [2, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1] [2023-02-18 18:25:38,693 WARN L477 AbstractCegarLoop]: Destroyed unattended storables created during the last iteration: SelfDestructingSolverStorable1 [2023-02-18 18:25:38,694 INFO L420 AbstractCegarLoop]: === Iteration 3 === Targeting __VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION === [__VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION] === [2023-02-18 18:25:38,697 INFO L144 PredicateUnifier]: Initialized classic predicate unifier [2023-02-18 18:25:38,697 INFO L85 PathProgramCache]: Analyzing trace with hash -697944935, now seen corresponding path program 1 times [2023-02-18 18:25:38,698 INFO L118 FreeRefinementEngine]: Executing refinement strategy CAMEL [2023-02-18 18:25:38,698 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleSmtInterpolCraig [1074770434] [2023-02-18 18:25:38,698 INFO L95 rtionOrderModulation]: Keeping assertion order NOT_INCREMENTALLY [2023-02-18 18:25:38,698 INFO L127 SolverBuilder]: Constructing new instance of SMTInterpol with explicit timeout -1 ms and remaining time -1 ms [2023-02-18 18:25:38,709 INFO L136 AnnotateAndAsserter]: Conjunction of SSA is unsat [2023-02-18 18:25:38,799 INFO L376 atingTraceCheckCraig]: Compute interpolants for subsequence at non-pending call position 5 [2023-02-18 18:25:38,802 INFO L136 AnnotateAndAsserter]: Conjunction of SSA is unsat [2023-02-18 18:25:38,809 INFO L134 CoverageAnalysis]: Checked inductivity of 2 backedges. 2 proven. 0 refuted. 0 times theorem prover too weak. 0 trivial. 0 not checked. [2023-02-18 18:25:38,809 INFO L136 FreeRefinementEngine]: Strategy CAMEL found an infeasible trace [2023-02-18 18:25:38,809 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleSmtInterpolCraig [1074770434] [2023-02-18 18:25:38,810 INFO L157 FreeRefinementEngine]: IpTcStrategyModuleSmtInterpolCraig [1074770434] provided 1 perfect and 0 imperfect interpolant sequences [2023-02-18 18:25:38,810 INFO L184 FreeRefinementEngine]: Found 1 perfect and 0 imperfect interpolant sequences. [2023-02-18 18:25:38,810 INFO L197 FreeRefinementEngine]: Number of different interpolants: perfect sequences [5] imperfect sequences [] total 5 [2023-02-18 18:25:38,810 INFO L121 tionRefinementEngine]: Using interpolant automaton builder IpAbStrategyModuleStraightlineAll [1961094881] [2023-02-18 18:25:38,810 INFO L85 oduleStraightlineAll]: Using 1 perfect interpolants to construct interpolant automaton [2023-02-18 18:25:38,811 INFO L571 AbstractCegarLoop]: INTERPOLANT automaton has 5 states [2023-02-18 18:25:38,811 INFO L100 FreeRefinementEngine]: Using predicate unifier PredicateUnifier provided by strategy CAMEL [2023-02-18 18:25:38,812 INFO L143 InterpolantAutomaton]: Constructing interpolant automaton starting with 5 interpolants. [2023-02-18 18:25:38,812 INFO L145 InterpolantAutomaton]: CoverageRelationStatistics Valid=7, Invalid=13, Unknown=0, NotChecked=0, Total=20 [2023-02-18 18:25:38,813 INFO L87 Difference]: Start difference. First operand 26 states and 33 transitions. Second operand has 5 states, 5 states have (on average 2.2) internal successors, (11), 4 states have internal predecessors, (11), 1 states have call successors, (2), 2 states have call predecessors, (2), 1 states have return successors, (1), 1 states have call predecessors, (1), 1 states have call successors, (1) [2023-02-18 18:25:38,860 INFO L144 Difference]: Subtrahend was deterministic. Have not used determinization. [2023-02-18 18:25:38,861 INFO L93 Difference]: Finished difference Result 39 states and 50 transitions. [2023-02-18 18:25:38,861 INFO L141 InterpolantAutomaton]: Switched to read-only mode: deterministic interpolant automaton has 6 states. [2023-02-18 18:25:38,861 INFO L78 Accepts]: Start accepts. Automaton has has 5 states, 5 states have (on average 2.2) internal successors, (11), 4 states have internal predecessors, (11), 1 states have call successors, (2), 2 states have call predecessors, (2), 1 states have return successors, (1), 1 states have call predecessors, (1), 1 states have call successors, (1) Word has length 14 [2023-02-18 18:25:38,862 INFO L84 Accepts]: Finished accepts. some prefix is accepted. [2023-02-18 18:25:38,862 INFO L225 Difference]: With dead ends: 39 [2023-02-18 18:25:38,862 INFO L226 Difference]: Without dead ends: 37 [2023-02-18 18:25:38,863 INFO L412 NwaCegarLoop]: 0 DeclaredPredicates, 8 GetRequests, 4 SyntacticMatches, 0 SemanticMatches, 4 ConstructedPredicates, 0 IntricatePredicates, 0 DeprecatedPredicates, 0 ImplicationChecksByTransitivity, 0.0s TimeCoverageRelationStatistics Valid=11, Invalid=19, Unknown=0, NotChecked=0, Total=30 [2023-02-18 18:25:38,864 INFO L413 NwaCegarLoop]: 29 mSDtfsCounter, 10 mSDsluCounter, 59 mSDsCounter, 0 mSdLazyCounter, 37 mSolverCounterSat, 1 mSolverCounterUnsat, 0 mSolverCounterUnknown, 0 mSolverCounterNotChecked, 0.0s Time, 0 mProtectedPredicate, 0 mProtectedAction, 15 SdHoareTripleChecker+Valid, 88 SdHoareTripleChecker+Invalid, 38 SdHoareTripleChecker+Unknown, 0 SdHoareTripleChecker+Unchecked, 0.0s SdHoareTripleChecker+Time, 1 IncrementalHoareTripleChecker+Valid, 37 IncrementalHoareTripleChecker+Invalid, 0 IncrementalHoareTripleChecker+Unknown, 0 IncrementalHoareTripleChecker+Unchecked, 0.0s IncrementalHoareTripleChecker+Time [2023-02-18 18:25:38,864 INFO L414 NwaCegarLoop]: SdHoareTripleChecker [15 Valid, 88 Invalid, 38 Unknown, 0 Unchecked, 0.0s Time], IncrementalHoareTripleChecker [1 Valid, 37 Invalid, 0 Unknown, 0 Unchecked, 0.0s Time] [2023-02-18 18:25:38,865 INFO L82 GeneralOperation]: Start minimizeSevpa. Operand 37 states. [2023-02-18 18:25:38,872 INFO L88 GeneralOperation]: Finished minimizeSevpa. Reduced states from 37 to 30. [2023-02-18 18:25:38,873 INFO L82 GeneralOperation]: Start removeUnreachable. Operand has 30 states, 19 states have (on average 1.2105263157894737) internal successors, (23), 20 states have internal predecessors, (23), 7 states have call successors, (7), 3 states have call predecessors, (7), 3 states have return successors, (6), 6 states have call predecessors, (6), 6 states have call successors, (6) [2023-02-18 18:25:38,877 INFO L88 GeneralOperation]: Finished removeUnreachable. Reduced from 30 states to 30 states and 36 transitions. [2023-02-18 18:25:38,878 INFO L78 Accepts]: Start accepts. Automaton has 30 states and 36 transitions. Word has length 14 [2023-02-18 18:25:38,878 INFO L84 Accepts]: Finished accepts. word is rejected. [2023-02-18 18:25:38,879 INFO L495 AbstractCegarLoop]: Abstraction has 30 states and 36 transitions. [2023-02-18 18:25:38,879 INFO L496 AbstractCegarLoop]: INTERPOLANT automaton has has 5 states, 5 states have (on average 2.2) internal successors, (11), 4 states have internal predecessors, (11), 1 states have call successors, (2), 2 states have call predecessors, (2), 1 states have return successors, (1), 1 states have call predecessors, (1), 1 states have call successors, (1) [2023-02-18 18:25:38,879 INFO L276 IsEmpty]: Start isEmpty. Operand 30 states and 36 transitions. [2023-02-18 18:25:38,880 INFO L282 IsEmpty]: Finished isEmpty. Found accepting run of length 20 [2023-02-18 18:25:38,880 INFO L187 NwaCegarLoop]: Found error trace [2023-02-18 18:25:38,880 INFO L195 NwaCegarLoop]: trace histogram [3, 2, 2, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1] [2023-02-18 18:25:38,881 WARN L477 AbstractCegarLoop]: Destroyed unattended storables created during the last iteration: SelfDestructingSolverStorable2 [2023-02-18 18:25:38,881 INFO L420 AbstractCegarLoop]: === Iteration 4 === Targeting __VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION === [__VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION] === [2023-02-18 18:25:38,881 INFO L144 PredicateUnifier]: Initialized classic predicate unifier [2023-02-18 18:25:38,882 INFO L85 PathProgramCache]: Analyzing trace with hash 262992548, now seen corresponding path program 1 times [2023-02-18 18:25:38,882 INFO L118 FreeRefinementEngine]: Executing refinement strategy CAMEL [2023-02-18 18:25:38,882 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleSmtInterpolCraig [618023697] [2023-02-18 18:25:38,883 INFO L95 rtionOrderModulation]: Keeping assertion order NOT_INCREMENTALLY [2023-02-18 18:25:38,883 INFO L127 SolverBuilder]: Constructing new instance of SMTInterpol with explicit timeout -1 ms and remaining time -1 ms [2023-02-18 18:25:38,894 ERROR L245 FreeRefinementEngine]: Caught known exception: Unsupported non-linear arithmetic [2023-02-18 18:25:38,894 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleZ3 [490928298] [2023-02-18 18:25:38,895 INFO L95 rtionOrderModulation]: Keeping assertion order NOT_INCREMENTALLY [2023-02-18 18:25:38,895 INFO L173 SolverBuilder]: Constructing external solver with command: z3 -smt2 -in SMTLIB2_COMPLIANT=true [2023-02-18 18:25:38,895 INFO L189 MonitoredProcess]: No working directory specified, using /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 [2023-02-18 18:25:38,901 INFO L229 MonitoredProcess]: Starting monitored process 2 with /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (exit command is (exit), workingDir is null) [2023-02-18 18:25:38,917 INFO L327 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (2)] Waiting until timeout for monitored process [2023-02-18 18:25:38,964 INFO L136 AnnotateAndAsserter]: Conjunction of SSA is unsat [2023-02-18 18:25:38,967 INFO L263 TraceCheckSpWp]: Trace formula consists of 86 conjuncts, 19 conjunts are in the unsatisfiable core [2023-02-18 18:25:38,971 INFO L286 TraceCheckSpWp]: Computing forward predicates... [2023-02-18 18:25:39,039 INFO L134 CoverageAnalysis]: Checked inductivity of 8 backedges. 3 proven. 4 refuted. 0 times theorem prover too weak. 1 trivial. 0 not checked. [2023-02-18 18:25:39,044 INFO L328 TraceCheckSpWp]: Computing backward predicates... [2023-02-18 18:25:39,179 INFO L134 CoverageAnalysis]: Checked inductivity of 8 backedges. 3 proven. 4 refuted. 0 times theorem prover too weak. 1 trivial. 0 not checked. [2023-02-18 18:25:39,180 INFO L136 FreeRefinementEngine]: Strategy CAMEL found an infeasible trace [2023-02-18 18:25:39,180 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleSmtInterpolCraig [618023697] [2023-02-18 18:25:39,182 WARN L310 FreeRefinementEngine]: Interpolation failed due to KNOWN_IGNORE: SMT_SOLVER_CANNOT_INTERPOLATE_INPUT [2023-02-18 18:25:39,182 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleZ3 [490928298] [2023-02-18 18:25:39,183 INFO L157 FreeRefinementEngine]: IpTcStrategyModuleZ3 [490928298] provided 0 perfect and 2 imperfect interpolant sequences [2023-02-18 18:25:39,183 INFO L184 FreeRefinementEngine]: Found 0 perfect and 2 imperfect interpolant sequences. [2023-02-18 18:25:39,183 INFO L197 FreeRefinementEngine]: Number of different interpolants: perfect sequences [] imperfect sequences [8, 7] total 12 [2023-02-18 18:25:39,184 INFO L121 tionRefinementEngine]: Using interpolant automaton builder IpAbStrategyModuleStraightlineAll [1365592335] [2023-02-18 18:25:39,185 INFO L85 oduleStraightlineAll]: Using 2 imperfect interpolants to construct interpolant automaton [2023-02-18 18:25:39,186 INFO L571 AbstractCegarLoop]: INTERPOLANT automaton has 12 states [2023-02-18 18:25:39,186 INFO L100 FreeRefinementEngine]: Using predicate unifier PredicateUnifier provided by strategy CAMEL [2023-02-18 18:25:39,187 INFO L143 InterpolantAutomaton]: Constructing interpolant automaton starting with 12 interpolants. [2023-02-18 18:25:39,188 INFO L145 InterpolantAutomaton]: CoverageRelationStatistics Valid=32, Invalid=100, Unknown=0, NotChecked=0, Total=132 [2023-02-18 18:25:39,188 INFO L87 Difference]: Start difference. First operand 30 states and 36 transitions. Second operand has 12 states, 10 states have (on average 2.0) internal successors, (20), 9 states have internal predecessors, (20), 4 states have call successors, (6), 3 states have call predecessors, (6), 2 states have return successors, (4), 2 states have call predecessors, (4), 4 states have call successors, (4) [2023-02-18 18:25:39,454 INFO L144 Difference]: Subtrahend was deterministic. Have not used determinization. [2023-02-18 18:25:39,454 INFO L93 Difference]: Finished difference Result 65 states and 84 transitions. [2023-02-18 18:25:39,455 INFO L141 InterpolantAutomaton]: Switched to read-only mode: deterministic interpolant automaton has 8 states. [2023-02-18 18:25:39,455 INFO L78 Accepts]: Start accepts. Automaton has has 12 states, 10 states have (on average 2.0) internal successors, (20), 9 states have internal predecessors, (20), 4 states have call successors, (6), 3 states have call predecessors, (6), 2 states have return successors, (4), 2 states have call predecessors, (4), 4 states have call successors, (4) Word has length 19 [2023-02-18 18:25:39,455 INFO L84 Accepts]: Finished accepts. some prefix is accepted. [2023-02-18 18:25:39,457 INFO L225 Difference]: With dead ends: 65 [2023-02-18 18:25:39,457 INFO L226 Difference]: Without dead ends: 51 [2023-02-18 18:25:39,458 INFO L412 NwaCegarLoop]: 0 DeclaredPredicates, 38 GetRequests, 25 SyntacticMatches, 1 SemanticMatches, 12 ConstructedPredicates, 0 IntricatePredicates, 0 DeprecatedPredicates, 20 ImplicationChecksByTransitivity, 0.1s TimeCoverageRelationStatistics Valid=47, Invalid=135, Unknown=0, NotChecked=0, Total=182 [2023-02-18 18:25:39,459 INFO L413 NwaCegarLoop]: 17 mSDtfsCounter, 30 mSDsluCounter, 31 mSDsCounter, 0 mSdLazyCounter, 113 mSolverCounterSat, 31 mSolverCounterUnsat, 0 mSolverCounterUnknown, 0 mSolverCounterNotChecked, 0.2s Time, 0 mProtectedPredicate, 0 mProtectedAction, 40 SdHoareTripleChecker+Valid, 48 SdHoareTripleChecker+Invalid, 144 SdHoareTripleChecker+Unknown, 0 SdHoareTripleChecker+Unchecked, 0.0s SdHoareTripleChecker+Time, 31 IncrementalHoareTripleChecker+Valid, 113 IncrementalHoareTripleChecker+Invalid, 0 IncrementalHoareTripleChecker+Unknown, 0 IncrementalHoareTripleChecker+Unchecked, 0.2s IncrementalHoareTripleChecker+Time [2023-02-18 18:25:39,464 INFO L414 NwaCegarLoop]: SdHoareTripleChecker [40 Valid, 48 Invalid, 144 Unknown, 0 Unchecked, 0.0s Time], IncrementalHoareTripleChecker [31 Valid, 113 Invalid, 0 Unknown, 0 Unchecked, 0.2s Time] [2023-02-18 18:25:39,465 INFO L82 GeneralOperation]: Start minimizeSevpa. Operand 51 states. [2023-02-18 18:25:39,473 INFO L88 GeneralOperation]: Finished minimizeSevpa. Reduced states from 51 to 51. [2023-02-18 18:25:39,478 INFO L82 GeneralOperation]: Start removeUnreachable. Operand has 51 states, 30 states have (on average 1.1666666666666667) internal successors, (35), 33 states have internal predecessors, (35), 15 states have call successors, (15), 5 states have call predecessors, (15), 5 states have return successors, (13), 12 states have call predecessors, (13), 13 states have call successors, (13) [2023-02-18 18:25:39,480 INFO L88 GeneralOperation]: Finished removeUnreachable. Reduced from 51 states to 51 states and 63 transitions. [2023-02-18 18:25:39,482 INFO L78 Accepts]: Start accepts. Automaton has 51 states and 63 transitions. Word has length 19 [2023-02-18 18:25:39,482 INFO L84 Accepts]: Finished accepts. word is rejected. [2023-02-18 18:25:39,486 INFO L495 AbstractCegarLoop]: Abstraction has 51 states and 63 transitions. [2023-02-18 18:25:39,486 INFO L496 AbstractCegarLoop]: INTERPOLANT automaton has has 12 states, 10 states have (on average 2.0) internal successors, (20), 9 states have internal predecessors, (20), 4 states have call successors, (6), 3 states have call predecessors, (6), 2 states have return successors, (4), 2 states have call predecessors, (4), 4 states have call successors, (4) [2023-02-18 18:25:39,486 INFO L276 IsEmpty]: Start isEmpty. Operand 51 states and 63 transitions. [2023-02-18 18:25:39,487 INFO L282 IsEmpty]: Finished isEmpty. Found accepting run of length 27 [2023-02-18 18:25:39,487 INFO L187 NwaCegarLoop]: Found error trace [2023-02-18 18:25:39,487 INFO L195 NwaCegarLoop]: trace histogram [4, 3, 3, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1] [2023-02-18 18:25:39,496 INFO L540 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (2)] Forceful destruction successful, exit code 0 [2023-02-18 18:25:39,694 WARN L477 AbstractCegarLoop]: Destroyed unattended storables created during the last iteration: SelfDestructingSolverStorable3,2 /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true [2023-02-18 18:25:39,694 INFO L420 AbstractCegarLoop]: === Iteration 5 === Targeting __VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION === [__VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION] === [2023-02-18 18:25:39,695 INFO L144 PredicateUnifier]: Initialized classic predicate unifier [2023-02-18 18:25:39,695 INFO L85 PathProgramCache]: Analyzing trace with hash 1807142342, now seen corresponding path program 1 times [2023-02-18 18:25:39,695 INFO L118 FreeRefinementEngine]: Executing refinement strategy CAMEL [2023-02-18 18:25:39,695 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleSmtInterpolCraig [555597426] [2023-02-18 18:25:39,695 INFO L95 rtionOrderModulation]: Keeping assertion order NOT_INCREMENTALLY [2023-02-18 18:25:39,695 INFO L127 SolverBuilder]: Constructing new instance of SMTInterpol with explicit timeout -1 ms and remaining time -1 ms [2023-02-18 18:25:39,704 ERROR L245 FreeRefinementEngine]: Caught known exception: Unsupported non-linear arithmetic [2023-02-18 18:25:39,704 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleZ3 [1607412747] [2023-02-18 18:25:39,704 INFO L95 rtionOrderModulation]: Keeping assertion order NOT_INCREMENTALLY [2023-02-18 18:25:39,704 INFO L173 SolverBuilder]: Constructing external solver with command: z3 -smt2 -in SMTLIB2_COMPLIANT=true [2023-02-18 18:25:39,705 INFO L189 MonitoredProcess]: No working directory specified, using /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 [2023-02-18 18:25:39,709 INFO L229 MonitoredProcess]: Starting monitored process 3 with /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (exit command is (exit), workingDir is null) [2023-02-18 18:25:39,711 INFO L327 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (3)] Waiting until timeout for monitored process [2023-02-18 18:25:39,761 INFO L136 AnnotateAndAsserter]: Conjunction of SSA is unsat [2023-02-18 18:25:39,762 INFO L263 TraceCheckSpWp]: Trace formula consists of 97 conjuncts, 17 conjunts are in the unsatisfiable core [2023-02-18 18:25:39,764 INFO L286 TraceCheckSpWp]: Computing forward predicates... [2023-02-18 18:25:39,811 INFO L134 CoverageAnalysis]: Checked inductivity of 18 backedges. 5 proven. 7 refuted. 0 times theorem prover too weak. 6 trivial. 0 not checked. [2023-02-18 18:25:39,812 INFO L328 TraceCheckSpWp]: Computing backward predicates... [2023-02-18 18:25:39,890 INFO L134 CoverageAnalysis]: Checked inductivity of 18 backedges. 5 proven. 7 refuted. 0 times theorem prover too weak. 6 trivial. 0 not checked. [2023-02-18 18:25:39,890 INFO L136 FreeRefinementEngine]: Strategy CAMEL found an infeasible trace [2023-02-18 18:25:39,890 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleSmtInterpolCraig [555597426] [2023-02-18 18:25:39,890 WARN L310 FreeRefinementEngine]: Interpolation failed due to KNOWN_IGNORE: SMT_SOLVER_CANNOT_INTERPOLATE_INPUT [2023-02-18 18:25:39,891 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleZ3 [1607412747] [2023-02-18 18:25:39,891 INFO L157 FreeRefinementEngine]: IpTcStrategyModuleZ3 [1607412747] provided 0 perfect and 2 imperfect interpolant sequences [2023-02-18 18:25:39,891 INFO L184 FreeRefinementEngine]: Found 0 perfect and 2 imperfect interpolant sequences. [2023-02-18 18:25:39,891 INFO L197 FreeRefinementEngine]: Number of different interpolants: perfect sequences [] imperfect sequences [7, 7] total 11 [2023-02-18 18:25:39,891 INFO L121 tionRefinementEngine]: Using interpolant automaton builder IpAbStrategyModuleStraightlineAll [1006143155] [2023-02-18 18:25:39,892 INFO L85 oduleStraightlineAll]: Using 2 imperfect interpolants to construct interpolant automaton [2023-02-18 18:25:39,892 INFO L571 AbstractCegarLoop]: INTERPOLANT automaton has 11 states [2023-02-18 18:25:39,892 INFO L100 FreeRefinementEngine]: Using predicate unifier PredicateUnifier provided by strategy CAMEL [2023-02-18 18:25:39,893 INFO L143 InterpolantAutomaton]: Constructing interpolant automaton starting with 11 interpolants. [2023-02-18 18:25:39,893 INFO L145 InterpolantAutomaton]: CoverageRelationStatistics Valid=27, Invalid=83, Unknown=0, NotChecked=0, Total=110 [2023-02-18 18:25:39,893 INFO L87 Difference]: Start difference. First operand 51 states and 63 transitions. Second operand has 11 states, 11 states have (on average 2.1818181818181817) internal successors, (24), 10 states have internal predecessors, (24), 3 states have call successors, (8), 3 states have call predecessors, (8), 2 states have return successors, (6), 2 states have call predecessors, (6), 3 states have call successors, (6) [2023-02-18 18:25:40,027 INFO L144 Difference]: Subtrahend was deterministic. Have not used determinization. [2023-02-18 18:25:40,027 INFO L93 Difference]: Finished difference Result 66 states and 83 transitions. [2023-02-18 18:25:40,027 INFO L141 InterpolantAutomaton]: Switched to read-only mode: deterministic interpolant automaton has 8 states. [2023-02-18 18:25:40,028 INFO L78 Accepts]: Start accepts. Automaton has has 11 states, 11 states have (on average 2.1818181818181817) internal successors, (24), 10 states have internal predecessors, (24), 3 states have call successors, (8), 3 states have call predecessors, (8), 2 states have return successors, (6), 2 states have call predecessors, (6), 3 states have call successors, (6) Word has length 26 [2023-02-18 18:25:40,028 INFO L84 Accepts]: Finished accepts. some prefix is accepted. [2023-02-18 18:25:40,029 INFO L225 Difference]: With dead ends: 66 [2023-02-18 18:25:40,029 INFO L226 Difference]: Without dead ends: 59 [2023-02-18 18:25:40,033 INFO L412 NwaCegarLoop]: 0 DeclaredPredicates, 52 GetRequests, 39 SyntacticMatches, 2 SemanticMatches, 11 ConstructedPredicates, 0 IntricatePredicates, 0 DeprecatedPredicates, 15 ImplicationChecksByTransitivity, 0.1s TimeCoverageRelationStatistics Valid=42, Invalid=114, Unknown=0, NotChecked=0, Total=156 [2023-02-18 18:25:40,036 INFO L413 NwaCegarLoop]: 17 mSDtfsCounter, 24 mSDsluCounter, 50 mSDsCounter, 0 mSdLazyCounter, 134 mSolverCounterSat, 10 mSolverCounterUnsat, 0 mSolverCounterUnknown, 0 mSolverCounterNotChecked, 0.1s Time, 0 mProtectedPredicate, 0 mProtectedAction, 30 SdHoareTripleChecker+Valid, 67 SdHoareTripleChecker+Invalid, 144 SdHoareTripleChecker+Unknown, 0 SdHoareTripleChecker+Unchecked, 0.0s SdHoareTripleChecker+Time, 10 IncrementalHoareTripleChecker+Valid, 134 IncrementalHoareTripleChecker+Invalid, 0 IncrementalHoareTripleChecker+Unknown, 0 IncrementalHoareTripleChecker+Unchecked, 0.1s IncrementalHoareTripleChecker+Time [2023-02-18 18:25:40,037 INFO L414 NwaCegarLoop]: SdHoareTripleChecker [30 Valid, 67 Invalid, 144 Unknown, 0 Unchecked, 0.0s Time], IncrementalHoareTripleChecker [10 Valid, 134 Invalid, 0 Unknown, 0 Unchecked, 0.1s Time] [2023-02-18 18:25:40,040 INFO L82 GeneralOperation]: Start minimizeSevpa. Operand 59 states. [2023-02-18 18:25:40,054 INFO L88 GeneralOperation]: Finished minimizeSevpa. Reduced states from 59 to 58. [2023-02-18 18:25:40,058 INFO L82 GeneralOperation]: Start removeUnreachable. Operand has 58 states, 35 states have (on average 1.1714285714285715) internal successors, (41), 39 states have internal predecessors, (41), 16 states have call successors, (16), 6 states have call predecessors, (16), 6 states have return successors, (15), 12 states have call predecessors, (15), 15 states have call successors, (15) [2023-02-18 18:25:40,065 INFO L88 GeneralOperation]: Finished removeUnreachable. Reduced from 58 states to 58 states and 72 transitions. [2023-02-18 18:25:40,066 INFO L78 Accepts]: Start accepts. Automaton has 58 states and 72 transitions. Word has length 26 [2023-02-18 18:25:40,066 INFO L84 Accepts]: Finished accepts. word is rejected. [2023-02-18 18:25:40,067 INFO L495 AbstractCegarLoop]: Abstraction has 58 states and 72 transitions. [2023-02-18 18:25:40,067 INFO L496 AbstractCegarLoop]: INTERPOLANT automaton has has 11 states, 11 states have (on average 2.1818181818181817) internal successors, (24), 10 states have internal predecessors, (24), 3 states have call successors, (8), 3 states have call predecessors, (8), 2 states have return successors, (6), 2 states have call predecessors, (6), 3 states have call successors, (6) [2023-02-18 18:25:40,067 INFO L276 IsEmpty]: Start isEmpty. Operand 58 states and 72 transitions. [2023-02-18 18:25:40,070 INFO L282 IsEmpty]: Finished isEmpty. Found accepting run of length 57 [2023-02-18 18:25:40,071 INFO L187 NwaCegarLoop]: Found error trace [2023-02-18 18:25:40,071 INFO L195 NwaCegarLoop]: trace histogram [9, 8, 8, 2, 2, 2, 2, 2, 2, 2, 2, 2, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1] [2023-02-18 18:25:40,078 INFO L540 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (3)] Forceful destruction successful, exit code 0 [2023-02-18 18:25:40,277 WARN L477 AbstractCegarLoop]: Destroyed unattended storables created during the last iteration: SelfDestructingSolverStorable4,3 /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true [2023-02-18 18:25:40,278 INFO L420 AbstractCegarLoop]: === Iteration 6 === Targeting __VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION === [__VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION] === [2023-02-18 18:25:40,278 INFO L144 PredicateUnifier]: Initialized classic predicate unifier [2023-02-18 18:25:40,278 INFO L85 PathProgramCache]: Analyzing trace with hash 1034157389, now seen corresponding path program 1 times [2023-02-18 18:25:40,278 INFO L118 FreeRefinementEngine]: Executing refinement strategy CAMEL [2023-02-18 18:25:40,278 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleSmtInterpolCraig [994462693] [2023-02-18 18:25:40,278 INFO L95 rtionOrderModulation]: Keeping assertion order NOT_INCREMENTALLY [2023-02-18 18:25:40,279 INFO L127 SolverBuilder]: Constructing new instance of SMTInterpol with explicit timeout -1 ms and remaining time -1 ms [2023-02-18 18:25:40,297 ERROR L245 FreeRefinementEngine]: Caught known exception: Unsupported non-linear arithmetic [2023-02-18 18:25:40,298 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleZ3 [1276684144] [2023-02-18 18:25:40,298 INFO L95 rtionOrderModulation]: Keeping assertion order NOT_INCREMENTALLY [2023-02-18 18:25:40,298 INFO L173 SolverBuilder]: Constructing external solver with command: z3 -smt2 -in SMTLIB2_COMPLIANT=true [2023-02-18 18:25:40,299 INFO L189 MonitoredProcess]: No working directory specified, using /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 [2023-02-18 18:25:40,300 INFO L229 MonitoredProcess]: Starting monitored process 4 with /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (exit command is (exit), workingDir is null) [2023-02-18 18:25:40,302 INFO L327 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (4)] Waiting until timeout for monitored process [2023-02-18 18:25:40,349 INFO L136 AnnotateAndAsserter]: Conjunction of SSA is unsat [2023-02-18 18:25:40,350 INFO L263 TraceCheckSpWp]: Trace formula consists of 159 conjuncts, 33 conjunts are in the unsatisfiable core [2023-02-18 18:25:40,353 INFO L286 TraceCheckSpWp]: Computing forward predicates... [2023-02-18 18:25:40,417 INFO L134 CoverageAnalysis]: Checked inductivity of 135 backedges. 15 proven. 29 refuted. 0 times theorem prover too weak. 91 trivial. 0 not checked. [2023-02-18 18:25:40,417 INFO L328 TraceCheckSpWp]: Computing backward predicates... [2023-02-18 18:25:40,654 INFO L134 CoverageAnalysis]: Checked inductivity of 135 backedges. 15 proven. 29 refuted. 0 times theorem prover too weak. 91 trivial. 0 not checked. [2023-02-18 18:25:40,655 INFO L136 FreeRefinementEngine]: Strategy CAMEL found an infeasible trace [2023-02-18 18:25:40,655 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleSmtInterpolCraig [994462693] [2023-02-18 18:25:40,655 WARN L310 FreeRefinementEngine]: Interpolation failed due to KNOWN_IGNORE: SMT_SOLVER_CANNOT_INTERPOLATE_INPUT [2023-02-18 18:25:40,655 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleZ3 [1276684144] [2023-02-18 18:25:40,655 INFO L157 FreeRefinementEngine]: IpTcStrategyModuleZ3 [1276684144] provided 0 perfect and 2 imperfect interpolant sequences [2023-02-18 18:25:40,657 INFO L184 FreeRefinementEngine]: Found 0 perfect and 2 imperfect interpolant sequences. [2023-02-18 18:25:40,657 INFO L197 FreeRefinementEngine]: Number of different interpolants: perfect sequences [] imperfect sequences [9, 9] total 15 [2023-02-18 18:25:40,657 INFO L121 tionRefinementEngine]: Using interpolant automaton builder IpAbStrategyModuleStraightlineAll [1161173078] [2023-02-18 18:25:40,657 INFO L85 oduleStraightlineAll]: Using 2 imperfect interpolants to construct interpolant automaton [2023-02-18 18:25:40,658 INFO L571 AbstractCegarLoop]: INTERPOLANT automaton has 15 states [2023-02-18 18:25:40,659 INFO L100 FreeRefinementEngine]: Using predicate unifier PredicateUnifier provided by strategy CAMEL [2023-02-18 18:25:40,660 INFO L143 InterpolantAutomaton]: Constructing interpolant automaton starting with 15 interpolants. [2023-02-18 18:25:40,660 INFO L145 InterpolantAutomaton]: CoverageRelationStatistics Valid=43, Invalid=167, Unknown=0, NotChecked=0, Total=210 [2023-02-18 18:25:40,661 INFO L87 Difference]: Start difference. First operand 58 states and 72 transitions. Second operand has 15 states, 15 states have (on average 2.2666666666666666) internal successors, (34), 14 states have internal predecessors, (34), 7 states have call successors, (18), 3 states have call predecessors, (18), 2 states have return successors, (16), 4 states have call predecessors, (16), 5 states have call successors, (16) [2023-02-18 18:25:41,530 INFO L144 Difference]: Subtrahend was deterministic. Have not used determinization. [2023-02-18 18:25:41,530 INFO L93 Difference]: Finished difference Result 142 states and 193 transitions. [2023-02-18 18:25:41,531 INFO L141 InterpolantAutomaton]: Switched to read-only mode: deterministic interpolant automaton has 12 states. [2023-02-18 18:25:41,531 INFO L78 Accepts]: Start accepts. Automaton has has 15 states, 15 states have (on average 2.2666666666666666) internal successors, (34), 14 states have internal predecessors, (34), 7 states have call successors, (18), 3 states have call predecessors, (18), 2 states have return successors, (16), 4 states have call predecessors, (16), 5 states have call successors, (16) Word has length 56 [2023-02-18 18:25:41,531 INFO L84 Accepts]: Finished accepts. some prefix is accepted. [2023-02-18 18:25:41,532 INFO L225 Difference]: With dead ends: 142 [2023-02-18 18:25:41,533 INFO L226 Difference]: Without dead ends: 111 [2023-02-18 18:25:41,533 INFO L412 NwaCegarLoop]: 0 DeclaredPredicates, 115 GetRequests, 94 SyntacticMatches, 3 SemanticMatches, 18 ConstructedPredicates, 0 IntricatePredicates, 0 DeprecatedPredicates, 37 ImplicationChecksByTransitivity, 0.2s TimeCoverageRelationStatistics Valid=83, Invalid=297, Unknown=0, NotChecked=0, Total=380 [2023-02-18 18:25:41,534 INFO L413 NwaCegarLoop]: 27 mSDtfsCounter, 46 mSDsluCounter, 89 mSDsCounter, 0 mSdLazyCounter, 522 mSolverCounterSat, 68 mSolverCounterUnsat, 0 mSolverCounterUnknown, 0 mSolverCounterNotChecked, 0.6s Time, 0 mProtectedPredicate, 0 mProtectedAction, 51 SdHoareTripleChecker+Valid, 116 SdHoareTripleChecker+Invalid, 590 SdHoareTripleChecker+Unknown, 0 SdHoareTripleChecker+Unchecked, 0.0s SdHoareTripleChecker+Time, 68 IncrementalHoareTripleChecker+Valid, 522 IncrementalHoareTripleChecker+Invalid, 0 IncrementalHoareTripleChecker+Unknown, 0 IncrementalHoareTripleChecker+Unchecked, 0.7s IncrementalHoareTripleChecker+Time [2023-02-18 18:25:41,534 INFO L414 NwaCegarLoop]: SdHoareTripleChecker [51 Valid, 116 Invalid, 590 Unknown, 0 Unchecked, 0.0s Time], IncrementalHoareTripleChecker [68 Valid, 522 Invalid, 0 Unknown, 0 Unchecked, 0.7s Time] [2023-02-18 18:25:41,535 INFO L82 GeneralOperation]: Start minimizeSevpa. Operand 111 states. [2023-02-18 18:25:41,582 INFO L88 GeneralOperation]: Finished minimizeSevpa. Reduced states from 111 to 106. [2023-02-18 18:25:41,583 INFO L82 GeneralOperation]: Start removeUnreachable. Operand has 106 states, 64 states have (on average 1.203125) internal successors, (77), 71 states have internal predecessors, (77), 31 states have call successors, (31), 10 states have call predecessors, (31), 10 states have return successors, (30), 24 states have call predecessors, (30), 30 states have call successors, (30) [2023-02-18 18:25:41,585 INFO L88 GeneralOperation]: Finished removeUnreachable. Reduced from 106 states to 106 states and 138 transitions. [2023-02-18 18:25:41,585 INFO L78 Accepts]: Start accepts. Automaton has 106 states and 138 transitions. Word has length 56 [2023-02-18 18:25:41,585 INFO L84 Accepts]: Finished accepts. word is rejected. [2023-02-18 18:25:41,586 INFO L495 AbstractCegarLoop]: Abstraction has 106 states and 138 transitions. [2023-02-18 18:25:41,586 INFO L496 AbstractCegarLoop]: INTERPOLANT automaton has has 15 states, 15 states have (on average 2.2666666666666666) internal successors, (34), 14 states have internal predecessors, (34), 7 states have call successors, (18), 3 states have call predecessors, (18), 2 states have return successors, (16), 4 states have call predecessors, (16), 5 states have call successors, (16) [2023-02-18 18:25:41,586 INFO L276 IsEmpty]: Start isEmpty. Operand 106 states and 138 transitions. [2023-02-18 18:25:41,592 INFO L282 IsEmpty]: Finished isEmpty. Found accepting run of length 68 [2023-02-18 18:25:41,592 INFO L187 NwaCegarLoop]: Found error trace [2023-02-18 18:25:41,592 INFO L195 NwaCegarLoop]: trace histogram [11, 10, 10, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1] [2023-02-18 18:25:41,601 INFO L540 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (4)] Forceful destruction successful, exit code 0 [2023-02-18 18:25:41,798 WARN L477 AbstractCegarLoop]: Destroyed unattended storables created during the last iteration: SelfDestructingSolverStorable5,4 /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true [2023-02-18 18:25:41,798 INFO L420 AbstractCegarLoop]: === Iteration 7 === Targeting __VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION === [__VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION] === [2023-02-18 18:25:41,799 INFO L144 PredicateUnifier]: Initialized classic predicate unifier [2023-02-18 18:25:41,799 INFO L85 PathProgramCache]: Analyzing trace with hash -1199454569, now seen corresponding path program 1 times [2023-02-18 18:25:41,799 INFO L118 FreeRefinementEngine]: Executing refinement strategy CAMEL [2023-02-18 18:25:41,799 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleSmtInterpolCraig [970102603] [2023-02-18 18:25:41,799 INFO L95 rtionOrderModulation]: Keeping assertion order NOT_INCREMENTALLY [2023-02-18 18:25:41,799 INFO L127 SolverBuilder]: Constructing new instance of SMTInterpol with explicit timeout -1 ms and remaining time -1 ms [2023-02-18 18:25:41,815 ERROR L245 FreeRefinementEngine]: Caught known exception: Unsupported non-linear arithmetic [2023-02-18 18:25:41,826 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleZ3 [1463442308] [2023-02-18 18:25:41,826 INFO L95 rtionOrderModulation]: Keeping assertion order NOT_INCREMENTALLY [2023-02-18 18:25:41,826 INFO L173 SolverBuilder]: Constructing external solver with command: z3 -smt2 -in SMTLIB2_COMPLIANT=true [2023-02-18 18:25:41,827 INFO L189 MonitoredProcess]: No working directory specified, using /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 [2023-02-18 18:25:41,828 INFO L229 MonitoredProcess]: Starting monitored process 5 with /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (exit command is (exit), workingDir is null) [2023-02-18 18:25:41,847 INFO L327 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (5)] Waiting until timeout for monitored process [2023-02-18 18:25:41,886 INFO L136 AnnotateAndAsserter]: Conjunction of SSA is unsat [2023-02-18 18:25:41,887 INFO L263 TraceCheckSpWp]: Trace formula consists of 179 conjuncts, 35 conjunts are in the unsatisfiable core [2023-02-18 18:25:41,893 INFO L286 TraceCheckSpWp]: Computing forward predicates... [2023-02-18 18:25:41,971 INFO L134 CoverageAnalysis]: Checked inductivity of 209 backedges. 19 proven. 37 refuted. 0 times theorem prover too weak. 153 trivial. 0 not checked. [2023-02-18 18:25:41,972 INFO L328 TraceCheckSpWp]: Computing backward predicates... [2023-02-18 18:25:42,191 INFO L134 CoverageAnalysis]: Checked inductivity of 209 backedges. 19 proven. 37 refuted. 0 times theorem prover too weak. 153 trivial. 0 not checked. [2023-02-18 18:25:42,192 INFO L136 FreeRefinementEngine]: Strategy CAMEL found an infeasible trace [2023-02-18 18:25:42,192 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleSmtInterpolCraig [970102603] [2023-02-18 18:25:42,192 WARN L310 FreeRefinementEngine]: Interpolation failed due to KNOWN_IGNORE: SMT_SOLVER_CANNOT_INTERPOLATE_INPUT [2023-02-18 18:25:42,192 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleZ3 [1463442308] [2023-02-18 18:25:42,193 INFO L157 FreeRefinementEngine]: IpTcStrategyModuleZ3 [1463442308] provided 0 perfect and 2 imperfect interpolant sequences [2023-02-18 18:25:42,193 INFO L184 FreeRefinementEngine]: Found 0 perfect and 2 imperfect interpolant sequences. [2023-02-18 18:25:42,193 INFO L197 FreeRefinementEngine]: Number of different interpolants: perfect sequences [] imperfect sequences [10, 9] total 16 [2023-02-18 18:25:42,193 INFO L121 tionRefinementEngine]: Using interpolant automaton builder IpAbStrategyModuleStraightlineAll [965577564] [2023-02-18 18:25:42,193 INFO L85 oduleStraightlineAll]: Using 2 imperfect interpolants to construct interpolant automaton [2023-02-18 18:25:42,195 INFO L571 AbstractCegarLoop]: INTERPOLANT automaton has 16 states [2023-02-18 18:25:42,198 INFO L100 FreeRefinementEngine]: Using predicate unifier PredicateUnifier provided by strategy CAMEL [2023-02-18 18:25:42,199 INFO L143 InterpolantAutomaton]: Constructing interpolant automaton starting with 16 interpolants. [2023-02-18 18:25:42,200 INFO L145 InterpolantAutomaton]: CoverageRelationStatistics Valid=53, Invalid=187, Unknown=0, NotChecked=0, Total=240 [2023-02-18 18:25:42,200 INFO L87 Difference]: Start difference. First operand 106 states and 138 transitions. Second operand has 16 states, 14 states have (on average 2.5714285714285716) internal successors, (36), 15 states have internal predecessors, (36), 8 states have call successors, (22), 3 states have call predecessors, (22), 2 states have return successors, (20), 5 states have call predecessors, (20), 6 states have call successors, (20) [2023-02-18 18:25:43,325 INFO L144 Difference]: Subtrahend was deterministic. Have not used determinization. [2023-02-18 18:25:43,325 INFO L93 Difference]: Finished difference Result 161 states and 210 transitions. [2023-02-18 18:25:43,326 INFO L141 InterpolantAutomaton]: Switched to read-only mode: deterministic interpolant automaton has 14 states. [2023-02-18 18:25:43,326 INFO L78 Accepts]: Start accepts. Automaton has has 16 states, 14 states have (on average 2.5714285714285716) internal successors, (36), 15 states have internal predecessors, (36), 8 states have call successors, (22), 3 states have call predecessors, (22), 2 states have return successors, (20), 5 states have call predecessors, (20), 6 states have call successors, (20) Word has length 67 [2023-02-18 18:25:43,327 INFO L84 Accepts]: Finished accepts. some prefix is accepted. [2023-02-18 18:25:43,328 INFO L225 Difference]: With dead ends: 161 [2023-02-18 18:25:43,328 INFO L226 Difference]: Without dead ends: 123 [2023-02-18 18:25:43,329 INFO L412 NwaCegarLoop]: 0 DeclaredPredicates, 137 GetRequests, 115 SyntacticMatches, 3 SemanticMatches, 19 ConstructedPredicates, 0 IntricatePredicates, 0 DeprecatedPredicates, 43 ImplicationChecksByTransitivity, 0.2s TimeCoverageRelationStatistics Valid=95, Invalid=325, Unknown=0, NotChecked=0, Total=420 [2023-02-18 18:25:43,329 INFO L413 NwaCegarLoop]: 24 mSDtfsCounter, 24 mSDsluCounter, 79 mSDsCounter, 0 mSdLazyCounter, 496 mSolverCounterSat, 37 mSolverCounterUnsat, 0 mSolverCounterUnknown, 0 mSolverCounterNotChecked, 0.9s Time, 0 mProtectedPredicate, 0 mProtectedAction, 26 SdHoareTripleChecker+Valid, 103 SdHoareTripleChecker+Invalid, 533 SdHoareTripleChecker+Unknown, 0 SdHoareTripleChecker+Unchecked, 0.0s SdHoareTripleChecker+Time, 37 IncrementalHoareTripleChecker+Valid, 496 IncrementalHoareTripleChecker+Invalid, 0 IncrementalHoareTripleChecker+Unknown, 0 IncrementalHoareTripleChecker+Unchecked, 1.0s IncrementalHoareTripleChecker+Time [2023-02-18 18:25:43,330 INFO L414 NwaCegarLoop]: SdHoareTripleChecker [26 Valid, 103 Invalid, 533 Unknown, 0 Unchecked, 0.0s Time], IncrementalHoareTripleChecker [37 Valid, 496 Invalid, 0 Unknown, 0 Unchecked, 1.0s Time] [2023-02-18 18:25:43,330 INFO L82 GeneralOperation]: Start minimizeSevpa. Operand 123 states. [2023-02-18 18:25:43,353 INFO L88 GeneralOperation]: Finished minimizeSevpa. Reduced states from 123 to 101. [2023-02-18 18:25:43,357 INFO L82 GeneralOperation]: Start removeUnreachable. Operand has 101 states, 62 states have (on average 1.1612903225806452) internal successors, (72), 66 states have internal predecessors, (72), 27 states have call successors, (27), 11 states have call predecessors, (27), 11 states have return successors, (26), 23 states have call predecessors, (26), 26 states have call successors, (26) [2023-02-18 18:25:43,359 INFO L88 GeneralOperation]: Finished removeUnreachable. Reduced from 101 states to 101 states and 125 transitions. [2023-02-18 18:25:43,360 INFO L78 Accepts]: Start accepts. Automaton has 101 states and 125 transitions. Word has length 67 [2023-02-18 18:25:43,360 INFO L84 Accepts]: Finished accepts. word is rejected. [2023-02-18 18:25:43,360 INFO L495 AbstractCegarLoop]: Abstraction has 101 states and 125 transitions. [2023-02-18 18:25:43,360 INFO L496 AbstractCegarLoop]: INTERPOLANT automaton has has 16 states, 14 states have (on average 2.5714285714285716) internal successors, (36), 15 states have internal predecessors, (36), 8 states have call successors, (22), 3 states have call predecessors, (22), 2 states have return successors, (20), 5 states have call predecessors, (20), 6 states have call successors, (20) [2023-02-18 18:25:43,361 INFO L276 IsEmpty]: Start isEmpty. Operand 101 states and 125 transitions. [2023-02-18 18:25:43,362 INFO L282 IsEmpty]: Finished isEmpty. Found accepting run of length 73 [2023-02-18 18:25:43,363 INFO L187 NwaCegarLoop]: Found error trace [2023-02-18 18:25:43,363 INFO L195 NwaCegarLoop]: trace histogram [12, 11, 11, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1] [2023-02-18 18:25:43,374 INFO L540 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (5)] Forceful destruction successful, exit code 0 [2023-02-18 18:25:43,568 WARN L477 AbstractCegarLoop]: Destroyed unattended storables created during the last iteration: SelfDestructingSolverStorable6,5 /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true [2023-02-18 18:25:43,569 INFO L420 AbstractCegarLoop]: === Iteration 8 === Targeting __VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION === [__VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION] === [2023-02-18 18:25:43,569 INFO L144 PredicateUnifier]: Initialized classic predicate unifier [2023-02-18 18:25:43,569 INFO L85 PathProgramCache]: Analyzing trace with hash 1728532070, now seen corresponding path program 1 times [2023-02-18 18:25:43,570 INFO L118 FreeRefinementEngine]: Executing refinement strategy CAMEL [2023-02-18 18:25:43,570 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleSmtInterpolCraig [2035861369] [2023-02-18 18:25:43,570 INFO L95 rtionOrderModulation]: Keeping assertion order NOT_INCREMENTALLY [2023-02-18 18:25:43,570 INFO L127 SolverBuilder]: Constructing new instance of SMTInterpol with explicit timeout -1 ms and remaining time -1 ms [2023-02-18 18:25:43,577 ERROR L245 FreeRefinementEngine]: Caught known exception: Unsupported non-linear arithmetic [2023-02-18 18:25:43,578 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleZ3 [1469273471] [2023-02-18 18:25:43,578 INFO L95 rtionOrderModulation]: Keeping assertion order NOT_INCREMENTALLY [2023-02-18 18:25:43,578 INFO L173 SolverBuilder]: Constructing external solver with command: z3 -smt2 -in SMTLIB2_COMPLIANT=true [2023-02-18 18:25:43,578 INFO L189 MonitoredProcess]: No working directory specified, using /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 [2023-02-18 18:25:43,579 INFO L229 MonitoredProcess]: Starting monitored process 6 with /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (exit command is (exit), workingDir is null) [2023-02-18 18:25:43,582 INFO L327 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (6)] Waiting until timeout for monitored process [2023-02-18 18:25:43,628 INFO L136 AnnotateAndAsserter]: Conjunction of SSA is unsat [2023-02-18 18:25:43,630 INFO L263 TraceCheckSpWp]: Trace formula consists of 188 conjuncts, 22 conjunts are in the unsatisfiable core [2023-02-18 18:25:43,632 INFO L286 TraceCheckSpWp]: Computing forward predicates... [2023-02-18 18:25:43,664 INFO L134 CoverageAnalysis]: Checked inductivity of 251 backedges. 22 proven. 9 refuted. 0 times theorem prover too weak. 220 trivial. 0 not checked. [2023-02-18 18:25:43,664 INFO L328 TraceCheckSpWp]: Computing backward predicates... [2023-02-18 18:25:43,775 INFO L134 CoverageAnalysis]: Checked inductivity of 251 backedges. 22 proven. 9 refuted. 0 times theorem prover too weak. 220 trivial. 0 not checked. [2023-02-18 18:25:43,775 INFO L136 FreeRefinementEngine]: Strategy CAMEL found an infeasible trace [2023-02-18 18:25:43,775 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleSmtInterpolCraig [2035861369] [2023-02-18 18:25:43,776 WARN L310 FreeRefinementEngine]: Interpolation failed due to KNOWN_IGNORE: SMT_SOLVER_CANNOT_INTERPOLATE_INPUT [2023-02-18 18:25:43,776 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleZ3 [1469273471] [2023-02-18 18:25:43,776 INFO L157 FreeRefinementEngine]: IpTcStrategyModuleZ3 [1469273471] provided 0 perfect and 2 imperfect interpolant sequences [2023-02-18 18:25:43,776 INFO L184 FreeRefinementEngine]: Found 0 perfect and 2 imperfect interpolant sequences. [2023-02-18 18:25:43,776 INFO L197 FreeRefinementEngine]: Number of different interpolants: perfect sequences [] imperfect sequences [7, 7] total 12 [2023-02-18 18:25:43,776 INFO L121 tionRefinementEngine]: Using interpolant automaton builder IpAbStrategyModuleStraightlineAll [1022978771] [2023-02-18 18:25:43,777 INFO L85 oduleStraightlineAll]: Using 2 imperfect interpolants to construct interpolant automaton [2023-02-18 18:25:43,777 INFO L571 AbstractCegarLoop]: INTERPOLANT automaton has 12 states [2023-02-18 18:25:43,777 INFO L100 FreeRefinementEngine]: Using predicate unifier PredicateUnifier provided by strategy CAMEL [2023-02-18 18:25:43,778 INFO L143 InterpolantAutomaton]: Constructing interpolant automaton starting with 12 interpolants. [2023-02-18 18:25:43,778 INFO L145 InterpolantAutomaton]: CoverageRelationStatistics Valid=32, Invalid=100, Unknown=0, NotChecked=0, Total=132 [2023-02-18 18:25:43,778 INFO L87 Difference]: Start difference. First operand 101 states and 125 transitions. Second operand has 12 states, 10 states have (on average 3.1) internal successors, (31), 10 states have internal predecessors, (31), 6 states have call successors, (24), 3 states have call predecessors, (24), 1 states have return successors, (22), 6 states have call predecessors, (22), 6 states have call successors, (22) [2023-02-18 18:25:44,006 INFO L144 Difference]: Subtrahend was deterministic. Have not used determinization. [2023-02-18 18:25:44,006 INFO L93 Difference]: Finished difference Result 120 states and 144 transitions. [2023-02-18 18:25:44,007 INFO L141 InterpolantAutomaton]: Switched to read-only mode: deterministic interpolant automaton has 11 states. [2023-02-18 18:25:44,007 INFO L78 Accepts]: Start accepts. Automaton has has 12 states, 10 states have (on average 3.1) internal successors, (31), 10 states have internal predecessors, (31), 6 states have call successors, (24), 3 states have call predecessors, (24), 1 states have return successors, (22), 6 states have call predecessors, (22), 6 states have call successors, (22) Word has length 72 [2023-02-18 18:25:44,008 INFO L84 Accepts]: Finished accepts. some prefix is accepted. [2023-02-18 18:25:44,008 INFO L225 Difference]: With dead ends: 120 [2023-02-18 18:25:44,009 INFO L226 Difference]: Without dead ends: 93 [2023-02-18 18:25:44,009 INFO L412 NwaCegarLoop]: 0 DeclaredPredicates, 145 GetRequests, 132 SyntacticMatches, 0 SemanticMatches, 13 ConstructedPredicates, 0 IntricatePredicates, 0 DeprecatedPredicates, 15 ImplicationChecksByTransitivity, 0.1s TimeCoverageRelationStatistics Valid=51, Invalid=159, Unknown=0, NotChecked=0, Total=210 [2023-02-18 18:25:44,010 INFO L413 NwaCegarLoop]: 44 mSDtfsCounter, 10 mSDsluCounter, 143 mSDsCounter, 0 mSdLazyCounter, 181 mSolverCounterSat, 12 mSolverCounterUnsat, 0 mSolverCounterUnknown, 0 mSolverCounterNotChecked, 0.1s Time, 0 mProtectedPredicate, 0 mProtectedAction, 12 SdHoareTripleChecker+Valid, 187 SdHoareTripleChecker+Invalid, 193 SdHoareTripleChecker+Unknown, 0 SdHoareTripleChecker+Unchecked, 0.0s SdHoareTripleChecker+Time, 12 IncrementalHoareTripleChecker+Valid, 181 IncrementalHoareTripleChecker+Invalid, 0 IncrementalHoareTripleChecker+Unknown, 0 IncrementalHoareTripleChecker+Unchecked, 0.2s IncrementalHoareTripleChecker+Time [2023-02-18 18:25:44,010 INFO L414 NwaCegarLoop]: SdHoareTripleChecker [12 Valid, 187 Invalid, 193 Unknown, 0 Unchecked, 0.0s Time], IncrementalHoareTripleChecker [12 Valid, 181 Invalid, 0 Unknown, 0 Unchecked, 0.2s Time] [2023-02-18 18:25:44,011 INFO L82 GeneralOperation]: Start minimizeSevpa. Operand 93 states. [2023-02-18 18:25:44,030 INFO L88 GeneralOperation]: Finished minimizeSevpa. Reduced states from 93 to 93. [2023-02-18 18:25:44,030 INFO L82 GeneralOperation]: Start removeUnreachable. Operand has 93 states, 58 states have (on average 1.1206896551724137) internal successors, (65), 61 states have internal predecessors, (65), 23 states have call successors, (23), 11 states have call predecessors, (23), 11 states have return successors, (22), 20 states have call predecessors, (22), 22 states have call successors, (22) [2023-02-18 18:25:44,031 INFO L88 GeneralOperation]: Finished removeUnreachable. Reduced from 93 states to 93 states and 110 transitions. [2023-02-18 18:25:44,031 INFO L78 Accepts]: Start accepts. Automaton has 93 states and 110 transitions. Word has length 72 [2023-02-18 18:25:44,031 INFO L84 Accepts]: Finished accepts. word is rejected. [2023-02-18 18:25:44,031 INFO L495 AbstractCegarLoop]: Abstraction has 93 states and 110 transitions. [2023-02-18 18:25:44,032 INFO L496 AbstractCegarLoop]: INTERPOLANT automaton has has 12 states, 10 states have (on average 3.1) internal successors, (31), 10 states have internal predecessors, (31), 6 states have call successors, (24), 3 states have call predecessors, (24), 1 states have return successors, (22), 6 states have call predecessors, (22), 6 states have call successors, (22) [2023-02-18 18:25:44,032 INFO L276 IsEmpty]: Start isEmpty. Operand 93 states and 110 transitions. [2023-02-18 18:25:44,033 INFO L282 IsEmpty]: Finished isEmpty. Found accepting run of length 87 [2023-02-18 18:25:44,033 INFO L187 NwaCegarLoop]: Found error trace [2023-02-18 18:25:44,033 INFO L195 NwaCegarLoop]: trace histogram [14, 13, 13, 3, 3, 3, 3, 3, 3, 3, 3, 3, 2, 2, 2, 2, 2, 1, 1, 1, 1, 1, 1, 1, 1, 1] [2023-02-18 18:25:44,041 INFO L540 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (6)] Forceful destruction successful, exit code 0 [2023-02-18 18:25:44,239 WARN L477 AbstractCegarLoop]: Destroyed unattended storables created during the last iteration: SelfDestructingSolverStorable7,6 /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true [2023-02-18 18:25:44,240 INFO L420 AbstractCegarLoop]: === Iteration 9 === Targeting __VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION === [__VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION] === [2023-02-18 18:25:44,241 INFO L144 PredicateUnifier]: Initialized classic predicate unifier [2023-02-18 18:25:44,241 INFO L85 PathProgramCache]: Analyzing trace with hash 1412721000, now seen corresponding path program 1 times [2023-02-18 18:25:44,241 INFO L118 FreeRefinementEngine]: Executing refinement strategy CAMEL [2023-02-18 18:25:44,241 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleSmtInterpolCraig [805685513] [2023-02-18 18:25:44,241 INFO L95 rtionOrderModulation]: Keeping assertion order NOT_INCREMENTALLY [2023-02-18 18:25:44,241 INFO L127 SolverBuilder]: Constructing new instance of SMTInterpol with explicit timeout -1 ms and remaining time -1 ms [2023-02-18 18:25:44,248 ERROR L245 FreeRefinementEngine]: Caught known exception: Unsupported non-linear arithmetic [2023-02-18 18:25:44,248 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleZ3 [808366816] [2023-02-18 18:25:44,249 INFO L95 rtionOrderModulation]: Keeping assertion order NOT_INCREMENTALLY [2023-02-18 18:25:44,249 INFO L173 SolverBuilder]: Constructing external solver with command: z3 -smt2 -in SMTLIB2_COMPLIANT=true [2023-02-18 18:25:44,249 INFO L189 MonitoredProcess]: No working directory specified, using /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 [2023-02-18 18:25:44,250 INFO L229 MonitoredProcess]: Starting monitored process 7 with /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (exit command is (exit), workingDir is null) [2023-02-18 18:25:44,255 INFO L327 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (7)] Waiting until timeout for monitored process [2023-02-18 18:25:44,305 INFO L136 AnnotateAndAsserter]: Conjunction of SSA is unsat [2023-02-18 18:25:44,307 INFO L263 TraceCheckSpWp]: Trace formula consists of 217 conjuncts, 8 conjunts are in the unsatisfiable core [2023-02-18 18:25:44,311 INFO L286 TraceCheckSpWp]: Computing forward predicates... [2023-02-18 18:25:44,361 INFO L134 CoverageAnalysis]: Checked inductivity of 362 backedges. 132 proven. 0 refuted. 0 times theorem prover too weak. 230 trivial. 0 not checked. [2023-02-18 18:25:44,361 INFO L324 TraceCheckSpWp]: Omiting computation of backward sequence because forward sequence was already perfect [2023-02-18 18:25:44,361 INFO L136 FreeRefinementEngine]: Strategy CAMEL found an infeasible trace [2023-02-18 18:25:44,362 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleSmtInterpolCraig [805685513] [2023-02-18 18:25:44,362 WARN L310 FreeRefinementEngine]: Interpolation failed due to KNOWN_IGNORE: SMT_SOLVER_CANNOT_INTERPOLATE_INPUT [2023-02-18 18:25:44,362 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleZ3 [808366816] [2023-02-18 18:25:44,362 INFO L157 FreeRefinementEngine]: IpTcStrategyModuleZ3 [808366816] provided 1 perfect and 0 imperfect interpolant sequences [2023-02-18 18:25:44,362 INFO L184 FreeRefinementEngine]: Found 1 perfect and 0 imperfect interpolant sequences. [2023-02-18 18:25:44,362 INFO L197 FreeRefinementEngine]: Number of different interpolants: perfect sequences [6] imperfect sequences [] total 6 [2023-02-18 18:25:44,363 INFO L121 tionRefinementEngine]: Using interpolant automaton builder IpAbStrategyModuleStraightlineAll [1696571643] [2023-02-18 18:25:44,363 INFO L85 oduleStraightlineAll]: Using 1 perfect interpolants to construct interpolant automaton [2023-02-18 18:25:44,363 INFO L571 AbstractCegarLoop]: INTERPOLANT automaton has 6 states [2023-02-18 18:25:44,363 INFO L100 FreeRefinementEngine]: Using predicate unifier PredicateUnifier provided by strategy CAMEL [2023-02-18 18:25:44,364 INFO L143 InterpolantAutomaton]: Constructing interpolant automaton starting with 6 interpolants. [2023-02-18 18:25:44,364 INFO L145 InterpolantAutomaton]: CoverageRelationStatistics Valid=12, Invalid=18, Unknown=0, NotChecked=0, Total=30 [2023-02-18 18:25:44,364 INFO L87 Difference]: Start difference. First operand 93 states and 110 transitions. Second operand has 6 states, 6 states have (on average 4.0) internal successors, (24), 6 states have internal predecessors, (24), 4 states have call successors, (13), 2 states have call predecessors, (13), 2 states have return successors, (13), 4 states have call predecessors, (13), 4 states have call successors, (13) [2023-02-18 18:25:44,484 INFO L144 Difference]: Subtrahend was deterministic. Have not used determinization. [2023-02-18 18:25:44,485 INFO L93 Difference]: Finished difference Result 125 states and 151 transitions. [2023-02-18 18:25:44,485 INFO L141 InterpolantAutomaton]: Switched to read-only mode: deterministic interpolant automaton has 6 states. [2023-02-18 18:25:44,485 INFO L78 Accepts]: Start accepts. Automaton has has 6 states, 6 states have (on average 4.0) internal successors, (24), 6 states have internal predecessors, (24), 4 states have call successors, (13), 2 states have call predecessors, (13), 2 states have return successors, (13), 4 states have call predecessors, (13), 4 states have call successors, (13) Word has length 86 [2023-02-18 18:25:44,486 INFO L84 Accepts]: Finished accepts. some prefix is accepted. [2023-02-18 18:25:44,487 INFO L225 Difference]: With dead ends: 125 [2023-02-18 18:25:44,487 INFO L226 Difference]: Without dead ends: 88 [2023-02-18 18:25:44,487 INFO L412 NwaCegarLoop]: 0 DeclaredPredicates, 86 GetRequests, 76 SyntacticMatches, 5 SemanticMatches, 5 ConstructedPredicates, 0 IntricatePredicates, 0 DeprecatedPredicates, 2 ImplicationChecksByTransitivity, 0.0s TimeCoverageRelationStatistics Valid=17, Invalid=25, Unknown=0, NotChecked=0, Total=42 [2023-02-18 18:25:44,488 INFO L413 NwaCegarLoop]: 46 mSDtfsCounter, 6 mSDsluCounter, 55 mSDsCounter, 0 mSdLazyCounter, 81 mSolverCounterSat, 2 mSolverCounterUnsat, 0 mSolverCounterUnknown, 0 mSolverCounterNotChecked, 0.1s Time, 0 mProtectedPredicate, 0 mProtectedAction, 11 SdHoareTripleChecker+Valid, 101 SdHoareTripleChecker+Invalid, 83 SdHoareTripleChecker+Unknown, 0 SdHoareTripleChecker+Unchecked, 0.0s SdHoareTripleChecker+Time, 2 IncrementalHoareTripleChecker+Valid, 81 IncrementalHoareTripleChecker+Invalid, 0 IncrementalHoareTripleChecker+Unknown, 0 IncrementalHoareTripleChecker+Unchecked, 0.1s IncrementalHoareTripleChecker+Time [2023-02-18 18:25:44,488 INFO L414 NwaCegarLoop]: SdHoareTripleChecker [11 Valid, 101 Invalid, 83 Unknown, 0 Unchecked, 0.0s Time], IncrementalHoareTripleChecker [2 Valid, 81 Invalid, 0 Unknown, 0 Unchecked, 0.1s Time] [2023-02-18 18:25:44,489 INFO L82 GeneralOperation]: Start minimizeSevpa. Operand 88 states. [2023-02-18 18:25:44,518 INFO L88 GeneralOperation]: Finished minimizeSevpa. Reduced states from 88 to 79. [2023-02-18 18:25:44,519 INFO L82 GeneralOperation]: Start removeUnreachable. Operand has 79 states, 50 states have (on average 1.08) internal successors, (54), 52 states have internal predecessors, (54), 18 states have call successors, (18), 10 states have call predecessors, (18), 10 states have return successors, (17), 16 states have call predecessors, (17), 17 states have call successors, (17) [2023-02-18 18:25:44,520 INFO L88 GeneralOperation]: Finished removeUnreachable. Reduced from 79 states to 79 states and 89 transitions. [2023-02-18 18:25:44,520 INFO L78 Accepts]: Start accepts. Automaton has 79 states and 89 transitions. Word has length 86 [2023-02-18 18:25:44,520 INFO L84 Accepts]: Finished accepts. word is rejected. [2023-02-18 18:25:44,520 INFO L495 AbstractCegarLoop]: Abstraction has 79 states and 89 transitions. [2023-02-18 18:25:44,520 INFO L496 AbstractCegarLoop]: INTERPOLANT automaton has has 6 states, 6 states have (on average 4.0) internal successors, (24), 6 states have internal predecessors, (24), 4 states have call successors, (13), 2 states have call predecessors, (13), 2 states have return successors, (13), 4 states have call predecessors, (13), 4 states have call successors, (13) [2023-02-18 18:25:44,521 INFO L276 IsEmpty]: Start isEmpty. Operand 79 states and 89 transitions. [2023-02-18 18:25:44,525 INFO L282 IsEmpty]: Finished isEmpty. Found accepting run of length 87 [2023-02-18 18:25:44,525 INFO L187 NwaCegarLoop]: Found error trace [2023-02-18 18:25:44,525 INFO L195 NwaCegarLoop]: trace histogram [14, 13, 13, 3, 3, 3, 3, 3, 3, 3, 3, 3, 2, 2, 2, 2, 2, 2, 1, 1, 1, 1, 1, 1, 1] [2023-02-18 18:25:44,535 INFO L540 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (7)] Forceful destruction successful, exit code 0 [2023-02-18 18:25:44,731 WARN L477 AbstractCegarLoop]: Destroyed unattended storables created during the last iteration: SelfDestructingSolverStorable8,7 /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true [2023-02-18 18:25:44,732 INFO L420 AbstractCegarLoop]: === Iteration 10 === Targeting __VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION === [__VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION] === [2023-02-18 18:25:44,732 INFO L144 PredicateUnifier]: Initialized classic predicate unifier [2023-02-18 18:25:44,732 INFO L85 PathProgramCache]: Analyzing trace with hash -1193302554, now seen corresponding path program 2 times [2023-02-18 18:25:44,732 INFO L118 FreeRefinementEngine]: Executing refinement strategy CAMEL [2023-02-18 18:25:44,732 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleSmtInterpolCraig [361214146] [2023-02-18 18:25:44,732 INFO L95 rtionOrderModulation]: Keeping assertion order NOT_INCREMENTALLY [2023-02-18 18:25:44,732 INFO L127 SolverBuilder]: Constructing new instance of SMTInterpol with explicit timeout -1 ms and remaining time -1 ms [2023-02-18 18:25:44,746 ERROR L245 FreeRefinementEngine]: Caught known exception: Unsupported non-linear arithmetic [2023-02-18 18:25:44,747 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleZ3 [855529261] [2023-02-18 18:25:44,747 INFO L93 rtionOrderModulation]: Changing assertion order to OUTSIDE_LOOP_FIRST1 [2023-02-18 18:25:44,747 INFO L173 SolverBuilder]: Constructing external solver with command: z3 -smt2 -in SMTLIB2_COMPLIANT=true [2023-02-18 18:25:44,747 INFO L189 MonitoredProcess]: No working directory specified, using /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 [2023-02-18 18:25:44,753 INFO L229 MonitoredProcess]: Starting monitored process 8 with /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (exit command is (exit), workingDir is null) [2023-02-18 18:25:44,757 INFO L327 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (8)] Waiting until timeout for monitored process [2023-02-18 18:25:44,813 INFO L228 tOrderPrioritization]: Assert order OUTSIDE_LOOP_FIRST1 issued 2 check-sat command(s) [2023-02-18 18:25:44,813 INFO L229 tOrderPrioritization]: Conjunction of SSA is unsat [2023-02-18 18:25:44,815 INFO L263 TraceCheckSpWp]: Trace formula consists of 221 conjuncts, 45 conjunts are in the unsatisfiable core [2023-02-18 18:25:44,817 INFO L286 TraceCheckSpWp]: Computing forward predicates... [2023-02-18 18:25:44,927 INFO L134 CoverageAnalysis]: Checked inductivity of 362 backedges. 28 proven. 58 refuted. 0 times theorem prover too weak. 276 trivial. 0 not checked. [2023-02-18 18:25:44,928 INFO L328 TraceCheckSpWp]: Computing backward predicates... [2023-02-18 18:25:47,342 INFO L134 CoverageAnalysis]: Checked inductivity of 362 backedges. 28 proven. 58 refuted. 0 times theorem prover too weak. 276 trivial. 0 not checked. [2023-02-18 18:25:47,343 INFO L136 FreeRefinementEngine]: Strategy CAMEL found an infeasible trace [2023-02-18 18:25:47,343 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleSmtInterpolCraig [361214146] [2023-02-18 18:25:47,343 WARN L310 FreeRefinementEngine]: Interpolation failed due to KNOWN_IGNORE: SMT_SOLVER_CANNOT_INTERPOLATE_INPUT [2023-02-18 18:25:47,343 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleZ3 [855529261] [2023-02-18 18:25:47,343 INFO L157 FreeRefinementEngine]: IpTcStrategyModuleZ3 [855529261] provided 0 perfect and 2 imperfect interpolant sequences [2023-02-18 18:25:47,343 INFO L184 FreeRefinementEngine]: Found 0 perfect and 2 imperfect interpolant sequences. [2023-02-18 18:25:47,344 INFO L197 FreeRefinementEngine]: Number of different interpolants: perfect sequences [] imperfect sequences [12, 12] total 21 [2023-02-18 18:25:47,344 INFO L121 tionRefinementEngine]: Using interpolant automaton builder IpAbStrategyModuleStraightlineAll [21243228] [2023-02-18 18:25:47,344 INFO L85 oduleStraightlineAll]: Using 2 imperfect interpolants to construct interpolant automaton [2023-02-18 18:25:47,344 INFO L571 AbstractCegarLoop]: INTERPOLANT automaton has 21 states [2023-02-18 18:25:47,345 INFO L100 FreeRefinementEngine]: Using predicate unifier PredicateUnifier provided by strategy CAMEL [2023-02-18 18:25:47,345 INFO L143 InterpolantAutomaton]: Constructing interpolant automaton starting with 21 interpolants. [2023-02-18 18:25:47,346 INFO L145 InterpolantAutomaton]: CoverageRelationStatistics Valid=82, Invalid=338, Unknown=0, NotChecked=0, Total=420 [2023-02-18 18:25:47,346 INFO L87 Difference]: Start difference. First operand 79 states and 89 transitions. Second operand has 21 states, 21 states have (on average 2.0952380952380953) internal successors, (44), 19 states have internal predecessors, (44), 11 states have call successors, (28), 3 states have call predecessors, (28), 2 states have return successors, (26), 9 states have call predecessors, (26), 9 states have call successors, (26) [2023-02-18 18:25:50,644 WARN L539 Checker$ProtectedHtc]: IncrementalHoareTripleChecker took 1.32s for a HTC check with result INVALID. Formula has sorts [Bool, Int], hasArrays=false, hasNonlinArith=true, quantifiers [] [2023-02-18 18:25:53,235 WARN L539 Checker$ProtectedHtc]: IncrementalHoareTripleChecker took 1.45s for a HTC check with result INVALID. Formula has sorts [Bool, Int], hasArrays=false, hasNonlinArith=true, quantifiers [] [2023-02-18 18:25:56,095 WARN L539 Checker$ProtectedHtc]: IncrementalHoareTripleChecker took 1.89s for a HTC check with result INVALID. Formula has sorts [Bool, Int], hasArrays=false, hasNonlinArith=true, quantifiers [] [2023-02-18 18:25:58,261 WARN L539 Checker$ProtectedHtc]: IncrementalHoareTripleChecker took 1.65s for a HTC check with result INVALID. Formula has sorts [Bool, Int], hasArrays=false, hasNonlinArith=true, quantifiers [] [2023-02-18 18:26:00,387 WARN L539 Checker$ProtectedHtc]: IncrementalHoareTripleChecker took 2.00s for a HTC check with result UNKNOWN. Formula has sorts [Bool, Int], hasArrays=false, hasNonlinArith=true, quantifiers [] [2023-02-18 18:26:01,033 INFO L144 Difference]: Subtrahend was deterministic. Have not used determinization. [2023-02-18 18:26:01,033 INFO L93 Difference]: Finished difference Result 159 states and 203 transitions. [2023-02-18 18:26:01,033 INFO L141 InterpolantAutomaton]: Switched to read-only mode: deterministic interpolant automaton has 16 states. [2023-02-18 18:26:01,033 INFO L78 Accepts]: Start accepts. Automaton has has 21 states, 21 states have (on average 2.0952380952380953) internal successors, (44), 19 states have internal predecessors, (44), 11 states have call successors, (28), 3 states have call predecessors, (28), 2 states have return successors, (26), 9 states have call predecessors, (26), 9 states have call successors, (26) Word has length 86 [2023-02-18 18:26:01,034 INFO L84 Accepts]: Finished accepts. some prefix is accepted. [2023-02-18 18:26:01,035 INFO L225 Difference]: With dead ends: 159 [2023-02-18 18:26:01,035 INFO L226 Difference]: Without dead ends: 134 [2023-02-18 18:26:01,035 INFO L412 NwaCegarLoop]: 0 DeclaredPredicates, 176 GetRequests, 147 SyntacticMatches, 4 SemanticMatches, 25 ConstructedPredicates, 0 IntricatePredicates, 0 DeprecatedPredicates, 62 ImplicationChecksByTransitivity, 2.4s TimeCoverageRelationStatistics Valid=151, Invalid=551, Unknown=0, NotChecked=0, Total=702 [2023-02-18 18:26:01,036 INFO L413 NwaCegarLoop]: 34 mSDtfsCounter, 82 mSDsluCounter, 150 mSDsCounter, 0 mSdLazyCounter, 936 mSolverCounterSat, 126 mSolverCounterUnsat, 1 mSolverCounterUnknown, 0 mSolverCounterNotChecked, 13.1s Time, 0 mProtectedPredicate, 0 mProtectedAction, 87 SdHoareTripleChecker+Valid, 184 SdHoareTripleChecker+Invalid, 1063 SdHoareTripleChecker+Unknown, 0 SdHoareTripleChecker+Unchecked, 0.0s SdHoareTripleChecker+Time, 126 IncrementalHoareTripleChecker+Valid, 936 IncrementalHoareTripleChecker+Invalid, 1 IncrementalHoareTripleChecker+Unknown, 0 IncrementalHoareTripleChecker+Unchecked, 13.2s IncrementalHoareTripleChecker+Time [2023-02-18 18:26:01,036 INFO L414 NwaCegarLoop]: SdHoareTripleChecker [87 Valid, 184 Invalid, 1063 Unknown, 0 Unchecked, 0.0s Time], IncrementalHoareTripleChecker [126 Valid, 936 Invalid, 1 Unknown, 0 Unchecked, 13.2s Time] [2023-02-18 18:26:01,037 INFO L82 GeneralOperation]: Start minimizeSevpa. Operand 134 states. [2023-02-18 18:26:01,114 INFO L88 GeneralOperation]: Finished minimizeSevpa. Reduced states from 134 to 130. [2023-02-18 18:26:01,115 INFO L82 GeneralOperation]: Start removeUnreachable. Operand has 130 states, 80 states have (on average 1.1375) internal successors, (91), 86 states have internal predecessors, (91), 36 states have call successors, (36), 13 states have call predecessors, (36), 13 states have return successors, (35), 30 states have call predecessors, (35), 35 states have call successors, (35) [2023-02-18 18:26:01,116 INFO L88 GeneralOperation]: Finished removeUnreachable. Reduced from 130 states to 130 states and 162 transitions. [2023-02-18 18:26:01,116 INFO L78 Accepts]: Start accepts. Automaton has 130 states and 162 transitions. Word has length 86 [2023-02-18 18:26:01,116 INFO L84 Accepts]: Finished accepts. word is rejected. [2023-02-18 18:26:01,116 INFO L495 AbstractCegarLoop]: Abstraction has 130 states and 162 transitions. [2023-02-18 18:26:01,116 INFO L496 AbstractCegarLoop]: INTERPOLANT automaton has has 21 states, 21 states have (on average 2.0952380952380953) internal successors, (44), 19 states have internal predecessors, (44), 11 states have call successors, (28), 3 states have call predecessors, (28), 2 states have return successors, (26), 9 states have call predecessors, (26), 9 states have call successors, (26) [2023-02-18 18:26:01,117 INFO L276 IsEmpty]: Start isEmpty. Operand 130 states and 162 transitions. [2023-02-18 18:26:01,117 INFO L282 IsEmpty]: Finished isEmpty. Found accepting run of length 98 [2023-02-18 18:26:01,118 INFO L187 NwaCegarLoop]: Found error trace [2023-02-18 18:26:01,118 INFO L195 NwaCegarLoop]: trace histogram [16, 15, 15, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 2, 2, 2, 1, 1, 1, 1, 1, 1, 1, 1, 1] [2023-02-18 18:26:01,125 INFO L552 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (8)] Ended with exit code 0 [2023-02-18 18:26:01,325 WARN L477 AbstractCegarLoop]: Destroyed unattended storables created during the last iteration: SelfDestructingSolverStorable9,8 /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true [2023-02-18 18:26:01,325 INFO L420 AbstractCegarLoop]: === Iteration 11 === Targeting __VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION === [__VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION] === [2023-02-18 18:26:01,325 INFO L144 PredicateUnifier]: Initialized classic predicate unifier [2023-02-18 18:26:01,326 INFO L85 PathProgramCache]: Analyzing trace with hash -1474759586, now seen corresponding path program 2 times [2023-02-18 18:26:01,326 INFO L118 FreeRefinementEngine]: Executing refinement strategy CAMEL [2023-02-18 18:26:01,326 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleSmtInterpolCraig [478712044] [2023-02-18 18:26:01,326 INFO L95 rtionOrderModulation]: Keeping assertion order NOT_INCREMENTALLY [2023-02-18 18:26:01,326 INFO L127 SolverBuilder]: Constructing new instance of SMTInterpol with explicit timeout -1 ms and remaining time -1 ms [2023-02-18 18:26:01,336 ERROR L245 FreeRefinementEngine]: Caught known exception: Unsupported non-linear arithmetic [2023-02-18 18:26:01,336 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleZ3 [1211362416] [2023-02-18 18:26:01,336 INFO L93 rtionOrderModulation]: Changing assertion order to OUTSIDE_LOOP_FIRST1 [2023-02-18 18:26:01,336 INFO L173 SolverBuilder]: Constructing external solver with command: z3 -smt2 -in SMTLIB2_COMPLIANT=true [2023-02-18 18:26:01,337 INFO L189 MonitoredProcess]: No working directory specified, using /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 [2023-02-18 18:26:01,338 INFO L229 MonitoredProcess]: Starting monitored process 9 with /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (exit command is (exit), workingDir is null) [2023-02-18 18:26:01,341 INFO L327 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (9)] Waiting until timeout for monitored process [2023-02-18 18:26:01,401 INFO L228 tOrderPrioritization]: Assert order OUTSIDE_LOOP_FIRST1 issued 2 check-sat command(s) [2023-02-18 18:26:01,401 INFO L229 tOrderPrioritization]: Conjunction of SSA is unsat [2023-02-18 18:26:01,403 INFO L263 TraceCheckSpWp]: Trace formula consists of 241 conjuncts, 50 conjunts are in the unsatisfiable core [2023-02-18 18:26:01,405 INFO L286 TraceCheckSpWp]: Computing forward predicates... [2023-02-18 18:26:01,499 INFO L134 CoverageAnalysis]: Checked inductivity of 478 backedges. 38 proven. 62 refuted. 0 times theorem prover too weak. 378 trivial. 0 not checked. [2023-02-18 18:26:01,500 INFO L328 TraceCheckSpWp]: Computing backward predicates... [2023-02-18 18:26:03,037 INFO L134 CoverageAnalysis]: Checked inductivity of 478 backedges. 38 proven. 62 refuted. 0 times theorem prover too weak. 378 trivial. 0 not checked. [2023-02-18 18:26:03,037 INFO L136 FreeRefinementEngine]: Strategy CAMEL found an infeasible trace [2023-02-18 18:26:03,038 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleSmtInterpolCraig [478712044] [2023-02-18 18:26:03,038 WARN L310 FreeRefinementEngine]: Interpolation failed due to KNOWN_IGNORE: SMT_SOLVER_CANNOT_INTERPOLATE_INPUT [2023-02-18 18:26:03,038 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleZ3 [1211362416] [2023-02-18 18:26:03,038 INFO L157 FreeRefinementEngine]: IpTcStrategyModuleZ3 [1211362416] provided 0 perfect and 2 imperfect interpolant sequences [2023-02-18 18:26:03,038 INFO L184 FreeRefinementEngine]: Found 0 perfect and 2 imperfect interpolant sequences. [2023-02-18 18:26:03,038 INFO L197 FreeRefinementEngine]: Number of different interpolants: perfect sequences [] imperfect sequences [13, 12] total 22 [2023-02-18 18:26:03,039 INFO L121 tionRefinementEngine]: Using interpolant automaton builder IpAbStrategyModuleStraightlineAll [1884446366] [2023-02-18 18:26:03,039 INFO L85 oduleStraightlineAll]: Using 2 imperfect interpolants to construct interpolant automaton [2023-02-18 18:26:03,039 INFO L571 AbstractCegarLoop]: INTERPOLANT automaton has 22 states [2023-02-18 18:26:03,039 INFO L100 FreeRefinementEngine]: Using predicate unifier PredicateUnifier provided by strategy CAMEL [2023-02-18 18:26:03,040 INFO L143 InterpolantAutomaton]: Constructing interpolant automaton starting with 22 interpolants. [2023-02-18 18:26:03,040 INFO L145 InterpolantAutomaton]: CoverageRelationStatistics Valid=96, Invalid=366, Unknown=0, NotChecked=0, Total=462 [2023-02-18 18:26:03,041 INFO L87 Difference]: Start difference. First operand 130 states and 162 transitions. Second operand has 22 states, 20 states have (on average 2.3) internal successors, (46), 21 states have internal predecessors, (46), 13 states have call successors, (32), 3 states have call predecessors, (32), 2 states have return successors, (30), 10 states have call predecessors, (30), 11 states have call successors, (30) [2023-02-18 18:26:08,015 WARN L539 Checker$ProtectedHtc]: IncrementalHoareTripleChecker took 2.00s for a HTC check with result UNKNOWN. Formula has sorts [Bool, Int], hasArrays=false, hasNonlinArith=true, quantifiers [] [2023-02-18 18:26:10,018 WARN L539 Checker$ProtectedHtc]: IncrementalHoareTripleChecker took 2.00s for a HTC check with result UNKNOWN. Formula has sorts [Bool, Int], hasArrays=false, hasNonlinArith=true, quantifiers [] [2023-02-18 18:26:13,099 INFO L144 Difference]: Subtrahend was deterministic. Have not used determinization. [2023-02-18 18:26:13,099 INFO L93 Difference]: Finished difference Result 187 states and 238 transitions. [2023-02-18 18:26:13,099 INFO L141 InterpolantAutomaton]: Switched to read-only mode: deterministic interpolant automaton has 20 states. [2023-02-18 18:26:13,099 INFO L78 Accepts]: Start accepts. Automaton has has 22 states, 20 states have (on average 2.3) internal successors, (46), 21 states have internal predecessors, (46), 13 states have call successors, (32), 3 states have call predecessors, (32), 2 states have return successors, (30), 10 states have call predecessors, (30), 11 states have call successors, (30) Word has length 97 [2023-02-18 18:26:13,100 INFO L84 Accepts]: Finished accepts. some prefix is accepted. [2023-02-18 18:26:13,101 INFO L225 Difference]: With dead ends: 187 [2023-02-18 18:26:13,101 INFO L226 Difference]: Without dead ends: 142 [2023-02-18 18:26:13,102 INFO L412 NwaCegarLoop]: 0 DeclaredPredicates, 200 GetRequests, 167 SyntacticMatches, 5 SemanticMatches, 28 ConstructedPredicates, 0 IntricatePredicates, 0 DeprecatedPredicates, 85 ImplicationChecksByTransitivity, 2.0s TimeCoverageRelationStatistics Valid=199, Invalid=671, Unknown=0, NotChecked=0, Total=870 [2023-02-18 18:26:13,102 INFO L413 NwaCegarLoop]: 29 mSDtfsCounter, 36 mSDsluCounter, 124 mSDsCounter, 0 mSdLazyCounter, 792 mSolverCounterSat, 87 mSolverCounterUnsat, 2 mSolverCounterUnknown, 0 mSolverCounterNotChecked, 9.1s Time, 0 mProtectedPredicate, 0 mProtectedAction, 38 SdHoareTripleChecker+Valid, 153 SdHoareTripleChecker+Invalid, 881 SdHoareTripleChecker+Unknown, 0 SdHoareTripleChecker+Unchecked, 0.0s SdHoareTripleChecker+Time, 87 IncrementalHoareTripleChecker+Valid, 792 IncrementalHoareTripleChecker+Invalid, 2 IncrementalHoareTripleChecker+Unknown, 0 IncrementalHoareTripleChecker+Unchecked, 9.2s IncrementalHoareTripleChecker+Time [2023-02-18 18:26:13,102 INFO L414 NwaCegarLoop]: SdHoareTripleChecker [38 Valid, 153 Invalid, 881 Unknown, 0 Unchecked, 0.0s Time], IncrementalHoareTripleChecker [87 Valid, 792 Invalid, 2 Unknown, 0 Unchecked, 9.2s Time] [2023-02-18 18:26:13,103 INFO L82 GeneralOperation]: Start minimizeSevpa. Operand 142 states. [2023-02-18 18:26:13,166 INFO L88 GeneralOperation]: Finished minimizeSevpa. Reduced states from 142 to 126. [2023-02-18 18:26:13,166 INFO L82 GeneralOperation]: Start removeUnreachable. Operand has 126 states, 79 states have (on average 1.0886075949367089) internal successors, (86), 83 states have internal predecessors, (86), 31 states have call successors, (31), 15 states have call predecessors, (31), 15 states have return successors, (30), 27 states have call predecessors, (30), 30 states have call successors, (30) [2023-02-18 18:26:13,167 INFO L88 GeneralOperation]: Finished removeUnreachable. Reduced from 126 states to 126 states and 147 transitions. [2023-02-18 18:26:13,167 INFO L78 Accepts]: Start accepts. Automaton has 126 states and 147 transitions. Word has length 97 [2023-02-18 18:26:13,167 INFO L84 Accepts]: Finished accepts. word is rejected. [2023-02-18 18:26:13,167 INFO L495 AbstractCegarLoop]: Abstraction has 126 states and 147 transitions. [2023-02-18 18:26:13,168 INFO L496 AbstractCegarLoop]: INTERPOLANT automaton has has 22 states, 20 states have (on average 2.3) internal successors, (46), 21 states have internal predecessors, (46), 13 states have call successors, (32), 3 states have call predecessors, (32), 2 states have return successors, (30), 10 states have call predecessors, (30), 11 states have call successors, (30) [2023-02-18 18:26:13,168 INFO L276 IsEmpty]: Start isEmpty. Operand 126 states and 147 transitions. [2023-02-18 18:26:13,169 INFO L282 IsEmpty]: Finished isEmpty. Found accepting run of length 103 [2023-02-18 18:26:13,169 INFO L187 NwaCegarLoop]: Found error trace [2023-02-18 18:26:13,169 INFO L195 NwaCegarLoop]: trace histogram [17, 16, 16, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 2, 2, 2, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1] [2023-02-18 18:26:13,176 INFO L540 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (9)] Forceful destruction successful, exit code 0 [2023-02-18 18:26:13,375 WARN L477 AbstractCegarLoop]: Destroyed unattended storables created during the last iteration: 9 /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true,SelfDestructingSolverStorable10 [2023-02-18 18:26:13,376 INFO L420 AbstractCegarLoop]: === Iteration 12 === Targeting __VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION === [__VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION] === [2023-02-18 18:26:13,376 INFO L144 PredicateUnifier]: Initialized classic predicate unifier [2023-02-18 18:26:13,376 INFO L85 PathProgramCache]: Analyzing trace with hash -1149721345, now seen corresponding path program 2 times [2023-02-18 18:26:13,376 INFO L118 FreeRefinementEngine]: Executing refinement strategy CAMEL [2023-02-18 18:26:13,376 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleSmtInterpolCraig [914053977] [2023-02-18 18:26:13,376 INFO L95 rtionOrderModulation]: Keeping assertion order NOT_INCREMENTALLY [2023-02-18 18:26:13,376 INFO L127 SolverBuilder]: Constructing new instance of SMTInterpol with explicit timeout -1 ms and remaining time -1 ms [2023-02-18 18:26:13,383 ERROR L245 FreeRefinementEngine]: Caught known exception: Unsupported non-linear arithmetic [2023-02-18 18:26:13,383 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleZ3 [1355790807] [2023-02-18 18:26:13,383 INFO L93 rtionOrderModulation]: Changing assertion order to OUTSIDE_LOOP_FIRST1 [2023-02-18 18:26:13,384 INFO L173 SolverBuilder]: Constructing external solver with command: z3 -smt2 -in SMTLIB2_COMPLIANT=true [2023-02-18 18:26:13,384 INFO L189 MonitoredProcess]: No working directory specified, using /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 [2023-02-18 18:26:13,385 INFO L229 MonitoredProcess]: Starting monitored process 10 with /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (exit command is (exit), workingDir is null) [2023-02-18 18:26:13,393 INFO L327 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (10)] Waiting until timeout for monitored process [2023-02-18 18:26:13,450 INFO L228 tOrderPrioritization]: Assert order OUTSIDE_LOOP_FIRST1 issued 2 check-sat command(s) [2023-02-18 18:26:13,450 INFO L229 tOrderPrioritization]: Conjunction of SSA is unsat [2023-02-18 18:26:13,451 INFO L263 TraceCheckSpWp]: Trace formula consists of 250 conjuncts, 39 conjunts are in the unsatisfiable core [2023-02-18 18:26:13,453 INFO L286 TraceCheckSpWp]: Computing forward predicates... [2023-02-18 18:26:13,505 INFO L134 CoverageAnalysis]: Checked inductivity of 540 backedges. 34 proven. 71 refuted. 0 times theorem prover too weak. 435 trivial. 0 not checked. [2023-02-18 18:26:13,505 INFO L328 TraceCheckSpWp]: Computing backward predicates... [2023-02-18 18:26:13,894 INFO L134 CoverageAnalysis]: Checked inductivity of 540 backedges. 34 proven. 71 refuted. 0 times theorem prover too weak. 435 trivial. 0 not checked. [2023-02-18 18:26:13,894 INFO L136 FreeRefinementEngine]: Strategy CAMEL found an infeasible trace [2023-02-18 18:26:13,894 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleSmtInterpolCraig [914053977] [2023-02-18 18:26:13,894 WARN L310 FreeRefinementEngine]: Interpolation failed due to KNOWN_IGNORE: SMT_SOLVER_CANNOT_INTERPOLATE_INPUT [2023-02-18 18:26:13,894 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleZ3 [1355790807] [2023-02-18 18:26:13,894 INFO L157 FreeRefinementEngine]: IpTcStrategyModuleZ3 [1355790807] provided 0 perfect and 2 imperfect interpolant sequences [2023-02-18 18:26:13,895 INFO L184 FreeRefinementEngine]: Found 0 perfect and 2 imperfect interpolant sequences. [2023-02-18 18:26:13,895 INFO L197 FreeRefinementEngine]: Number of different interpolants: perfect sequences [] imperfect sequences [11, 10] total 18 [2023-02-18 18:26:13,895 INFO L121 tionRefinementEngine]: Using interpolant automaton builder IpAbStrategyModuleStraightlineAll [750601880] [2023-02-18 18:26:13,895 INFO L85 oduleStraightlineAll]: Using 2 imperfect interpolants to construct interpolant automaton [2023-02-18 18:26:13,896 INFO L571 AbstractCegarLoop]: INTERPOLANT automaton has 18 states [2023-02-18 18:26:13,896 INFO L100 FreeRefinementEngine]: Using predicate unifier PredicateUnifier provided by strategy CAMEL [2023-02-18 18:26:13,897 INFO L143 InterpolantAutomaton]: Constructing interpolant automaton starting with 18 interpolants. [2023-02-18 18:26:13,897 INFO L145 InterpolantAutomaton]: CoverageRelationStatistics Valid=65, Invalid=241, Unknown=0, NotChecked=0, Total=306 [2023-02-18 18:26:13,897 INFO L87 Difference]: Start difference. First operand 126 states and 147 transitions. Second operand has 18 states, 16 states have (on average 2.875) internal successors, (46), 17 states have internal predecessors, (46), 10 states have call successors, (34), 3 states have call predecessors, (34), 2 states have return successors, (32), 10 states have call predecessors, (32), 10 states have call successors, (32) [2023-02-18 18:26:14,636 INFO L144 Difference]: Subtrahend was deterministic. Have not used determinization. [2023-02-18 18:26:14,636 INFO L93 Difference]: Finished difference Result 150 states and 167 transitions. [2023-02-18 18:26:14,636 INFO L141 InterpolantAutomaton]: Switched to read-only mode: deterministic interpolant automaton has 14 states. [2023-02-18 18:26:14,637 INFO L78 Accepts]: Start accepts. Automaton has has 18 states, 16 states have (on average 2.875) internal successors, (46), 17 states have internal predecessors, (46), 10 states have call successors, (34), 3 states have call predecessors, (34), 2 states have return successors, (32), 10 states have call predecessors, (32), 10 states have call successors, (32) Word has length 102 [2023-02-18 18:26:14,637 INFO L84 Accepts]: Finished accepts. some prefix is accepted. [2023-02-18 18:26:14,640 INFO L225 Difference]: With dead ends: 150 [2023-02-18 18:26:14,640 INFO L226 Difference]: Without dead ends: 110 [2023-02-18 18:26:14,641 INFO L412 NwaCegarLoop]: 0 DeclaredPredicates, 207 GetRequests, 183 SyntacticMatches, 3 SemanticMatches, 21 ConstructedPredicates, 0 IntricatePredicates, 0 DeprecatedPredicates, 58 ImplicationChecksByTransitivity, 0.2s TimeCoverageRelationStatistics Valid=111, Invalid=395, Unknown=0, NotChecked=0, Total=506 [2023-02-18 18:26:14,641 INFO L413 NwaCegarLoop]: 31 mSDtfsCounter, 20 mSDsluCounter, 134 mSDsCounter, 0 mSdLazyCounter, 559 mSolverCounterSat, 38 mSolverCounterUnsat, 0 mSolverCounterUnknown, 0 mSolverCounterNotChecked, 0.5s Time, 0 mProtectedPredicate, 0 mProtectedAction, 23 SdHoareTripleChecker+Valid, 165 SdHoareTripleChecker+Invalid, 597 SdHoareTripleChecker+Unknown, 0 SdHoareTripleChecker+Unchecked, 0.0s SdHoareTripleChecker+Time, 38 IncrementalHoareTripleChecker+Valid, 559 IncrementalHoareTripleChecker+Invalid, 0 IncrementalHoareTripleChecker+Unknown, 0 IncrementalHoareTripleChecker+Unchecked, 0.6s IncrementalHoareTripleChecker+Time [2023-02-18 18:26:14,641 INFO L414 NwaCegarLoop]: SdHoareTripleChecker [23 Valid, 165 Invalid, 597 Unknown, 0 Unchecked, 0.0s Time], IncrementalHoareTripleChecker [38 Valid, 559 Invalid, 0 Unknown, 0 Unchecked, 0.6s Time] [2023-02-18 18:26:14,643 INFO L82 GeneralOperation]: Start minimizeSevpa. Operand 110 states. [2023-02-18 18:26:14,686 INFO L88 GeneralOperation]: Finished minimizeSevpa. Reduced states from 110 to 110. [2023-02-18 18:26:14,687 INFO L82 GeneralOperation]: Start removeUnreachable. Operand has 110 states, 71 states have (on average 1.0704225352112675) internal successors, (76), 74 states have internal predecessors, (76), 23 states have call successors, (23), 15 states have call predecessors, (23), 15 states have return successors, (22), 20 states have call predecessors, (22), 22 states have call successors, (22) [2023-02-18 18:26:14,687 INFO L88 GeneralOperation]: Finished removeUnreachable. Reduced from 110 states to 110 states and 121 transitions. [2023-02-18 18:26:14,688 INFO L78 Accepts]: Start accepts. Automaton has 110 states and 121 transitions. Word has length 102 [2023-02-18 18:26:14,688 INFO L84 Accepts]: Finished accepts. word is rejected. [2023-02-18 18:26:14,688 INFO L495 AbstractCegarLoop]: Abstraction has 110 states and 121 transitions. [2023-02-18 18:26:14,688 INFO L496 AbstractCegarLoop]: INTERPOLANT automaton has has 18 states, 16 states have (on average 2.875) internal successors, (46), 17 states have internal predecessors, (46), 10 states have call successors, (34), 3 states have call predecessors, (34), 2 states have return successors, (32), 10 states have call predecessors, (32), 10 states have call successors, (32) [2023-02-18 18:26:14,689 INFO L276 IsEmpty]: Start isEmpty. Operand 110 states and 121 transitions. [2023-02-18 18:26:14,689 INFO L282 IsEmpty]: Finished isEmpty. Found accepting run of length 117 [2023-02-18 18:26:14,689 INFO L187 NwaCegarLoop]: Found error trace [2023-02-18 18:26:14,690 INFO L195 NwaCegarLoop]: trace histogram [19, 18, 18, 4, 4, 4, 4, 4, 4, 4, 4, 4, 3, 3, 3, 3, 3, 2, 1, 1, 1, 1, 1, 1, 1, 1] [2023-02-18 18:26:14,697 INFO L540 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (10)] Forceful destruction successful, exit code 0 [2023-02-18 18:26:14,890 WARN L477 AbstractCegarLoop]: Destroyed unattended storables created during the last iteration: SelfDestructingSolverStorable11,10 /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true [2023-02-18 18:26:14,890 INFO L420 AbstractCegarLoop]: === Iteration 13 === Targeting __VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION === [__VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION] === [2023-02-18 18:26:14,891 INFO L144 PredicateUnifier]: Initialized classic predicate unifier [2023-02-18 18:26:14,891 INFO L85 PathProgramCache]: Analyzing trace with hash 289773103, now seen corresponding path program 2 times [2023-02-18 18:26:14,891 INFO L118 FreeRefinementEngine]: Executing refinement strategy CAMEL [2023-02-18 18:26:14,891 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleSmtInterpolCraig [1835389801] [2023-02-18 18:26:14,891 INFO L95 rtionOrderModulation]: Keeping assertion order NOT_INCREMENTALLY [2023-02-18 18:26:14,891 INFO L127 SolverBuilder]: Constructing new instance of SMTInterpol with explicit timeout -1 ms and remaining time -1 ms [2023-02-18 18:26:14,898 ERROR L245 FreeRefinementEngine]: Caught known exception: Unsupported non-linear arithmetic [2023-02-18 18:26:14,898 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleZ3 [226009603] [2023-02-18 18:26:14,898 INFO L93 rtionOrderModulation]: Changing assertion order to OUTSIDE_LOOP_FIRST1 [2023-02-18 18:26:14,898 INFO L173 SolverBuilder]: Constructing external solver with command: z3 -smt2 -in SMTLIB2_COMPLIANT=true [2023-02-18 18:26:14,898 INFO L189 MonitoredProcess]: No working directory specified, using /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 [2023-02-18 18:26:14,899 INFO L229 MonitoredProcess]: Starting monitored process 11 with /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (exit command is (exit), workingDir is null) [2023-02-18 18:26:14,920 INFO L327 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (11)] Waiting until timeout for monitored process [2023-02-18 18:26:14,981 INFO L228 tOrderPrioritization]: Assert order OUTSIDE_LOOP_FIRST1 issued 2 check-sat command(s) [2023-02-18 18:26:14,981 INFO L229 tOrderPrioritization]: Conjunction of SSA is unsat [2023-02-18 18:26:14,983 INFO L263 TraceCheckSpWp]: Trace formula consists of 279 conjuncts, 56 conjunts are in the unsatisfiable core [2023-02-18 18:26:14,986 INFO L286 TraceCheckSpWp]: Computing forward predicates... [2023-02-18 18:26:15,128 INFO L134 CoverageAnalysis]: Checked inductivity of 699 backedges. 38 proven. 100 refuted. 0 times theorem prover too weak. 561 trivial. 0 not checked. [2023-02-18 18:26:15,129 INFO L328 TraceCheckSpWp]: Computing backward predicates... [2023-02-18 18:26:21,615 INFO L134 CoverageAnalysis]: Checked inductivity of 699 backedges. 38 proven. 100 refuted. 0 times theorem prover too weak. 561 trivial. 0 not checked. [2023-02-18 18:26:21,615 INFO L136 FreeRefinementEngine]: Strategy CAMEL found an infeasible trace [2023-02-18 18:26:21,615 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleSmtInterpolCraig [1835389801] [2023-02-18 18:26:21,616 WARN L310 FreeRefinementEngine]: Interpolation failed due to KNOWN_IGNORE: SMT_SOLVER_CANNOT_INTERPOLATE_INPUT [2023-02-18 18:26:21,616 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleZ3 [226009603] [2023-02-18 18:26:21,616 INFO L157 FreeRefinementEngine]: IpTcStrategyModuleZ3 [226009603] provided 0 perfect and 2 imperfect interpolant sequences [2023-02-18 18:26:21,616 INFO L184 FreeRefinementEngine]: Found 0 perfect and 2 imperfect interpolant sequences. [2023-02-18 18:26:21,616 INFO L197 FreeRefinementEngine]: Number of different interpolants: perfect sequences [] imperfect sequences [15, 15] total 27 [2023-02-18 18:26:21,616 INFO L121 tionRefinementEngine]: Using interpolant automaton builder IpAbStrategyModuleStraightlineAll [1706255404] [2023-02-18 18:26:21,616 INFO L85 oduleStraightlineAll]: Using 2 imperfect interpolants to construct interpolant automaton [2023-02-18 18:26:21,617 INFO L571 AbstractCegarLoop]: INTERPOLANT automaton has 27 states [2023-02-18 18:26:21,617 INFO L100 FreeRefinementEngine]: Using predicate unifier PredicateUnifier provided by strategy CAMEL [2023-02-18 18:26:21,618 INFO L143 InterpolantAutomaton]: Constructing interpolant automaton starting with 27 interpolants. [2023-02-18 18:26:21,618 INFO L145 InterpolantAutomaton]: CoverageRelationStatistics Valid=145, Invalid=557, Unknown=0, NotChecked=0, Total=702 [2023-02-18 18:26:21,618 INFO L87 Difference]: Start difference. First operand 110 states and 121 transitions. Second operand has 27 states, 27 states have (on average 2.0) internal successors, (54), 25 states have internal predecessors, (54), 15 states have call successors, (38), 3 states have call predecessors, (38), 2 states have return successors, (36), 13 states have call predecessors, (36), 13 states have call successors, (36) [2023-02-18 18:26:29,308 WARN L539 Checker$ProtectedHtc]: IncrementalHoareTripleChecker took 2.00s for a HTC check with result UNKNOWN. Formula has sorts [Bool, Int], hasArrays=false, hasNonlinArith=true, quantifiers [] [2023-02-18 18:26:44,917 WARN L539 Checker$ProtectedHtc]: IncrementalHoareTripleChecker took 2.00s for a HTC check with result UNKNOWN. Formula has sorts [Bool, Int], hasArrays=false, hasNonlinArith=true, quantifiers [] [2023-02-18 18:26:47,277 WARN L539 Checker$ProtectedHtc]: IncrementalHoareTripleChecker took 1.72s for a HTC check with result INVALID. Formula has sorts [Bool, Int], hasArrays=false, hasNonlinArith=true, quantifiers [] [2023-02-18 18:26:49,583 WARN L539 Checker$ProtectedHtc]: IncrementalHoareTripleChecker took 2.00s for a HTC check with result UNKNOWN. Formula has sorts [Bool, Int], hasArrays=false, hasNonlinArith=true, quantifiers [] [2023-02-18 18:26:51,524 INFO L144 Difference]: Subtrahend was deterministic. Have not used determinization. [2023-02-18 18:26:51,524 INFO L93 Difference]: Finished difference Result 228 states and 282 transitions. [2023-02-18 18:26:51,525 INFO L141 InterpolantAutomaton]: Switched to read-only mode: deterministic interpolant automaton has 31 states. [2023-02-18 18:26:51,525 INFO L78 Accepts]: Start accepts. Automaton has has 27 states, 27 states have (on average 2.0) internal successors, (54), 25 states have internal predecessors, (54), 15 states have call successors, (38), 3 states have call predecessors, (38), 2 states have return successors, (36), 13 states have call predecessors, (36), 13 states have call successors, (36) Word has length 116 [2023-02-18 18:26:51,525 INFO L84 Accepts]: Finished accepts. some prefix is accepted. [2023-02-18 18:26:51,526 INFO L225 Difference]: With dead ends: 228 [2023-02-18 18:26:51,526 INFO L226 Difference]: Without dead ends: 205 [2023-02-18 18:26:51,527 INFO L412 NwaCegarLoop]: 0 DeclaredPredicates, 247 GetRequests, 202 SyntacticMatches, 3 SemanticMatches, 42 ConstructedPredicates, 0 IntricatePredicates, 0 DeprecatedPredicates, 267 ImplicationChecksByTransitivity, 7.9s TimeCoverageRelationStatistics Valid=466, Invalid=1426, Unknown=0, NotChecked=0, Total=1892 [2023-02-18 18:26:51,528 INFO L413 NwaCegarLoop]: 41 mSDtfsCounter, 100 mSDsluCounter, 185 mSDsCounter, 0 mSdLazyCounter, 1209 mSolverCounterSat, 191 mSolverCounterUnsat, 3 mSolverCounterUnknown, 0 mSolverCounterNotChecked, 23.6s Time, 0 mProtectedPredicate, 0 mProtectedAction, 103 SdHoareTripleChecker+Valid, 226 SdHoareTripleChecker+Invalid, 1403 SdHoareTripleChecker+Unknown, 0 SdHoareTripleChecker+Unchecked, 0.0s SdHoareTripleChecker+Time, 191 IncrementalHoareTripleChecker+Valid, 1209 IncrementalHoareTripleChecker+Invalid, 3 IncrementalHoareTripleChecker+Unknown, 0 IncrementalHoareTripleChecker+Unchecked, 23.8s IncrementalHoareTripleChecker+Time [2023-02-18 18:26:51,528 INFO L414 NwaCegarLoop]: SdHoareTripleChecker [103 Valid, 226 Invalid, 1403 Unknown, 0 Unchecked, 0.0s Time], IncrementalHoareTripleChecker [191 Valid, 1209 Invalid, 3 Unknown, 0 Unchecked, 23.8s Time] [2023-02-18 18:26:51,529 INFO L82 GeneralOperation]: Start minimizeSevpa. Operand 205 states. [2023-02-18 18:26:51,776 INFO L88 GeneralOperation]: Finished minimizeSevpa. Reduced states from 205 to 193. [2023-02-18 18:26:51,777 INFO L82 GeneralOperation]: Start removeUnreachable. Operand has 193 states, 123 states have (on average 1.1382113821138211) internal successors, (140), 127 states have internal predecessors, (140), 47 states have call successors, (47), 22 states have call predecessors, (47), 22 states have return successors, (46), 43 states have call predecessors, (46), 46 states have call successors, (46) [2023-02-18 18:26:51,778 INFO L88 GeneralOperation]: Finished removeUnreachable. Reduced from 193 states to 193 states and 233 transitions. [2023-02-18 18:26:51,778 INFO L78 Accepts]: Start accepts. Automaton has 193 states and 233 transitions. Word has length 116 [2023-02-18 18:26:51,779 INFO L84 Accepts]: Finished accepts. word is rejected. [2023-02-18 18:26:51,779 INFO L495 AbstractCegarLoop]: Abstraction has 193 states and 233 transitions. [2023-02-18 18:26:51,779 INFO L496 AbstractCegarLoop]: INTERPOLANT automaton has has 27 states, 27 states have (on average 2.0) internal successors, (54), 25 states have internal predecessors, (54), 15 states have call successors, (38), 3 states have call predecessors, (38), 2 states have return successors, (36), 13 states have call predecessors, (36), 13 states have call successors, (36) [2023-02-18 18:26:51,779 INFO L276 IsEmpty]: Start isEmpty. Operand 193 states and 233 transitions. [2023-02-18 18:26:51,780 INFO L282 IsEmpty]: Finished isEmpty. Found accepting run of length 122 [2023-02-18 18:26:51,780 INFO L187 NwaCegarLoop]: Found error trace [2023-02-18 18:26:51,781 INFO L195 NwaCegarLoop]: trace histogram [20, 19, 19, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 3, 3, 3, 2, 1, 1, 1, 1, 1, 1, 1, 1] [2023-02-18 18:26:51,787 INFO L540 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (11)] Forceful destruction successful, exit code 0 [2023-02-18 18:26:51,987 WARN L477 AbstractCegarLoop]: Destroyed unattended storables created during the last iteration: 11 /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true,SelfDestructingSolverStorable12 [2023-02-18 18:26:51,987 INFO L420 AbstractCegarLoop]: === Iteration 14 === Targeting __VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION === [__VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION] === [2023-02-18 18:26:51,987 INFO L144 PredicateUnifier]: Initialized classic predicate unifier [2023-02-18 18:26:51,988 INFO L85 PathProgramCache]: Analyzing trace with hash 1316179534, now seen corresponding path program 3 times [2023-02-18 18:26:51,988 INFO L118 FreeRefinementEngine]: Executing refinement strategy CAMEL [2023-02-18 18:26:51,988 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleSmtInterpolCraig [1199679925] [2023-02-18 18:26:51,988 INFO L95 rtionOrderModulation]: Keeping assertion order NOT_INCREMENTALLY [2023-02-18 18:26:51,988 INFO L127 SolverBuilder]: Constructing new instance of SMTInterpol with explicit timeout -1 ms and remaining time -1 ms [2023-02-18 18:26:51,998 ERROR L245 FreeRefinementEngine]: Caught known exception: Unsupported non-linear arithmetic [2023-02-18 18:26:51,999 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleZ3 [1611347125] [2023-02-18 18:26:51,999 INFO L93 rtionOrderModulation]: Changing assertion order to OUTSIDE_LOOP_FIRST2 [2023-02-18 18:26:51,999 INFO L173 SolverBuilder]: Constructing external solver with command: z3 -smt2 -in SMTLIB2_COMPLIANT=true [2023-02-18 18:26:52,000 INFO L189 MonitoredProcess]: No working directory specified, using /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 [2023-02-18 18:26:52,001 INFO L229 MonitoredProcess]: Starting monitored process 12 with /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (exit command is (exit), workingDir is null) [2023-02-18 18:26:52,003 INFO L327 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (12)] Waiting until timeout for monitored process [2023-02-18 18:26:52,052 INFO L228 tOrderPrioritization]: Assert order OUTSIDE_LOOP_FIRST2 issued 4 check-sat command(s) [2023-02-18 18:26:52,053 INFO L229 tOrderPrioritization]: Conjunction of SSA is unsat [2023-02-18 18:26:52,053 INFO L263 TraceCheckSpWp]: Trace formula consists of 163 conjuncts, 26 conjunts are in the unsatisfiable core [2023-02-18 18:26:52,056 INFO L286 TraceCheckSpWp]: Computing forward predicates... [2023-02-18 18:26:52,195 INFO L134 CoverageAnalysis]: Checked inductivity of 776 backedges. 118 proven. 52 refuted. 0 times theorem prover too weak. 606 trivial. 0 not checked. [2023-02-18 18:26:52,195 INFO L328 TraceCheckSpWp]: Computing backward predicates... [2023-02-18 18:26:52,369 INFO L136 FreeRefinementEngine]: Strategy CAMEL found an infeasible trace [2023-02-18 18:26:52,369 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleSmtInterpolCraig [1199679925] [2023-02-18 18:26:52,369 WARN L310 FreeRefinementEngine]: Interpolation failed due to KNOWN_IGNORE: SMT_SOLVER_CANNOT_INTERPOLATE_INPUT [2023-02-18 18:26:52,369 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleZ3 [1611347125] [2023-02-18 18:26:52,369 INFO L157 FreeRefinementEngine]: IpTcStrategyModuleZ3 [1611347125] provided 0 perfect and 1 imperfect interpolant sequences [2023-02-18 18:26:52,369 INFO L184 FreeRefinementEngine]: Found 0 perfect and 1 imperfect interpolant sequences. [2023-02-18 18:26:52,369 INFO L197 FreeRefinementEngine]: Number of different interpolants: perfect sequences [] imperfect sequences [9] total 9 [2023-02-18 18:26:52,369 INFO L121 tionRefinementEngine]: Using interpolant automaton builder IpAbStrategyModuleStraightlineAll [641077780] [2023-02-18 18:26:52,369 INFO L85 oduleStraightlineAll]: Using 1 imperfect interpolants to construct interpolant automaton [2023-02-18 18:26:52,370 INFO L571 AbstractCegarLoop]: INTERPOLANT automaton has 9 states [2023-02-18 18:26:52,370 INFO L100 FreeRefinementEngine]: Using predicate unifier PredicateUnifier provided by strategy CAMEL [2023-02-18 18:26:52,370 INFO L143 InterpolantAutomaton]: Constructing interpolant automaton starting with 9 interpolants. [2023-02-18 18:26:52,370 INFO L145 InterpolantAutomaton]: CoverageRelationStatistics Valid=32, Invalid=124, Unknown=0, NotChecked=0, Total=156 [2023-02-18 18:26:52,370 INFO L87 Difference]: Start difference. First operand 193 states and 233 transitions. Second operand has 9 states, 9 states have (on average 2.7777777777777777) internal successors, (25), 8 states have internal predecessors, (25), 3 states have call successors, (10), 2 states have call predecessors, (10), 2 states have return successors, (11), 3 states have call predecessors, (11), 3 states have call successors, (11) [2023-02-18 18:26:52,767 INFO L144 Difference]: Subtrahend was deterministic. Have not used determinization. [2023-02-18 18:26:52,768 INFO L93 Difference]: Finished difference Result 211 states and 247 transitions. [2023-02-18 18:26:52,768 INFO L141 InterpolantAutomaton]: Switched to read-only mode: deterministic interpolant automaton has 8 states. [2023-02-18 18:26:52,768 INFO L78 Accepts]: Start accepts. Automaton has has 9 states, 9 states have (on average 2.7777777777777777) internal successors, (25), 8 states have internal predecessors, (25), 3 states have call successors, (10), 2 states have call predecessors, (10), 2 states have return successors, (11), 3 states have call predecessors, (11), 3 states have call successors, (11) Word has length 121 [2023-02-18 18:26:52,769 INFO L84 Accepts]: Finished accepts. some prefix is accepted. [2023-02-18 18:26:52,770 INFO L225 Difference]: With dead ends: 211 [2023-02-18 18:26:52,770 INFO L226 Difference]: Without dead ends: 209 [2023-02-18 18:26:52,771 INFO L412 NwaCegarLoop]: 0 DeclaredPredicates, 136 GetRequests, 121 SyntacticMatches, 1 SemanticMatches, 14 ConstructedPredicates, 0 IntricatePredicates, 0 DeprecatedPredicates, 27 ImplicationChecksByTransitivity, 0.2s TimeCoverageRelationStatistics Valid=53, Invalid=187, Unknown=0, NotChecked=0, Total=240 [2023-02-18 18:26:52,771 INFO L413 NwaCegarLoop]: 16 mSDtfsCounter, 17 mSDsluCounter, 45 mSDsCounter, 0 mSdLazyCounter, 120 mSolverCounterSat, 9 mSolverCounterUnsat, 0 mSolverCounterUnknown, 0 mSolverCounterNotChecked, 0.1s Time, 0 mProtectedPredicate, 0 mProtectedAction, 17 SdHoareTripleChecker+Valid, 61 SdHoareTripleChecker+Invalid, 129 SdHoareTripleChecker+Unknown, 0 SdHoareTripleChecker+Unchecked, 0.0s SdHoareTripleChecker+Time, 9 IncrementalHoareTripleChecker+Valid, 120 IncrementalHoareTripleChecker+Invalid, 0 IncrementalHoareTripleChecker+Unknown, 0 IncrementalHoareTripleChecker+Unchecked, 0.1s IncrementalHoareTripleChecker+Time [2023-02-18 18:26:52,771 INFO L414 NwaCegarLoop]: SdHoareTripleChecker [17 Valid, 61 Invalid, 129 Unknown, 0 Unchecked, 0.0s Time], IncrementalHoareTripleChecker [9 Valid, 120 Invalid, 0 Unknown, 0 Unchecked, 0.1s Time] [2023-02-18 18:26:52,772 INFO L82 GeneralOperation]: Start minimizeSevpa. Operand 209 states. [2023-02-18 18:26:53,005 INFO L88 GeneralOperation]: Finished minimizeSevpa. Reduced states from 209 to 209. [2023-02-18 18:26:53,005 INFO L82 GeneralOperation]: Start removeUnreachable. Operand has 209 states, 135 states have (on average 1.125925925925926) internal successors, (152), 139 states have internal predecessors, (152), 47 states have call successors, (47), 26 states have call predecessors, (47), 26 states have return successors, (46), 43 states have call predecessors, (46), 46 states have call successors, (46) [2023-02-18 18:26:53,006 INFO L88 GeneralOperation]: Finished removeUnreachable. Reduced from 209 states to 209 states and 245 transitions. [2023-02-18 18:26:53,007 INFO L78 Accepts]: Start accepts. Automaton has 209 states and 245 transitions. Word has length 121 [2023-02-18 18:26:53,007 INFO L84 Accepts]: Finished accepts. word is rejected. [2023-02-18 18:26:53,007 INFO L495 AbstractCegarLoop]: Abstraction has 209 states and 245 transitions. [2023-02-18 18:26:53,007 INFO L496 AbstractCegarLoop]: INTERPOLANT automaton has has 9 states, 9 states have (on average 2.7777777777777777) internal successors, (25), 8 states have internal predecessors, (25), 3 states have call successors, (10), 2 states have call predecessors, (10), 2 states have return successors, (11), 3 states have call predecessors, (11), 3 states have call successors, (11) [2023-02-18 18:26:53,007 INFO L276 IsEmpty]: Start isEmpty. Operand 209 states and 245 transitions. [2023-02-18 18:26:53,008 INFO L282 IsEmpty]: Finished isEmpty. Found accepting run of length 128 [2023-02-18 18:26:53,008 INFO L187 NwaCegarLoop]: Found error trace [2023-02-18 18:26:53,008 INFO L195 NwaCegarLoop]: trace histogram [21, 20, 20, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 3, 3, 2, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1] [2023-02-18 18:26:53,020 INFO L540 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (12)] Forceful destruction successful, exit code 0 [2023-02-18 18:26:53,216 WARN L477 AbstractCegarLoop]: Destroyed unattended storables created during the last iteration: 12 /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true,SelfDestructingSolverStorable13 [2023-02-18 18:26:53,217 INFO L420 AbstractCegarLoop]: === Iteration 15 === Targeting __VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION === [__VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION] === [2023-02-18 18:26:53,217 INFO L144 PredicateUnifier]: Initialized classic predicate unifier [2023-02-18 18:26:53,217 INFO L85 PathProgramCache]: Analyzing trace with hash 1262824565, now seen corresponding path program 1 times [2023-02-18 18:26:53,217 INFO L118 FreeRefinementEngine]: Executing refinement strategy CAMEL [2023-02-18 18:26:53,217 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleSmtInterpolCraig [803865377] [2023-02-18 18:26:53,217 INFO L95 rtionOrderModulation]: Keeping assertion order NOT_INCREMENTALLY [2023-02-18 18:26:53,217 INFO L127 SolverBuilder]: Constructing new instance of SMTInterpol with explicit timeout -1 ms and remaining time -1 ms [2023-02-18 18:26:53,223 ERROR L245 FreeRefinementEngine]: Caught known exception: Unsupported non-linear arithmetic [2023-02-18 18:26:53,223 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleZ3 [1575743470] [2023-02-18 18:26:53,224 INFO L95 rtionOrderModulation]: Keeping assertion order NOT_INCREMENTALLY [2023-02-18 18:26:53,224 INFO L173 SolverBuilder]: Constructing external solver with command: z3 -smt2 -in SMTLIB2_COMPLIANT=true [2023-02-18 18:26:53,224 INFO L189 MonitoredProcess]: No working directory specified, using /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 [2023-02-18 18:26:53,225 INFO L229 MonitoredProcess]: Starting monitored process 13 with /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (exit command is (exit), workingDir is null) [2023-02-18 18:26:53,247 INFO L327 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (13)] Waiting until timeout for monitored process [2023-02-18 18:26:53,300 INFO L136 AnnotateAndAsserter]: Conjunction of SSA is unsat [2023-02-18 18:26:53,303 INFO L263 TraceCheckSpWp]: Trace formula consists of 299 conjuncts, 59 conjunts are in the unsatisfiable core [2023-02-18 18:26:53,305 INFO L286 TraceCheckSpWp]: Computing forward predicates... [2023-02-18 18:26:53,459 INFO L134 CoverageAnalysis]: Checked inductivity of 857 backedges. 92 proven. 113 refuted. 0 times theorem prover too weak. 652 trivial. 0 not checked. [2023-02-18 18:26:53,459 INFO L328 TraceCheckSpWp]: Computing backward predicates... [2023-02-18 18:26:55,640 INFO L134 CoverageAnalysis]: Checked inductivity of 857 backedges. 92 proven. 113 refuted. 0 times theorem prover too weak. 652 trivial. 0 not checked. [2023-02-18 18:26:55,641 INFO L136 FreeRefinementEngine]: Strategy CAMEL found an infeasible trace [2023-02-18 18:26:55,641 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleSmtInterpolCraig [803865377] [2023-02-18 18:26:55,641 WARN L310 FreeRefinementEngine]: Interpolation failed due to KNOWN_IGNORE: SMT_SOLVER_CANNOT_INTERPOLATE_INPUT [2023-02-18 18:26:55,641 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleZ3 [1575743470] [2023-02-18 18:26:55,641 INFO L157 FreeRefinementEngine]: IpTcStrategyModuleZ3 [1575743470] provided 0 perfect and 2 imperfect interpolant sequences [2023-02-18 18:26:55,641 INFO L184 FreeRefinementEngine]: Found 0 perfect and 2 imperfect interpolant sequences. [2023-02-18 18:26:55,641 INFO L197 FreeRefinementEngine]: Number of different interpolants: perfect sequences [] imperfect sequences [16, 15] total 28 [2023-02-18 18:26:55,642 INFO L121 tionRefinementEngine]: Using interpolant automaton builder IpAbStrategyModuleStraightlineAll [1388008039] [2023-02-18 18:26:55,642 INFO L85 oduleStraightlineAll]: Using 2 imperfect interpolants to construct interpolant automaton [2023-02-18 18:26:55,642 INFO L571 AbstractCegarLoop]: INTERPOLANT automaton has 28 states [2023-02-18 18:26:55,642 INFO L100 FreeRefinementEngine]: Using predicate unifier PredicateUnifier provided by strategy CAMEL [2023-02-18 18:26:55,643 INFO L143 InterpolantAutomaton]: Constructing interpolant automaton starting with 28 interpolants. [2023-02-18 18:26:55,643 INFO L145 InterpolantAutomaton]: CoverageRelationStatistics Valid=155, Invalid=601, Unknown=0, NotChecked=0, Total=756 [2023-02-18 18:26:55,644 INFO L87 Difference]: Start difference. First operand 209 states and 245 transitions. Second operand has 28 states, 26 states have (on average 2.1538461538461537) internal successors, (56), 24 states have internal predecessors, (56), 17 states have call successors, (42), 3 states have call predecessors, (42), 2 states have return successors, (40), 16 states have call predecessors, (40), 15 states have call successors, (40) [2023-02-18 18:27:01,863 INFO L144 Difference]: Subtrahend was deterministic. Have not used determinization. [2023-02-18 18:27:01,863 INFO L93 Difference]: Finished difference Result 292 states and 352 transitions. [2023-02-18 18:27:01,863 INFO L141 InterpolantAutomaton]: Switched to read-only mode: deterministic interpolant automaton has 27 states. [2023-02-18 18:27:01,864 INFO L78 Accepts]: Start accepts. Automaton has has 28 states, 26 states have (on average 2.1538461538461537) internal successors, (56), 24 states have internal predecessors, (56), 17 states have call successors, (42), 3 states have call predecessors, (42), 2 states have return successors, (40), 16 states have call predecessors, (40), 15 states have call successors, (40) Word has length 127 [2023-02-18 18:27:01,864 INFO L84 Accepts]: Finished accepts. some prefix is accepted. [2023-02-18 18:27:01,865 INFO L225 Difference]: With dead ends: 292 [2023-02-18 18:27:01,865 INFO L226 Difference]: Without dead ends: 212 [2023-02-18 18:27:01,866 INFO L412 NwaCegarLoop]: 0 DeclaredPredicates, 266 GetRequests, 220 SyntacticMatches, 6 SemanticMatches, 40 ConstructedPredicates, 0 IntricatePredicates, 0 DeprecatedPredicates, 174 ImplicationChecksByTransitivity, 2.7s TimeCoverageRelationStatistics Valid=418, Invalid=1304, Unknown=0, NotChecked=0, Total=1722 [2023-02-18 18:27:01,866 INFO L413 NwaCegarLoop]: 36 mSDtfsCounter, 68 mSDsluCounter, 161 mSDsCounter, 0 mSdLazyCounter, 965 mSolverCounterSat, 129 mSolverCounterUnsat, 0 mSolverCounterUnknown, 0 mSolverCounterNotChecked, 4.3s Time, 0 mProtectedPredicate, 0 mProtectedAction, 68 SdHoareTripleChecker+Valid, 197 SdHoareTripleChecker+Invalid, 1094 SdHoareTripleChecker+Unknown, 0 SdHoareTripleChecker+Unchecked, 0.0s SdHoareTripleChecker+Time, 129 IncrementalHoareTripleChecker+Valid, 965 IncrementalHoareTripleChecker+Invalid, 0 IncrementalHoareTripleChecker+Unknown, 0 IncrementalHoareTripleChecker+Unchecked, 4.4s IncrementalHoareTripleChecker+Time [2023-02-18 18:27:01,867 INFO L414 NwaCegarLoop]: SdHoareTripleChecker [68 Valid, 197 Invalid, 1094 Unknown, 0 Unchecked, 0.0s Time], IncrementalHoareTripleChecker [129 Valid, 965 Invalid, 0 Unknown, 0 Unchecked, 4.4s Time] [2023-02-18 18:27:01,867 INFO L82 GeneralOperation]: Start minimizeSevpa. Operand 212 states. [2023-02-18 18:27:02,056 INFO L88 GeneralOperation]: Finished minimizeSevpa. Reduced states from 212 to 194. [2023-02-18 18:27:02,056 INFO L82 GeneralOperation]: Start removeUnreachable. Operand has 194 states, 127 states have (on average 1.0708661417322836) internal successors, (136), 131 states have internal predecessors, (136), 39 states have call successors, (39), 27 states have call predecessors, (39), 27 states have return successors, (39), 35 states have call predecessors, (39), 39 states have call successors, (39) [2023-02-18 18:27:02,057 INFO L88 GeneralOperation]: Finished removeUnreachable. Reduced from 194 states to 194 states and 214 transitions. [2023-02-18 18:27:02,057 INFO L78 Accepts]: Start accepts. Automaton has 194 states and 214 transitions. Word has length 127 [2023-02-18 18:27:02,058 INFO L84 Accepts]: Finished accepts. word is rejected. [2023-02-18 18:27:02,058 INFO L495 AbstractCegarLoop]: Abstraction has 194 states and 214 transitions. [2023-02-18 18:27:02,058 INFO L496 AbstractCegarLoop]: INTERPOLANT automaton has has 28 states, 26 states have (on average 2.1538461538461537) internal successors, (56), 24 states have internal predecessors, (56), 17 states have call successors, (42), 3 states have call predecessors, (42), 2 states have return successors, (40), 16 states have call predecessors, (40), 15 states have call successors, (40) [2023-02-18 18:27:02,058 INFO L276 IsEmpty]: Start isEmpty. Operand 194 states and 214 transitions. [2023-02-18 18:27:02,059 INFO L282 IsEmpty]: Finished isEmpty. Found accepting run of length 130 [2023-02-18 18:27:02,059 INFO L187 NwaCegarLoop]: Found error trace [2023-02-18 18:27:02,060 INFO L195 NwaCegarLoop]: trace histogram [21, 20, 20, 5, 5, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 3, 1, 1, 1, 1, 1, 1, 1] [2023-02-18 18:27:02,071 INFO L540 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (13)] Forceful destruction successful, exit code 0 [2023-02-18 18:27:02,265 WARN L477 AbstractCegarLoop]: Destroyed unattended storables created during the last iteration: 13 /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true,SelfDestructingSolverStorable14 [2023-02-18 18:27:02,266 INFO L420 AbstractCegarLoop]: === Iteration 16 === Targeting __VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION === [__VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION] === [2023-02-18 18:27:02,266 INFO L144 PredicateUnifier]: Initialized classic predicate unifier [2023-02-18 18:27:02,266 INFO L85 PathProgramCache]: Analyzing trace with hash -1395307885, now seen corresponding path program 3 times [2023-02-18 18:27:02,266 INFO L118 FreeRefinementEngine]: Executing refinement strategy CAMEL [2023-02-18 18:27:02,266 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleSmtInterpolCraig [1122310088] [2023-02-18 18:27:02,266 INFO L95 rtionOrderModulation]: Keeping assertion order NOT_INCREMENTALLY [2023-02-18 18:27:02,266 INFO L127 SolverBuilder]: Constructing new instance of SMTInterpol with explicit timeout -1 ms and remaining time -1 ms [2023-02-18 18:27:02,272 ERROR L245 FreeRefinementEngine]: Caught known exception: Unsupported non-linear arithmetic [2023-02-18 18:27:02,273 INFO L333 FreeRefinementEngine]: Using trace check IpTcStrategyModuleZ3 [416402204] [2023-02-18 18:27:02,273 INFO L93 rtionOrderModulation]: Changing assertion order to OUTSIDE_LOOP_FIRST2 [2023-02-18 18:27:02,273 INFO L173 SolverBuilder]: Constructing external solver with command: z3 -smt2 -in SMTLIB2_COMPLIANT=true [2023-02-18 18:27:02,273 INFO L189 MonitoredProcess]: No working directory specified, using /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 [2023-02-18 18:27:02,274 INFO L229 MonitoredProcess]: Starting monitored process 14 with /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (exit command is (exit), workingDir is null) [2023-02-18 18:27:02,285 INFO L327 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (14)] Waiting until timeout for monitored process [2023-02-18 18:27:02,339 INFO L228 tOrderPrioritization]: Assert order OUTSIDE_LOOP_FIRST2 issued 4 check-sat command(s) [2023-02-18 18:27:02,339 INFO L229 tOrderPrioritization]: Conjunction of SSA is unsat [2023-02-18 18:27:02,340 INFO L263 TraceCheckSpWp]: Trace formula consists of 174 conjuncts, 35 conjunts are in the unsatisfiable core [2023-02-18 18:27:02,343 INFO L286 TraceCheckSpWp]: Computing forward predicates... [2023-02-18 18:27:02,499 INFO L134 CoverageAnalysis]: Checked inductivity of 868 backedges. 177 proven. 50 refuted. 0 times theorem prover too weak. 641 trivial. 0 not checked. [2023-02-18 18:27:02,499 INFO L328 TraceCheckSpWp]: Computing backward predicates... [2023-02-18 18:27:02,691 INFO L136 FreeRefinementEngine]: Strategy CAMEL found an infeasible trace [2023-02-18 18:27:02,691 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleSmtInterpolCraig [1122310088] [2023-02-18 18:27:02,691 WARN L310 FreeRefinementEngine]: Interpolation failed due to KNOWN_IGNORE: SMT_SOLVER_CANNOT_INTERPOLATE_INPUT [2023-02-18 18:27:02,691 INFO L333 FreeRefinementEngine]: Using interpolant generator IpTcStrategyModuleZ3 [416402204] [2023-02-18 18:27:02,691 INFO L157 FreeRefinementEngine]: IpTcStrategyModuleZ3 [416402204] provided 0 perfect and 1 imperfect interpolant sequences [2023-02-18 18:27:02,691 INFO L184 FreeRefinementEngine]: Found 0 perfect and 1 imperfect interpolant sequences. [2023-02-18 18:27:02,691 INFO L197 FreeRefinementEngine]: Number of different interpolants: perfect sequences [] imperfect sequences [10] total 10 [2023-02-18 18:27:02,691 INFO L121 tionRefinementEngine]: Using interpolant automaton builder IpAbStrategyModuleStraightlineAll [2062063268] [2023-02-18 18:27:02,692 INFO L85 oduleStraightlineAll]: Using 1 imperfect interpolants to construct interpolant automaton [2023-02-18 18:27:02,692 INFO L571 AbstractCegarLoop]: INTERPOLANT automaton has 10 states [2023-02-18 18:27:02,692 INFO L100 FreeRefinementEngine]: Using predicate unifier PredicateUnifier provided by strategy CAMEL [2023-02-18 18:27:02,692 INFO L143 InterpolantAutomaton]: Constructing interpolant automaton starting with 10 interpolants. [2023-02-18 18:27:02,692 INFO L145 InterpolantAutomaton]: CoverageRelationStatistics Valid=40, Invalid=170, Unknown=0, NotChecked=0, Total=210 [2023-02-18 18:27:02,693 INFO L87 Difference]: Start difference. First operand 194 states and 214 transitions. Second operand has 10 states, 10 states have (on average 2.4) internal successors, (24), 9 states have internal predecessors, (24), 3 states have call successors, (10), 2 states have call predecessors, (10), 2 states have return successors, (11), 4 states have call predecessors, (11), 3 states have call successors, (11) [2023-02-18 18:27:02,998 INFO L144 Difference]: Subtrahend was deterministic. Have not used determinization. [2023-02-18 18:27:02,998 INFO L93 Difference]: Finished difference Result 194 states and 214 transitions. [2023-02-18 18:27:02,999 INFO L141 InterpolantAutomaton]: Switched to read-only mode: deterministic interpolant automaton has 6 states. [2023-02-18 18:27:02,999 INFO L78 Accepts]: Start accepts. Automaton has has 10 states, 10 states have (on average 2.4) internal successors, (24), 9 states have internal predecessors, (24), 3 states have call successors, (10), 2 states have call predecessors, (10), 2 states have return successors, (11), 4 states have call predecessors, (11), 3 states have call successors, (11) Word has length 129 [2023-02-18 18:27:02,999 INFO L84 Accepts]: Finished accepts. some prefix is accepted. [2023-02-18 18:27:02,999 INFO L225 Difference]: With dead ends: 194 [2023-02-18 18:27:02,999 INFO L226 Difference]: Without dead ends: 0 [2023-02-18 18:27:03,000 INFO L412 NwaCegarLoop]: 0 DeclaredPredicates, 138 GetRequests, 121 SyntacticMatches, 2 SemanticMatches, 15 ConstructedPredicates, 0 IntricatePredicates, 0 DeprecatedPredicates, 45 ImplicationChecksByTransitivity, 0.2s TimeCoverageRelationStatistics Valid=57, Invalid=215, Unknown=0, NotChecked=0, Total=272 [2023-02-18 18:27:03,001 INFO L413 NwaCegarLoop]: 12 mSDtfsCounter, 19 mSDsluCounter, 34 mSDsCounter, 0 mSdLazyCounter, 101 mSolverCounterSat, 21 mSolverCounterUnsat, 0 mSolverCounterUnknown, 0 mSolverCounterNotChecked, 0.1s Time, 0 mProtectedPredicate, 0 mProtectedAction, 20 SdHoareTripleChecker+Valid, 46 SdHoareTripleChecker+Invalid, 122 SdHoareTripleChecker+Unknown, 0 SdHoareTripleChecker+Unchecked, 0.0s SdHoareTripleChecker+Time, 21 IncrementalHoareTripleChecker+Valid, 101 IncrementalHoareTripleChecker+Invalid, 0 IncrementalHoareTripleChecker+Unknown, 0 IncrementalHoareTripleChecker+Unchecked, 0.1s IncrementalHoareTripleChecker+Time [2023-02-18 18:27:03,001 INFO L414 NwaCegarLoop]: SdHoareTripleChecker [20 Valid, 46 Invalid, 122 Unknown, 0 Unchecked, 0.0s Time], IncrementalHoareTripleChecker [21 Valid, 101 Invalid, 0 Unknown, 0 Unchecked, 0.1s Time] [2023-02-18 18:27:03,001 INFO L82 GeneralOperation]: Start minimizeSevpa. Operand 0 states. [2023-02-18 18:27:03,001 INFO L88 GeneralOperation]: Finished minimizeSevpa. Reduced states from 0 to 0. [2023-02-18 18:27:03,002 INFO L82 GeneralOperation]: Start removeUnreachable. Operand has 0 states, 0 states have (on average 0.0) internal successors, (0), 0 states have internal predecessors, (0), 0 states have call successors, (0), 0 states have call predecessors, (0), 0 states have return successors, (0), 0 states have call predecessors, (0), 0 states have call successors, (0) [2023-02-18 18:27:03,002 INFO L88 GeneralOperation]: Finished removeUnreachable. Reduced from 0 states to 0 states and 0 transitions. [2023-02-18 18:27:03,002 INFO L78 Accepts]: Start accepts. Automaton has 0 states and 0 transitions. Word has length 129 [2023-02-18 18:27:03,002 INFO L84 Accepts]: Finished accepts. word is rejected. [2023-02-18 18:27:03,002 INFO L495 AbstractCegarLoop]: Abstraction has 0 states and 0 transitions. [2023-02-18 18:27:03,002 INFO L496 AbstractCegarLoop]: INTERPOLANT automaton has has 10 states, 10 states have (on average 2.4) internal successors, (24), 9 states have internal predecessors, (24), 3 states have call successors, (10), 2 states have call predecessors, (10), 2 states have return successors, (11), 4 states have call predecessors, (11), 3 states have call successors, (11) [2023-02-18 18:27:03,003 INFO L276 IsEmpty]: Start isEmpty. Operand 0 states and 0 transitions. [2023-02-18 18:27:03,003 INFO L282 IsEmpty]: Finished isEmpty. No accepting run. [2023-02-18 18:27:03,005 INFO L805 garLoopResultBuilder]: Registering result SAFE for location __VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION (0 of 1 remaining) [2023-02-18 18:27:03,012 INFO L540 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true (14)] Forceful destruction successful, exit code 0 [2023-02-18 18:27:03,205 WARN L477 AbstractCegarLoop]: Destroyed unattended storables created during the last iteration: 14 /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 -smt2 -in SMTLIB2_COMPLIANT=true,SelfDestructingSolverStorable15 [2023-02-18 18:27:03,207 INFO L343 DoubleDeckerVisitor]: Before removal of dead ends 0 states and 0 transitions. [2023-02-18 18:27:03,349 INFO L899 garLoopResultBuilder]: For program point L52(lines 52 55) no Hoare annotation was computed. [2023-02-18 18:27:03,353 INFO L895 garLoopResultBuilder]: At program point L52-2(lines 44 56) the Hoare annotation is: (let ((.cse122 (div |ULTIMATE.start_main_~p~0#1| 2)) (.cse119 (div |ULTIMATE.start_main_~d~0#1| 2))) (let ((.cse294 (+ .cse119 1)) (.cse295 (+ .cse122 1)) (.cse121 (+ 1 .cse122)) (.cse266 (- .cse119))) (let ((.cse270 (+ (- 1) .cse266)) (.cse100 (+ |ULTIMATE.start_main_~q~0#1| .cse121)) (.cse83 (+ |ULTIMATE.start_main_~q~0#1| .cse122)) (.cse280 (mod |ULTIMATE.start_main_~d~0#1| 2)) (.cse258 (div |ULTIMATE.start_main_~p~0#1| 4)) (.cse261 (div .cse295 2)) (.cse88 (div .cse294 2)) (.cse92 (div |ULTIMATE.start_main_~d~0#1| 4))) (let ((.cse95 (+ 1 .cse92)) (.cse292 (+ .cse92 1)) (.cse82 (+ 1 .cse88)) (.cse293 (+ .cse88 1)) (.cse291 (+ .cse261 1)) (.cse286 (+ .cse258 1)) (.cse68 (- |ULTIMATE.start_main_~d~0#1|)) (.cse116 (= 1 |ULTIMATE.start_main_~p~0#1|)) (.cse81 (= 0 .cse280)) (.cse297 (< |ULTIMATE.start_main_~p~0#1| 0)) (.cse98 (= 0 (mod |ULTIMATE.start_main_~p~0#1| 2))) (.cse93 (+ |ULTIMATE.start_main_~r~0#1| .cse266)) (.cse296 (< |ULTIMATE.start_main_~d~0#1| 0)) (.cse299 (* .cse83 |ULTIMATE.start_main_~B~0#1|)) (.cse298 (* .cse100 |ULTIMATE.start_main_~B~0#1|)) (.cse84 (+ |ULTIMATE.start_main_~r~0#1| .cse270)) (.cse120 (+ 1 .cse119))) (let ((.cse149 (- .cse88)) (.cse130 (= 0 (mod .cse122 2))) (.cse282 (< .cse122 0)) (.cse86 (= 0 (mod .cse294 2))) (.cse283 (< .cse120 0)) (.cse284 (< .cse121 0)) (.cse134 (= 0 (mod .cse295 2))) (.cse79 (= 1 .cse122)) (.cse99 (= 1 .cse121)) (.cse150 (= |ULTIMATE.start_main_~A~0#1| (+ .cse298 .cse84))) (.cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse299 .cse84))) (.cse89 (not .cse296)) (.cse154 (= |ULTIMATE.start_main_~A~0#1| (+ .cse299 .cse93))) (.cse97 (and .cse297 (not .cse98))) (.cse152 (= |ULTIMATE.start_main_~A~0#1| (+ .cse298 .cse93))) (.cse101 (not .cse297)) (.cse90 (and .cse296 (not .cse81))) (.cse48 (= |ULTIMATE.start_main_~A~0#1| (+ (* |ULTIMATE.start_main_~d~0#1| |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse255 (not .cse116)) (.cse139 (+ |ULTIMATE.start_main_~r~0#1| .cse68)) (.cse140 (- .cse92)) (.cse96 (= 0 (mod .cse119 2))) (.cse285 (< .cse119 0)) (.cse160 (+ |ULTIMATE.start_main_~q~0#1| |ULTIMATE.start_main_~p~0#1|)) (.cse143 (* 2 |ULTIMATE.start_main_~d~0#1|)) (.cse142 (* 2 |ULTIMATE.start_main_~p~0#1|)) (.cse179 (div |ULTIMATE.start_main_~p~0#1| 8)) (.cse176 (= 0 (mod .cse258 2))) (.cse259 (+ 1 .cse258)) (.cse185 (div .cse286 2)) (.cse252 (div .cse291 2)) (.cse253 (div .cse295 4)) (.cse247 (div .cse294 4)) (.cse287 (< .cse88 0)) (.cse238 (= 0 (mod .cse88 2))) (.cse235 (= 0 (mod .cse293 2))) (.cse288 (< .cse82 0)) (.cse246 (div .cse293 2)) (.cse224 (div |ULTIMATE.start_main_~d~0#1| 8)) (.cse289 (< .cse92 0)) (.cse193 (= 0 (mod .cse92 2))) (.cse227 (div .cse292 2)) (.cse290 (< .cse95 0)) (.cse204 (= 0 (mod .cse292 2))) (.cse260 (+ 1 .cse261))) (let ((.cse74 (* 2 1)) (.cse38 (* 2 |ULTIMATE.start_main_~B~0#1|)) (.cse256 (< .cse261 0)) (.cse213 (= 0 (mod .cse261 2))) (.cse220 (= 0 (mod .cse291 2))) (.cse257 (< .cse260 0)) (.cse207 (and .cse290 (not .cse204))) (.cse206 (not .cse290)) (.cse225 (+ 1 .cse227)) (.cse192 (and .cse289 (not .cse193))) (.cse223 (+ 1 .cse224)) (.cse196 (not .cse289)) (.cse245 (+ 1 .cse246)) (.cse233 (not .cse288)) (.cse231 (and .cse288 (not .cse235))) (.cse242 (and .cse287 (not .cse238))) (.cse237 (not .cse287)) (.cse249 (+ 1 .cse247)) (.cse118 (* |ULTIMATE.start_main_~B~0#1| 1)) (.cse254 (+ 1 .cse253)) (.cse251 (+ 1 .cse252)) (.cse182 (+ 1 .cse185)) (.cse183 (= 0 (mod .cse286 2))) (.cse262 (< .cse259 0)) (.cse180 (not .cse176)) (.cse181 (< .cse258 0)) (.cse177 (+ 1 .cse179)) (.cse111 (div .cse142 4)) (.cse113 (div .cse143 4)) (.cse108 (+ |ULTIMATE.start_main_~q~0#1| .cse142)) (.cse112 (+ |ULTIMATE.start_main_~r~0#1| (- .cse143))) (.cse263 (* (+ .cse160 .cse121) |ULTIMATE.start_main_~B~0#1|)) (.cse265 (* (+ .cse160 .cse122) |ULTIMATE.start_main_~B~0#1|)) (.cse188 (= 1 .cse258)) (.cse201 (= 1 .cse259)) (.cse221 (= 1 .cse260)) (.cse210 (= 1 .cse261)) (.cse91 (and (not .cse96) .cse285)) (.cse94 (not .cse285)) (.cse141 (+ (- 1) .cse140)) (.cse11 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse160 |ULTIMATE.start_main_~B~0#1|) .cse139))) (.cse12 (or .cse48 .cse255)) (.cse27 (= |ULTIMATE.start_main_~r~0#1| |ULTIMATE.start_main_~A~0#1|)) (.cse72 (or (and (or .cse154 .cse97) (or .cse98 .cse152 .cse101)) .cse90)) (.cse66 (or (and (or .cse98 .cse150 .cse101) (or .cse155 .cse97)) .cse81 .cse89)) (.cse28 (= |ULTIMATE.start_main_~q~0#1| 0)) (.cse5 (= |ULTIMATE.start_main_~B~0#1| 1)) (.cse7 (= |ULTIMATE.start_main_~A~0#1| (+ (* |ULTIMATE.start_main_~q~0#1| |ULTIMATE.start_main_~B~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse8 (= |ULTIMATE.start_main_~d~0#1| (* |ULTIMATE.start_main_~B~0#1| |ULTIMATE.start_main_~p~0#1|))) (.cse267 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse120 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|)) .cse81 .cse89) (or .cse90 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse119 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))))) (.cse268 (and (or .cse97 (not .cse79)) (or .cse98 (not .cse99) .cse101))) (.cse138 (and .cse284 (not .cse134))) (.cse271 (* (+ .cse100 .cse261) |ULTIMATE.start_main_~B~0#1|)) (.cse273 (* (+ .cse100 .cse260) |ULTIMATE.start_main_~B~0#1|)) (.cse136 (not .cse284)) (.cse85 (not .cse283)) (.cse87 (and (not .cse86) .cse283)) (.cse131 (not .cse282)) (.cse275 (* (+ .cse83 .cse259) |ULTIMATE.start_main_~B~0#1|)) (.cse132 (and .cse282 (not .cse130))) (.cse276 (* (+ .cse83 .cse258) |ULTIMATE.start_main_~B~0#1|)) (.cse148 (+ (- 1) .cse149)) (.cse281 (div .cse68 (- 2)))) (let ((.cse70 (+ |ULTIMATE.start_main_~q~0#1| (* |ULTIMATE.start_main_~p~0#1| (- 1)))) (.cse59 (<= 2 .cse281)) (.cse61 (>= |ULTIMATE.start_main_~r~0#1| .cse281)) (.cse63 (= .cse280 0)) (.cse69 (or .cse81 (let ((.cse279 (+ .cse84 .cse148)) (.cse278 (+ .cse84 .cse149))) (and (or .cse98 (and (or .cse87 (and (or .cse138 (= |ULTIMATE.start_main_~A~0#1| (+ .cse271 .cse278))) (or .cse134 (= |ULTIMATE.start_main_~A~0#1| (+ .cse273 .cse278)) .cse136))) (or .cse85 .cse86 (and (or .cse138 (= |ULTIMATE.start_main_~A~0#1| (+ .cse271 .cse279))) (or .cse134 (= |ULTIMATE.start_main_~A~0#1| (+ .cse273 .cse279)) .cse136)))) .cse101) (or (and (or (and (or .cse132 (= |ULTIMATE.start_main_~A~0#1| (+ .cse276 .cse279))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse275 .cse279)) .cse130 .cse131)) .cse85 .cse86) (or .cse87 (and (or .cse130 .cse131 (= |ULTIMATE.start_main_~A~0#1| (+ .cse275 .cse278))) (or .cse132 (= |ULTIMATE.start_main_~A~0#1| (+ .cse276 .cse278)))))) .cse97))) .cse89)) (.cse60 (let ((.cse277 (or .cse267 .cse268))) (or (and .cse11 .cse277 .cse48 .cse27 .cse72 .cse66 .cse28 .cse5 .cse7 .cse8) (and .cse11 .cse12 .cse277 .cse27 .cse72 .cse66 .cse28 .cse5 .cse7 .cse8)))) (.cse52 (or (and (or .cse81 (= |ULTIMATE.start_main_~B~0#1| .cse120) .cse89) (or .cse90 (= |ULTIMATE.start_main_~B~0#1| .cse119))) .cse268)) (.cse73 (or .cse90 (let ((.cse272 (+ .cse93 .cse140)) (.cse274 (+ .cse93 .cse141))) (and (or .cse98 (and (or .cse91 (and (or .cse138 (= |ULTIMATE.start_main_~A~0#1| (+ .cse271 .cse272))) (or .cse134 .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse273 .cse272))))) (or .cse94 (and (or .cse134 (= |ULTIMATE.start_main_~A~0#1| (+ .cse273 .cse274)) .cse136) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse271 .cse274)) .cse138)) .cse96)) .cse101) (or .cse97 (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse275 .cse272)) .cse130 .cse131) (or .cse132 (= |ULTIMATE.start_main_~A~0#1| (+ .cse276 .cse272)))) .cse91) (or (and (or .cse130 .cse131 (= |ULTIMATE.start_main_~A~0#1| (+ .cse275 .cse274))) (or .cse132 (= |ULTIMATE.start_main_~A~0#1| (+ .cse276 .cse274)))) .cse94 .cse96))))))) (.cse102 (and (or .cse134 (not .cse221) .cse136) (or (not .cse210) .cse138))) (.cse80 (and (or .cse132 (not .cse188)) (or .cse130 .cse131 (not .cse201)))) (.cse123 (+ |ULTIMATE.start_main_~q~0#1| (* 2 .cse142))) (.cse124 (+ |ULTIMATE.start_main_~r~0#1| (- (* 2 .cse143)))) (.cse137 (* (+ .cse160 .cse261) |ULTIMATE.start_main_~B~0#1|)) (.cse135 (* (+ .cse160 .cse260) |ULTIMATE.start_main_~B~0#1|)) (.cse133 (* (+ .cse160 .cse258) |ULTIMATE.start_main_~B~0#1|)) (.cse126 (* (+ .cse160 .cse259) |ULTIMATE.start_main_~B~0#1|)) (.cse21 (not (>= |ULTIMATE.start_main_~r~0#1| |ULTIMATE.start_main_~d~0#1|))) (.cse56 (+ |ULTIMATE.start_main_~r~0#1| |ULTIMATE.start_main_~d~0#1|)) (.cse78 (or (and (or .cse81 .cse89 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse120 .cse160) .cse139))) (or .cse90 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse119 .cse160) .cse139)))) .cse116 .cse268)) (.cse9 (<= 2 |ULTIMATE.start_main_~d~0#1|)) (.cse65 (or (let ((.cse269 (+ .cse139 .cse270))) (and (or .cse98 (= |ULTIMATE.start_main_~A~0#1| (+ .cse263 .cse269)) .cse101) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse265 .cse269)) .cse97))) .cse81 .cse89)) (.cse19 (= |ULTIMATE.start_main_~A~0#1| (+ (* (+ .cse108 |ULTIMATE.start_main_~p~0#1|) |ULTIMATE.start_main_~B~0#1|) (+ .cse112 .cse68)))) (.cse77 (or .cse116 .cse267 .cse268)) (.cse71 (or .cse90 (let ((.cse264 (+ .cse139 .cse266))) (and (or .cse98 .cse101 (= |ULTIMATE.start_main_~A~0#1| (+ .cse263 .cse264))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse265 .cse264)) .cse97))))) (.cse13 (or .cse255 (= |ULTIMATE.start_main_~B~0#1| |ULTIMATE.start_main_~d~0#1|))) (.cse157 (>= |ULTIMATE.start_main_~r~0#1| .cse119)) (.cse156 (>= |ULTIMATE.start_main_~r~0#1| .cse120)) (.cse161 (* (+ |ULTIMATE.start_main_~q~0#1| .cse260) |ULTIMATE.start_main_~B~0#1|)) (.cse166 (* (+ |ULTIMATE.start_main_~q~0#1| .cse261) |ULTIMATE.start_main_~B~0#1|)) (.cse168 (* (+ |ULTIMATE.start_main_~q~0#1| .cse258) |ULTIMATE.start_main_~B~0#1|)) (.cse167 (* (+ |ULTIMATE.start_main_~q~0#1| .cse259) |ULTIMATE.start_main_~B~0#1|)) (.cse115 (+ 1 .cse113)) (.cse109 (+ 1 .cse111)) (.cse198 (* (+ .cse83 .cse177) |ULTIMATE.start_main_~B~0#1|)) (.cse178 (not .cse181)) (.cse197 (and .cse181 .cse180)) (.cse190 (* (+ .cse83 .cse179) |ULTIMATE.start_main_~B~0#1|)) (.cse200 (* (+ .cse83 .cse185) |ULTIMATE.start_main_~B~0#1|)) (.cse186 (and (not .cse183) .cse262)) (.cse184 (not .cse262)) (.cse199 (* (+ .cse83 .cse182) |ULTIMATE.start_main_~B~0#1|)) (.cse219 (* (+ .cse100 .cse251) |ULTIMATE.start_main_~B~0#1|)) (.cse216 (* (+ .cse100 .cse252) |ULTIMATE.start_main_~B~0#1|)) (.cse214 (* (+ .cse100 .cse254) |ULTIMATE.start_main_~B~0#1|)) (.cse211 (* (+ .cse100 .cse253) |ULTIMATE.start_main_~B~0#1|)) (.cse117 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse118 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse158 (and (or (and (or .cse132 (not (<= 1 .cse258))) (or .cse130 .cse131 (not (<= 1 .cse259)))) .cse97) (or .cse98 .cse101 (and (or (not (<= 1 .cse260)) .cse134 .cse136) (or .cse138 (not (<= 1 .cse261))))))) (.cse159 (and (or .cse81 (and (or .cse87 (not (= .cse118 .cse88))) (or .cse85 .cse86 (not (= .cse118 .cse82)))) .cse89) (or .cse90 (and (or .cse94 (not (= .cse118 .cse95)) .cse96) (or .cse91 (not (= .cse118 .cse92))))))) (.cse175 (and (or .cse85 .cse86 (and (or (not (= .cse118 .cse245)) .cse233 .cse235) (or .cse231 (not (= .cse118 .cse246))))) (or .cse87 (and (or (not (= .cse118 .cse247)) .cse242) (or .cse237 (not (= .cse118 .cse249)) .cse238))))) (.cse173 (and (or (and (or .cse207 (not (= .cse118 .cse227))) (or .cse204 .cse206 (not (= .cse118 .cse225)))) .cse94 .cse96) (or .cse91 (and (or .cse192 (not (= .cse118 .cse224))) (or .cse193 (not (= .cse118 .cse223)) .cse196))))) (.cse218 (not .cse257)) (.cse217 (and .cse257 (not .cse220))) (.cse212 (and .cse256 (not .cse213))) (.cse215 (not .cse256)) (.cse64 (* 2 .cse38)) (.cse62 (* 2 .cse74))) (let ((.cse10 (= |ULTIMATE.start_main_~d~0#1| .cse74)) (.cse16 (= |ULTIMATE.start_main_~p~0#1| .cse74)) (.cse18 (= |ULTIMATE.start_main_~d~0#1| .cse38)) (.cse23 (= (+ |ULTIMATE.start_main_~q~0#1| (* .cse62 (- 1))) 0)) (.cse24 (= (+ |ULTIMATE.start_main_~r~0#1| .cse64) |ULTIMATE.start_main_~A~0#1|)) (.cse6 (or .cse48 .cse255 (not .cse8))) (.cse46 (or .cse98 (let ((.cse250 (* .cse118 .cse100))) (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse250 .cse84)) .cse81 .cse175 .cse89) (or .cse173 .cse90 (= |ULTIMATE.start_main_~A~0#1| (+ .cse250 .cse93))))) .cse101 (and (or .cse134 .cse136 (and (or (not (<= 1 .cse251)) .cse218 .cse220) (or (not (<= 1 .cse252)) .cse217))) (or .cse138 (and (or .cse212 (not (<= 1 .cse253))) (or (not (<= 1 .cse254)) .cse213 .cse215)))))) (.cse3 (or .cse117 .cse158 .cse159)) (.cse43 (or (let ((.cse244 (- .cse246)) (.cse248 (- .cse247))) (let ((.cse243 (>= .cse84 .cse88)) (.cse236 (+ .cse84 (+ (- 1) .cse248))) (.cse239 (not (>= .cse84 .cse249))) (.cse241 (+ .cse84 .cse248)) (.cse240 (not (>= .cse84 .cse247))) (.cse229 (+ .cse84 .cse244)) (.cse230 (not (>= .cse84 .cse246))) (.cse232 (not (>= .cse84 .cse245))) (.cse234 (+ .cse84 (+ (- 1) .cse244))) (.cse228 (>= .cse84 .cse82))) (and (or (and (or .cse85 .cse86 .cse228 (and (or .cse188 .cse132 (and (or .cse176 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse198 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.cse176 .cse178))) (or .cse130 (and (or (and (or .cse189 (= |ULTIMATE.start_main_~A~0#1| (+ .cse199 .cse191)) .cse192) (or .cse193 .cse195 (= |ULTIMATE.start_main_~A~0#1| (+ .cse199 .cse194)) .cse196)) .cse184 .cse183) (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse200 .cse194)) .cse193 .cse195 .cse196) (or .cse189 (= |ULTIMATE.start_main_~A~0#1| (+ .cse200 .cse191)) .cse192)) .cse186)) .cse131 .cse201))) (or .cse202 .cse94 .cse96 (and (or (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse190 .cse203)) .cse204 .cse205 .cse206) (or .cse207 .cse208 (= |ULTIMATE.start_main_~A~0#1| (+ .cse190 .cse209)))) .cse197) (or (and (or .cse207 .cse208 (= |ULTIMATE.start_main_~A~0#1| (+ .cse198 .cse209))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse198 .cse203)) .cse204 .cse205 .cse206)) .cse176 .cse178)) .cse188 .cse132) (or .cse130 .cse131 (and (or (and (or .cse207 .cse208 (= |ULTIMATE.start_main_~A~0#1| (+ .cse199 .cse209))) (or .cse204 .cse205 .cse206 (= |ULTIMATE.start_main_~A~0#1| (+ .cse199 .cse203)))) .cse184 .cse183) (or (and (or .cse207 .cse208 (= |ULTIMATE.start_main_~A~0#1| (+ .cse200 .cse209))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse200 .cse203)) .cse204 .cse205 .cse206)) .cse186)) .cse201))))) (or .cse98 .cse101 (and (or .cse202 .cse94 (and (or .cse210 .cse138 (and (or (and (or .cse207 (= |ULTIMATE.start_main_~A~0#1| (+ .cse211 .cse209)) .cse208) (or .cse204 .cse205 (= |ULTIMATE.start_main_~A~0#1| (+ .cse211 .cse203)) .cse206)) .cse212) (or .cse213 (and (or .cse207 .cse208 (= |ULTIMATE.start_main_~A~0#1| (+ .cse214 .cse209))) (or .cse204 .cse205 .cse206 (= |ULTIMATE.start_main_~A~0#1| (+ .cse214 .cse203)))) .cse215))) (or (and (or (and (or .cse207 .cse208 (= |ULTIMATE.start_main_~A~0#1| (+ .cse216 .cse209))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse216 .cse203)) .cse204 .cse205 .cse206)) .cse217) (or .cse218 (and (or .cse207 .cse208 (= |ULTIMATE.start_main_~A~0#1| (+ .cse219 .cse209))) (or .cse204 (= |ULTIMATE.start_main_~A~0#1| (+ .cse219 .cse203)) .cse205 .cse206)) .cse220)) .cse134 .cse221 .cse136)) .cse96) (or .cse91 .cse187 (and (or .cse210 (and (or .cse212 (and (or .cse193 (= |ULTIMATE.start_main_~A~0#1| (+ .cse211 .cse194)) .cse195 .cse196) (or .cse189 (= |ULTIMATE.start_main_~A~0#1| (+ .cse211 .cse191)) .cse192))) (or .cse213 (and (or .cse189 (= |ULTIMATE.start_main_~A~0#1| (+ .cse214 .cse191)) .cse192) (or .cse193 (= |ULTIMATE.start_main_~A~0#1| (+ .cse214 .cse194)) .cse195 .cse196)) .cse215)) .cse138) (or .cse134 .cse221 (and (or .cse218 (and (or .cse189 (= |ULTIMATE.start_main_~A~0#1| (+ .cse219 .cse191)) .cse192) (or .cse193 .cse195 (= |ULTIMATE.start_main_~A~0#1| (+ .cse219 .cse194)) .cse196)) .cse220) (or (and (or .cse189 (= |ULTIMATE.start_main_~A~0#1| (+ .cse216 .cse191)) .cse192) (or .cse193 .cse195 (= |ULTIMATE.start_main_~A~0#1| (+ .cse216 .cse194)) .cse196)) .cse217)) .cse136)))))))))) (.cse50 (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse118 .cse108) .cse112)) (and (or .cse90 (not (= .cse118 .cse113))) (or .cse81 .cse89 (not (= .cse118 .cse115)))) (and (or .cse98 .cse101 (not (<= 1 .cse109))) (or (not (<= 1 .cse111)) .cse97)))) (.cse51 (or (let ((.cse174 (* .cse118 .cse83))) (and (or .cse173 (= |ULTIMATE.start_main_~A~0#1| (+ .cse174 .cse93)) .cse90) (or .cse81 (= |ULTIMATE.start_main_~A~0#1| (+ .cse174 .cse84)) .cse175 .cse89))) .cse97 (and (or .cse132 (and (or .cse176 (not (<= 1 .cse177)) .cse178) (or (not (<= 1 .cse179)) (and .cse180 .cse181)))) (or .cse130 .cse131 (and (or (not (<= 1 .cse182)) .cse183 .cse184) (or (not (<= 1 .cse185)) .cse186)))))) (.cse20 (+ 0 .cse62)) (.cse0 (or .cse81 .cse156 .cse89 (let ((.cse169 (+ |ULTIMATE.start_main_~r~0#1| .cse149)) (.cse170 (not (>= |ULTIMATE.start_main_~r~0#1| .cse88))) (.cse172 (+ |ULTIMATE.start_main_~r~0#1| .cse148)) (.cse171 (not (>= |ULTIMATE.start_main_~r~0#1| .cse82)))) (and (or .cse98 (and (or (and (or .cse87 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse169)) .cse170) (or .cse85 .cse86 .cse171 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse172)))) .cse134 .cse136) (or (and (or .cse87 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse169)) .cse170) (or .cse85 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse172)) .cse86 .cse171)) .cse138)) .cse99 .cse101) (or .cse79 (and (or (and (or .cse87 (= |ULTIMATE.start_main_~A~0#1| (+ .cse168 .cse169)) .cse170) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse168 .cse172)) .cse85 .cse86 .cse171)) .cse132) (or .cse130 .cse131 (and (or .cse87 (= |ULTIMATE.start_main_~A~0#1| (+ .cse167 .cse169)) .cse170) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse167 .cse172)) .cse85 .cse86 .cse171)))) .cse97))))) (.cse1 (or .cse90 .cse157 (let ((.cse164 (not (>= |ULTIMATE.start_main_~r~0#1| .cse95))) (.cse165 (+ |ULTIMATE.start_main_~r~0#1| .cse141)) (.cse162 (+ |ULTIMATE.start_main_~r~0#1| .cse140)) (.cse163 (not (>= |ULTIMATE.start_main_~r~0#1| .cse92)))) (and (or .cse98 .cse99 .cse101 (and (or .cse134 .cse136 (and (or .cse91 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse162)) .cse163) (or .cse164 .cse94 .cse96 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse165))))) (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse165)) .cse164 .cse94 .cse96) (or .cse91 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse162)) .cse163)) .cse138))) (or .cse79 .cse97 (and (or .cse130 (and (or .cse91 .cse163 (= |ULTIMATE.start_main_~A~0#1| (+ .cse167 .cse162))) (or .cse164 (= |ULTIMATE.start_main_~A~0#1| (+ .cse167 .cse165)) .cse94 .cse96)) .cse131) (or .cse132 (and (or .cse164 .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse168 .cse165)) .cse96) (or .cse91 (= |ULTIMATE.start_main_~A~0#1| (+ .cse168 .cse162)) .cse163))))))))) (.cse25 (+ |ULTIMATE.start_main_~A~0#1| (- .cse64))) (.cse22 (* |ULTIMATE.start_main_~B~0#1| 2)) (.cse53 (or (and .cse9 .cse65 .cse11 .cse12 .cse19 .cse78 .cse77 .cse71 .cse72 .cse66 .cse13 .cse7) (and .cse9 .cse65 .cse11 .cse12 .cse19 .cse77 .cse71 .cse72 .cse66 .cse13 .cse7))) (.cse17 (= .cse56 |ULTIMATE.start_main_~A~0#1|)) (.cse47 (or .cse158 .cse159 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse118 .cse160) .cse139)))) (.cse31 (or .cse116 (let ((.cse153 (not .cse157)) (.cse151 (not .cse156))) (and (or .cse98 (and (or .cse150 .cse81 .cse151 .cse89) (or .cse152 .cse90 .cse153)) .cse101) (or .cse97 (and (or .cse154 .cse90 .cse153) (or .cse155 .cse81 .cse151 .cse89))))))) (.cse2 (or .cse11 .cse21)) (.cse34 (or (>= .cse139 .cse120) .cse81 .cse89 (let ((.cse146 (+ .cse139 .cse149)) (.cse147 (not (>= .cse139 .cse88))) (.cse144 (+ .cse139 .cse148)) (.cse145 (not (>= .cse139 .cse82)))) (and (or .cse98 (and (or .cse138 (and (or .cse85 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse144)) .cse86 .cse145) (or .cse87 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse146)) .cse147))) (or .cse134 .cse136 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse135 .cse146)) .cse87 .cse147) (or .cse85 (= |ULTIMATE.start_main_~A~0#1| (+ .cse135 .cse144)) .cse86 .cse145)))) .cse99 .cse101) (or .cse79 (and (or .cse132 (and (or .cse85 .cse86 .cse145 (= |ULTIMATE.start_main_~A~0#1| (+ .cse133 .cse144))) (or .cse87 (= |ULTIMATE.start_main_~A~0#1| (+ .cse133 .cse146)) .cse147))) (or (and (or .cse87 (= |ULTIMATE.start_main_~A~0#1| (+ .cse126 .cse146)) .cse147) (or .cse85 (= |ULTIMATE.start_main_~A~0#1| (+ .cse126 .cse144)) .cse86 .cse145)) .cse130 .cse131)) .cse97))))) (.cse4 (or (= 1 .cse142) (= |ULTIMATE.start_main_~A~0#1| (+ (* (+ .cse123 |ULTIMATE.start_main_~p~0#1|) |ULTIMATE.start_main_~B~0#1|) (+ .cse124 .cse68))) (not (>= .cse124 |ULTIMATE.start_main_~d~0#1|)) (>= .cse124 .cse143))) (.cse26 (or .cse7 (and (<= 1 |ULTIMATE.start_main_~d~0#1|) .cse7))) (.cse32 (or .cse90 (let ((.cse125 (not (>= .cse139 .cse95))) (.cse127 (+ .cse139 .cse141)) (.cse128 (not (>= .cse139 .cse92))) (.cse129 (+ .cse139 .cse140))) (and (or .cse79 (and (or (and (or .cse94 .cse125 .cse96 (= |ULTIMATE.start_main_~A~0#1| (+ .cse126 .cse127))) (or .cse91 .cse128 (= |ULTIMATE.start_main_~A~0#1| (+ .cse126 .cse129)))) .cse130 .cse131) (or .cse132 (and (or .cse91 .cse128 (= |ULTIMATE.start_main_~A~0#1| (+ .cse133 .cse129))) (or .cse94 .cse125 (= |ULTIMATE.start_main_~A~0#1| (+ .cse133 .cse127)) .cse96)))) .cse97) (or .cse98 .cse99 (and (or .cse134 (and (or .cse91 (= |ULTIMATE.start_main_~A~0#1| (+ .cse135 .cse129)) .cse128) (or .cse94 .cse125 (= |ULTIMATE.start_main_~A~0#1| (+ .cse135 .cse127)) .cse96)) .cse136) (or (and (or .cse94 .cse125 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse127)) .cse96) (or .cse91 .cse128 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse129)))) .cse138)) .cse101))) (>= .cse139 .cse119))) (.cse33 (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse118 .cse123) .cse124)) (not (= .cse118 |ULTIMATE.start_main_~d~0#1|)) (not (<= 1 |ULTIMATE.start_main_~p~0#1|)))) (.cse35 (or .cse117 (and (or (not (= .cse118 .cse119)) .cse90) (or .cse81 (not (= .cse118 .cse120)) .cse89)) (and (or (not (<= 1 .cse121)) .cse98 .cse101) (or (not (<= 1 .cse122)) .cse97)))) (.cse36 (or (let ((.cse114 (- .cse113))) (let ((.cse105 (+ .cse112 (+ (- 1) .cse114))) (.cse103 (not (>= .cse112 .cse115))) (.cse107 (+ .cse112 .cse114)) (.cse106 (not (>= .cse112 .cse113)))) (and (or .cse98 (let ((.cse104 (* (+ .cse108 .cse109) |ULTIMATE.start_main_~B~0#1|))) (and (or .cse81 .cse103 (= |ULTIMATE.start_main_~A~0#1| (+ .cse104 .cse105)) .cse89) (or .cse90 .cse106 (= |ULTIMATE.start_main_~A~0#1| (+ .cse104 .cse107))))) .cse101) (or (let ((.cse110 (* (+ .cse108 .cse111) |ULTIMATE.start_main_~B~0#1|))) (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse110 .cse105)) .cse81 .cse103 .cse89) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse110 .cse107)) .cse90 .cse106))) .cse97)))) (>= .cse112 |ULTIMATE.start_main_~d~0#1|) .cse116)) (.cse57 (= |ULTIMATE.start_main_~d~0#1| .cse64)) (.cse58 (= |ULTIMATE.start_main_~p~0#1| .cse62)) (.cse44 (or (and (or .cse90 (and (or .cse94 .cse96 (= |ULTIMATE.start_main_~B~0#1| .cse95)) (or .cse91 (= |ULTIMATE.start_main_~B~0#1| .cse92)))) (or .cse81 (and (or .cse87 (= |ULTIMATE.start_main_~B~0#1| .cse88)) (or (= |ULTIMATE.start_main_~B~0#1| .cse82) .cse85 .cse86)) .cse89)) (and (or .cse98 .cse101 .cse102) (or .cse80 .cse97)))) (.cse45 (let ((.cse75 (or .cse98 .cse99 (and (or .cse90 (and (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse95 .cse100) .cse93)) .cse96) (or .cse91 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse92 .cse100) .cse93))))) (or .cse81 (and (or .cse85 .cse86 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse82 .cse100) .cse84))) (or .cse87 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse88 .cse100) .cse84)))) .cse89)) .cse101 .cse102)) (.cse76 (or .cse79 .cse80 (and (or .cse81 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse82 .cse83) .cse84)) .cse85 .cse86) (or .cse87 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse88 .cse83) .cse84)))) .cse89) (or .cse90 (and (or .cse91 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse92 .cse83) .cse93))) (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse95 .cse83) .cse93)) .cse96)))) .cse97))) (or (and .cse65 .cse75 .cse59 .cse61 .cse19 .cse76 .cse77 .cse48 .cse66 .cse63 .cse7 .cse69 .cse11 .cse60 .cse52 .cse78 .cse71 .cse72 .cse13 .cse73) (and .cse65 .cse75 .cse59 .cse61 .cse19 .cse76 .cse77 .cse66 .cse63 .cse7 .cse69 .cse11 .cse12 .cse60 .cse52 .cse78 .cse71 .cse72 .cse13 .cse73)))) (.cse42 (* .cse74 (- 1))) (.cse29 (= |ULTIMATE.start_main_~p~0#1| 1)) (.cse30 (= |ULTIMATE.start_main_~d~0#1| |ULTIMATE.start_main_~B~0#1|)) (.cse55 (- |ULTIMATE.start_main_~B~0#1|)) (.cse15 (= |ULTIMATE.start_main_~r~0#1| (+ |ULTIMATE.start_main_~A~0#1| .cse68))) (.cse14 (= .cse70 0)) (.cse67 (= |ULTIMATE.start_main_~d~0#1| 1))) (or (and .cse0 .cse1 .cse2 .cse3 .cse4 .cse5 .cse6 .cse7 .cse8) (and .cse9 .cse10 .cse11 .cse12 .cse13 .cse14 .cse15 .cse5 .cse16 .cse7 .cse17 .cse18) (and .cse19 (= |ULTIMATE.start_main_~p~0#1| 2) .cse5 (= |ULTIMATE.start_main_~q~0#1| .cse20) .cse21 (= |ULTIMATE.start_main_~d~0#1| .cse22) .cse7 .cse11 .cse12 .cse23 .cse24 .cse13 (= |ULTIMATE.start_main_~r~0#1| .cse25) .cse26 .cse8) (and .cse10 .cse27 .cse28 .cse5 .cse16 .cse8 .cse18) (and .cse29 .cse27 .cse30 .cse28 .cse5) (and .cse31 .cse19 .cse4 .cse5 .cse32 .cse33 .cse7 .cse11 .cse12 .cse2 .cse34 .cse13 .cse26 .cse8 .cse35 .cse36) (and .cse23 .cse29 .cse30 .cse24 (not (>= |ULTIMATE.start_main_~r~0#1| .cse22)) .cse5 .cse26 .cse7) (and .cse27 .cse29 .cse30 .cse28 .cse5) (let ((.cse37 (+ |ULTIMATE.start_main_~A~0#1| (* |ULTIMATE.start_main_~r~0#1| (- 1))))) (and (= .cse37 .cse38) .cse29 .cse5 .cse26 (let ((.cse41 (= 0 (mod (+ |ULTIMATE.start_main_~A~0#1| |ULTIMATE.start_main_~r~0#1|) 2))) (.cse39 (div (+ |ULTIMATE.start_main_~A~0#1| (- |ULTIMATE.start_main_~r~0#1|)) 2)) (.cse40 (< .cse37 0))) (or (and (= |ULTIMATE.start_main_~d~0#1| .cse39) (or (not .cse40) .cse41)) (and (not .cse41) (= |ULTIMATE.start_main_~d~0#1| (+ 1 .cse39)) .cse40))) (= (+ |ULTIMATE.start_main_~q~0#1| .cse42) 0))) (and .cse5 .cse6 .cse7 .cse8) (and .cse27 (or (and .cse3 .cse43 .cse44 .cse4 .cse32 .cse33 .cse45 .cse1 .cse34 .cse36 .cse31 .cse46 .cse47 .cse48 .cse27 .cse49 .cse5 .cse50 .cse51 .cse7 .cse0 .cse2 .cse52 .cse13 .cse8 .cse35) (and .cse3 .cse43 .cse44 .cse4 .cse32 .cse33 .cse45 .cse1 .cse12 .cse34 .cse36 .cse31 .cse46 .cse47 .cse27 .cse49 .cse5 .cse50 .cse51 .cse7 .cse0 .cse2 .cse52 .cse13 .cse8 .cse35)) .cse5 .cse7 .cse8) (and .cse2 .cse34 .cse4 .cse5 .cse26 .cse32 .cse33 .cse7 .cse8 .cse35 .cse36) (and .cse11 .cse12 .cse19 .cse13 .cse5 .cse6 .cse7 .cse8) (and .cse2 .cse4 .cse5 .cse6 .cse7 .cse8) (and .cse0 .cse1 .cse2 .cse52 .cse3 .cse13 .cse4 .cse5 .cse6 .cse7 .cse53 .cse8) (and .cse31 .cse46 .cse19 .cse3 .cse47 .cse43 .cse4 .cse49 .cse5 .cse32 .cse50 .cse51 .cse33 .cse7 .cse0 .cse1 .cse11 .cse12 .cse2 .cse34 .cse13 .cse8 .cse35 .cse36) (let ((.cse54 (+ |ULTIMATE.start_main_~A~0#1| (* |ULTIMATE.start_main_~B~0#1| (- 4))))) (and .cse31 (>= .cse54 |ULTIMATE.start_main_~B~0#1|) (= |ULTIMATE.start_main_~r~0#1| (+ .cse54 .cse55)) .cse5 (= |ULTIMATE.start_main_~q~0#1| (+ .cse20 |ULTIMATE.start_main_~p~0#1|)) .cse0 .cse1 .cse2 (= .cse56 .cse25) (<= |ULTIMATE.start_main_~p~0#1| 1) .cse30 (= (+ |ULTIMATE.start_main_~q~0#1| (- 4)) 1) (not (>= .cse54 .cse22)) .cse8)) (and (= |ULTIMATE.start_main_~q~0#1| (+ 0 |ULTIMATE.start_main_~p~0#1|)) .cse57 .cse52 .cse13 .cse14 .cse5 .cse15 .cse7 .cse53 .cse17 .cse8 .cse58) (and (or (and .cse31 .cse47 .cse4 .cse5 .cse32 .cse33 .cse7 .cse2 .cse34 .cse26 .cse8 .cse35 .cse36) (and .cse31 .cse2 .cse34 .cse4 .cse5 .cse26 .cse32 .cse33 .cse7 .cse8 .cse35 .cse36)) .cse5 .cse7 .cse8) (and .cse57 .cse59 .cse60 .cse52 .cse61 .cse27 .cse13 .cse28 .cse5 (= |ULTIMATE.start_main_~d~0#1| .cse62) .cse63 .cse58) (and .cse52 .cse27 (= |ULTIMATE.start_main_~d~0#1| (* 2 .cse64)) .cse44 .cse13 .cse28 .cse5 .cse7 .cse45 .cse8 (= |ULTIMATE.start_main_~p~0#1| (* 2 .cse62))) (and .cse65 .cse19 .cse29 .cse66 .cse5 (= |ULTIMATE.start_main_~r~0#1| (+ (+ |ULTIMATE.start_main_~A~0#1| (* |ULTIMATE.start_main_~B~0#1| (- 2))) .cse55)) .cse67 (= |ULTIMATE.start_main_~r~0#1| (+ (+ |ULTIMATE.start_main_~A~0#1| (- 2)) .cse68)) .cse69 .cse11 (= (+ .cse70 .cse42) 0) .cse71 .cse72 .cse30 .cse73 (= (+ |ULTIMATE.start_main_~q~0#1| (- 2)) 1)) (and .cse11 .cse72 .cse29 .cse66 .cse30 (= |ULTIMATE.start_main_~r~0#1| (+ |ULTIMATE.start_main_~A~0#1| .cse55)) .cse5 .cse15 .cse14 (= (+ |ULTIMATE.start_main_~q~0#1| (* 1 (- 1))) 0) .cse67)))))))))) [2023-02-18 18:27:03,353 INFO L899 garLoopResultBuilder]: For program point L11(lines 11 13) no Hoare annotation was computed. [2023-02-18 18:27:03,356 INFO L895 garLoopResultBuilder]: At program point L44-1(lines 44 56) the Hoare annotation is: (let ((.cse71 (div |ULTIMATE.start_main_~d~0#1| 2)) (.cse74 (div |ULTIMATE.start_main_~p~0#1| 2))) (let ((.cse73 (+ 1 .cse74)) (.cse247 (- .cse71))) (let ((.cse251 (+ (- 1) .cse247)) (.cse23 (+ |ULTIMATE.start_main_~q~0#1| .cse73)) (.cse53 (+ |ULTIMATE.start_main_~q~0#1| .cse74))) (let ((.cse126 (- |ULTIMATE.start_main_~d~0#1|)) (.cse16 (= 0 (mod |ULTIMATE.start_main_~d~0#1| 2))) (.cse275 (< |ULTIMATE.start_main_~p~0#1| 0)) (.cse13 (= 0 (mod |ULTIMATE.start_main_~p~0#1| 2))) (.cse21 (+ |ULTIMATE.start_main_~r~0#1| .cse247)) (.cse274 (< |ULTIMATE.start_main_~d~0#1| 0)) (.cse277 (* .cse53 |ULTIMATE.start_main_~B~0#1|)) (.cse276 (* .cse23 |ULTIMATE.start_main_~B~0#1|)) (.cse15 (+ |ULTIMATE.start_main_~r~0#1| .cse251)) (.cse269 (+ .cse74 1))) (let ((.cse265 (+ .cse71 1)) (.cse108 (div .cse269 2)) (.cse105 (div |ULTIMATE.start_main_~p~0#1| 4)) (.cse199 (= 1 .cse74)) (.cse192 (= 1 .cse73)) (.cse72 (+ 1 .cse71)) (.cse213 (= |ULTIMATE.start_main_~A~0#1| (+ .cse276 .cse15))) (.cse218 (= |ULTIMATE.start_main_~A~0#1| (+ .cse277 .cse15))) (.cse18 (not .cse274)) (.cse217 (= |ULTIMATE.start_main_~A~0#1| (+ .cse277 .cse21))) (.cse51 (and .cse275 (not .cse13))) (.cse215 (= |ULTIMATE.start_main_~A~0#1| (+ .cse276 .cse21))) (.cse24 (not .cse275)) (.cse20 (and .cse274 (not .cse16))) (.cse41 (+ |ULTIMATE.start_main_~q~0#1| |ULTIMATE.start_main_~p~0#1|)) (.cse42 (+ |ULTIMATE.start_main_~r~0#1| .cse126)) (.cse190 (= 1 |ULTIMATE.start_main_~p~0#1|))) (let ((.cse252 (not (= 0 |ULTIMATE.start_main_~q~0#1|))) (.cse43 (= |ULTIMATE.start_main_~A~0#1| (+ (* |ULTIMATE.start_main_~d~0#1| |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse253 (not .cse190)) (.cse141 (- |ULTIMATE.start_main_~B~0#1|)) (.cse8 (= |ULTIMATE.start_main_~B~0#1| 1)) (.cse131 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse41 |ULTIMATE.start_main_~B~0#1|) .cse42))) (.cse132 (or (and (or .cse217 .cse51) (or .cse13 .cse215 .cse24)) .cse20)) (.cse133 (or (and (or .cse13 .cse213 .cse24) (or .cse218 .cse51)) .cse16 .cse18)) (.cse134 (= |ULTIMATE.start_main_~A~0#1| (+ (* |ULTIMATE.start_main_~q~0#1| |ULTIMATE.start_main_~B~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse70 (= |ULTIMATE.start_main_~d~0#1| (* |ULTIMATE.start_main_~B~0#1| |ULTIMATE.start_main_~p~0#1|))) (.cse256 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse72 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|)) .cse16 .cse18) (or .cse20 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse71 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))))) (.cse232 (and (or .cse51 (not .cse199)) (or .cse13 (not .cse192) .cse24))) (.cse106 (+ 1 .cse105)) (.cse272 (< .cse74 0)) (.cse61 (= 0 (mod .cse74 2))) (.cse25 (= 0 (mod .cse269 2))) (.cse273 (< .cse73 0)) (.cse107 (+ 1 .cse108)) (.cse104 (div |ULTIMATE.start_main_~d~0#1| 4)) (.cse101 (div .cse265 2))) (let ((.cse102 (+ 1 .cse101)) (.cse264 (+ .cse101 1)) (.cse103 (+ 1 .cse104)) (.cse267 (+ .cse104 1)) (.cse268 (+ .cse108 1)) (.cse266 (+ .cse105 1)) (.cse161 (= 1 .cse107)) (.cse26 (not .cse273)) (.cse164 (= 1 .cse108)) (.cse32 (and .cse273 (not .cse25))) (.cse76 (= 0 (mod .cse265 2))) (.cse270 (< .cse72 0)) (.cse94 (= 0 (mod .cse71 2))) (.cse271 (< .cse71 0)) (.cse54 (and .cse272 (not .cse61))) (.cse145 (= 1 .cse105)) (.cse62 (not .cse272)) (.cse155 (= 1 .cse106)) (.cse210 (- .cse101)) (.cse202 (- .cse104)) (.cse127 (or .cse256 .cse232)) (.cse0 (or (and (or .cse16 (= |ULTIMATE.start_main_~B~0#1| .cse72) .cse18) (or .cse20 (= |ULTIMATE.start_main_~B~0#1| .cse71))) .cse232)) (.cse129 (or (and .cse131 .cse132 .cse133 (= |ULTIMATE.start_main_~r~0#1| (+ |ULTIMATE.start_main_~A~0#1| .cse141)) .cse8 .cse134 (= (+ |ULTIMATE.start_main_~q~0#1| (* 1 (- 1))) 0) .cse70) (and .cse131 .cse134 .cse70) (and .cse131 .cse132 .cse133 .cse134 .cse70))) (.cse130 (or .cse252 .cse43 .cse253)) (.cse231 (* 2 |ULTIMATE.start_main_~p~0#1|)) (.cse212 (* 2 |ULTIMATE.start_main_~d~0#1|))) (let ((.cse116 (- (* 2 .cse212))) (.cse47 (div .cse212 4)) (.cse50 (div .cse231 4)) (.cse4 (or (and .cse127 .cse0 .cse129 .cse130) (and .cse127 .cse0 .cse129 (<= 1 |ULTIMATE.start_main_~d~0#1|) .cse130))) (.cse203 (+ (- 1) .cse202)) (.cse209 (+ (- 1) .cse210)) (.cse211 (= 1 .cse231)) (.cse45 (+ |ULTIMATE.start_main_~q~0#1| .cse231)) (.cse46 (+ |ULTIMATE.start_main_~r~0#1| (- .cse212))) (.cse255 (and (or .cse54 (not .cse145)) (or .cse61 .cse62 (not .cse155)))) (.cse93 (not .cse271)) (.cse95 (and (not .cse94) .cse271)) (.cse75 (not .cse270)) (.cse82 (and (not .cse76) .cse270)) (.cse254 (and (or .cse25 (not .cse161) .cse26) (or (not .cse164) .cse32))) (.cse55 (= 0 (mod .cse105 2))) (.cse58 (div |ULTIMATE.start_main_~p~0#1| 8)) (.cse66 (div .cse266 2)) (.cse34 (div .cse269 4)) (.cse30 (div .cse268 2)) (.cse89 (div .cse267 2)) (.cse97 (div |ULTIMATE.start_main_~d~0#1| 8)) (.cse29 (= 0 (mod .cse268 2))) (.cse258 (< .cse104 0)) (.cse98 (= 0 (mod .cse104 2))) (.cse257 (< .cse107 0)) (.cse259 (< .cse108 0)) (.cse36 (= 0 (mod .cse108 2))) (.cse260 (< .cse103 0)) (.cse90 (= 0 (mod .cse267 2))) (.cse64 (= 0 (mod .cse266 2))) (.cse261 (< .cse106 0)) (.cse60 (< .cse105 0)) (.cse83 (div .cse265 4)) (.cse81 (div .cse264 2)) (.cse262 (< .cse102 0)) (.cse79 (= 0 (mod .cse264 2))) (.cse87 (= 0 (mod .cse101 2))) (.cse263 (< .cse101 0)) (.cse135 (* 2 1))) (let ((.cse12 (* .cse135 (- 1))) (.cse7 (= |ULTIMATE.start_main_~p~0#1| 1)) (.cse125 (+ |ULTIMATE.start_main_~q~0#1| (* |ULTIMATE.start_main_~p~0#1| (- 1)))) (.cse117 (= |ULTIMATE.start_main_~d~0#1| 1)) (.cse109 (= |ULTIMATE.start_main_~r~0#1| |ULTIMATE.start_main_~A~0#1|)) (.cse111 (= |ULTIMATE.start_main_~q~0#1| 0)) (.cse6 (* 2 |ULTIMATE.start_main_~B~0#1|)) (.cse121 (* |ULTIMATE.start_main_~B~0#1| 2)) (.cse85 (not .cse263)) (.cse84 (and .cse263 (not .cse87))) (.cse80 (and .cse262 (not .cse79))) (.cse78 (not .cse262)) (.cse77 (+ 1 .cse81)) (.cse86 (+ 1 .cse83)) (.cse57 (not .cse60)) (.cse65 (not .cse261)) (.cse67 (and (not .cse64) .cse261)) (.cse88 (and .cse260 (not .cse90))) (.cse91 (not .cse260)) (.cse33 (and .cse259 (not .cse36))) (.cse37 (not .cse259)) (.cse28 (not .cse257)) (.cse96 (and .cse258 (not .cse98))) (.cse100 (not .cse258)) (.cse31 (and .cse257 (not .cse29))) (.cse99 (+ 1 .cse97)) (.cse92 (+ 1 .cse89)) (.cse27 (+ 1 .cse30)) (.cse35 (+ 1 .cse34)) (.cse63 (+ 1 .cse66)) (.cse56 (+ 1 .cse58)) (.cse59 (not .cse55)) (.cse118 (or .cse13 .cse192 (and (or .cse20 (and (or .cse93 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse103 .cse23) .cse21)) .cse94) (or .cse95 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse104 .cse23) .cse21))))) (or .cse16 (and (or .cse75 .cse76 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse102 .cse23) .cse15))) (or .cse82 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse101 .cse23) .cse15)))) .cse18)) .cse24 .cse254)) (.cse119 (or .cse199 .cse255 (and (or .cse16 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse102 .cse53) .cse15)) .cse75 .cse76) (or .cse82 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse101 .cse53) .cse15)))) .cse18) (or .cse20 (and (or .cse95 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse104 .cse53) .cse21))) (or .cse93 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse103 .cse53) .cse21)) .cse94)))) .cse51)) (.cse120 (or .cse190 .cse256 .cse232)) (.cse2 (or (and (or .cse20 (and (or .cse93 .cse94 (= |ULTIMATE.start_main_~B~0#1| .cse103)) (or .cse95 (= |ULTIMATE.start_main_~B~0#1| .cse104)))) (or .cse16 (and (or .cse82 (= |ULTIMATE.start_main_~B~0#1| .cse101)) (or (= |ULTIMATE.start_main_~B~0#1| .cse102) .cse75 .cse76)) .cse18)) (and (or .cse13 .cse24 .cse254) (or .cse255 .cse51)))) (.cse3 (= |ULTIMATE.start_main_~B~0#1| |ULTIMATE.start_main_~d~0#1|)) (.cse122 (or .cse252 .cse211 .cse253 (= |ULTIMATE.start_main_~A~0#1| (+ (* |ULTIMATE.start_main_~d~0#1| .cse45) .cse46)))) (.cse123 (let ((.cse238 (* (+ .cse23 .cse108) |ULTIMATE.start_main_~B~0#1|)) (.cse240 (* (+ .cse23 .cse107) |ULTIMATE.start_main_~B~0#1|)) (.cse242 (* (+ .cse53 .cse106) |ULTIMATE.start_main_~B~0#1|)) (.cse243 (* (+ .cse53 .cse105) |ULTIMATE.start_main_~B~0#1|)) (.cse244 (* (+ .cse41 .cse73) |ULTIMATE.start_main_~B~0#1|)) (.cse246 (* (+ .cse41 .cse74) |ULTIMATE.start_main_~B~0#1|))) (let ((.cse233 (or (let ((.cse250 (+ .cse42 .cse251))) (and (or .cse13 (= |ULTIMATE.start_main_~A~0#1| (+ .cse244 .cse250)) .cse24) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse246 .cse250)) .cse51))) .cse16 .cse18)) (.cse234 (or .cse16 (let ((.cse249 (+ .cse15 .cse209)) (.cse248 (+ .cse15 .cse210))) (and (or .cse13 (and (or .cse82 (and (or .cse32 (= |ULTIMATE.start_main_~A~0#1| (+ .cse238 .cse248))) (or .cse25 (= |ULTIMATE.start_main_~A~0#1| (+ .cse240 .cse248)) .cse26))) (or .cse75 .cse76 (and (or .cse32 (= |ULTIMATE.start_main_~A~0#1| (+ .cse238 .cse249))) (or .cse25 (= |ULTIMATE.start_main_~A~0#1| (+ .cse240 .cse249)) .cse26)))) .cse24) (or (and (or (and (or .cse54 (= |ULTIMATE.start_main_~A~0#1| (+ .cse243 .cse249))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse242 .cse249)) .cse61 .cse62)) .cse75 .cse76) (or .cse82 (and (or .cse61 .cse62 (= |ULTIMATE.start_main_~A~0#1| (+ .cse242 .cse248))) (or .cse54 (= |ULTIMATE.start_main_~A~0#1| (+ .cse243 .cse248)))))) .cse51))) .cse18)) (.cse236 (or .cse20 (let ((.cse245 (+ .cse42 .cse247))) (and (or .cse13 .cse24 (= |ULTIMATE.start_main_~A~0#1| (+ .cse244 .cse245))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse246 .cse245)) .cse51))))) (.cse237 (or .cse20 (let ((.cse239 (+ .cse21 .cse202)) (.cse241 (+ .cse21 .cse203))) (and (or .cse13 (and (or .cse95 (and (or .cse32 (= |ULTIMATE.start_main_~A~0#1| (+ .cse238 .cse239))) (or .cse25 .cse26 (= |ULTIMATE.start_main_~A~0#1| (+ .cse240 .cse239))))) (or .cse93 (and (or .cse25 (= |ULTIMATE.start_main_~A~0#1| (+ .cse240 .cse241)) .cse26) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse238 .cse241)) .cse32)) .cse94)) .cse24) (or .cse51 (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse242 .cse239)) .cse61 .cse62) (or .cse54 (= |ULTIMATE.start_main_~A~0#1| (+ .cse243 .cse239)))) .cse95) (or (and (or .cse61 .cse62 (= |ULTIMATE.start_main_~A~0#1| (+ .cse242 .cse241))) (or .cse54 (= |ULTIMATE.start_main_~A~0#1| (+ .cse243 .cse241)))) .cse93 .cse94))))))) (.cse235 (= |ULTIMATE.start_main_~A~0#1| (+ (* (+ .cse45 |ULTIMATE.start_main_~p~0#1|) |ULTIMATE.start_main_~B~0#1|) (+ .cse46 .cse126))))) (or (and .cse4 .cse233 .cse234 .cse131 .cse235 .cse236 .cse132 .cse133 .cse237 .cse134) (and .cse4 .cse233 .cse234 .cse131 .cse235 .cse236 .cse132 .cse133 .cse8 .cse237 (= |ULTIMATE.start_main_~r~0#1| (+ (+ |ULTIMATE.start_main_~A~0#1| (* |ULTIMATE.start_main_~B~0#1| (- 2))) .cse141)) (= (+ |ULTIMATE.start_main_~q~0#1| (- 2)) 1)) (and .cse4 .cse131 .cse235 .cse134))))) (.cse124 (or (and (or .cse16 .cse18 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse72 .cse41) .cse42))) (or .cse20 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse71 .cse41) .cse42)))) .cse190 .cse232)) (.cse49 (+ 1 .cse50)) (.cse48 (+ 1 .cse47)) (.cse68 (+ |ULTIMATE.start_main_~q~0#1| (* 2 .cse231))) (.cse69 (+ |ULTIMATE.start_main_~r~0#1| .cse116))) (let ((.cse44 (let ((.cse193 (* (+ |ULTIMATE.start_main_~q~0#1| .cse107) |ULTIMATE.start_main_~B~0#1|)) (.cse198 (* (+ |ULTIMATE.start_main_~q~0#1| .cse108) |ULTIMATE.start_main_~B~0#1|)) (.cse201 (* (+ |ULTIMATE.start_main_~q~0#1| .cse105) |ULTIMATE.start_main_~B~0#1|)) (.cse200 (* (+ |ULTIMATE.start_main_~q~0#1| .cse106) |ULTIMATE.start_main_~B~0#1|)) (.cse204 (>= |ULTIMATE.start_main_~r~0#1| .cse72)) (.cse191 (>= |ULTIMATE.start_main_~r~0#1| .cse71)) (.cse226 (* (+ .cse41 .cse106) |ULTIMATE.start_main_~B~0#1|)) (.cse225 (* (+ .cse41 .cse105) |ULTIMATE.start_main_~B~0#1|)) (.cse224 (* (+ .cse41 .cse107) |ULTIMATE.start_main_~B~0#1|)) (.cse219 (* (+ .cse41 .cse108) |ULTIMATE.start_main_~B~0#1|))) (let ((.cse181 (or .cse20 (let ((.cse227 (not (>= .cse42 .cse103))) (.cse228 (+ .cse42 .cse203)) (.cse229 (not (>= .cse42 .cse104))) (.cse230 (+ .cse42 .cse202))) (and (or .cse199 (and (or (and (or .cse93 .cse227 .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse226 .cse228))) (or .cse95 .cse229 (= |ULTIMATE.start_main_~A~0#1| (+ .cse226 .cse230)))) .cse61 .cse62) (or .cse54 (and (or .cse95 .cse229 (= |ULTIMATE.start_main_~A~0#1| (+ .cse225 .cse230))) (or .cse93 .cse227 (= |ULTIMATE.start_main_~A~0#1| (+ .cse225 .cse228)) .cse94)))) .cse51) (or .cse13 .cse192 (and (or .cse25 (and (or .cse95 (= |ULTIMATE.start_main_~A~0#1| (+ .cse224 .cse230)) .cse229) (or .cse93 .cse227 (= |ULTIMATE.start_main_~A~0#1| (+ .cse224 .cse228)) .cse94)) .cse26) (or (and (or .cse93 .cse227 (= |ULTIMATE.start_main_~A~0#1| (+ .cse219 .cse228)) .cse94) (or .cse95 .cse229 (= |ULTIMATE.start_main_~A~0#1| (+ .cse219 .cse230)))) .cse32)) .cse24))) (>= .cse42 .cse71))) (.cse182 (or (>= .cse42 .cse72) .cse16 .cse18 (let ((.cse222 (+ .cse42 .cse210)) (.cse223 (not (>= .cse42 .cse101))) (.cse220 (+ .cse42 .cse209)) (.cse221 (not (>= .cse42 .cse102)))) (and (or .cse13 (and (or .cse32 (and (or .cse75 (= |ULTIMATE.start_main_~A~0#1| (+ .cse219 .cse220)) .cse76 .cse221) (or .cse82 (= |ULTIMATE.start_main_~A~0#1| (+ .cse219 .cse222)) .cse223))) (or .cse25 .cse26 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse224 .cse222)) .cse82 .cse223) (or .cse75 (= |ULTIMATE.start_main_~A~0#1| (+ .cse224 .cse220)) .cse76 .cse221)))) .cse192 .cse24) (or .cse199 (and (or .cse54 (and (or .cse75 .cse76 .cse221 (= |ULTIMATE.start_main_~A~0#1| (+ .cse225 .cse220))) (or .cse82 (= |ULTIMATE.start_main_~A~0#1| (+ .cse225 .cse222)) .cse223))) (or (and (or .cse82 (= |ULTIMATE.start_main_~A~0#1| (+ .cse226 .cse222)) .cse223) (or .cse75 (= |ULTIMATE.start_main_~A~0#1| (+ .cse226 .cse220)) .cse76 .cse221)) .cse61 .cse62)) .cse51))))) (.cse136 (or .cse190 (let ((.cse216 (not .cse191)) (.cse214 (not .cse204))) (and (or .cse13 (and (or .cse213 .cse16 .cse214 .cse18) (or .cse215 .cse20 .cse216)) .cse24) (or .cse51 (and (or .cse217 .cse20 .cse216) (or .cse218 .cse16 .cse214 .cse18))))))) (.cse137 (or .cse211 (= |ULTIMATE.start_main_~A~0#1| (+ (* (+ .cse68 |ULTIMATE.start_main_~p~0#1|) |ULTIMATE.start_main_~B~0#1|) (+ .cse69 .cse126))) (not (>= .cse69 |ULTIMATE.start_main_~d~0#1|)) (>= .cse69 .cse212))) (.cse142 (or .cse16 .cse204 .cse18 (let ((.cse205 (+ |ULTIMATE.start_main_~r~0#1| .cse210)) (.cse206 (not (>= |ULTIMATE.start_main_~r~0#1| .cse101))) (.cse208 (+ |ULTIMATE.start_main_~r~0#1| .cse209)) (.cse207 (not (>= |ULTIMATE.start_main_~r~0#1| .cse102)))) (and (or .cse13 (and (or (and (or .cse82 (= |ULTIMATE.start_main_~A~0#1| (+ .cse193 .cse205)) .cse206) (or .cse75 .cse76 .cse207 (= |ULTIMATE.start_main_~A~0#1| (+ .cse193 .cse208)))) .cse25 .cse26) (or (and (or .cse82 (= |ULTIMATE.start_main_~A~0#1| (+ .cse198 .cse205)) .cse206) (or .cse75 (= |ULTIMATE.start_main_~A~0#1| (+ .cse198 .cse208)) .cse76 .cse207)) .cse32)) .cse192 .cse24) (or .cse199 (and (or (and (or .cse82 (= |ULTIMATE.start_main_~A~0#1| (+ .cse201 .cse205)) .cse206) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse201 .cse208)) .cse75 .cse76 .cse207)) .cse54) (or .cse61 .cse62 (and (or .cse82 (= |ULTIMATE.start_main_~A~0#1| (+ .cse200 .cse205)) .cse206) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse200 .cse208)) .cse75 .cse76 .cse207)))) .cse51))))) (.cse143 (or .cse20 .cse191 (let ((.cse196 (not (>= |ULTIMATE.start_main_~r~0#1| .cse103))) (.cse197 (+ |ULTIMATE.start_main_~r~0#1| .cse203)) (.cse194 (+ |ULTIMATE.start_main_~r~0#1| .cse202)) (.cse195 (not (>= |ULTIMATE.start_main_~r~0#1| .cse104)))) (and (or .cse13 .cse192 .cse24 (and (or .cse25 .cse26 (and (or .cse95 (= |ULTIMATE.start_main_~A~0#1| (+ .cse193 .cse194)) .cse195) (or .cse196 .cse93 .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse193 .cse197))))) (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse198 .cse197)) .cse196 .cse93 .cse94) (or .cse95 (= |ULTIMATE.start_main_~A~0#1| (+ .cse198 .cse194)) .cse195)) .cse32))) (or .cse199 .cse51 (and (or .cse61 (and (or .cse95 .cse195 (= |ULTIMATE.start_main_~A~0#1| (+ .cse200 .cse194))) (or .cse196 (= |ULTIMATE.start_main_~A~0#1| (+ .cse200 .cse197)) .cse93 .cse94)) .cse62) (or .cse54 (and (or .cse196 .cse93 (= |ULTIMATE.start_main_~A~0#1| (+ .cse201 .cse197)) .cse94) (or .cse95 (= |ULTIMATE.start_main_~A~0#1| (+ .cse201 .cse194)) .cse195))))))))) (.cse139 (or .cse131 (not (>= |ULTIMATE.start_main_~r~0#1| |ULTIMATE.start_main_~d~0#1|)))) (.cse138 (or (let ((.cse189 (- .cse47))) (let ((.cse185 (+ .cse46 (+ (- 1) .cse189))) (.cse183 (not (>= .cse46 .cse48))) (.cse187 (+ .cse46 .cse189)) (.cse186 (not (>= .cse46 .cse47)))) (and (or .cse13 (let ((.cse184 (* (+ .cse45 .cse49) |ULTIMATE.start_main_~B~0#1|))) (and (or .cse16 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse184 .cse185)) .cse18) (or .cse20 .cse186 (= |ULTIMATE.start_main_~A~0#1| (+ .cse184 .cse187))))) .cse24) (or (let ((.cse188 (* (+ .cse45 .cse50) |ULTIMATE.start_main_~B~0#1|))) (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse188 .cse185)) .cse16 .cse183 .cse18) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse188 .cse187)) .cse20 .cse186))) .cse51)))) (>= .cse46 |ULTIMATE.start_main_~d~0#1|) .cse190))) (or (and .cse118 .cse136 .cse119 .cse122 .cse0 .cse123 .cse124 .cse120 .cse2 .cse137 .cse3 .cse138) (and .cse118 .cse136 .cse119 .cse120 .cse2 .cse137 .cse3 .cse134 .cse139 .cse122 .cse0 .cse123 .cse124 .cse138) (let ((.cse140 (+ |ULTIMATE.start_main_~A~0#1| (* |ULTIMATE.start_main_~B~0#1| (- 4))))) (and .cse118 .cse136 .cse119 .cse120 (>= .cse140 |ULTIMATE.start_main_~B~0#1|) .cse2 (= |ULTIMATE.start_main_~r~0#1| (+ .cse140 .cse141)) .cse8 .cse3 .cse142 .cse143 .cse139 .cse122 .cse0 .cse123 .cse124 (= (+ |ULTIMATE.start_main_~q~0#1| (- 4)) 1) (not (>= .cse140 .cse121)))) (let ((.cse152 (* (+ .cse53 .cse58) |ULTIMATE.start_main_~B~0#1|)) (.cse151 (and .cse60 .cse59)) (.cse146 (* (+ .cse53 .cse56) |ULTIMATE.start_main_~B~0#1|)) (.cse153 (* (+ .cse53 .cse63) |ULTIMATE.start_main_~B~0#1|)) (.cse154 (* (+ .cse53 .cse66) |ULTIMATE.start_main_~B~0#1|)) (.cse166 (* (+ .cse23 .cse34) |ULTIMATE.start_main_~B~0#1|)) (.cse165 (* (+ .cse23 .cse35) |ULTIMATE.start_main_~B~0#1|)) (.cse162 (* (+ .cse23 .cse27) |ULTIMATE.start_main_~B~0#1|)) (.cse163 (* (+ .cse23 .cse30) |ULTIMATE.start_main_~B~0#1|))) (and .cse118 .cse136 .cse119 .cse120 (or (let ((.cse167 (- .cse81)) (.cse168 (- .cse83))) (let ((.cse160 (>= .cse15 .cse101)) (.cse156 (+ .cse15 (+ (- 1) .cse168))) (.cse157 (not (>= .cse15 .cse86))) (.cse159 (+ .cse15 .cse168)) (.cse158 (not (>= .cse15 .cse83))) (.cse147 (+ .cse15 .cse167)) (.cse148 (not (>= .cse15 .cse81))) (.cse149 (not (>= .cse15 .cse77))) (.cse150 (+ .cse15 (+ (- 1) .cse167))) (.cse144 (>= .cse15 .cse102))) (and (or (and (or .cse75 .cse76 .cse144 (and (or .cse145 .cse54 (and (or .cse55 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse147)) .cse148 .cse80) (or .cse149 .cse78 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse150)) .cse79)) .cse57) (or .cse151 (and (or .cse149 .cse78 (= |ULTIMATE.start_main_~A~0#1| (+ .cse152 .cse150)) .cse79) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse152 .cse147)) .cse148 .cse80))))) (or .cse61 .cse62 (and (or .cse65 .cse64 (and (or .cse148 (= |ULTIMATE.start_main_~A~0#1| (+ .cse153 .cse147)) .cse80) (or .cse149 (= |ULTIMATE.start_main_~A~0#1| (+ .cse153 .cse150)) .cse78 .cse79))) (or .cse67 (and (or .cse149 (= |ULTIMATE.start_main_~A~0#1| (+ .cse154 .cse150)) .cse78 .cse79) (or .cse148 .cse80 (= |ULTIMATE.start_main_~A~0#1| (+ .cse154 .cse147)))))) .cse155))) (or .cse82 (and (or .cse145 (and (or .cse55 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse156)) .cse85 .cse87 .cse157) (or .cse158 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse159)) .cse84)) .cse57) (or .cse151 (and (or .cse85 .cse87 .cse157 (= |ULTIMATE.start_main_~A~0#1| (+ .cse152 .cse156))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse152 .cse159)) .cse158 .cse84)))) .cse54) (or (and (or (and (or .cse158 .cse84 (= |ULTIMATE.start_main_~A~0#1| (+ .cse154 .cse159))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse154 .cse156)) .cse85 .cse87 .cse157)) .cse67) (or .cse65 .cse64 (and (or .cse158 (= |ULTIMATE.start_main_~A~0#1| (+ .cse153 .cse159)) .cse84) (or .cse85 .cse87 (= |ULTIMATE.start_main_~A~0#1| (+ .cse153 .cse156)) .cse157)))) .cse61 .cse62 .cse155)) .cse160)) .cse51) (or .cse13 (and (or .cse82 .cse160 (and (or .cse25 .cse161 .cse26 (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse162 .cse156)) .cse85 .cse87 .cse157) (or .cse158 (= |ULTIMATE.start_main_~A~0#1| (+ .cse162 .cse159)) .cse84)) .cse28 .cse29) (or (and (or .cse85 .cse87 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse156)) .cse157) (or .cse158 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse159)) .cse84)) .cse31))) (or .cse164 .cse32 (and (or .cse36 (and (or .cse158 (= |ULTIMATE.start_main_~A~0#1| (+ .cse165 .cse159)) .cse84) (or .cse85 .cse87 (= |ULTIMATE.start_main_~A~0#1| (+ .cse165 .cse156)) .cse157)) .cse37) (or .cse33 (and (or .cse85 .cse87 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse156)) .cse157) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse159)) .cse158 .cse84))))))) (or .cse75 (and (or .cse25 .cse161 .cse26 (and (or .cse28 .cse29 (and (or .cse149 .cse78 (= |ULTIMATE.start_main_~A~0#1| (+ .cse162 .cse150)) .cse79) (or .cse148 (= |ULTIMATE.start_main_~A~0#1| (+ .cse162 .cse147)) .cse80))) (or (and (or .cse148 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse147)) .cse80) (or .cse149 .cse78 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse150)) .cse79)) .cse31))) (or .cse164 .cse32 (and (or .cse36 (and (or .cse149 .cse78 (= |ULTIMATE.start_main_~A~0#1| (+ .cse165 .cse150)) .cse79) (or .cse148 .cse80 (= |ULTIMATE.start_main_~A~0#1| (+ .cse165 .cse147)))) .cse37) (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse147)) .cse148 .cse80) (or .cse149 .cse78 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse150)) .cse79)) .cse33)))) .cse76 .cse144)) .cse24)))) .cse16 .cse18) .cse2 .cse137 (or .cse20 (let ((.cse179 (- .cse97)) (.cse180 (- .cse89))) (let ((.cse174 (>= .cse21 .cse103)) (.cse177 (not (>= .cse21 .cse89))) (.cse178 (+ .cse21 .cse180)) (.cse175 (+ .cse21 (+ (- 1) .cse180))) (.cse176 (not (>= .cse21 .cse92))) (.cse169 (>= .cse21 .cse104)) (.cse170 (not (>= .cse21 .cse97))) (.cse171 (+ .cse21 .cse179)) (.cse173 (not (>= .cse21 .cse99))) (.cse172 (+ .cse21 (+ (- 1) .cse179)))) (and (or .cse51 (and (or .cse95 .cse169 (and (or .cse145 .cse54 (and (or (and (or .cse170 (= |ULTIMATE.start_main_~A~0#1| (+ .cse152 .cse171)) .cse96) (or .cse98 (= |ULTIMATE.start_main_~A~0#1| (+ .cse152 .cse172)) .cse173 .cse100)) .cse151) (or (and (or .cse170 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse171)) .cse96) (or .cse98 .cse173 .cse100 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse172)))) .cse55 .cse57))) (or .cse61 (and (or (and (or .cse170 (= |ULTIMATE.start_main_~A~0#1| (+ .cse153 .cse171)) .cse96) (or .cse98 .cse173 (= |ULTIMATE.start_main_~A~0#1| (+ .cse153 .cse172)) .cse100)) .cse65 .cse64) (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse154 .cse172)) .cse98 .cse173 .cse100) (or .cse170 (= |ULTIMATE.start_main_~A~0#1| (+ .cse154 .cse171)) .cse96)) .cse67)) .cse62 .cse155))) (or .cse174 .cse93 .cse94 (and (or (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse152 .cse175)) .cse90 .cse176 .cse91) (or .cse88 .cse177 (= |ULTIMATE.start_main_~A~0#1| (+ .cse152 .cse178)))) .cse151) (or (and (or .cse88 .cse177 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse178))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse175)) .cse90 .cse176 .cse91)) .cse55 .cse57)) .cse145 .cse54) (or .cse61 .cse62 (and (or (and (or .cse88 .cse177 (= |ULTIMATE.start_main_~A~0#1| (+ .cse153 .cse178))) (or .cse90 .cse176 .cse91 (= |ULTIMATE.start_main_~A~0#1| (+ .cse153 .cse175)))) .cse65 .cse64) (or (and (or .cse88 .cse177 (= |ULTIMATE.start_main_~A~0#1| (+ .cse154 .cse178))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse154 .cse175)) .cse90 .cse176 .cse91)) .cse67)) .cse155))))) (or .cse13 .cse24 (and (or .cse174 .cse93 (and (or .cse164 .cse32 (and (or (and (or .cse88 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse178)) .cse177) (or .cse90 .cse176 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse175)) .cse91)) .cse33) (or .cse36 (and (or .cse88 .cse177 (= |ULTIMATE.start_main_~A~0#1| (+ .cse165 .cse178))) (or .cse90 .cse176 .cse91 (= |ULTIMATE.start_main_~A~0#1| (+ .cse165 .cse175)))) .cse37))) (or (and (or (and (or .cse88 .cse177 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse178))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse175)) .cse90 .cse176 .cse91)) .cse31) (or .cse28 (and (or .cse88 .cse177 (= |ULTIMATE.start_main_~A~0#1| (+ .cse162 .cse178))) (or .cse90 (= |ULTIMATE.start_main_~A~0#1| (+ .cse162 .cse175)) .cse176 .cse91)) .cse29)) .cse25 .cse161 .cse26)) .cse94) (or .cse95 .cse169 (and (or .cse164 (and (or .cse33 (and (or .cse98 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse172)) .cse173 .cse100) (or .cse170 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse171)) .cse96))) (or .cse36 (and (or .cse170 (= |ULTIMATE.start_main_~A~0#1| (+ .cse165 .cse171)) .cse96) (or .cse98 (= |ULTIMATE.start_main_~A~0#1| (+ .cse165 .cse172)) .cse173 .cse100)) .cse37)) .cse32) (or .cse25 .cse161 (and (or .cse28 (and (or .cse170 (= |ULTIMATE.start_main_~A~0#1| (+ .cse162 .cse171)) .cse96) (or .cse98 .cse173 (= |ULTIMATE.start_main_~A~0#1| (+ .cse162 .cse172)) .cse100)) .cse29) (or (and (or .cse170 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse171)) .cse96) (or .cse98 .cse173 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse172)) .cse100)) .cse31)) .cse26))))))))) .cse181 .cse3 .cse134 .cse142 .cse143 .cse139 .cse122 .cse0 .cse123 .cse124 .cse182 .cse138)) (and .cse118 .cse136 .cse119 .cse120 .cse2 .cse137 .cse181 .cse3 .cse134 .cse139 .cse122 .cse0 .cse123 .cse124 .cse182 .cse138) (and .cse118 .cse136 .cse119 .cse120 .cse2 .cse137 .cse3 .cse134 .cse142 .cse143 .cse139 .cse122 .cse0 .cse123 .cse124 .cse138))))) (.cse115 (* 2 .cse135)) (.cse114 (* 2 .cse6)) (.cse112 (let ((.cse128 (or (and .cse131 .cse109 .cse132 .cse133 .cse111 .cse8 .cse134 .cse70) (and .cse131 .cse109 .cse111 .cse8 .cse134 .cse70)))) (or (and .cse127 .cse43 .cse128) (and .cse129 .cse7 (= |ULTIMATE.start_main_~r~0#1| (+ |ULTIMATE.start_main_~A~0#1| .cse126)) (= .cse125 0) .cse117) (and .cse127 .cse130 .cse128) (and .cse127 .cse129 .cse43)))) (.cse1 (or (and (= (+ .cse125 .cse12) 0) .cse123 .cse7 .cse117 (= |ULTIMATE.start_main_~r~0#1| (+ (+ |ULTIMATE.start_main_~A~0#1| (- 2)) .cse126))) (and .cse118 .cse119 .cse123 .cse124 .cse120 .cse43))) (.cse110 (= |ULTIMATE.start_main_~d~0#1| |ULTIMATE.start_main_~B~0#1|))) (or (and .cse0 .cse1 .cse2 .cse3) (let ((.cse5 (+ |ULTIMATE.start_main_~A~0#1| (* |ULTIMATE.start_main_~r~0#1| (- 1))))) (and .cse4 (= .cse5 .cse6) .cse7 .cse8 (let ((.cse11 (= 0 (mod (+ |ULTIMATE.start_main_~A~0#1| |ULTIMATE.start_main_~r~0#1|) 2))) (.cse9 (div (+ |ULTIMATE.start_main_~A~0#1| (- |ULTIMATE.start_main_~r~0#1|)) 2)) (.cse10 (< .cse5 0))) (or (and (= |ULTIMATE.start_main_~d~0#1| .cse9) (or (not .cse10) .cse11)) (and (not .cse11) (= |ULTIMATE.start_main_~d~0#1| (+ 1 .cse9)) .cse10))) (= (+ |ULTIMATE.start_main_~q~0#1| .cse12) 0))) (let ((.cse22 (* |ULTIMATE.start_main_~B~0#1| 1))) (let ((.cse39 (and (or (and (or .cse54 (not (<= 1 .cse105))) (or .cse61 .cse62 (not (<= 1 .cse106)))) .cse51) (or .cse13 .cse24 (and (or (not (<= 1 .cse107)) .cse25 .cse26) (or .cse32 (not (<= 1 .cse108))))))) (.cse40 (and (or .cse16 (and (or .cse82 (not (= .cse22 .cse101))) (or .cse75 .cse76 (not (= .cse22 .cse102)))) .cse18) (or .cse20 (and (or .cse93 (not (= .cse22 .cse103)) .cse94) (or .cse95 (not (= .cse22 .cse104))))))) (.cse19 (and (or (and (or .cse88 (not (= .cse22 .cse89))) (or .cse90 .cse91 (not (= .cse22 .cse92)))) .cse93 .cse94) (or .cse95 (and (or .cse96 (not (= .cse22 .cse97))) (or .cse98 (not (= .cse22 .cse99)) .cse100))))) (.cse17 (and (or .cse75 .cse76 (and (or (not (= .cse22 .cse77)) .cse78 .cse79) (or .cse80 (not (= .cse22 .cse81))))) (or .cse82 (and (or (not (= .cse22 .cse83)) .cse84) (or .cse85 (not (= .cse22 .cse86)) .cse87))))) (.cse38 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse22 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|)))) (and (or .cse13 (let ((.cse14 (* .cse22 .cse23))) (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse14 .cse15)) .cse16 .cse17 .cse18) (or .cse19 .cse20 (= |ULTIMATE.start_main_~A~0#1| (+ .cse14 .cse21))))) .cse24 (and (or .cse25 .cse26 (and (or (not (<= 1 .cse27)) .cse28 .cse29) (or (not (<= 1 .cse30)) .cse31))) (or .cse32 (and (or .cse33 (not (<= 1 .cse34))) (or (not (<= 1 .cse35)) .cse36 .cse37))))) (or .cse38 .cse39 .cse40) (or .cse39 .cse40 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse22 .cse41) .cse42))) .cse43 .cse44 .cse8 (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse22 .cse45) .cse46)) (and (or .cse20 (not (= .cse22 .cse47))) (or .cse16 .cse18 (not (= .cse22 .cse48)))) (and (or .cse13 .cse24 (not (<= 1 .cse49))) (or (not (<= 1 .cse50)) .cse51))) (or (let ((.cse52 (* .cse22 .cse53))) (and (or .cse19 (= |ULTIMATE.start_main_~A~0#1| (+ .cse52 .cse21)) .cse20) (or .cse16 (= |ULTIMATE.start_main_~A~0#1| (+ .cse52 .cse15)) .cse17 .cse18))) .cse51 (and (or .cse54 (and (or .cse55 (not (<= 1 .cse56)) .cse57) (or (not (<= 1 .cse58)) (and .cse59 .cse60)))) (or .cse61 .cse62 (and (or (not (<= 1 .cse63)) .cse64 .cse65) (or (not (<= 1 .cse66)) .cse67))))) (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse22 .cse68) .cse69)) (not (= .cse22 |ULTIMATE.start_main_~d~0#1|)) (not (<= 1 |ULTIMATE.start_main_~p~0#1|))) .cse70 (or .cse38 (and (or (not (= .cse22 .cse71)) .cse20) (or .cse16 (not (= .cse22 .cse72)) .cse18)) (and (or (not (<= 1 .cse73)) .cse13 .cse24) (or (not (<= 1 .cse74)) .cse51)))))) (and .cse109 .cse7 .cse110 .cse111 .cse8 .cse70) (and .cse7 .cse109 .cse110 .cse111 .cse8) (and .cse112 .cse7 .cse110 .cse8) (let ((.cse113 (+ |ULTIMATE.start_main_~r~0#1| |ULTIMATE.start_main_~d~0#1|))) (and (= .cse113 (+ |ULTIMATE.start_main_~A~0#1| (- .cse114))) (<= |ULTIMATE.start_main_~p~0#1| 1) .cse110 .cse44 .cse8 (= |ULTIMATE.start_main_~d~0#1| (* |ULTIMATE.start_main_~d~0#1| |ULTIMATE.start_main_~p~0#1|)) (= |ULTIMATE.start_main_~q~0#1| (+ (+ 0 .cse115) |ULTIMATE.start_main_~p~0#1|)) (= .cse113 (+ |ULTIMATE.start_main_~A~0#1| .cse116)) .cse117 .cse70)) (and .cse118 .cse119 .cse120 .cse7 .cse2 (not (>= |ULTIMATE.start_main_~r~0#1| .cse121)) .cse8 .cse3 .cse122 .cse0 .cse123 .cse124 (= (+ |ULTIMATE.start_main_~q~0#1| (* .cse115 (- 1))) 0) .cse110 (= (+ |ULTIMATE.start_main_~r~0#1| .cse114) |ULTIMATE.start_main_~A~0#1|)) (and .cse112 .cse0 .cse3) (and .cse7 .cse1 .cse110 .cse8)))))))))))) [2023-02-18 18:27:03,356 INFO L902 garLoopResultBuilder]: At program point main_returnLabel#1(lines 22 61) the Hoare annotation is: true [2023-02-18 18:27:03,359 INFO L895 garLoopResultBuilder]: At program point L36(line 36) the Hoare annotation is: (let ((.cse32 (div |ULTIMATE.start_main_~d~0#1| 2)) (.cse40 (div |ULTIMATE.start_main_~p~0#1| 2))) (let ((.cse37 (+ 1 .cse40)) (.cse252 (- .cse32))) (let ((.cse260 (+ (- 1) .cse252)) (.cse206 (+ |ULTIMATE.start_main_~q~0#1| .cse37)) (.cse47 (+ |ULTIMATE.start_main_~q~0#1| .cse40)) (.cse264 (mod |ULTIMATE.start_main_~d~0#1| 2)) (.cse228 (+ .cse40 1))) (let ((.cse214 (div |ULTIMATE.start_main_~p~0#1| 4)) (.cse212 (div .cse228 2)) (.cse231 (+ .cse32 1)) (.cse76 (= 1 |ULTIMATE.start_main_~p~0#1|)) (.cse176 (- |ULTIMATE.start_main_~d~0#1|)) (.cse34 (= 0 .cse264)) (.cse270 (< |ULTIMATE.start_main_~p~0#1| 0)) (.cse38 (= 0 (mod |ULTIMATE.start_main_~p~0#1| 2))) (.cse44 (+ |ULTIMATE.start_main_~r~0#1| .cse252)) (.cse269 (< |ULTIMATE.start_main_~d~0#1| 0)) (.cse272 (* .cse47 |ULTIMATE.start_main_~B~0#1|)) (.cse271 (* .cse206 |ULTIMATE.start_main_~B~0#1|)) (.cse45 (+ |ULTIMATE.start_main_~r~0#1| .cse260))) (let ((.cse101 (= 1 .cse40)) (.cse100 (= 1 .cse37)) (.cse200 (= |ULTIMATE.start_main_~A~0#1| (+ .cse271 .cse45))) (.cse205 (= |ULTIMATE.start_main_~A~0#1| (+ .cse272 .cse45))) (.cse36 (not .cse269)) (.cse204 (= |ULTIMATE.start_main_~A~0#1| (+ .cse272 .cse44))) (.cse41 (and .cse270 (not .cse38))) (.cse202 (= |ULTIMATE.start_main_~A~0#1| (+ .cse271 .cse44))) (.cse39 (not .cse270)) (.cse33 (and .cse269 (not .cse34))) (.cse211 (+ |ULTIMATE.start_main_~q~0#1| |ULTIMATE.start_main_~p~0#1|)) (.cse87 (+ |ULTIMATE.start_main_~r~0#1| .cse176)) (.cse2 (= |ULTIMATE.start_main_~r~0#1| |ULTIMATE.start_main_~A~0#1|)) (.cse26 (= |ULTIMATE.start_main_~A~0#1| (+ (* |ULTIMATE.start_main_~d~0#1| |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse263 (not .cse76)) (.cse121 (div |ULTIMATE.start_main_~d~0#1| 4)) (.cse106 (div .cse231 2)) (.cse35 (+ 1 .cse32)) (.cse97 (= 0 (mod .cse228 2))) (.cse267 (< .cse37 0)) (.cse213 (+ 1 .cse212)) (.cse215 (+ 1 .cse214)) (.cse268 (< .cse40 0)) (.cse55 (= 0 (mod .cse40 2)))) (let ((.cse48 (and .cse268 (not .cse55))) (.cse135 (= 1 .cse214)) (.cse56 (not .cse268)) (.cse148 (= 1 .cse215)) (.cse168 (= 1 .cse213)) (.cse98 (not .cse267)) (.cse157 (= 1 .cse212)) (.cse88 (and .cse267 (not .cse97))) (.cse92 (= 0 (mod .cse231 2))) (.cse261 (< .cse35 0)) (.cse116 (= 0 (mod .cse32 2))) (.cse262 (< .cse32 0)) (.cse177 (* 2 |ULTIMATE.start_main_~d~0#1|)) (.cse175 (* 2 |ULTIMATE.start_main_~p~0#1|)) (.cse107 (- .cse106)) (.cse122 (- .cse121)) (.cse265 (div .cse176 (- 2))) (.cse20 (or .cse26 .cse263)) (.cse0 (or .cse2 (= (+ |ULTIMATE.start_main_~A~0#1| (* (- 1) |ULTIMATE.start_main_~r~0#1|)) 0))) (.cse108 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse211 |ULTIMATE.start_main_~B~0#1|) .cse87))) (.cse1 (= 0 |ULTIMATE.start_main_~q~0#1|)) (.cse241 (or (and (or .cse204 .cse41) (or .cse38 .cse202 .cse39)) .cse33)) (.cse237 (or (and (or .cse38 .cse200 .cse39) (or .cse205 .cse41)) .cse34 .cse36)) (.cse3 (= |ULTIMATE.start_main_~q~0#1| 0)) (.cse4 (= |ULTIMATE.start_main_~B~0#1| 1)) (.cse5 (= |ULTIMATE.start_main_~A~0#1| (+ (* |ULTIMATE.start_main_~q~0#1| |ULTIMATE.start_main_~B~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse6 (= |ULTIMATE.start_main_~d~0#1| (* |ULTIMATE.start_main_~B~0#1| |ULTIMATE.start_main_~p~0#1|))) (.cse256 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse35 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|)) .cse34 .cse36) (or .cse33 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse32 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))))) (.cse253 (and (or .cse41 (not .cse101)) (or .cse38 (not .cse100) .cse39)))) (let ((.cse9 (let ((.cse266 (or .cse256 .cse253))) (or (and .cse0 .cse108 .cse20 .cse266 .cse1 .cse2 .cse241 .cse237 .cse3 .cse4 .cse5 .cse6) (and .cse0 .cse108 .cse266 .cse1 .cse26 .cse2 .cse241 .cse237 .cse3 .cse4 .cse5 .cse6)))) (.cse10 (<= 2 .cse265)) (.cse11 (>= |ULTIMATE.start_main_~r~0#1| .cse265)) (.cse13 (= .cse264 0)) (.cse15 (or (and (or .cse34 (= |ULTIMATE.start_main_~B~0#1| .cse35) .cse36) (or .cse33 (= |ULTIMATE.start_main_~B~0#1| .cse32))) .cse253)) (.cse16 (or .cse263 (= |ULTIMATE.start_main_~B~0#1| |ULTIMATE.start_main_~d~0#1|))) (.cse123 (+ (- 1) .cse122)) (.cse105 (+ (- 1) .cse107)) (.cse62 (+ |ULTIMATE.start_main_~q~0#1| .cse175)) (.cse63 (+ |ULTIMATE.start_main_~r~0#1| (- .cse177))) (.cse115 (not .cse262)) (.cse124 (+ 1 .cse121)) (.cse110 (and (not .cse116) .cse262)) (.cse94 (and (not .cse92) .cse261)) (.cse104 (+ 1 .cse106)) (.cse89 (not .cse261)) (.cse258 (and (or .cse97 (not .cse168) .cse98) (or (not .cse157) .cse88))) (.cse257 (and (or .cse48 (not .cse135)) (or .cse55 .cse56 (not .cse148)))) (.cse7 (* 2 1)) (.cse8 (* 2 |ULTIMATE.start_main_~B~0#1|))) (let ((.cse14 (* 2 .cse8)) (.cse12 (* 2 .cse7)) (.cse18 (or (and (or .cse33 (and (or .cse115 .cse116 (= |ULTIMATE.start_main_~B~0#1| .cse124)) (or .cse110 (= |ULTIMATE.start_main_~B~0#1| .cse121)))) (or .cse34 (and (or .cse94 (= |ULTIMATE.start_main_~B~0#1| .cse106)) (or (= |ULTIMATE.start_main_~B~0#1| .cse104) .cse89 .cse92)) .cse36)) (and (or .cse38 .cse39 .cse258) (or .cse257 .cse41)))) (.cse17 (let ((.cse243 (* (+ .cse206 .cse212) |ULTIMATE.start_main_~B~0#1|)) (.cse245 (* (+ .cse206 .cse213) |ULTIMATE.start_main_~B~0#1|)) (.cse247 (* (+ .cse47 .cse215) |ULTIMATE.start_main_~B~0#1|)) (.cse248 (* (+ .cse47 .cse214) |ULTIMATE.start_main_~B~0#1|)) (.cse249 (* (+ .cse211 .cse37) |ULTIMATE.start_main_~B~0#1|)) (.cse251 (* (+ .cse211 .cse40) |ULTIMATE.start_main_~B~0#1|))) (let ((.cse232 (or (let ((.cse259 (+ .cse87 .cse260))) (and (or .cse38 (= |ULTIMATE.start_main_~A~0#1| (+ .cse249 .cse259)) .cse39) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse251 .cse259)) .cse41))) .cse34 .cse36)) (.cse233 (or .cse38 .cse100 (and (or .cse33 (and (or .cse115 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse124 .cse206) .cse44)) .cse116) (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse121 .cse206) .cse44))))) (or .cse34 (and (or .cse89 .cse92 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse104 .cse206) .cse45))) (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse106 .cse206) .cse45)))) .cse36)) .cse39 .cse258)) (.cse234 (= |ULTIMATE.start_main_~A~0#1| (+ (* (+ .cse62 |ULTIMATE.start_main_~p~0#1|) |ULTIMATE.start_main_~B~0#1|) (+ .cse63 .cse176)))) (.cse235 (or .cse101 .cse257 (and (or .cse34 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse104 .cse47) .cse45)) .cse89 .cse92) (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse106 .cse47) .cse45)))) .cse36) (or .cse33 (and (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse121 .cse47) .cse44))) (or .cse115 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse124 .cse47) .cse44)) .cse116)))) .cse41)) (.cse236 (or .cse76 .cse256 .cse253)) (.cse238 (or .cse34 (let ((.cse255 (+ .cse45 .cse105)) (.cse254 (+ .cse45 .cse107))) (and (or .cse38 (and (or .cse94 (and (or .cse88 (= |ULTIMATE.start_main_~A~0#1| (+ .cse243 .cse254))) (or .cse97 (= |ULTIMATE.start_main_~A~0#1| (+ .cse245 .cse254)) .cse98))) (or .cse89 .cse92 (and (or .cse88 (= |ULTIMATE.start_main_~A~0#1| (+ .cse243 .cse255))) (or .cse97 (= |ULTIMATE.start_main_~A~0#1| (+ .cse245 .cse255)) .cse98)))) .cse39) (or (and (or (and (or .cse48 (= |ULTIMATE.start_main_~A~0#1| (+ .cse248 .cse255))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse247 .cse255)) .cse55 .cse56)) .cse89 .cse92) (or .cse94 (and (or .cse55 .cse56 (= |ULTIMATE.start_main_~A~0#1| (+ .cse247 .cse254))) (or .cse48 (= |ULTIMATE.start_main_~A~0#1| (+ .cse248 .cse254)))))) .cse41))) .cse36)) (.cse239 (or (and (or .cse34 .cse36 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse35 .cse211) .cse87))) (or .cse33 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse32 .cse211) .cse87)))) .cse76 .cse253)) (.cse240 (or .cse33 (let ((.cse250 (+ .cse87 .cse252))) (and (or .cse38 .cse39 (= |ULTIMATE.start_main_~A~0#1| (+ .cse249 .cse250))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse251 .cse250)) .cse41))))) (.cse242 (or .cse33 (let ((.cse244 (+ .cse44 .cse122)) (.cse246 (+ .cse44 .cse123))) (and (or .cse38 (and (or .cse110 (and (or .cse88 (= |ULTIMATE.start_main_~A~0#1| (+ .cse243 .cse244))) (or .cse97 .cse98 (= |ULTIMATE.start_main_~A~0#1| (+ .cse245 .cse244))))) (or .cse115 (and (or .cse97 (= |ULTIMATE.start_main_~A~0#1| (+ .cse245 .cse246)) .cse98) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse243 .cse246)) .cse88)) .cse116)) .cse39) (or .cse41 (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse247 .cse244)) .cse55 .cse56) (or .cse48 (= |ULTIMATE.start_main_~A~0#1| (+ .cse248 .cse244)))) .cse110) (or (and (or .cse55 .cse56 (= |ULTIMATE.start_main_~A~0#1| (+ .cse247 .cse246))) (or .cse48 (= |ULTIMATE.start_main_~A~0#1| (+ .cse248 .cse246)))) .cse115 .cse116)))))))) (or (and .cse232 .cse233 .cse9 .cse10 .cse11 .cse234 .cse235 .cse236 .cse26 .cse237 .cse13 .cse5 .cse238 .cse108 .cse15 .cse239 .cse240 .cse241 .cse16 .cse242) (and .cse232 .cse233 .cse9 .cse10 .cse11 .cse234 .cse235 .cse236 .cse237 .cse13 .cse5 .cse238 .cse108 .cse20 .cse15 .cse239 .cse240 .cse241 .cse16 .cse242)))))) (or (and .cse0 .cse1 (= |ULTIMATE.start_main_~p~0#1| 1) .cse2 (= |ULTIMATE.start_main_~d~0#1| |ULTIMATE.start_main_~B~0#1|) .cse3 .cse4 (<= 1 |ULTIMATE.start_main_~d~0#1|) (= |ULTIMATE.start_main_~d~0#1| 1) .cse5 .cse6) (and (= |ULTIMATE.start_main_~d~0#1| .cse7) (<= 2 |ULTIMATE.start_main_~d~0#1|) .cse0 .cse1 .cse2 .cse3 .cse4 (= |ULTIMATE.start_main_~p~0#1| .cse7) .cse5 .cse6 (= |ULTIMATE.start_main_~d~0#1| .cse8)) (and .cse9 .cse10 .cse11 .cse2 .cse3 .cse4 (= |ULTIMATE.start_main_~d~0#1| .cse12) .cse13 .cse5 (= |ULTIMATE.start_main_~p~0#1| .cse12) (= |ULTIMATE.start_main_~d~0#1| .cse14) .cse15 .cse16 .cse6) (and .cse17 .cse15 .cse2 (= |ULTIMATE.start_main_~d~0#1| (* 2 .cse14)) .cse18 .cse16 .cse3 .cse4 .cse5 .cse6 (= |ULTIMATE.start_main_~p~0#1| (* 2 .cse12))) (and (let ((.cse229 (+ .cse121 1)) (.cse230 (+ .cse106 1))) (let ((.cse222 (+ .cse214 1)) (.cse197 (div .cse231 4)) (.cse223 (< .cse106 0)) (.cse188 (= 0 (mod .cse106 2))) (.cse185 (= 0 (mod .cse230 2))) (.cse224 (< .cse104 0)) (.cse196 (div .cse230 2)) (.cse171 (div |ULTIMATE.start_main_~d~0#1| 8)) (.cse225 (< .cse121 0)) (.cse140 (= 0 (mod .cse121 2))) (.cse174 (div .cse229 2)) (.cse226 (< .cse124 0)) (.cse151 (= 0 (mod .cse229 2))) (.cse227 (+ .cse212 1))) (let ((.cse207 (div .cse228 4)) (.cse219 (< .cse212 0)) (.cse160 (= 0 (mod .cse212 2))) (.cse167 (= 0 (mod .cse227 2))) (.cse220 (< .cse213 0)) (.cse209 (div .cse227 2)) (.cse154 (and .cse226 (not .cse151))) (.cse153 (not .cse226)) (.cse172 (+ 1 .cse174)) (.cse139 (and .cse225 (not .cse140))) (.cse170 (+ 1 .cse171)) (.cse143 (not .cse225)) (.cse195 (+ 1 .cse196)) (.cse183 (not .cse224)) (.cse181 (and .cse224 (not .cse185))) (.cse192 (and .cse223 (not .cse188))) (.cse187 (not .cse223)) (.cse199 (+ 1 .cse197)) (.cse27 (* |ULTIMATE.start_main_~B~0#1| 1)) (.cse52 (div |ULTIMATE.start_main_~p~0#1| 8)) (.cse49 (= 0 (mod .cse214 2))) (.cse60 (div .cse222 2)) (.cse58 (= 0 (mod .cse222 2))) (.cse221 (< .cse215 0)) (.cse54 (< .cse214 0)) (.cse64 (div .cse177 4)) (.cse67 (div .cse175 4))) (let ((.cse66 (+ 1 .cse67)) (.cse65 (+ 1 .cse64)) (.cse28 (+ |ULTIMATE.start_main_~q~0#1| (* 2 .cse175))) (.cse29 (+ |ULTIMATE.start_main_~r~0#1| (- (* 2 .cse177)))) (.cse51 (not .cse54)) (.cse61 (and (not .cse58) .cse221)) (.cse59 (not .cse221)) (.cse57 (+ 1 .cse60)) (.cse53 (not .cse49)) (.cse50 (+ 1 .cse52)) (.cse31 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse27 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse216 (and (or (and (or .cse48 (not (<= 1 .cse214))) (or .cse55 .cse56 (not (<= 1 .cse215)))) .cse41) (or .cse38 .cse39 (and (or (not (<= 1 .cse213)) .cse97 .cse98) (or .cse88 (not (<= 1 .cse212))))))) (.cse217 (and (or .cse34 (and (or .cse94 (not (= .cse27 .cse106))) (or .cse89 .cse92 (not (= .cse27 .cse104)))) .cse36) (or .cse33 (and (or .cse115 (not (= .cse27 .cse124)) .cse116) (or .cse110 (not (= .cse27 .cse121))))))) (.cse46 (and (or .cse89 .cse92 (and (or (not (= .cse27 .cse195)) .cse183 .cse185) (or .cse181 (not (= .cse27 .cse196))))) (or .cse94 (and (or (not (= .cse27 .cse197)) .cse192) (or .cse187 (not (= .cse27 .cse199)) .cse188))))) (.cse42 (and (or (and (or .cse154 (not (= .cse27 .cse174))) (or .cse151 .cse153 (not (= .cse27 .cse172)))) .cse115 .cse116) (or .cse110 (and (or .cse139 (not (= .cse27 .cse171))) (or .cse140 (not (= .cse27 .cse170)) .cse143))))) (.cse210 (+ 1 .cse209)) (.cse165 (not .cse220)) (.cse164 (and .cse220 (not .cse167))) (.cse159 (and .cse219 (not .cse160))) (.cse208 (+ 1 .cse207)) (.cse162 (not .cse219))) (let ((.cse19 (or .cse38 (let ((.cse218 (* .cse27 .cse206))) (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse218 .cse45)) .cse34 .cse46 .cse36) (or .cse42 .cse33 (= |ULTIMATE.start_main_~A~0#1| (+ .cse218 .cse44))))) .cse39 (and (or .cse97 .cse98 (and (or (not (<= 1 .cse210)) .cse165 .cse167) (or (not (<= 1 .cse209)) .cse164))) (or .cse88 (and (or .cse159 (not (<= 1 .cse207))) (or (not (<= 1 .cse208)) .cse160 .cse162)))))) (.cse21 (or .cse31 .cse216 .cse217)) (.cse22 (or .cse216 .cse217 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse27 .cse211) .cse87)))) (.cse23 (let ((.cse75 (>= |ULTIMATE.start_main_~r~0#1| |ULTIMATE.start_main_~d~0#1|)) (.cse111 (* (+ |ULTIMATE.start_main_~q~0#1| .cse213) |ULTIMATE.start_main_~B~0#1|)) (.cse118 (* (+ |ULTIMATE.start_main_~q~0#1| .cse212) |ULTIMATE.start_main_~B~0#1|)) (.cse120 (* (+ |ULTIMATE.start_main_~q~0#1| .cse214) |ULTIMATE.start_main_~B~0#1|)) (.cse119 (* (+ |ULTIMATE.start_main_~q~0#1| .cse215) |ULTIMATE.start_main_~B~0#1|)) (.cse103 (* (+ .cse211 .cse215) |ULTIMATE.start_main_~B~0#1|)) (.cse102 (* (+ .cse211 .cse214) |ULTIMATE.start_main_~B~0#1|)) (.cse99 (* (+ .cse211 .cse213) |ULTIMATE.start_main_~B~0#1|)) (.cse90 (* (+ .cse211 .cse212) |ULTIMATE.start_main_~B~0#1|)) (.cse145 (* (+ .cse47 .cse50) |ULTIMATE.start_main_~B~0#1|)) (.cse144 (and .cse54 .cse53)) (.cse137 (* (+ .cse47 .cse52) |ULTIMATE.start_main_~B~0#1|)) (.cse147 (* (+ .cse47 .cse60) |ULTIMATE.start_main_~B~0#1|)) (.cse146 (* (+ .cse47 .cse57) |ULTIMATE.start_main_~B~0#1|)) (.cse166 (* (+ .cse206 .cse210) |ULTIMATE.start_main_~B~0#1|)) (.cse163 (* (+ .cse206 .cse209) |ULTIMATE.start_main_~B~0#1|)) (.cse161 (* (+ .cse206 .cse208) |ULTIMATE.start_main_~B~0#1|)) (.cse158 (* (+ .cse206 .cse207) |ULTIMATE.start_main_~B~0#1|)) (.cse125 (>= |ULTIMATE.start_main_~r~0#1| .cse35)) (.cse109 (>= |ULTIMATE.start_main_~r~0#1| .cse32))) (let ((.cse77 (let ((.cse203 (not .cse109)) (.cse201 (not .cse125))) (and (or .cse38 (and (or .cse200 .cse34 .cse201 .cse36) (or .cse202 .cse33 .cse203)) .cse39) (or .cse41 (and (or .cse204 .cse33 .cse203) (or .cse205 .cse34 .cse201 .cse36)))))) (.cse68 (or (let ((.cse194 (- .cse196)) (.cse198 (- .cse197))) (let ((.cse193 (>= .cse45 .cse106)) (.cse186 (+ .cse45 (+ (- 1) .cse198))) (.cse189 (not (>= .cse45 .cse199))) (.cse191 (+ .cse45 .cse198)) (.cse190 (not (>= .cse45 .cse197))) (.cse179 (+ .cse45 .cse194)) (.cse180 (not (>= .cse45 .cse196))) (.cse182 (not (>= .cse45 .cse195))) (.cse184 (+ .cse45 (+ (- 1) .cse194))) (.cse178 (>= .cse45 .cse104))) (and (or (and (or .cse89 .cse92 .cse178 (and (or .cse135 .cse48 (and (or .cse49 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse179)) .cse180 .cse181) (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse184)) .cse185)) .cse51) (or .cse144 (and (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse184)) .cse185) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse179)) .cse180 .cse181))))) (or .cse55 .cse56 (and (or .cse59 .cse58 (and (or .cse180 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse179)) .cse181) (or .cse182 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse184)) .cse183 .cse185))) (or .cse61 (and (or .cse182 (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse184)) .cse183 .cse185) (or .cse180 .cse181 (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse179)))))) .cse148))) (or .cse94 (and (or .cse135 (and (or .cse49 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse186)) .cse187 .cse188 .cse189) (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse191)) .cse192)) .cse51) (or .cse144 (and (or .cse187 .cse188 .cse189 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse186))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse191)) .cse190 .cse192)))) .cse48) (or (and (or (and (or .cse190 .cse192 (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse191))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse186)) .cse187 .cse188 .cse189)) .cse61) (or .cse59 .cse58 (and (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse191)) .cse192) (or .cse187 .cse188 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse186)) .cse189)))) .cse55 .cse56 .cse148)) .cse193)) .cse41) (or .cse38 (and (or .cse94 .cse193 (and (or .cse97 .cse168 .cse98 (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse186)) .cse187 .cse188 .cse189) (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse191)) .cse192)) .cse165 .cse167) (or (and (or .cse187 .cse188 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse186)) .cse189) (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse191)) .cse192)) .cse164))) (or .cse157 .cse88 (and (or .cse160 (and (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse191)) .cse192) (or .cse187 .cse188 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse186)) .cse189)) .cse162) (or .cse159 (and (or .cse187 .cse188 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse186)) .cse189) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse191)) .cse190 .cse192))))))) (or .cse89 (and (or .cse97 .cse168 .cse98 (and (or .cse165 .cse167 (and (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse184)) .cse185) (or .cse180 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse179)) .cse181))) (or (and (or .cse180 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse179)) .cse181) (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse184)) .cse185)) .cse164))) (or .cse157 .cse88 (and (or .cse160 (and (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse184)) .cse185) (or .cse180 .cse181 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse179)))) .cse162) (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse179)) .cse180 .cse181) (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse184)) .cse185)) .cse159)))) .cse92 .cse178)) .cse39)))) .cse34 .cse36)) (.cse69 (or (= 1 .cse175) (= |ULTIMATE.start_main_~A~0#1| (+ (* (+ .cse28 |ULTIMATE.start_main_~p~0#1|) |ULTIMATE.start_main_~B~0#1|) (+ .cse29 .cse176))) (not (>= .cse29 |ULTIMATE.start_main_~d~0#1|)) (>= .cse29 .cse177))) (.cse70 (or .cse33 (let ((.cse169 (- .cse171)) (.cse173 (- .cse174))) (let ((.cse149 (>= .cse44 .cse124)) (.cse155 (not (>= .cse44 .cse174))) (.cse156 (+ .cse44 .cse173)) (.cse150 (+ .cse44 (+ (- 1) .cse173))) (.cse152 (not (>= .cse44 .cse172))) (.cse134 (>= .cse44 .cse121)) (.cse136 (not (>= .cse44 .cse171))) (.cse138 (+ .cse44 .cse169)) (.cse142 (not (>= .cse44 .cse170))) (.cse141 (+ .cse44 (+ (- 1) .cse169)))) (and (or .cse41 (and (or .cse110 .cse134 (and (or .cse135 .cse48 (and (or (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse138)) .cse139) (or .cse140 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse141)) .cse142 .cse143)) .cse144) (or (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse138)) .cse139) (or .cse140 .cse142 .cse143 (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse141)))) .cse49 .cse51))) (or .cse55 (and (or (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse138)) .cse139) (or .cse140 .cse142 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse141)) .cse143)) .cse59 .cse58) (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse141)) .cse140 .cse142 .cse143) (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse138)) .cse139)) .cse61)) .cse56 .cse148))) (or .cse149 .cse115 .cse116 (and (or (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse150)) .cse151 .cse152 .cse153) (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse156)))) .cse144) (or (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse156))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse150)) .cse151 .cse152 .cse153)) .cse49 .cse51)) .cse135 .cse48) (or .cse55 .cse56 (and (or (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse156))) (or .cse151 .cse152 .cse153 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse150)))) .cse59 .cse58) (or (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse156))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse150)) .cse151 .cse152 .cse153)) .cse61)) .cse148))))) (or .cse38 .cse39 (and (or .cse149 .cse115 (and (or .cse157 .cse88 (and (or (and (or .cse154 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse156)) .cse155) (or .cse151 .cse152 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse150)) .cse153)) .cse159) (or .cse160 (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse156))) (or .cse151 .cse152 .cse153 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse150)))) .cse162))) (or (and (or (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse156))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse150)) .cse151 .cse152 .cse153)) .cse164) (or .cse165 (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse156))) (or .cse151 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse150)) .cse152 .cse153)) .cse167)) .cse97 .cse168 .cse98)) .cse116) (or .cse110 .cse134 (and (or .cse157 (and (or .cse159 (and (or .cse140 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse141)) .cse142 .cse143) (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse138)) .cse139))) (or .cse160 (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse138)) .cse139) (or .cse140 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse141)) .cse142 .cse143)) .cse162)) .cse88) (or .cse97 .cse168 (and (or .cse165 (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse138)) .cse139) (or .cse140 .cse142 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse141)) .cse143)) .cse167) (or (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse138)) .cse139) (or .cse140 .cse142 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse141)) .cse143)) .cse164)) .cse98)))))))))) (.cse71 (or .cse33 (let ((.cse130 (not (>= .cse87 .cse124))) (.cse131 (+ .cse87 .cse123)) (.cse132 (not (>= .cse87 .cse121))) (.cse133 (+ .cse87 .cse122))) (and (or .cse101 (and (or (and (or .cse115 .cse130 .cse116 (= |ULTIMATE.start_main_~A~0#1| (+ .cse103 .cse131))) (or .cse110 .cse132 (= |ULTIMATE.start_main_~A~0#1| (+ .cse103 .cse133)))) .cse55 .cse56) (or .cse48 (and (or .cse110 .cse132 (= |ULTIMATE.start_main_~A~0#1| (+ .cse102 .cse133))) (or .cse115 .cse130 (= |ULTIMATE.start_main_~A~0#1| (+ .cse102 .cse131)) .cse116)))) .cse41) (or .cse38 .cse100 (and (or .cse97 (and (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ .cse99 .cse133)) .cse132) (or .cse115 .cse130 (= |ULTIMATE.start_main_~A~0#1| (+ .cse99 .cse131)) .cse116)) .cse98) (or (and (or .cse115 .cse130 (= |ULTIMATE.start_main_~A~0#1| (+ .cse90 .cse131)) .cse116) (or .cse110 .cse132 (= |ULTIMATE.start_main_~A~0#1| (+ .cse90 .cse133)))) .cse88)) .cse39))) (>= .cse87 .cse32))) (.cse72 (or .cse34 .cse125 .cse36 (let ((.cse126 (+ |ULTIMATE.start_main_~r~0#1| .cse107)) (.cse127 (not (>= |ULTIMATE.start_main_~r~0#1| .cse106))) (.cse129 (+ |ULTIMATE.start_main_~r~0#1| .cse105)) (.cse128 (not (>= |ULTIMATE.start_main_~r~0#1| .cse104)))) (and (or .cse38 (and (or (and (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse111 .cse126)) .cse127) (or .cse89 .cse92 .cse128 (= |ULTIMATE.start_main_~A~0#1| (+ .cse111 .cse129)))) .cse97 .cse98) (or (and (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse118 .cse126)) .cse127) (or .cse89 (= |ULTIMATE.start_main_~A~0#1| (+ .cse118 .cse129)) .cse92 .cse128)) .cse88)) .cse100 .cse39) (or .cse101 (and (or (and (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse120 .cse126)) .cse127) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse120 .cse129)) .cse89 .cse92 .cse128)) .cse48) (or .cse55 .cse56 (and (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse119 .cse126)) .cse127) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse119 .cse129)) .cse89 .cse92 .cse128)))) .cse41))))) (.cse73 (or .cse33 .cse109 (let ((.cse114 (not (>= |ULTIMATE.start_main_~r~0#1| .cse124))) (.cse117 (+ |ULTIMATE.start_main_~r~0#1| .cse123)) (.cse112 (+ |ULTIMATE.start_main_~r~0#1| .cse122)) (.cse113 (not (>= |ULTIMATE.start_main_~r~0#1| .cse121)))) (and (or .cse38 .cse100 .cse39 (and (or .cse97 .cse98 (and (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ .cse111 .cse112)) .cse113) (or .cse114 .cse115 .cse116 (= |ULTIMATE.start_main_~A~0#1| (+ .cse111 .cse117))))) (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse118 .cse117)) .cse114 .cse115 .cse116) (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ .cse118 .cse112)) .cse113)) .cse88))) (or .cse101 .cse41 (and (or .cse55 (and (or .cse110 .cse113 (= |ULTIMATE.start_main_~A~0#1| (+ .cse119 .cse112))) (or .cse114 (= |ULTIMATE.start_main_~A~0#1| (+ .cse119 .cse117)) .cse115 .cse116)) .cse56) (or .cse48 (and (or .cse114 .cse115 (= |ULTIMATE.start_main_~A~0#1| (+ .cse120 .cse117)) .cse116) (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ .cse120 .cse112)) .cse113))))))))) (.cse74 (or .cse108 (not .cse75))) (.cse78 (or (>= .cse87 .cse35) .cse34 .cse36 (let ((.cse95 (+ .cse87 .cse107)) (.cse96 (not (>= .cse87 .cse106))) (.cse91 (+ .cse87 .cse105)) (.cse93 (not (>= .cse87 .cse104)))) (and (or .cse38 (and (or .cse88 (and (or .cse89 (= |ULTIMATE.start_main_~A~0#1| (+ .cse90 .cse91)) .cse92 .cse93) (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse90 .cse95)) .cse96))) (or .cse97 .cse98 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse99 .cse95)) .cse94 .cse96) (or .cse89 (= |ULTIMATE.start_main_~A~0#1| (+ .cse99 .cse91)) .cse92 .cse93)))) .cse100 .cse39) (or .cse101 (and (or .cse48 (and (or .cse89 .cse92 .cse93 (= |ULTIMATE.start_main_~A~0#1| (+ .cse102 .cse91))) (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse102 .cse95)) .cse96))) (or (and (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse103 .cse95)) .cse96) (or .cse89 (= |ULTIMATE.start_main_~A~0#1| (+ .cse103 .cse91)) .cse92 .cse93)) .cse55 .cse56)) .cse41))))) (.cse79 (or (let ((.cse86 (- .cse64))) (let ((.cse82 (+ .cse63 (+ (- 1) .cse86))) (.cse80 (not (>= .cse63 .cse65))) (.cse84 (+ .cse63 .cse86)) (.cse83 (not (>= .cse63 .cse64)))) (and (or .cse38 (let ((.cse81 (* (+ .cse62 .cse66) |ULTIMATE.start_main_~B~0#1|))) (and (or .cse34 .cse80 (= |ULTIMATE.start_main_~A~0#1| (+ .cse81 .cse82)) .cse36) (or .cse33 .cse83 (= |ULTIMATE.start_main_~A~0#1| (+ .cse81 .cse84))))) .cse39) (or (let ((.cse85 (* (+ .cse62 .cse67) |ULTIMATE.start_main_~B~0#1|))) (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse85 .cse82)) .cse34 .cse80 .cse36) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse85 .cse84)) .cse33 .cse83))) .cse41)))) (>= .cse63 |ULTIMATE.start_main_~d~0#1|) .cse76))) (or (and .cse68 .cse18 .cse69 .cse70 .cse71 .cse5 .cse72 .cse73 .cse17 .cse74 .cse15 (or .cse75 .cse76 .cse77) .cse78 .cse16 .cse79) (and (or .cse76 .cse77) .cse68 .cse18 .cse69 .cse70 .cse71 .cse5 .cse72 .cse73 .cse17 .cse74 .cse15 .cse78 .cse16 .cse79))))) (.cse24 (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse27 .cse62) .cse63)) (and (or .cse33 (not (= .cse27 .cse64))) (or .cse34 .cse36 (not (= .cse27 .cse65)))) (and (or .cse38 .cse39 (not (<= 1 .cse66))) (or (not (<= 1 .cse67)) .cse41)))) (.cse25 (or (let ((.cse43 (* .cse27 .cse47))) (and (or .cse42 (= |ULTIMATE.start_main_~A~0#1| (+ .cse43 .cse44)) .cse33) (or .cse34 (= |ULTIMATE.start_main_~A~0#1| (+ .cse43 .cse45)) .cse46 .cse36))) .cse41 (and (or .cse48 (and (or .cse49 (not (<= 1 .cse50)) .cse51) (or (not (<= 1 .cse52)) (and .cse53 .cse54)))) (or .cse55 .cse56 (and (or (not (<= 1 .cse57)) .cse58 .cse59) (or (not (<= 1 .cse60)) .cse61)))))) (.cse30 (or .cse31 (and (or (not (= .cse27 .cse32)) .cse33) (or .cse34 (not (= .cse27 .cse35)) .cse36)) (and (or (not (<= 1 .cse37)) .cse38 .cse39) (or (not (<= 1 .cse40)) .cse41))))) (or (and .cse19 .cse20 .cse21 .cse22 .cse2 .cse4 .cse23 .cse24 .cse25 .cse6) (and .cse19 .cse21 .cse22 .cse26 .cse2 .cse4 .cse23 .cse24 .cse25 (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse27 .cse28) .cse29)) (not (= .cse27 |ULTIMATE.start_main_~d~0#1|)) (not (<= 1 |ULTIMATE.start_main_~p~0#1|))) .cse6 .cse30) (and .cse19 .cse20 .cse21 .cse22 .cse2 .cse4 .cse23 .cse24 .cse25 .cse6 .cse30))))))) .cse2 .cse4 .cse5 .cse6)))))))))) [2023-02-18 18:27:03,359 INFO L899 garLoopResultBuilder]: For program point L-1(line -1) no Hoare annotation was computed. [2023-02-18 18:27:03,359 INFO L899 garLoopResultBuilder]: For program point ULTIMATE.startFINAL(line -1) no Hoare annotation was computed. [2023-02-18 18:27:03,362 INFO L895 garLoopResultBuilder]: At program point L45(line 45) the Hoare annotation is: (let ((.cse122 (div |ULTIMATE.start_main_~p~0#1| 2)) (.cse119 (div |ULTIMATE.start_main_~d~0#1| 2))) (let ((.cse294 (+ .cse119 1)) (.cse295 (+ .cse122 1)) (.cse121 (+ 1 .cse122)) (.cse266 (- .cse119))) (let ((.cse270 (+ (- 1) .cse266)) (.cse100 (+ |ULTIMATE.start_main_~q~0#1| .cse121)) (.cse83 (+ |ULTIMATE.start_main_~q~0#1| .cse122)) (.cse280 (mod |ULTIMATE.start_main_~d~0#1| 2)) (.cse260 (div |ULTIMATE.start_main_~p~0#1| 4)) (.cse261 (div .cse295 2)) (.cse88 (div .cse294 2)) (.cse92 (div |ULTIMATE.start_main_~d~0#1| 4))) (let ((.cse95 (+ 1 .cse92)) (.cse292 (+ .cse92 1)) (.cse82 (+ 1 .cse88)) (.cse293 (+ .cse88 1)) (.cse291 (+ .cse261 1)) (.cse286 (+ .cse260 1)) (.cse68 (- |ULTIMATE.start_main_~d~0#1|)) (.cse116 (= 1 |ULTIMATE.start_main_~p~0#1|)) (.cse81 (= 0 .cse280)) (.cse297 (< |ULTIMATE.start_main_~p~0#1| 0)) (.cse98 (= 0 (mod |ULTIMATE.start_main_~p~0#1| 2))) (.cse93 (+ |ULTIMATE.start_main_~r~0#1| .cse266)) (.cse296 (< |ULTIMATE.start_main_~d~0#1| 0)) (.cse299 (* .cse83 |ULTIMATE.start_main_~B~0#1|)) (.cse298 (* .cse100 |ULTIMATE.start_main_~B~0#1|)) (.cse84 (+ |ULTIMATE.start_main_~r~0#1| .cse270)) (.cse120 (+ 1 .cse119))) (let ((.cse149 (- .cse88)) (.cse130 (= 0 (mod .cse122 2))) (.cse282 (< .cse122 0)) (.cse86 (= 0 (mod .cse294 2))) (.cse283 (< .cse120 0)) (.cse284 (< .cse121 0)) (.cse134 (= 0 (mod .cse295 2))) (.cse79 (= 1 .cse122)) (.cse99 (= 1 .cse121)) (.cse150 (= |ULTIMATE.start_main_~A~0#1| (+ .cse298 .cse84))) (.cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse299 .cse84))) (.cse89 (not .cse296)) (.cse154 (= |ULTIMATE.start_main_~A~0#1| (+ .cse299 .cse93))) (.cse97 (and .cse297 (not .cse98))) (.cse152 (= |ULTIMATE.start_main_~A~0#1| (+ .cse298 .cse93))) (.cse101 (not .cse297)) (.cse90 (and .cse296 (not .cse81))) (.cse42 (= |ULTIMATE.start_main_~A~0#1| (+ (* |ULTIMATE.start_main_~d~0#1| |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse161 (not .cse116)) (.cse139 (+ |ULTIMATE.start_main_~r~0#1| .cse68)) (.cse140 (- .cse92)) (.cse96 (= 0 (mod .cse119 2))) (.cse285 (< .cse119 0)) (.cse160 (+ |ULTIMATE.start_main_~q~0#1| |ULTIMATE.start_main_~p~0#1|)) (.cse143 (* 2 |ULTIMATE.start_main_~d~0#1|)) (.cse142 (* 2 |ULTIMATE.start_main_~p~0#1|)) (.cse180 (div |ULTIMATE.start_main_~p~0#1| 8)) (.cse177 (= 0 (mod .cse260 2))) (.cse259 (+ 1 .cse260)) (.cse186 (div .cse286 2)) (.cse253 (div .cse291 2)) (.cse254 (div .cse295 4)) (.cse248 (div .cse294 4)) (.cse287 (< .cse88 0)) (.cse239 (= 0 (mod .cse88 2))) (.cse236 (= 0 (mod .cse293 2))) (.cse288 (< .cse82 0)) (.cse247 (div .cse293 2)) (.cse225 (div |ULTIMATE.start_main_~d~0#1| 8)) (.cse289 (< .cse92 0)) (.cse194 (= 0 (mod .cse92 2))) (.cse228 (div .cse292 2)) (.cse290 (< .cse95 0)) (.cse205 (= 0 (mod .cse292 2))) (.cse262 (+ 1 .cse261))) (let ((.cse74 (* 2 1)) (.cse48 (* 2 |ULTIMATE.start_main_~B~0#1|)) (.cse256 (< .cse261 0)) (.cse214 (= 0 (mod .cse261 2))) (.cse221 (= 0 (mod .cse291 2))) (.cse257 (< .cse262 0)) (.cse208 (and .cse290 (not .cse205))) (.cse207 (not .cse290)) (.cse226 (+ 1 .cse228)) (.cse193 (and .cse289 (not .cse194))) (.cse224 (+ 1 .cse225)) (.cse197 (not .cse289)) (.cse246 (+ 1 .cse247)) (.cse234 (not .cse288)) (.cse232 (and .cse288 (not .cse236))) (.cse243 (and .cse287 (not .cse239))) (.cse238 (not .cse287)) (.cse250 (+ 1 .cse248)) (.cse255 (+ 1 .cse254)) (.cse252 (+ 1 .cse253)) (.cse183 (+ 1 .cse186)) (.cse184 (= 0 (mod .cse286 2))) (.cse258 (< .cse259 0)) (.cse181 (not .cse177)) (.cse182 (< .cse260 0)) (.cse178 (+ 1 .cse180)) (.cse111 (div .cse142 4)) (.cse113 (div .cse143 4)) (.cse118 (* |ULTIMATE.start_main_~B~0#1| 1)) (.cse108 (+ |ULTIMATE.start_main_~q~0#1| .cse142)) (.cse112 (+ |ULTIMATE.start_main_~r~0#1| (- .cse143))) (.cse263 (* (+ .cse160 .cse121) |ULTIMATE.start_main_~B~0#1|)) (.cse265 (* (+ .cse160 .cse122) |ULTIMATE.start_main_~B~0#1|)) (.cse189 (= 1 .cse260)) (.cse202 (= 1 .cse259)) (.cse222 (= 1 .cse262)) (.cse211 (= 1 .cse261)) (.cse91 (and (not .cse96) .cse285)) (.cse94 (not .cse285)) (.cse141 (+ (- 1) .cse140)) (.cse13 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse160 |ULTIMATE.start_main_~B~0#1|) .cse139))) (.cse14 (or .cse42 .cse161)) (.cse21 (= |ULTIMATE.start_main_~r~0#1| |ULTIMATE.start_main_~A~0#1|)) (.cse72 (or (and (or .cse154 .cse97) (or .cse98 .cse152 .cse101)) .cse90)) (.cse66 (or (and (or .cse98 .cse150 .cse101) (or .cse155 .cse97)) .cse81 .cse89)) (.cse22 (= |ULTIMATE.start_main_~q~0#1| 0)) (.cse5 (= |ULTIMATE.start_main_~B~0#1| 1)) (.cse7 (= |ULTIMATE.start_main_~A~0#1| (+ (* |ULTIMATE.start_main_~q~0#1| |ULTIMATE.start_main_~B~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse8 (= |ULTIMATE.start_main_~d~0#1| (* |ULTIMATE.start_main_~B~0#1| |ULTIMATE.start_main_~p~0#1|))) (.cse267 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse120 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|)) .cse81 .cse89) (or .cse90 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse119 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))))) (.cse268 (and (or .cse97 (not .cse79)) (or .cse98 (not .cse99) .cse101))) (.cse138 (and .cse284 (not .cse134))) (.cse271 (* (+ .cse100 .cse261) |ULTIMATE.start_main_~B~0#1|)) (.cse273 (* (+ .cse100 .cse262) |ULTIMATE.start_main_~B~0#1|)) (.cse136 (not .cse284)) (.cse85 (not .cse283)) (.cse87 (and (not .cse86) .cse283)) (.cse131 (not .cse282)) (.cse275 (* (+ .cse83 .cse259) |ULTIMATE.start_main_~B~0#1|)) (.cse132 (and .cse282 (not .cse130))) (.cse276 (* (+ .cse83 .cse260) |ULTIMATE.start_main_~B~0#1|)) (.cse148 (+ (- 1) .cse149)) (.cse281 (div .cse68 (- 2)))) (let ((.cse70 (+ |ULTIMATE.start_main_~q~0#1| (* |ULTIMATE.start_main_~p~0#1| (- 1)))) (.cse61 (<= 2 .cse281)) (.cse63 (>= |ULTIMATE.start_main_~r~0#1| .cse281)) (.cse64 (= .cse280 0)) (.cse69 (or .cse81 (let ((.cse279 (+ .cse84 .cse148)) (.cse278 (+ .cse84 .cse149))) (and (or .cse98 (and (or .cse87 (and (or .cse138 (= |ULTIMATE.start_main_~A~0#1| (+ .cse271 .cse278))) (or .cse134 (= |ULTIMATE.start_main_~A~0#1| (+ .cse273 .cse278)) .cse136))) (or .cse85 .cse86 (and (or .cse138 (= |ULTIMATE.start_main_~A~0#1| (+ .cse271 .cse279))) (or .cse134 (= |ULTIMATE.start_main_~A~0#1| (+ .cse273 .cse279)) .cse136)))) .cse101) (or (and (or (and (or .cse132 (= |ULTIMATE.start_main_~A~0#1| (+ .cse276 .cse279))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse275 .cse279)) .cse130 .cse131)) .cse85 .cse86) (or .cse87 (and (or .cse130 .cse131 (= |ULTIMATE.start_main_~A~0#1| (+ .cse275 .cse278))) (or .cse132 (= |ULTIMATE.start_main_~A~0#1| (+ .cse276 .cse278)))))) .cse97))) .cse89)) (.cse62 (let ((.cse277 (or .cse267 .cse268))) (or (and .cse13 .cse277 .cse42 .cse21 .cse72 .cse66 .cse22 .cse5 .cse7 .cse8) (and .cse13 .cse14 .cse277 .cse21 .cse72 .cse66 .cse22 .cse5 .cse7 .cse8)))) (.cse46 (or (and (or .cse81 (= |ULTIMATE.start_main_~B~0#1| .cse120) .cse89) (or .cse90 (= |ULTIMATE.start_main_~B~0#1| .cse119))) .cse268)) (.cse73 (or .cse90 (let ((.cse272 (+ .cse93 .cse140)) (.cse274 (+ .cse93 .cse141))) (and (or .cse98 (and (or .cse91 (and (or .cse138 (= |ULTIMATE.start_main_~A~0#1| (+ .cse271 .cse272))) (or .cse134 .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse273 .cse272))))) (or .cse94 (and (or .cse134 (= |ULTIMATE.start_main_~A~0#1| (+ .cse273 .cse274)) .cse136) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse271 .cse274)) .cse138)) .cse96)) .cse101) (or .cse97 (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse275 .cse272)) .cse130 .cse131) (or .cse132 (= |ULTIMATE.start_main_~A~0#1| (+ .cse276 .cse272)))) .cse91) (or (and (or .cse130 .cse131 (= |ULTIMATE.start_main_~A~0#1| (+ .cse275 .cse274))) (or .cse132 (= |ULTIMATE.start_main_~A~0#1| (+ .cse276 .cse274)))) .cse94 .cse96))))))) (.cse102 (and (or .cse134 (not .cse222) .cse136) (or (not .cse211) .cse138))) (.cse80 (and (or .cse132 (not .cse189)) (or .cse130 .cse131 (not .cse202)))) (.cse123 (+ |ULTIMATE.start_main_~q~0#1| (* 2 .cse142))) (.cse124 (+ |ULTIMATE.start_main_~r~0#1| (- (* 2 .cse143)))) (.cse137 (* (+ .cse160 .cse261) |ULTIMATE.start_main_~B~0#1|)) (.cse135 (* (+ .cse160 .cse262) |ULTIMATE.start_main_~B~0#1|)) (.cse133 (* (+ .cse160 .cse260) |ULTIMATE.start_main_~B~0#1|)) (.cse126 (* (+ .cse160 .cse259) |ULTIMATE.start_main_~B~0#1|)) (.cse11 (not (>= |ULTIMATE.start_main_~r~0#1| |ULTIMATE.start_main_~d~0#1|))) (.cse55 (+ |ULTIMATE.start_main_~r~0#1| |ULTIMATE.start_main_~d~0#1|)) (.cse78 (or (and (or .cse81 .cse89 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse120 .cse160) .cse139))) (or .cse90 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse119 .cse160) .cse139)))) .cse116 .cse268)) (.cse25 (<= 2 |ULTIMATE.start_main_~d~0#1|)) (.cse65 (or (let ((.cse269 (+ .cse139 .cse270))) (and (or .cse98 (= |ULTIMATE.start_main_~A~0#1| (+ .cse263 .cse269)) .cse101) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse265 .cse269)) .cse97))) .cse81 .cse89)) (.cse9 (= |ULTIMATE.start_main_~A~0#1| (+ (* (+ .cse108 |ULTIMATE.start_main_~p~0#1|) |ULTIMATE.start_main_~B~0#1|) (+ .cse112 .cse68)))) (.cse77 (or .cse116 .cse267 .cse268)) (.cse71 (or .cse90 (let ((.cse264 (+ .cse139 .cse266))) (and (or .cse98 .cse101 (= |ULTIMATE.start_main_~A~0#1| (+ .cse263 .cse264))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse265 .cse264)) .cse97))))) (.cse17 (or .cse161 (= |ULTIMATE.start_main_~B~0#1| |ULTIMATE.start_main_~d~0#1|))) (.cse117 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse118 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse158 (and (or (and (or .cse132 (not (<= 1 .cse260))) (or .cse130 .cse131 (not (<= 1 .cse259)))) .cse97) (or .cse98 .cse101 (and (or (not (<= 1 .cse262)) .cse134 .cse136) (or .cse138 (not (<= 1 .cse261))))))) (.cse159 (and (or .cse81 (and (or .cse87 (not (= .cse118 .cse88))) (or .cse85 .cse86 (not (= .cse118 .cse82)))) .cse89) (or .cse90 (and (or .cse94 (not (= .cse118 .cse95)) .cse96) (or .cse91 (not (= .cse118 .cse92))))))) (.cse157 (>= |ULTIMATE.start_main_~r~0#1| .cse119)) (.cse156 (>= |ULTIMATE.start_main_~r~0#1| .cse120)) (.cse162 (* (+ |ULTIMATE.start_main_~q~0#1| .cse262) |ULTIMATE.start_main_~B~0#1|)) (.cse167 (* (+ |ULTIMATE.start_main_~q~0#1| .cse261) |ULTIMATE.start_main_~B~0#1|)) (.cse169 (* (+ |ULTIMATE.start_main_~q~0#1| .cse260) |ULTIMATE.start_main_~B~0#1|)) (.cse168 (* (+ |ULTIMATE.start_main_~q~0#1| .cse259) |ULTIMATE.start_main_~B~0#1|)) (.cse115 (+ 1 .cse113)) (.cse109 (+ 1 .cse111)) (.cse199 (* (+ .cse83 .cse178) |ULTIMATE.start_main_~B~0#1|)) (.cse179 (not .cse182)) (.cse198 (and .cse182 .cse181)) (.cse191 (* (+ .cse83 .cse180) |ULTIMATE.start_main_~B~0#1|)) (.cse201 (* (+ .cse83 .cse186) |ULTIMATE.start_main_~B~0#1|)) (.cse187 (and (not .cse184) .cse258)) (.cse185 (not .cse258)) (.cse200 (* (+ .cse83 .cse183) |ULTIMATE.start_main_~B~0#1|)) (.cse220 (* (+ .cse100 .cse252) |ULTIMATE.start_main_~B~0#1|)) (.cse217 (* (+ .cse100 .cse253) |ULTIMATE.start_main_~B~0#1|)) (.cse215 (* (+ .cse100 .cse255) |ULTIMATE.start_main_~B~0#1|)) (.cse212 (* (+ .cse100 .cse254) |ULTIMATE.start_main_~B~0#1|)) (.cse176 (and (or .cse85 .cse86 (and (or (not (= .cse118 .cse246)) .cse234 .cse236) (or .cse232 (not (= .cse118 .cse247))))) (or .cse87 (and (or (not (= .cse118 .cse248)) .cse243) (or .cse238 (not (= .cse118 .cse250)) .cse239))))) (.cse174 (and (or (and (or .cse208 (not (= .cse118 .cse228))) (or .cse205 .cse207 (not (= .cse118 .cse226)))) .cse94 .cse96) (or .cse91 (and (or .cse193 (not (= .cse118 .cse225))) (or .cse194 (not (= .cse118 .cse224)) .cse197))))) (.cse219 (not .cse257)) (.cse218 (and .cse257 (not .cse221))) (.cse213 (and .cse256 (not .cse214))) (.cse216 (not .cse256)) (.cse59 (* 2 .cse48)) (.cse60 (* 2 .cse74))) (let ((.cse20 (= |ULTIMATE.start_main_~d~0#1| .cse74)) (.cse23 (= |ULTIMATE.start_main_~p~0#1| .cse74)) (.cse24 (= |ULTIMATE.start_main_~d~0#1| .cse48)) (.cse15 (= (+ |ULTIMATE.start_main_~q~0#1| (* .cse60 (- 1))) 0)) (.cse16 (= (+ |ULTIMATE.start_main_~r~0#1| .cse59) |ULTIMATE.start_main_~A~0#1|)) (.cse10 (+ 0 .cse60)) (.cse18 (+ |ULTIMATE.start_main_~A~0#1| (- .cse59))) (.cse12 (* |ULTIMATE.start_main_~B~0#1| 2)) (.cse40 (or .cse98 (let ((.cse251 (* .cse118 .cse100))) (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse251 .cse84)) .cse81 .cse176 .cse89) (or .cse174 .cse90 (= |ULTIMATE.start_main_~A~0#1| (+ .cse251 .cse93))))) .cse101 (and (or .cse134 .cse136 (and (or (not (<= 1 .cse252)) .cse219 .cse221) (or (not (<= 1 .cse253)) .cse218))) (or .cse138 (and (or .cse213 (not (<= 1 .cse254))) (or (not (<= 1 .cse255)) .cse214 .cse216)))))) (.cse37 (or (let ((.cse245 (- .cse247)) (.cse249 (- .cse248))) (let ((.cse244 (>= .cse84 .cse88)) (.cse237 (+ .cse84 (+ (- 1) .cse249))) (.cse240 (not (>= .cse84 .cse250))) (.cse242 (+ .cse84 .cse249)) (.cse241 (not (>= .cse84 .cse248))) (.cse230 (+ .cse84 .cse245)) (.cse231 (not (>= .cse84 .cse247))) (.cse233 (not (>= .cse84 .cse246))) (.cse235 (+ .cse84 (+ (- 1) .cse245))) (.cse229 (>= .cse84 .cse82))) (and (or (and (or .cse85 .cse86 .cse229 (and (or .cse189 .cse132 (and (or .cse177 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse199 .cse230)) .cse231 .cse232) (or .cse233 .cse234 (= |ULTIMATE.start_main_~A~0#1| (+ .cse199 .cse235)) .cse236)) .cse179) (or .cse198 (and (or .cse233 .cse234 (= |ULTIMATE.start_main_~A~0#1| (+ .cse191 .cse235)) .cse236) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse191 .cse230)) .cse231 .cse232))))) (or .cse130 .cse131 (and (or .cse185 .cse184 (and (or .cse231 (= |ULTIMATE.start_main_~A~0#1| (+ .cse200 .cse230)) .cse232) (or .cse233 (= |ULTIMATE.start_main_~A~0#1| (+ .cse200 .cse235)) .cse234 .cse236))) (or .cse187 (and (or .cse233 (= |ULTIMATE.start_main_~A~0#1| (+ .cse201 .cse235)) .cse234 .cse236) (or .cse231 .cse232 (= |ULTIMATE.start_main_~A~0#1| (+ .cse201 .cse230)))))) .cse202))) (or .cse87 (and (or .cse189 (and (or .cse177 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse199 .cse237)) .cse238 .cse239 .cse240) (or .cse241 (= |ULTIMATE.start_main_~A~0#1| (+ .cse199 .cse242)) .cse243)) .cse179) (or .cse198 (and (or .cse238 .cse239 .cse240 (= |ULTIMATE.start_main_~A~0#1| (+ .cse191 .cse237))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse191 .cse242)) .cse241 .cse243)))) .cse132) (or (and (or (and (or .cse241 .cse243 (= |ULTIMATE.start_main_~A~0#1| (+ .cse201 .cse242))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse201 .cse237)) .cse238 .cse239 .cse240)) .cse187) (or .cse185 .cse184 (and (or .cse241 (= |ULTIMATE.start_main_~A~0#1| (+ .cse200 .cse242)) .cse243) (or .cse238 .cse239 (= |ULTIMATE.start_main_~A~0#1| (+ .cse200 .cse237)) .cse240)))) .cse130 .cse131 .cse202)) .cse244)) .cse97) (or .cse98 (and (or .cse87 .cse244 (and (or .cse134 .cse222 .cse136 (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse220 .cse237)) .cse238 .cse239 .cse240) (or .cse241 (= |ULTIMATE.start_main_~A~0#1| (+ .cse220 .cse242)) .cse243)) .cse219 .cse221) (or (and (or .cse238 .cse239 (= |ULTIMATE.start_main_~A~0#1| (+ .cse217 .cse237)) .cse240) (or .cse241 (= |ULTIMATE.start_main_~A~0#1| (+ .cse217 .cse242)) .cse243)) .cse218))) (or .cse211 .cse138 (and (or .cse214 (and (or .cse241 (= |ULTIMATE.start_main_~A~0#1| (+ .cse215 .cse242)) .cse243) (or .cse238 .cse239 (= |ULTIMATE.start_main_~A~0#1| (+ .cse215 .cse237)) .cse240)) .cse216) (or .cse213 (and (or .cse238 .cse239 (= |ULTIMATE.start_main_~A~0#1| (+ .cse212 .cse237)) .cse240) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse212 .cse242)) .cse241 .cse243))))))) (or .cse85 (and (or .cse134 .cse222 .cse136 (and (or .cse219 .cse221 (and (or .cse233 .cse234 (= |ULTIMATE.start_main_~A~0#1| (+ .cse220 .cse235)) .cse236) (or .cse231 (= |ULTIMATE.start_main_~A~0#1| (+ .cse220 .cse230)) .cse232))) (or (and (or .cse231 (= |ULTIMATE.start_main_~A~0#1| (+ .cse217 .cse230)) .cse232) (or .cse233 .cse234 (= |ULTIMATE.start_main_~A~0#1| (+ .cse217 .cse235)) .cse236)) .cse218))) (or .cse211 .cse138 (and (or .cse214 (and (or .cse233 .cse234 (= |ULTIMATE.start_main_~A~0#1| (+ .cse215 .cse235)) .cse236) (or .cse231 .cse232 (= |ULTIMATE.start_main_~A~0#1| (+ .cse215 .cse230)))) .cse216) (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse212 .cse230)) .cse231 .cse232) (or .cse233 .cse234 (= |ULTIMATE.start_main_~A~0#1| (+ .cse212 .cse235)) .cse236)) .cse213)))) .cse86 .cse229)) .cse101)))) .cse81 .cse89)) (.cse43 (or .cse90 (let ((.cse223 (- .cse225)) (.cse227 (- .cse228))) (let ((.cse203 (>= .cse93 .cse95)) (.cse209 (not (>= .cse93 .cse228))) (.cse210 (+ .cse93 .cse227)) (.cse204 (+ .cse93 (+ (- 1) .cse227))) (.cse206 (not (>= .cse93 .cse226))) (.cse188 (>= .cse93 .cse92)) (.cse190 (not (>= .cse93 .cse225))) (.cse192 (+ .cse93 .cse223)) (.cse196 (not (>= .cse93 .cse224))) (.cse195 (+ .cse93 (+ (- 1) .cse223)))) (and (or .cse97 (and (or .cse91 .cse188 (and (or .cse189 .cse132 (and (or (and (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse191 .cse192)) .cse193) (or .cse194 (= |ULTIMATE.start_main_~A~0#1| (+ .cse191 .cse195)) .cse196 .cse197)) .cse198) (or (and (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse199 .cse192)) .cse193) (or .cse194 .cse196 .cse197 (= |ULTIMATE.start_main_~A~0#1| (+ .cse199 .cse195)))) .cse177 .cse179))) (or .cse130 (and (or (and (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse200 .cse192)) .cse193) (or .cse194 .cse196 (= |ULTIMATE.start_main_~A~0#1| (+ .cse200 .cse195)) .cse197)) .cse185 .cse184) (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse201 .cse195)) .cse194 .cse196 .cse197) (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse201 .cse192)) .cse193)) .cse187)) .cse131 .cse202))) (or .cse203 .cse94 .cse96 (and (or (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse191 .cse204)) .cse205 .cse206 .cse207) (or .cse208 .cse209 (= |ULTIMATE.start_main_~A~0#1| (+ .cse191 .cse210)))) .cse198) (or (and (or .cse208 .cse209 (= |ULTIMATE.start_main_~A~0#1| (+ .cse199 .cse210))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse199 .cse204)) .cse205 .cse206 .cse207)) .cse177 .cse179)) .cse189 .cse132) (or .cse130 .cse131 (and (or (and (or .cse208 .cse209 (= |ULTIMATE.start_main_~A~0#1| (+ .cse200 .cse210))) (or .cse205 .cse206 .cse207 (= |ULTIMATE.start_main_~A~0#1| (+ .cse200 .cse204)))) .cse185 .cse184) (or (and (or .cse208 .cse209 (= |ULTIMATE.start_main_~A~0#1| (+ .cse201 .cse210))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse201 .cse204)) .cse205 .cse206 .cse207)) .cse187)) .cse202))))) (or .cse98 .cse101 (and (or .cse203 .cse94 (and (or .cse211 .cse138 (and (or (and (or .cse208 (= |ULTIMATE.start_main_~A~0#1| (+ .cse212 .cse210)) .cse209) (or .cse205 .cse206 (= |ULTIMATE.start_main_~A~0#1| (+ .cse212 .cse204)) .cse207)) .cse213) (or .cse214 (and (or .cse208 .cse209 (= |ULTIMATE.start_main_~A~0#1| (+ .cse215 .cse210))) (or .cse205 .cse206 .cse207 (= |ULTIMATE.start_main_~A~0#1| (+ .cse215 .cse204)))) .cse216))) (or (and (or (and (or .cse208 .cse209 (= |ULTIMATE.start_main_~A~0#1| (+ .cse217 .cse210))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse217 .cse204)) .cse205 .cse206 .cse207)) .cse218) (or .cse219 (and (or .cse208 .cse209 (= |ULTIMATE.start_main_~A~0#1| (+ .cse220 .cse210))) (or .cse205 (= |ULTIMATE.start_main_~A~0#1| (+ .cse220 .cse204)) .cse206 .cse207)) .cse221)) .cse134 .cse222 .cse136)) .cse96) (or .cse91 .cse188 (and (or .cse211 (and (or .cse213 (and (or .cse194 (= |ULTIMATE.start_main_~A~0#1| (+ .cse212 .cse195)) .cse196 .cse197) (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse212 .cse192)) .cse193))) (or .cse214 (and (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse215 .cse192)) .cse193) (or .cse194 (= |ULTIMATE.start_main_~A~0#1| (+ .cse215 .cse195)) .cse196 .cse197)) .cse216)) .cse138) (or .cse134 .cse222 (and (or .cse219 (and (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse220 .cse192)) .cse193) (or .cse194 .cse196 (= |ULTIMATE.start_main_~A~0#1| (+ .cse220 .cse195)) .cse197)) .cse221) (or (and (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse217 .cse192)) .cse193) (or .cse194 .cse196 (= |ULTIMATE.start_main_~A~0#1| (+ .cse217 .cse195)) .cse197)) .cse218)) .cse136)))))))))) (.cse44 (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse118 .cse108) .cse112)) (and (or .cse90 (not (= .cse118 .cse113))) (or .cse81 .cse89 (not (= .cse118 .cse115)))) (and (or .cse98 .cse101 (not (<= 1 .cse109))) (or (not (<= 1 .cse111)) .cse97)))) (.cse45 (or (let ((.cse175 (* .cse118 .cse83))) (and (or .cse174 (= |ULTIMATE.start_main_~A~0#1| (+ .cse175 .cse93)) .cse90) (or .cse81 (= |ULTIMATE.start_main_~A~0#1| (+ .cse175 .cse84)) .cse176 .cse89))) .cse97 (and (or .cse132 (and (or .cse177 (not (<= 1 .cse178)) .cse179) (or (not (<= 1 .cse180)) (and .cse181 .cse182)))) (or .cse130 .cse131 (and (or (not (<= 1 .cse183)) .cse184 .cse185) (or (not (<= 1 .cse186)) .cse187)))))) (.cse0 (or .cse81 .cse156 .cse89 (let ((.cse170 (+ |ULTIMATE.start_main_~r~0#1| .cse149)) (.cse171 (not (>= |ULTIMATE.start_main_~r~0#1| .cse88))) (.cse173 (+ |ULTIMATE.start_main_~r~0#1| .cse148)) (.cse172 (not (>= |ULTIMATE.start_main_~r~0#1| .cse82)))) (and (or .cse98 (and (or (and (or .cse87 (= |ULTIMATE.start_main_~A~0#1| (+ .cse162 .cse170)) .cse171) (or .cse85 .cse86 .cse172 (= |ULTIMATE.start_main_~A~0#1| (+ .cse162 .cse173)))) .cse134 .cse136) (or (and (or .cse87 (= |ULTIMATE.start_main_~A~0#1| (+ .cse167 .cse170)) .cse171) (or .cse85 (= |ULTIMATE.start_main_~A~0#1| (+ .cse167 .cse173)) .cse86 .cse172)) .cse138)) .cse99 .cse101) (or .cse79 (and (or (and (or .cse87 (= |ULTIMATE.start_main_~A~0#1| (+ .cse169 .cse170)) .cse171) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse169 .cse173)) .cse85 .cse86 .cse172)) .cse132) (or .cse130 .cse131 (and (or .cse87 (= |ULTIMATE.start_main_~A~0#1| (+ .cse168 .cse170)) .cse171) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse168 .cse173)) .cse85 .cse86 .cse172)))) .cse97))))) (.cse1 (or .cse90 .cse157 (let ((.cse165 (not (>= |ULTIMATE.start_main_~r~0#1| .cse95))) (.cse166 (+ |ULTIMATE.start_main_~r~0#1| .cse141)) (.cse163 (+ |ULTIMATE.start_main_~r~0#1| .cse140)) (.cse164 (not (>= |ULTIMATE.start_main_~r~0#1| .cse92)))) (and (or .cse98 .cse99 .cse101 (and (or .cse134 .cse136 (and (or .cse91 (= |ULTIMATE.start_main_~A~0#1| (+ .cse162 .cse163)) .cse164) (or .cse165 .cse94 .cse96 (= |ULTIMATE.start_main_~A~0#1| (+ .cse162 .cse166))))) (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse167 .cse166)) .cse165 .cse94 .cse96) (or .cse91 (= |ULTIMATE.start_main_~A~0#1| (+ .cse167 .cse163)) .cse164)) .cse138))) (or .cse79 .cse97 (and (or .cse130 (and (or .cse91 .cse164 (= |ULTIMATE.start_main_~A~0#1| (+ .cse168 .cse163))) (or .cse165 (= |ULTIMATE.start_main_~A~0#1| (+ .cse168 .cse166)) .cse94 .cse96)) .cse131) (or .cse132 (and (or .cse165 .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse169 .cse166)) .cse96) (or .cse91 (= |ULTIMATE.start_main_~A~0#1| (+ .cse169 .cse163)) .cse164))))))))) (.cse3 (or .cse117 .cse158 .cse159)) (.cse6 (or .cse42 .cse161 (not .cse8))) (.cse56 (or (and .cse25 .cse65 .cse13 .cse14 .cse9 .cse78 .cse77 .cse71 .cse72 .cse66 .cse17 .cse7) (and .cse25 .cse65 .cse13 .cse14 .cse9 .cse77 .cse71 .cse72 .cse66 .cse17 .cse7))) (.cse28 (= .cse55 |ULTIMATE.start_main_~A~0#1|)) (.cse41 (or .cse158 .cse159 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse118 .cse160) .cse139)))) (.cse31 (or .cse116 (let ((.cse153 (not .cse157)) (.cse151 (not .cse156))) (and (or .cse98 (and (or .cse150 .cse81 .cse151 .cse89) (or .cse152 .cse90 .cse153)) .cse101) (or .cse97 (and (or .cse154 .cse90 .cse153) (or .cse155 .cse81 .cse151 .cse89))))))) (.cse2 (or .cse13 .cse11)) (.cse34 (or (>= .cse139 .cse120) .cse81 .cse89 (let ((.cse146 (+ .cse139 .cse149)) (.cse147 (not (>= .cse139 .cse88))) (.cse144 (+ .cse139 .cse148)) (.cse145 (not (>= .cse139 .cse82)))) (and (or .cse98 (and (or .cse138 (and (or .cse85 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse144)) .cse86 .cse145) (or .cse87 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse146)) .cse147))) (or .cse134 .cse136 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse135 .cse146)) .cse87 .cse147) (or .cse85 (= |ULTIMATE.start_main_~A~0#1| (+ .cse135 .cse144)) .cse86 .cse145)))) .cse99 .cse101) (or .cse79 (and (or .cse132 (and (or .cse85 .cse86 .cse145 (= |ULTIMATE.start_main_~A~0#1| (+ .cse133 .cse144))) (or .cse87 (= |ULTIMATE.start_main_~A~0#1| (+ .cse133 .cse146)) .cse147))) (or (and (or .cse87 (= |ULTIMATE.start_main_~A~0#1| (+ .cse126 .cse146)) .cse147) (or .cse85 (= |ULTIMATE.start_main_~A~0#1| (+ .cse126 .cse144)) .cse86 .cse145)) .cse130 .cse131)) .cse97))))) (.cse4 (or (= 1 .cse142) (= |ULTIMATE.start_main_~A~0#1| (+ (* (+ .cse123 |ULTIMATE.start_main_~p~0#1|) |ULTIMATE.start_main_~B~0#1|) (+ .cse124 .cse68))) (not (>= .cse124 |ULTIMATE.start_main_~d~0#1|)) (>= .cse124 .cse143))) (.cse19 (or .cse7 (and (<= 1 |ULTIMATE.start_main_~d~0#1|) .cse7))) (.cse32 (or .cse90 (let ((.cse125 (not (>= .cse139 .cse95))) (.cse127 (+ .cse139 .cse141)) (.cse128 (not (>= .cse139 .cse92))) (.cse129 (+ .cse139 .cse140))) (and (or .cse79 (and (or (and (or .cse94 .cse125 .cse96 (= |ULTIMATE.start_main_~A~0#1| (+ .cse126 .cse127))) (or .cse91 .cse128 (= |ULTIMATE.start_main_~A~0#1| (+ .cse126 .cse129)))) .cse130 .cse131) (or .cse132 (and (or .cse91 .cse128 (= |ULTIMATE.start_main_~A~0#1| (+ .cse133 .cse129))) (or .cse94 .cse125 (= |ULTIMATE.start_main_~A~0#1| (+ .cse133 .cse127)) .cse96)))) .cse97) (or .cse98 .cse99 (and (or .cse134 (and (or .cse91 (= |ULTIMATE.start_main_~A~0#1| (+ .cse135 .cse129)) .cse128) (or .cse94 .cse125 (= |ULTIMATE.start_main_~A~0#1| (+ .cse135 .cse127)) .cse96)) .cse136) (or (and (or .cse94 .cse125 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse127)) .cse96) (or .cse91 .cse128 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse129)))) .cse138)) .cse101))) (>= .cse139 .cse119))) (.cse33 (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse118 .cse123) .cse124)) (not (= .cse118 |ULTIMATE.start_main_~d~0#1|)) (not (<= 1 |ULTIMATE.start_main_~p~0#1|)))) (.cse35 (or .cse117 (and (or (not (= .cse118 .cse119)) .cse90) (or .cse81 (not (= .cse118 .cse120)) .cse89)) (and (or (not (<= 1 .cse121)) .cse98 .cse101) (or (not (<= 1 .cse122)) .cse97)))) (.cse36 (or (let ((.cse114 (- .cse113))) (let ((.cse105 (+ .cse112 (+ (- 1) .cse114))) (.cse103 (not (>= .cse112 .cse115))) (.cse107 (+ .cse112 .cse114)) (.cse106 (not (>= .cse112 .cse113)))) (and (or .cse98 (let ((.cse104 (* (+ .cse108 .cse109) |ULTIMATE.start_main_~B~0#1|))) (and (or .cse81 .cse103 (= |ULTIMATE.start_main_~A~0#1| (+ .cse104 .cse105)) .cse89) (or .cse90 .cse106 (= |ULTIMATE.start_main_~A~0#1| (+ .cse104 .cse107))))) .cse101) (or (let ((.cse110 (* (+ .cse108 .cse111) |ULTIMATE.start_main_~B~0#1|))) (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse110 .cse105)) .cse81 .cse103 .cse89) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse110 .cse107)) .cse90 .cse106))) .cse97)))) (>= .cse112 |ULTIMATE.start_main_~d~0#1|) .cse116)) (.cse38 (or (and (or .cse90 (and (or .cse94 .cse96 (= |ULTIMATE.start_main_~B~0#1| .cse95)) (or .cse91 (= |ULTIMATE.start_main_~B~0#1| .cse92)))) (or .cse81 (and (or .cse87 (= |ULTIMATE.start_main_~B~0#1| .cse88)) (or (= |ULTIMATE.start_main_~B~0#1| .cse82) .cse85 .cse86)) .cse89)) (and (or .cse98 .cse101 .cse102) (or .cse80 .cse97)))) (.cse39 (let ((.cse75 (or .cse98 .cse99 (and (or .cse90 (and (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse95 .cse100) .cse93)) .cse96) (or .cse91 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse92 .cse100) .cse93))))) (or .cse81 (and (or .cse85 .cse86 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse82 .cse100) .cse84))) (or .cse87 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse88 .cse100) .cse84)))) .cse89)) .cse101 .cse102)) (.cse76 (or .cse79 .cse80 (and (or .cse81 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse82 .cse83) .cse84)) .cse85 .cse86) (or .cse87 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse88 .cse83) .cse84)))) .cse89) (or .cse90 (and (or .cse91 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse92 .cse83) .cse93))) (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse95 .cse83) .cse93)) .cse96)))) .cse97))) (or (and .cse65 .cse75 .cse61 .cse63 .cse9 .cse76 .cse77 .cse42 .cse66 .cse64 .cse7 .cse69 .cse13 .cse62 .cse46 .cse78 .cse71 .cse72 .cse17 .cse73) (and .cse65 .cse75 .cse61 .cse63 .cse9 .cse76 .cse77 .cse66 .cse64 .cse7 .cse69 .cse13 .cse14 .cse62 .cse46 .cse78 .cse71 .cse72 .cse17 .cse73)))) (.cse57 (= |ULTIMATE.start_main_~d~0#1| .cse59)) (.cse58 (= |ULTIMATE.start_main_~p~0#1| .cse60)) (.cse52 (* .cse74 (- 1))) (.cse29 (= |ULTIMATE.start_main_~p~0#1| 1)) (.cse30 (= |ULTIMATE.start_main_~d~0#1| |ULTIMATE.start_main_~B~0#1|)) (.cse54 (- |ULTIMATE.start_main_~B~0#1|)) (.cse27 (= |ULTIMATE.start_main_~r~0#1| (+ |ULTIMATE.start_main_~A~0#1| .cse68))) (.cse26 (= .cse70 0)) (.cse67 (= |ULTIMATE.start_main_~d~0#1| 1))) (or (and .cse0 .cse1 .cse2 .cse3 .cse4 .cse5 .cse6 .cse7 .cse8) (and .cse9 (= |ULTIMATE.start_main_~p~0#1| 2) .cse5 (= |ULTIMATE.start_main_~q~0#1| .cse10) .cse11 (= |ULTIMATE.start_main_~d~0#1| .cse12) .cse7 .cse13 .cse14 .cse15 .cse16 .cse17 (= |ULTIMATE.start_main_~r~0#1| .cse18) .cse19 .cse8) (and .cse20 .cse21 .cse22 .cse5 .cse23 .cse8 .cse24) (and .cse25 .cse20 .cse13 .cse14 .cse17 .cse26 .cse27 .cse5 .cse23 .cse7 .cse28 .cse24) (and .cse29 .cse21 .cse30 .cse22 .cse5) (and .cse15 .cse29 .cse30 .cse16 (not (>= |ULTIMATE.start_main_~r~0#1| .cse12)) .cse5 .cse19 .cse7) (and .cse31 .cse9 .cse4 .cse5 .cse32 .cse33 .cse7 .cse13 .cse14 .cse2 .cse34 .cse17 .cse19 .cse8 .cse35 .cse36) (and .cse21 .cse29 .cse30 .cse22 .cse5) (and .cse5 .cse6 .cse7 .cse8) (and .cse21 (or (and .cse3 .cse37 .cse38 .cse4 .cse32 .cse33 .cse39 .cse1 .cse34 .cse36 .cse31 .cse40 .cse41 .cse42 .cse21 .cse43 .cse5 .cse44 .cse45 .cse7 .cse0 .cse2 .cse46 .cse17 .cse8 .cse35) (and .cse3 .cse37 .cse38 .cse4 .cse32 .cse33 .cse39 .cse1 .cse14 .cse34 .cse36 .cse31 .cse40 .cse41 .cse21 .cse43 .cse5 .cse44 .cse45 .cse7 .cse0 .cse2 .cse46 .cse17 .cse8 .cse35)) .cse5 .cse7 .cse8) (let ((.cse47 (+ |ULTIMATE.start_main_~A~0#1| (* |ULTIMATE.start_main_~r~0#1| (- 1))))) (and (= .cse47 .cse48) .cse29 .cse5 .cse19 (let ((.cse51 (= 0 (mod (+ |ULTIMATE.start_main_~A~0#1| |ULTIMATE.start_main_~r~0#1|) 2))) (.cse49 (div (+ |ULTIMATE.start_main_~A~0#1| (- |ULTIMATE.start_main_~r~0#1|)) 2)) (.cse50 (< .cse47 0))) (or (and (= |ULTIMATE.start_main_~d~0#1| .cse49) (or (not .cse50) .cse51)) (and (not .cse51) (= |ULTIMATE.start_main_~d~0#1| (+ 1 .cse49)) .cse50))) (= (+ |ULTIMATE.start_main_~q~0#1| .cse52) 0))) (and .cse2 .cse34 .cse4 .cse5 .cse19 .cse32 .cse33 .cse7 .cse8 .cse35 .cse36) (and .cse2 .cse4 .cse5 .cse6 .cse7 .cse8) (and .cse13 .cse14 .cse9 .cse17 .cse5 .cse6 .cse7 .cse8) (let ((.cse53 (+ |ULTIMATE.start_main_~A~0#1| (* |ULTIMATE.start_main_~B~0#1| (- 4))))) (and .cse31 (>= .cse53 |ULTIMATE.start_main_~B~0#1|) (= |ULTIMATE.start_main_~r~0#1| (+ .cse53 .cse54)) .cse5 (= |ULTIMATE.start_main_~q~0#1| (+ .cse10 |ULTIMATE.start_main_~p~0#1|)) .cse0 .cse1 .cse2 (= .cse55 .cse18) (<= |ULTIMATE.start_main_~p~0#1| 1) .cse30 (= (+ |ULTIMATE.start_main_~q~0#1| (- 4)) 1) (not (>= .cse53 .cse12)) .cse8)) (and .cse31 .cse40 .cse9 .cse3 .cse41 .cse37 .cse4 .cse43 .cse5 .cse32 .cse44 .cse45 .cse33 .cse7 .cse0 .cse1 .cse13 .cse14 .cse2 .cse34 .cse17 .cse8 .cse35 .cse36) (and .cse0 .cse1 .cse2 .cse46 .cse3 .cse17 .cse4 .cse5 .cse6 .cse7 .cse56 .cse8) (and (= |ULTIMATE.start_main_~q~0#1| (+ 0 |ULTIMATE.start_main_~p~0#1|)) .cse57 .cse46 .cse17 .cse26 .cse5 .cse27 .cse7 .cse56 .cse28 .cse8 .cse58) (and (or (and .cse31 .cse41 .cse4 .cse5 .cse32 .cse33 .cse7 .cse2 .cse34 .cse19 .cse8 .cse35 .cse36) (and .cse31 .cse2 .cse34 .cse4 .cse5 .cse19 .cse32 .cse33 .cse7 .cse8 .cse35 .cse36)) .cse5 .cse7 .cse8) (and .cse46 .cse21 (= |ULTIMATE.start_main_~d~0#1| (* 2 .cse59)) .cse38 .cse17 .cse22 .cse5 .cse7 .cse39 .cse8 (= |ULTIMATE.start_main_~p~0#1| (* 2 .cse60))) (and .cse57 .cse61 .cse62 .cse46 .cse63 .cse21 .cse17 .cse22 .cse5 (= |ULTIMATE.start_main_~d~0#1| .cse60) .cse64 .cse58) (and .cse65 .cse9 .cse29 .cse66 .cse5 (= |ULTIMATE.start_main_~r~0#1| (+ (+ |ULTIMATE.start_main_~A~0#1| (* |ULTIMATE.start_main_~B~0#1| (- 2))) .cse54)) .cse67 (= |ULTIMATE.start_main_~r~0#1| (+ (+ |ULTIMATE.start_main_~A~0#1| (- 2)) .cse68)) .cse69 .cse13 (= (+ .cse70 .cse52) 0) .cse71 .cse72 .cse30 .cse73 (= (+ |ULTIMATE.start_main_~q~0#1| (- 2)) 1)) (and .cse13 .cse72 .cse29 .cse66 .cse30 (= |ULTIMATE.start_main_~r~0#1| (+ |ULTIMATE.start_main_~A~0#1| .cse54)) .cse5 .cse27 .cse26 (= (+ |ULTIMATE.start_main_~q~0#1| (* 1 (- 1))) 0) .cse67)))))))))) [2023-02-18 18:27:03,362 INFO L899 garLoopResultBuilder]: For program point L12(line 12) no Hoare annotation was computed. [2023-02-18 18:27:03,365 INFO L895 garLoopResultBuilder]: At program point L45-1(line 45) the Hoare annotation is: (let ((.cse102 (div |ULTIMATE.start_main_~d~0#1| 2)) (.cse105 (div |ULTIMATE.start_main_~p~0#1| 2))) (let ((.cse301 (+ .cse105 1)) (.cse304 (+ .cse102 1)) (.cse104 (+ 1 .cse105)) (.cse270 (- .cse102))) (let ((.cse274 (+ (- 1) .cse270)) (.cse180 (+ |ULTIMATE.start_main_~q~0#1| .cse104)) (.cse177 (+ |ULTIMATE.start_main_~q~0#1| .cse105)) (.cse284 (mod |ULTIMATE.start_main_~d~0#1| 2)) (.cse131 (div .cse304 2)) (.cse144 (div |ULTIMATE.start_main_~d~0#1| 4)) (.cse287 (div |ULTIMATE.start_main_~p~0#1| 4)) (.cse288 (div .cse301 2))) (let ((.cse300 (+ .cse288 1)) (.cse299 (+ .cse287 1)) (.cse146 (+ 1 .cse144)) (.cse302 (+ .cse144 1)) (.cse129 (+ 1 .cse131)) (.cse303 (+ .cse131 1)) (.cse74 (- |ULTIMATE.start_main_~d~0#1|)) (.cse99 (= 1 |ULTIMATE.start_main_~p~0#1|)) (.cse81 (= 0 .cse284)) (.cse306 (< |ULTIMATE.start_main_~p~0#1| 0)) (.cse80 (= 0 (mod |ULTIMATE.start_main_~p~0#1| 2))) (.cse179 (+ |ULTIMATE.start_main_~r~0#1| .cse270)) (.cse305 (< |ULTIMATE.start_main_~d~0#1| 0)) (.cse308 (* .cse177 |ULTIMATE.start_main_~B~0#1|)) (.cse307 (* .cse180 |ULTIMATE.start_main_~B~0#1|)) (.cse178 (+ |ULTIMATE.start_main_~r~0#1| .cse274)) (.cse103 (+ 1 .cse102))) (let ((.cse119 (= 0 (mod .cse301 2))) (.cse291 (< .cse104 0)) (.cse292 (< .cse105 0)) (.cse127 (= 0 (mod .cse105 2))) (.cse138 (= 0 (mod .cse102 2))) (.cse293 (< .cse102 0)) (.cse114 (= 0 (mod .cse304 2))) (.cse294 (< .cse103 0)) (.cse132 (- .cse131)) (.cse123 (= 1 .cse105)) (.cse122 (= 1 .cse104)) (.cse150 (= |ULTIMATE.start_main_~A~0#1| (+ .cse307 .cse178))) (.cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse308 .cse178))) (.cse85 (not .cse305)) (.cse154 (= |ULTIMATE.start_main_~A~0#1| (+ .cse308 .cse179))) (.cse94 (and .cse306 (not .cse80))) (.cse152 (= |ULTIMATE.start_main_~A~0#1| (+ .cse307 .cse179))) (.cse91 (not .cse306)) (.cse86 (and .cse305 (not .cse81))) (.cse51 (= |ULTIMATE.start_main_~A~0#1| (+ (* |ULTIMATE.start_main_~d~0#1| |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse108 (not .cse99)) (.cse109 (+ |ULTIMATE.start_main_~r~0#1| .cse74)) (.cse143 (- .cse144)) (.cse158 (+ |ULTIMATE.start_main_~q~0#1| |ULTIMATE.start_main_~p~0#1|)) (.cse147 (* 2 |ULTIMATE.start_main_~d~0#1|)) (.cse290 (* 2 |ULTIMATE.start_main_~p~0#1|)) (.cse261 (div .cse304 4)) (.cse295 (< .cse131 0)) (.cse252 (= 0 (mod .cse131 2))) (.cse249 (= 0 (mod .cse303 2))) (.cse296 (< .cse129 0)) (.cse260 (div .cse303 2)) (.cse233 (div |ULTIMATE.start_main_~d~0#1| 8)) (.cse297 (< .cse144 0)) (.cse202 (= 0 (mod .cse144 2))) (.cse236 (div .cse302 2)) (.cse298 (< .cse146 0)) (.cse213 (= 0 (mod .cse302 2))) (.cse188 (div |ULTIMATE.start_main_~p~0#1| 8)) (.cse185 (= 0 (mod .cse287 2))) (.cse286 (+ 1 .cse287)) (.cse194 (div .cse299 2)) (.cse289 (+ 1 .cse288)) (.cse239 (div .cse300 2)) (.cse240 (div .cse301 4))) (let ((.cse222 (= 0 (mod .cse288 2))) (.cse264 (< .cse288 0)) (.cse241 (+ 1 .cse240)) (.cse229 (= 0 (mod .cse300 2))) (.cse238 (+ 1 .cse239)) (.cse265 (< .cse289 0)) (.cse191 (+ 1 .cse194)) (.cse192 (= 0 (mod .cse299 2))) (.cse266 (< .cse286 0)) (.cse189 (not .cse185)) (.cse190 (< .cse287 0)) (.cse186 (+ 1 .cse188)) (.cse216 (and .cse298 (not .cse213))) (.cse215 (not .cse298)) (.cse234 (+ 1 .cse236)) (.cse201 (and .cse297 (not .cse202))) (.cse232 (+ 1 .cse233)) (.cse205 (not .cse297)) (.cse259 (+ 1 .cse260)) (.cse247 (not .cse296)) (.cse245 (and .cse296 (not .cse249))) (.cse256 (and .cse295 (not .cse252))) (.cse251 (not .cse295)) (.cse263 (+ 1 .cse261)) (.cse93 (div .cse290 4)) (.cse96 (div .cse147 4)) (.cse89 (+ |ULTIMATE.start_main_~q~0#1| .cse290)) (.cse95 (+ |ULTIMATE.start_main_~r~0#1| (- .cse147))) (.cse267 (* (+ .cse158 .cse104) |ULTIMATE.start_main_~B~0#1|)) (.cse269 (* (+ .cse158 .cse105) |ULTIMATE.start_main_~B~0#1|)) (.cse171 (* 2 1)) (.cse56 (* 2 |ULTIMATE.start_main_~B~0#1|)) (.cse197 (= 1 .cse287)) (.cse210 (= 1 .cse286)) (.cse230 (= 1 .cse289)) (.cse219 (= 1 .cse288)) (.cse145 (+ (- 1) .cse143)) (.cse19 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse158 |ULTIMATE.start_main_~B~0#1|) .cse109))) (.cse20 (or .cse51 .cse108)) (.cse14 (= |ULTIMATE.start_main_~r~0#1| |ULTIMATE.start_main_~A~0#1|)) (.cse78 (or (and (or .cse154 .cse94) (or .cse80 .cse152 .cse91)) .cse86)) (.cse73 (or (and (or .cse80 .cse150 .cse91) (or .cse155 .cse94)) .cse81 .cse85)) (.cse15 (= |ULTIMATE.start_main_~q~0#1| 0)) (.cse2 (= |ULTIMATE.start_main_~B~0#1| 1)) (.cse4 (= |ULTIMATE.start_main_~A~0#1| (+ (* |ULTIMATE.start_main_~q~0#1| |ULTIMATE.start_main_~B~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse11 (= |ULTIMATE.start_main_~d~0#1| (* |ULTIMATE.start_main_~B~0#1| |ULTIMATE.start_main_~p~0#1|))) (.cse271 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse103 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|)) .cse81 .cse85) (or .cse86 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse102 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))))) (.cse272 (and (or .cse94 (not .cse123)) (or .cse80 (not .cse122) .cse91))) (.cse275 (* (+ .cse180 .cse288) |ULTIMATE.start_main_~B~0#1|)) (.cse277 (* (+ .cse180 .cse289) |ULTIMATE.start_main_~B~0#1|)) (.cse279 (* (+ .cse177 .cse286) |ULTIMATE.start_main_~B~0#1|)) (.cse280 (* (+ .cse177 .cse287) |ULTIMATE.start_main_~B~0#1|)) (.cse130 (+ (- 1) .cse132)) (.cse285 (div .cse74 (- 2))) (.cse116 (and (not .cse114) .cse294)) (.cse111 (not .cse294)) (.cse136 (not .cse293)) (.cse140 (and (not .cse138) .cse293)) (.cse124 (and .cse292 (not .cse127))) (.cse128 (not .cse292)) (.cse120 (not .cse291)) (.cse110 (and .cse291 (not .cse119))) (.cse101 (* |ULTIMATE.start_main_~B~0#1| 1)) (.cse44 (- (* 2 .cse147)))) (let ((.cse107 (not (= 0 |ULTIMATE.start_main_~q~0#1|))) (.cse63 (not (>= |ULTIMATE.start_main_~r~0#1| |ULTIMATE.start_main_~d~0#1|))) (.cse126 (* (+ .cse158 .cse286) |ULTIMATE.start_main_~B~0#1|)) (.cse125 (* (+ .cse158 .cse287) |ULTIMATE.start_main_~B~0#1|)) (.cse121 (* (+ .cse158 .cse289) |ULTIMATE.start_main_~B~0#1|)) (.cse112 (* (+ .cse158 .cse288) |ULTIMATE.start_main_~B~0#1|)) (.cse133 (= 1 .cse290)) (.cse134 (+ |ULTIMATE.start_main_~q~0#1| (* 2 .cse290))) (.cse135 (+ |ULTIMATE.start_main_~r~0#1| .cse44)) (.cse100 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse101 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse148 (and (or (and (or .cse124 (not (<= 1 .cse287))) (or .cse127 .cse128 (not (<= 1 .cse286)))) .cse94) (or .cse80 .cse91 (and (or (not (<= 1 .cse289)) .cse119 .cse120) (or .cse110 (not (<= 1 .cse288))))))) (.cse149 (and (or .cse81 (and (or .cse116 (not (= .cse101 .cse131))) (or .cse111 .cse114 (not (= .cse101 .cse129)))) .cse85) (or .cse86 (and (or .cse136 (not (= .cse101 .cse146)) .cse138) (or .cse140 (not (= .cse101 .cse144))))))) (.cse76 (+ |ULTIMATE.start_main_~q~0#1| (* |ULTIMATE.start_main_~p~0#1| (- 1)))) (.cse157 (>= |ULTIMATE.start_main_~r~0#1| .cse102)) (.cse156 (>= |ULTIMATE.start_main_~r~0#1| .cse103)) (.cse159 (* (+ |ULTIMATE.start_main_~q~0#1| .cse289) |ULTIMATE.start_main_~B~0#1|)) (.cse164 (* (+ |ULTIMATE.start_main_~q~0#1| .cse288) |ULTIMATE.start_main_~B~0#1|)) (.cse166 (* (+ |ULTIMATE.start_main_~q~0#1| .cse287) |ULTIMATE.start_main_~B~0#1|)) (.cse165 (* (+ |ULTIMATE.start_main_~q~0#1| .cse286) |ULTIMATE.start_main_~B~0#1|)) (.cse68 (<= 2 .cse285)) (.cse70 (>= |ULTIMATE.start_main_~r~0#1| .cse285)) (.cse71 (= .cse284 0)) (.cse75 (or .cse81 (let ((.cse283 (+ .cse178 .cse130)) (.cse282 (+ .cse178 .cse132))) (and (or .cse80 (and (or .cse116 (and (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ .cse275 .cse282))) (or .cse119 (= |ULTIMATE.start_main_~A~0#1| (+ .cse277 .cse282)) .cse120))) (or .cse111 .cse114 (and (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ .cse275 .cse283))) (or .cse119 (= |ULTIMATE.start_main_~A~0#1| (+ .cse277 .cse283)) .cse120)))) .cse91) (or (and (or (and (or .cse124 (= |ULTIMATE.start_main_~A~0#1| (+ .cse280 .cse283))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse279 .cse283)) .cse127 .cse128)) .cse111 .cse114) (or .cse116 (and (or .cse127 .cse128 (= |ULTIMATE.start_main_~A~0#1| (+ .cse279 .cse282))) (or .cse124 (= |ULTIMATE.start_main_~A~0#1| (+ .cse280 .cse282)))))) .cse94))) .cse85)) (.cse69 (let ((.cse281 (or .cse271 .cse272))) (or (and .cse19 .cse281 .cse51 .cse14 .cse78 .cse73 .cse15 .cse2 .cse4 .cse11) (and .cse19 .cse20 .cse281 .cse14 .cse78 .cse73 .cse15 .cse2 .cse4 .cse11)))) (.cse9 (or (and (or .cse81 (= |ULTIMATE.start_main_~B~0#1| .cse103) .cse85) (or .cse86 (= |ULTIMATE.start_main_~B~0#1| .cse102))) .cse272)) (.cse79 (or .cse86 (let ((.cse276 (+ .cse179 .cse143)) (.cse278 (+ .cse179 .cse145))) (and (or .cse80 (and (or .cse140 (and (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ .cse275 .cse276))) (or .cse119 .cse120 (= |ULTIMATE.start_main_~A~0#1| (+ .cse277 .cse276))))) (or .cse136 (and (or .cse119 (= |ULTIMATE.start_main_~A~0#1| (+ .cse277 .cse278)) .cse120) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse275 .cse278)) .cse110)) .cse138)) .cse91) (or .cse94 (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse279 .cse276)) .cse127 .cse128) (or .cse124 (= |ULTIMATE.start_main_~A~0#1| (+ .cse280 .cse276)))) .cse140) (or (and (or .cse127 .cse128 (= |ULTIMATE.start_main_~A~0#1| (+ .cse279 .cse278))) (or .cse124 (= |ULTIMATE.start_main_~A~0#1| (+ .cse280 .cse278)))) .cse136 .cse138))))))) (.cse181 (and (or .cse119 (not .cse230) .cse120) (or (not .cse219) .cse110))) (.cse176 (and (or .cse124 (not .cse197)) (or .cse127 .cse128 (not .cse210)))) (.cse66 (* 2 .cse56)) (.cse67 (* 2 .cse171)) (.cse41 (+ |ULTIMATE.start_main_~r~0#1| |ULTIMATE.start_main_~d~0#1|)) (.cse175 (or (and (or .cse81 .cse85 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse103 .cse158) .cse109))) (or .cse86 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse102 .cse158) .cse109)))) .cse99 .cse272)) (.cse18 (<= 2 |ULTIMATE.start_main_~d~0#1|)) (.cse72 (or (let ((.cse273 (+ .cse109 .cse274))) (and (or .cse80 (= |ULTIMATE.start_main_~A~0#1| (+ .cse267 .cse273)) .cse91) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse269 .cse273)) .cse94))) .cse81 .cse85)) (.cse32 (= |ULTIMATE.start_main_~A~0#1| (+ (* (+ .cse89 |ULTIMATE.start_main_~p~0#1|) |ULTIMATE.start_main_~B~0#1|) (+ .cse95 .cse74)))) (.cse174 (or .cse99 .cse271 .cse272)) (.cse77 (or .cse86 (let ((.cse268 (+ .cse109 .cse270))) (and (or .cse80 .cse91 (= |ULTIMATE.start_main_~A~0#1| (+ .cse267 .cse268))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse269 .cse268)) .cse94))))) (.cse10 (or .cse108 (= |ULTIMATE.start_main_~B~0#1| |ULTIMATE.start_main_~d~0#1|))) (.cse98 (+ 1 .cse96)) (.cse90 (+ 1 .cse93)) (.cse184 (and (or .cse111 .cse114 (and (or (not (= .cse101 .cse259)) .cse247 .cse249) (or .cse245 (not (= .cse101 .cse260))))) (or .cse116 (and (or (not (= .cse101 .cse261)) .cse256) (or .cse251 (not (= .cse101 .cse263)) .cse252))))) (.cse182 (and (or (and (or .cse216 (not (= .cse101 .cse236))) (or .cse213 .cse215 (not (= .cse101 .cse234)))) .cse136 .cse138) (or .cse140 (and (or .cse201 (not (= .cse101 .cse233))) (or .cse202 (not (= .cse101 .cse232)) .cse205))))) (.cse207 (* (+ .cse177 .cse186) |ULTIMATE.start_main_~B~0#1|)) (.cse187 (not .cse190)) (.cse206 (and .cse190 .cse189)) (.cse199 (* (+ .cse177 .cse188) |ULTIMATE.start_main_~B~0#1|)) (.cse209 (* (+ .cse177 .cse194) |ULTIMATE.start_main_~B~0#1|)) (.cse195 (and (not .cse192) .cse266)) (.cse193 (not .cse266)) (.cse208 (* (+ .cse177 .cse191) |ULTIMATE.start_main_~B~0#1|)) (.cse227 (not .cse265)) (.cse228 (* (+ .cse180 .cse238) |ULTIMATE.start_main_~B~0#1|)) (.cse225 (* (+ .cse180 .cse239) |ULTIMATE.start_main_~B~0#1|)) (.cse226 (and .cse265 (not .cse229))) (.cse223 (* (+ .cse180 .cse241) |ULTIMATE.start_main_~B~0#1|)) (.cse224 (not .cse264)) (.cse220 (* (+ .cse180 .cse240) |ULTIMATE.start_main_~B~0#1|)) (.cse221 (and .cse264 (not .cse222)))) (let ((.cse13 (= |ULTIMATE.start_main_~d~0#1| .cse171)) (.cse16 (= |ULTIMATE.start_main_~p~0#1| .cse171)) (.cse17 (= |ULTIMATE.start_main_~d~0#1| .cse56)) (.cse46 (or (let ((.cse258 (- .cse260)) (.cse262 (- .cse261))) (let ((.cse257 (>= .cse178 .cse131)) (.cse250 (+ .cse178 (+ (- 1) .cse262))) (.cse253 (not (>= .cse178 .cse263))) (.cse255 (+ .cse178 .cse262)) (.cse254 (not (>= .cse178 .cse261))) (.cse243 (+ .cse178 .cse258)) (.cse244 (not (>= .cse178 .cse260))) (.cse246 (not (>= .cse178 .cse259))) (.cse248 (+ .cse178 (+ (- 1) .cse258))) (.cse242 (>= .cse178 .cse129))) (and (or (and (or .cse111 .cse114 .cse242 (and (or .cse197 .cse124 (and (or .cse185 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse207 .cse243)) .cse244 .cse245) (or .cse246 .cse247 (= |ULTIMATE.start_main_~A~0#1| (+ .cse207 .cse248)) .cse249)) .cse187) (or .cse206 (and (or .cse246 .cse247 (= |ULTIMATE.start_main_~A~0#1| (+ .cse199 .cse248)) .cse249) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse199 .cse243)) .cse244 .cse245))))) (or .cse127 .cse128 (and (or .cse193 .cse192 (and (or .cse244 (= |ULTIMATE.start_main_~A~0#1| (+ .cse208 .cse243)) .cse245) (or .cse246 (= |ULTIMATE.start_main_~A~0#1| (+ .cse208 .cse248)) .cse247 .cse249))) (or .cse195 (and (or .cse246 (= |ULTIMATE.start_main_~A~0#1| (+ .cse209 .cse248)) .cse247 .cse249) (or .cse244 .cse245 (= |ULTIMATE.start_main_~A~0#1| (+ .cse209 .cse243)))))) .cse210))) (or .cse116 (and (or .cse197 (and (or .cse185 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse207 .cse250)) .cse251 .cse252 .cse253) (or .cse254 (= |ULTIMATE.start_main_~A~0#1| (+ .cse207 .cse255)) .cse256)) .cse187) (or .cse206 (and (or .cse251 .cse252 .cse253 (= |ULTIMATE.start_main_~A~0#1| (+ .cse199 .cse250))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse199 .cse255)) .cse254 .cse256)))) .cse124) (or (and (or (and (or .cse254 .cse256 (= |ULTIMATE.start_main_~A~0#1| (+ .cse209 .cse255))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse209 .cse250)) .cse251 .cse252 .cse253)) .cse195) (or .cse193 .cse192 (and (or .cse254 (= |ULTIMATE.start_main_~A~0#1| (+ .cse208 .cse255)) .cse256) (or .cse251 .cse252 (= |ULTIMATE.start_main_~A~0#1| (+ .cse208 .cse250)) .cse253)))) .cse127 .cse128 .cse210)) .cse257)) .cse94) (or .cse80 (and (or .cse116 .cse257 (and (or .cse119 .cse230 .cse120 (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse228 .cse250)) .cse251 .cse252 .cse253) (or .cse254 (= |ULTIMATE.start_main_~A~0#1| (+ .cse228 .cse255)) .cse256)) .cse227 .cse229) (or (and (or .cse251 .cse252 (= |ULTIMATE.start_main_~A~0#1| (+ .cse225 .cse250)) .cse253) (or .cse254 (= |ULTIMATE.start_main_~A~0#1| (+ .cse225 .cse255)) .cse256)) .cse226))) (or .cse219 .cse110 (and (or .cse222 (and (or .cse254 (= |ULTIMATE.start_main_~A~0#1| (+ .cse223 .cse255)) .cse256) (or .cse251 .cse252 (= |ULTIMATE.start_main_~A~0#1| (+ .cse223 .cse250)) .cse253)) .cse224) (or .cse221 (and (or .cse251 .cse252 (= |ULTIMATE.start_main_~A~0#1| (+ .cse220 .cse250)) .cse253) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse220 .cse255)) .cse254 .cse256))))))) (or .cse111 (and (or .cse119 .cse230 .cse120 (and (or .cse227 .cse229 (and (or .cse246 .cse247 (= |ULTIMATE.start_main_~A~0#1| (+ .cse228 .cse248)) 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(and (or .cse198 (= |ULTIMATE.start_main_~A~0#1| (+ .cse208 .cse200)) .cse201) (or .cse202 .cse204 (= |ULTIMATE.start_main_~A~0#1| (+ .cse208 .cse203)) .cse205)) .cse193 .cse192) (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse209 .cse203)) .cse202 .cse204 .cse205) (or .cse198 (= |ULTIMATE.start_main_~A~0#1| (+ .cse209 .cse200)) .cse201)) .cse195)) .cse128 .cse210))) (or .cse211 .cse136 .cse138 (and (or (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse199 .cse212)) .cse213 .cse214 .cse215) (or .cse216 .cse217 (= |ULTIMATE.start_main_~A~0#1| (+ .cse199 .cse218)))) .cse206) (or (and (or .cse216 .cse217 (= |ULTIMATE.start_main_~A~0#1| (+ .cse207 .cse218))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse207 .cse212)) .cse213 .cse214 .cse215)) .cse185 .cse187)) .cse197 .cse124) (or .cse127 .cse128 (and (or (and (or .cse216 .cse217 (= |ULTIMATE.start_main_~A~0#1| (+ .cse208 .cse218))) (or .cse213 .cse214 .cse215 (= |ULTIMATE.start_main_~A~0#1| (+ .cse208 .cse212)))) .cse193 .cse192) (or (and (or .cse216 .cse217 (= |ULTIMATE.start_main_~A~0#1| (+ .cse209 .cse218))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse209 .cse212)) .cse213 .cse214 .cse215)) .cse195)) .cse210))))) (or .cse80 .cse91 (and (or .cse211 .cse136 (and (or .cse219 .cse110 (and (or (and (or .cse216 (= |ULTIMATE.start_main_~A~0#1| (+ .cse220 .cse218)) .cse217) (or .cse213 .cse214 (= |ULTIMATE.start_main_~A~0#1| (+ .cse220 .cse212)) .cse215)) .cse221) (or .cse222 (and (or .cse216 .cse217 (= |ULTIMATE.start_main_~A~0#1| (+ .cse223 .cse218))) (or .cse213 .cse214 .cse215 (= |ULTIMATE.start_main_~A~0#1| (+ .cse223 .cse212)))) .cse224))) (or (and (or (and (or .cse216 .cse217 (= |ULTIMATE.start_main_~A~0#1| (+ .cse225 .cse218))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse225 .cse212)) .cse213 .cse214 .cse215)) .cse226) (or .cse227 (and (or .cse216 .cse217 (= |ULTIMATE.start_main_~A~0#1| (+ .cse228 .cse218))) (or .cse213 (= |ULTIMATE.start_main_~A~0#1| (+ .cse228 .cse212)) .cse214 .cse215)) .cse229)) .cse119 .cse230 .cse120)) .cse138) (or .cse140 .cse196 (and (or .cse219 (and (or .cse221 (and (or .cse202 (= |ULTIMATE.start_main_~A~0#1| (+ .cse220 .cse203)) .cse204 .cse205) (or .cse198 (= |ULTIMATE.start_main_~A~0#1| (+ .cse220 .cse200)) .cse201))) (or .cse222 (and (or .cse198 (= |ULTIMATE.start_main_~A~0#1| (+ .cse223 .cse200)) .cse201) (or .cse202 (= |ULTIMATE.start_main_~A~0#1| (+ .cse223 .cse203)) .cse204 .cse205)) .cse224)) .cse110) (or .cse119 .cse230 (and (or .cse227 (and (or .cse198 (= |ULTIMATE.start_main_~A~0#1| (+ .cse228 .cse200)) .cse201) (or .cse202 .cse204 (= |ULTIMATE.start_main_~A~0#1| (+ .cse228 .cse203)) .cse205)) .cse229) (or (and (or .cse198 (= |ULTIMATE.start_main_~A~0#1| (+ .cse225 .cse200)) .cse201) (or .cse202 .cse204 (= |ULTIMATE.start_main_~A~0#1| (+ .cse225 .cse203)) .cse205)) .cse226)) .cse120)))))))))) (.cse53 (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse101 .cse89) .cse95)) (and (or .cse86 (not (= .cse101 .cse96))) (or .cse81 .cse85 (not (= .cse101 .cse98)))) (and (or .cse80 .cse91 (not (<= 1 .cse90))) (or (not (<= 1 .cse93)) .cse94)))) (.cse54 (or (let ((.cse183 (* .cse101 .cse177))) (and (or .cse182 (= |ULTIMATE.start_main_~A~0#1| (+ .cse183 .cse179)) .cse86) (or .cse81 (= |ULTIMATE.start_main_~A~0#1| (+ .cse183 .cse178)) .cse184 .cse85))) .cse94 (and (or .cse124 (and (or .cse185 (not (<= 1 .cse186)) .cse187) (or (not (<= 1 .cse188)) (and .cse189 .cse190)))) (or .cse127 .cse128 (and (or (not (<= 1 .cse191)) .cse192 .cse193) (or (not (<= 1 .cse194)) .cse195)))))) (.cse5 (or (and .cse18 .cse72 .cse19 .cse20 .cse32 .cse175 .cse174 .cse77 .cse78 .cse73 .cse10 .cse4) (and .cse18 .cse72 .cse19 .cse20 .cse32 .cse174 .cse77 .cse78 .cse73 .cse10 .cse4))) (.cse23 (= .cse41 |ULTIMATE.start_main_~A~0#1|)) (.cse43 (+ 0 .cse67)) (.cse42 (+ |ULTIMATE.start_main_~A~0#1| (- .cse66))) (.cse47 (or (and (or .cse86 (and (or .cse136 .cse138 (= |ULTIMATE.start_main_~B~0#1| .cse146)) (or .cse140 (= |ULTIMATE.start_main_~B~0#1| .cse144)))) (or .cse81 (and (or .cse116 (= |ULTIMATE.start_main_~B~0#1| .cse131)) (or (= |ULTIMATE.start_main_~B~0#1| .cse129) .cse111 .cse114)) .cse85)) (and (or .cse80 .cse91 .cse181) (or .cse176 .cse94)))) (.cse48 (let ((.cse172 (or .cse80 .cse122 (and (or .cse86 (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse146 .cse180) .cse179)) .cse138) (or .cse140 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse144 .cse180) .cse179))))) (or .cse81 (and (or .cse111 .cse114 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse129 .cse180) .cse178))) (or .cse116 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse131 .cse180) .cse178)))) .cse85)) .cse91 .cse181)) (.cse173 (or .cse123 .cse176 (and (or .cse81 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse129 .cse177) .cse178)) .cse111 .cse114) (or .cse116 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse131 .cse177) .cse178)))) .cse85) (or .cse86 (and (or .cse140 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse144 .cse177) .cse179))) (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse146 .cse177) .cse179)) .cse138)))) .cse94))) (or (and .cse72 .cse172 .cse68 .cse70 .cse32 .cse173 .cse174 .cse51 .cse73 .cse71 .cse4 .cse75 .cse19 .cse69 .cse9 .cse175 .cse77 .cse78 .cse10 .cse79) (and .cse72 .cse172 .cse68 .cse70 .cse32 .cse173 .cse174 .cse73 .cse71 .cse4 .cse75 .cse19 .cse20 .cse69 .cse9 .cse175 .cse77 .cse78 .cse10 .cse79)))) (.cse61 (= |ULTIMATE.start_main_~d~0#1| .cse66)) (.cse62 (= |ULTIMATE.start_main_~p~0#1| .cse67)) (.cse64 (= (+ |ULTIMATE.start_main_~q~0#1| (* .cse67 (- 1))) 0)) (.cse65 (= (+ |ULTIMATE.start_main_~r~0#1| .cse66) |ULTIMATE.start_main_~A~0#1|)) (.cse39 (* |ULTIMATE.start_main_~B~0#1| 2)) (.cse60 (* .cse171 (- 1))) (.cse6 (or .cse81 .cse156 .cse85 (let ((.cse167 (+ |ULTIMATE.start_main_~r~0#1| .cse132)) (.cse168 (not (>= |ULTIMATE.start_main_~r~0#1| .cse131))) (.cse170 (+ |ULTIMATE.start_main_~r~0#1| .cse130)) (.cse169 (not (>= |ULTIMATE.start_main_~r~0#1| .cse129)))) (and (or .cse80 (and (or (and (or .cse116 (= |ULTIMATE.start_main_~A~0#1| (+ .cse159 .cse167)) .cse168) (or .cse111 .cse114 .cse169 (= |ULTIMATE.start_main_~A~0#1| (+ .cse159 .cse170)))) .cse119 .cse120) (or (and (or .cse116 (= |ULTIMATE.start_main_~A~0#1| (+ .cse164 .cse167)) .cse168) (or .cse111 (= |ULTIMATE.start_main_~A~0#1| (+ .cse164 .cse170)) .cse114 .cse169)) .cse110)) .cse122 .cse91) (or .cse123 (and (or (and (or .cse116 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse167)) .cse168) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse170)) .cse111 .cse114 .cse169)) .cse124) (or .cse127 .cse128 (and (or .cse116 (= |ULTIMATE.start_main_~A~0#1| (+ .cse165 .cse167)) .cse168) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse165 .cse170)) .cse111 .cse114 .cse169)))) .cse94))))) (.cse7 (or .cse86 .cse157 (let ((.cse162 (not (>= |ULTIMATE.start_main_~r~0#1| .cse146))) (.cse163 (+ |ULTIMATE.start_main_~r~0#1| .cse145)) (.cse160 (+ |ULTIMATE.start_main_~r~0#1| .cse143)) (.cse161 (not (>= |ULTIMATE.start_main_~r~0#1| .cse144)))) (and (or .cse80 .cse122 .cse91 (and (or .cse119 .cse120 (and (or .cse140 (= |ULTIMATE.start_main_~A~0#1| (+ .cse159 .cse160)) .cse161) (or .cse162 .cse136 .cse138 (= |ULTIMATE.start_main_~A~0#1| (+ .cse159 .cse163))))) (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse164 .cse163)) .cse162 .cse136 .cse138) (or .cse140 (= |ULTIMATE.start_main_~A~0#1| (+ .cse164 .cse160)) .cse161)) .cse110))) (or .cse123 .cse94 (and (or .cse127 (and (or .cse140 .cse161 (= |ULTIMATE.start_main_~A~0#1| (+ .cse165 .cse160))) (or .cse162 (= |ULTIMATE.start_main_~A~0#1| (+ .cse165 .cse163)) .cse136 .cse138)) .cse128) (or .cse124 (and (or .cse162 .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse163)) .cse138) (or .cse140 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse160)) .cse161))))))))) (.cse3 (or .cse51 .cse108 (not .cse11))) (.cse30 (= |ULTIMATE.start_main_~p~0#1| 1)) (.cse31 (= |ULTIMATE.start_main_~d~0#1| |ULTIMATE.start_main_~B~0#1|)) (.cse40 (- |ULTIMATE.start_main_~B~0#1|)) (.cse22 (= |ULTIMATE.start_main_~r~0#1| (+ |ULTIMATE.start_main_~A~0#1| .cse74))) (.cse21 (= .cse76 0)) (.cse45 (= |ULTIMATE.start_main_~d~0#1| 1)) (.cse50 (or .cse148 .cse149 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse101 .cse158) .cse109)))) (.cse33 (or .cse99 (let ((.cse153 (not .cse157)) (.cse151 (not .cse156))) (and (or .cse80 (and (or .cse150 .cse81 .cse151 .cse85) (or .cse152 .cse86 .cse153)) .cse91) (or .cse94 (and (or .cse154 .cse86 .cse153) (or .cse155 .cse81 .cse151 .cse85))))))) (.cse0 (or .cse100 .cse148 .cse149)) (.cse1 (or .cse133 (= |ULTIMATE.start_main_~A~0#1| (+ (* (+ .cse134 |ULTIMATE.start_main_~p~0#1|) |ULTIMATE.start_main_~B~0#1|) (+ .cse135 .cse74))) (not (>= .cse135 |ULTIMATE.start_main_~d~0#1|)) (>= .cse135 .cse147))) (.cse24 (or .cse86 (let ((.cse137 (not (>= .cse109 .cse146))) (.cse139 (+ .cse109 .cse145)) (.cse141 (not (>= .cse109 .cse144))) (.cse142 (+ .cse109 .cse143))) (and (or .cse123 (and (or (and (or .cse136 .cse137 .cse138 (= |ULTIMATE.start_main_~A~0#1| (+ .cse126 .cse139))) (or .cse140 .cse141 (= |ULTIMATE.start_main_~A~0#1| (+ .cse126 .cse142)))) .cse127 .cse128) (or .cse124 (and (or .cse140 .cse141 (= |ULTIMATE.start_main_~A~0#1| (+ .cse125 .cse142))) (or .cse136 .cse137 (= |ULTIMATE.start_main_~A~0#1| (+ .cse125 .cse139)) .cse138)))) .cse94) (or .cse80 .cse122 (and (or .cse119 (and (or .cse140 (= |ULTIMATE.start_main_~A~0#1| (+ .cse121 .cse142)) .cse141) (or .cse136 .cse137 (= |ULTIMATE.start_main_~A~0#1| (+ .cse121 .cse139)) .cse138)) .cse120) (or (and (or .cse136 .cse137 (= |ULTIMATE.start_main_~A~0#1| (+ .cse112 .cse139)) .cse138) (or .cse140 .cse141 (= |ULTIMATE.start_main_~A~0#1| (+ .cse112 .cse142)))) .cse110)) .cse91))) (>= .cse109 .cse102))) (.cse25 (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse101 .cse134) .cse135)) (not (= .cse101 |ULTIMATE.start_main_~d~0#1|)) (not (<= 1 |ULTIMATE.start_main_~p~0#1|)))) (.cse8 (or .cse19 .cse63)) (.cse26 (or .cse107 .cse133 .cse108 (= |ULTIMATE.start_main_~A~0#1| (+ (* |ULTIMATE.start_main_~d~0#1| .cse89) .cse95)))) (.cse27 (or (>= .cse109 .cse103) .cse81 .cse85 (let ((.cse117 (+ .cse109 .cse132)) (.cse118 (not (>= .cse109 .cse131))) (.cse113 (+ .cse109 .cse130)) (.cse115 (not (>= .cse109 .cse129)))) (and (or .cse80 (and (or .cse110 (and (or .cse111 (= |ULTIMATE.start_main_~A~0#1| (+ .cse112 .cse113)) .cse114 .cse115) (or .cse116 (= |ULTIMATE.start_main_~A~0#1| (+ .cse112 .cse117)) .cse118))) (or .cse119 .cse120 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse121 .cse117)) .cse116 .cse118) (or .cse111 (= |ULTIMATE.start_main_~A~0#1| (+ .cse121 .cse113)) .cse114 .cse115)))) .cse122 .cse91) (or .cse123 (and (or .cse124 (and (or .cse111 .cse114 .cse115 (= |ULTIMATE.start_main_~A~0#1| (+ .cse125 .cse113))) (or .cse116 (= |ULTIMATE.start_main_~A~0#1| (+ .cse125 .cse117)) .cse118))) (or (and (or .cse116 (= |ULTIMATE.start_main_~A~0#1| (+ .cse126 .cse117)) .cse118) (or .cse111 (= |ULTIMATE.start_main_~A~0#1| (+ .cse126 .cse113)) .cse114 .cse115)) .cse127 .cse128)) .cse94))))) (.cse28 (let ((.cse106 (or .cse107 .cse51 .cse108))) (or (and .cse106 .cse4) (and (<= 1 |ULTIMATE.start_main_~d~0#1|) .cse106 .cse4)))) (.cse12 (or .cse100 (and (or (not (= .cse101 .cse102)) .cse86) (or .cse81 (not (= .cse101 .cse103)) .cse85)) (and (or (not (<= 1 .cse104)) .cse80 .cse91) (or (not (<= 1 .cse105)) .cse94)))) (.cse29 (or (let ((.cse97 (- .cse96))) (let ((.cse84 (+ .cse95 (+ (- 1) .cse97))) (.cse82 (not (>= .cse95 .cse98))) (.cse88 (+ .cse95 .cse97)) (.cse87 (not (>= .cse95 .cse96)))) (and (or .cse80 (let ((.cse83 (* (+ .cse89 .cse90) |ULTIMATE.start_main_~B~0#1|))) (and (or .cse81 .cse82 (= |ULTIMATE.start_main_~A~0#1| (+ .cse83 .cse84)) .cse85) (or .cse86 .cse87 (= |ULTIMATE.start_main_~A~0#1| (+ .cse83 .cse88))))) .cse91) (or (let ((.cse92 (* (+ .cse89 .cse93) |ULTIMATE.start_main_~B~0#1|))) (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse92 .cse84)) .cse81 .cse82 .cse85) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse92 .cse88)) .cse86 .cse87))) .cse94)))) (>= .cse95 |ULTIMATE.start_main_~d~0#1|) .cse99))) (or (and .cse0 .cse1 .cse2 .cse3 .cse4 .cse5 .cse6 .cse7 .cse8 .cse9 .cse10 .cse11 .cse12) (and .cse13 .cse14 .cse15 .cse2 .cse16 .cse11 .cse17) (and .cse18 .cse13 .cse19 .cse20 .cse10 .cse21 .cse22 .cse2 .cse16 .cse4 .cse23 .cse17) (and .cse0 .cse1 .cse2 .cse24 .cse25 .cse4 .cse8 .cse26 .cse27 .cse28 .cse11 .cse12 .cse29) (and .cse30 .cse14 .cse31 .cse15 .cse2) (and (or (and .cse26 .cse28 .cse4) (and .cse8 .cse26 .cse28 .cse1 .cse4)) .cse0 .cse2 .cse3 .cse4 .cse11 .cse12) (and .cse19 .cse20 .cse32 .cse0 .cse28 .cse10 .cse2 .cse3 .cse4 .cse11 .cse12) (and (let ((.cse38 (+ |ULTIMATE.start_main_~A~0#1| (* |ULTIMATE.start_main_~B~0#1| (- 4))))) (let ((.cse34 (>= .cse38 |ULTIMATE.start_main_~B~0#1|)) (.cse35 (= |ULTIMATE.start_main_~r~0#1| (+ .cse38 .cse40))) (.cse36 (= (+ |ULTIMATE.start_main_~q~0#1| (- 4)) 1)) (.cse37 (not (>= .cse38 .cse39)))) (or (and .cse33 .cse6 .cse7 .cse8 .cse26 .cse34 .cse28 .cse35 .cse2 .cse36 .cse37 .cse4) (and .cse33 .cse8 .cse26 .cse34 .cse28 .cse35 .cse2 .cse36 .cse37 .cse4)))) (= .cse41 .cse42) (<= |ULTIMATE.start_main_~p~0#1| 1) .cse31 .cse2 (= |ULTIMATE.start_main_~d~0#1| (* |ULTIMATE.start_main_~d~0#1| |ULTIMATE.start_main_~p~0#1|)) (= |ULTIMATE.start_main_~q~0#1| (+ .cse43 |ULTIMATE.start_main_~p~0#1|)) (= .cse41 (+ |ULTIMATE.start_main_~A~0#1| .cse44)) .cse45 .cse11) (and .cse14 .cse30 .cse31 .cse15 .cse2) (and .cse14 (or (and .cse0 .cse46 .cse47 .cse1 .cse24 .cse25 .cse48 .cse7 .cse27 .cse29 .cse33 .cse49 .cse50 .cse51 .cse14 .cse52 .cse2 .cse53 .cse54 .cse4 .cse6 .cse8 .cse9 .cse10 .cse11 .cse12) (and .cse0 .cse46 .cse47 .cse1 .cse24 .cse25 .cse48 .cse7 .cse20 .cse27 .cse29 .cse33 .cse49 .cse50 .cse14 .cse52 .cse2 .cse53 .cse54 .cse4 .cse6 .cse8 .cse9 .cse10 .cse11 .cse12)) .cse2 .cse4 .cse11) (and .cse0 .cse46 .cse1 .cse24 .cse25 .cse7 .cse19 .cse20 .cse27 .cse29 .cse33 .cse49 .cse32 .cse50 .cse52 .cse2 .cse53 .cse54 .cse4 .cse6 .cse8 .cse28 .cse10 .cse11 .cse12) (let ((.cse55 (+ |ULTIMATE.start_main_~A~0#1| (* |ULTIMATE.start_main_~r~0#1| (- 1))))) (and (= .cse55 .cse56) .cse30 .cse28 .cse2 (let ((.cse59 (= 0 (mod (+ |ULTIMATE.start_main_~A~0#1| |ULTIMATE.start_main_~r~0#1|) 2))) (.cse57 (div (+ |ULTIMATE.start_main_~A~0#1| (- |ULTIMATE.start_main_~r~0#1|)) 2)) (.cse58 (< .cse55 0))) (or (and (= |ULTIMATE.start_main_~d~0#1| .cse57) (or (not .cse58) .cse59)) (and (not .cse59) (= |ULTIMATE.start_main_~d~0#1| (+ 1 .cse57)) .cse58))) (= (+ |ULTIMATE.start_main_~q~0#1| .cse60) 0))) (and (= |ULTIMATE.start_main_~q~0#1| (+ 0 |ULTIMATE.start_main_~p~0#1|)) .cse61 .cse9 .cse10 .cse21 .cse2 .cse22 .cse4 .cse5 .cse23 .cse11 .cse62) (and .cse32 (= |ULTIMATE.start_main_~p~0#1| 2) .cse2 (= |ULTIMATE.start_main_~q~0#1| .cse43) .cse63 (= |ULTIMATE.start_main_~d~0#1| .cse39) .cse4 .cse19 .cse20 .cse64 .cse28 .cse65 .cse10 (= |ULTIMATE.start_main_~r~0#1| .cse42) .cse11) (and .cse9 .cse14 (= |ULTIMATE.start_main_~d~0#1| (* 2 .cse66)) .cse47 .cse10 .cse15 .cse2 .cse4 .cse48 .cse11 (= |ULTIMATE.start_main_~p~0#1| (* 2 .cse67))) (and .cse33 .cse32 .cse0 .cse1 .cse2 .cse24 .cse25 .cse4 .cse19 .cse20 .cse8 .cse27 .cse28 .cse10 .cse11 .cse12 .cse29) (and .cse61 .cse68 .cse69 .cse9 .cse70 .cse14 .cse10 .cse15 .cse2 (= |ULTIMATE.start_main_~d~0#1| .cse67) .cse71 .cse62) (and .cse26 .cse64 .cse30 .cse28 .cse31 .cse65 (not (>= |ULTIMATE.start_main_~r~0#1| .cse39)) .cse2 .cse4) (and .cse72 .cse32 .cse30 .cse73 .cse2 (= |ULTIMATE.start_main_~r~0#1| (+ (+ |ULTIMATE.start_main_~A~0#1| (* |ULTIMATE.start_main_~B~0#1| (- 2))) .cse40)) .cse45 (= |ULTIMATE.start_main_~r~0#1| (+ (+ |ULTIMATE.start_main_~A~0#1| (- 2)) .cse74)) .cse75 .cse19 (= (+ .cse76 .cse60) 0) .cse77 .cse78 .cse28 .cse31 .cse79 (= (+ |ULTIMATE.start_main_~q~0#1| (- 2)) 1)) (and .cse6 .cse7 .cse8 .cse26 .cse0 .cse28 .cse1 .cse2 .cse3 .cse4 .cse11 .cse12) (and .cse19 .cse78 .cse30 .cse73 .cse31 (= |ULTIMATE.start_main_~r~0#1| (+ |ULTIMATE.start_main_~A~0#1| .cse40)) .cse2 .cse22 .cse21 .cse4 (= (+ |ULTIMATE.start_main_~q~0#1| (* 1 (- 1))) 0) .cse45) (and (or (and .cse33 .cse0 .cse50 .cse1 .cse2 .cse24 .cse25 .cse4 .cse8 .cse26 .cse27 .cse28 .cse11 .cse12 .cse29) (and .cse33 .cse0 .cse1 .cse2 .cse24 .cse25 .cse4 .cse8 .cse26 .cse27 .cse28 .cse11 .cse12 .cse29)) .cse2 .cse4 .cse11)))))))))) [2023-02-18 18:27:03,365 INFO L899 garLoopResultBuilder]: For program point L37(lines 34 42) no Hoare annotation was computed. [2023-02-18 18:27:03,365 INFO L899 garLoopResultBuilder]: For program point ULTIMATE.startEXIT(line -1) no Hoare annotation was computed. [2023-02-18 18:27:03,366 INFO L895 garLoopResultBuilder]: At program point L58(line 58) the Hoare annotation is: (let ((.cse84 (div |ULTIMATE.start_main_~p~0#1| 2)) (.cse44 (div |ULTIMATE.start_main_~d~0#1| 2))) (let ((.cse78 (- .cse44)) (.cse85 (+ 1 .cse84))) (let ((.cse20 (= 0 (mod |ULTIMATE.start_main_~d~0#1| 2))) (.cse100 (< |ULTIMATE.start_main_~d~0#1| 0)) (.cse51 (- |ULTIMATE.start_main_~d~0#1|)) (.cse35 (+ |ULTIMATE.start_main_~q~0#1| .cse85)) (.cse101 (< |ULTIMATE.start_main_~p~0#1| 0)) (.cse27 (= 0 (mod |ULTIMATE.start_main_~p~0#1| 2))) (.cse39 (+ |ULTIMATE.start_main_~q~0#1| .cse84)) (.cse83 (+ (- 1) .cse78))) (let ((.cse38 (= 1 .cse84)) (.cse34 (= 1 .cse85)) (.cse37 (+ |ULTIMATE.start_main_~r~0#1| .cse83)) (.cse97 (* .cse39 |ULTIMATE.start_main_~B~0#1|)) (.cse31 (and .cse101 (not .cse27))) (.cse96 (* .cse35 |ULTIMATE.start_main_~B~0#1|)) (.cse36 (+ |ULTIMATE.start_main_~r~0#1| .cse78)) (.cse28 (not .cse101)) (.cse54 (= |ULTIMATE.start_main_~A~0#1| (+ (* |ULTIMATE.start_main_~q~0#1| |ULTIMATE.start_main_~B~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse9 (= |ULTIMATE.start_main_~r~0#1| |ULTIMATE.start_main_~A~0#1|)) (.cse11 (= |ULTIMATE.start_main_~q~0#1| 0)) (.cse3 (= |ULTIMATE.start_main_~B~0#1| 1)) (.cse42 (+ |ULTIMATE.start_main_~q~0#1| |ULTIMATE.start_main_~p~0#1|)) (.cse43 (+ |ULTIMATE.start_main_~r~0#1| .cse51)) (.cse41 (+ 1 .cse44)) (.cse26 (not .cse100)) (.cse14 (and .cse100 (not .cse20))) (.cse99 (+ .cse84 1))) (let ((.cse65 (= 0 (mod .cse99 2))) (.cse92 (< .cse85 0)) (.cse89 (div .cse99 2)) (.cse86 (div |ULTIMATE.start_main_~p~0#1| 4)) (.cse93 (< .cse84 0)) (.cse70 (= 0 (mod .cse84 2))) (.cse47 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse41 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|)) .cse20 .cse26) (or .cse14 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse44 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))))) (.cse48 (= |ULTIMATE.start_main_~A~0#1| (+ (* |ULTIMATE.start_main_~d~0#1| |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse2 (= |ULTIMATE.start_main_~p~0#1| 1)) (.cse49 (+ |ULTIMATE.start_main_~q~0#1| (* |ULTIMATE.start_main_~p~0#1| (- 1)))) (.cse50 (= |ULTIMATE.start_main_~d~0#1| 1)) (.cse52 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse42 |ULTIMATE.start_main_~B~0#1|) .cse43))) (.cse8 (let ((.cse98 (= |ULTIMATE.start_main_~d~0#1| (* |ULTIMATE.start_main_~B~0#1| |ULTIMATE.start_main_~p~0#1|)))) (or (and .cse54 .cse98) (and .cse9 .cse11 .cse3 .cse98)))) (.cse58 (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse97 .cse36)) .cse31) (or .cse27 (= |ULTIMATE.start_main_~A~0#1| (+ .cse96 .cse36)) .cse28)) .cse14)) (.cse59 (or (and (or .cse27 (= |ULTIMATE.start_main_~A~0#1| (+ .cse96 .cse37)) .cse28) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse97 .cse37)) .cse31)) .cse20 .cse26)) (.cse61 (- |ULTIMATE.start_main_~B~0#1|)) (.cse46 (and (or .cse31 (not .cse38)) (or .cse27 (not .cse34) .cse28))) (.cse94 (+ .cse44 1))) (let ((.cse25 (= 0 (mod .cse94 2))) (.cse90 (< .cse41 0)) (.cse16 (= 0 (mod .cse44 2))) (.cse91 (< .cse44 0)) (.cse13 (or (and (or .cse20 (= |ULTIMATE.start_main_~B~0#1| .cse41) .cse26) (or .cse14 (= |ULTIMATE.start_main_~B~0#1| .cse44))) .cse46)) (.cse12 (let ((.cse95 (or (and .cse52 .cse8 .cse54) (and .cse52 .cse8 .cse58 .cse59 .cse54) (and .cse52 .cse8 .cse58 .cse59 (= |ULTIMATE.start_main_~r~0#1| (+ |ULTIMATE.start_main_~A~0#1| .cse61)) .cse3 (= (+ |ULTIMATE.start_main_~q~0#1| (* 1 (- 1))) 0))))) (or (and (or .cse47 .cse46) .cse48 .cse95) (and .cse2 (= |ULTIMATE.start_main_~r~0#1| (+ |ULTIMATE.start_main_~A~0#1| .cse51)) (= .cse49 0) .cse50 .cse95)))) (.cse19 (div |ULTIMATE.start_main_~d~0#1| 4)) (.cse22 (div .cse94 2)) (.cse72 (and .cse93 (not .cse70))) (.cse71 (not .cse93)) (.cse87 (+ 1 .cse86)) (.cse88 (+ 1 .cse89)) (.cse66 (not .cse92)) (.cse62 (and .cse92 (not .cse65)))) (let ((.cse29 (and (or .cse65 (not (= 1 .cse88)) .cse66) (or (not (= 1 .cse89)) .cse62))) (.cse30 (and (or .cse72 (not (= 1 .cse86))) (or .cse70 .cse71 (not (= 1 .cse87))))) (.cse23 (+ 1 .cse22)) (.cse17 (+ 1 .cse19)) (.cse7 (* (* 2 1) (- 1))) (.cse0 (or (and .cse13 .cse12 (<= 1 |ULTIMATE.start_main_~d~0#1|)) (and .cse13 .cse12))) (.cse18 (and (not .cse16) .cse91)) (.cse15 (not .cse91)) (.cse24 (not .cse90)) (.cse21 (and (not .cse25) .cse90))) (let ((.cse10 (= |ULTIMATE.start_main_~d~0#1| |ULTIMATE.start_main_~B~0#1|)) (.cse32 (let ((.cse40 (let ((.cse63 (* (+ .cse35 .cse89) |ULTIMATE.start_main_~B~0#1|)) (.cse67 (* (+ .cse35 .cse88) |ULTIMATE.start_main_~B~0#1|)) (.cse69 (* (+ .cse39 .cse87) |ULTIMATE.start_main_~B~0#1|)) (.cse73 (* (+ .cse39 .cse86) |ULTIMATE.start_main_~B~0#1|)) (.cse75 (* (+ .cse42 .cse85) |ULTIMATE.start_main_~B~0#1|)) (.cse77 (* (+ .cse42 .cse84) |ULTIMATE.start_main_~B~0#1|))) (let ((.cse55 (or (let ((.cse82 (+ .cse43 .cse83))) (and (or .cse27 (= |ULTIMATE.start_main_~A~0#1| (+ .cse75 .cse82)) .cse28) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse77 .cse82)) .cse31))) .cse20 .cse26)) (.cse56 (or .cse20 (let ((.cse81 (- .cse22))) (let ((.cse80 (+ .cse37 (+ (- 1) .cse81))) (.cse79 (+ .cse37 .cse81))) (and (or .cse27 (and (or .cse21 (and (or .cse62 (= |ULTIMATE.start_main_~A~0#1| (+ .cse63 .cse79))) (or .cse65 (= |ULTIMATE.start_main_~A~0#1| (+ .cse67 .cse79)) .cse66))) (or .cse24 .cse25 (and (or .cse62 (= |ULTIMATE.start_main_~A~0#1| (+ .cse63 .cse80))) (or .cse65 (= |ULTIMATE.start_main_~A~0#1| (+ .cse67 .cse80)) .cse66)))) .cse28) (or (and (or (and (or .cse72 (= |ULTIMATE.start_main_~A~0#1| (+ .cse73 .cse80))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse69 .cse80)) .cse70 .cse71)) .cse24 .cse25) (or .cse21 (and (or .cse70 .cse71 (= |ULTIMATE.start_main_~A~0#1| (+ .cse69 .cse79))) (or .cse72 (= |ULTIMATE.start_main_~A~0#1| (+ .cse73 .cse79)))))) .cse31)))) .cse26)) (.cse53 (= |ULTIMATE.start_main_~A~0#1| (+ (* (+ (+ |ULTIMATE.start_main_~q~0#1| (* 2 |ULTIMATE.start_main_~p~0#1|)) |ULTIMATE.start_main_~p~0#1|) |ULTIMATE.start_main_~B~0#1|) (+ (+ |ULTIMATE.start_main_~r~0#1| (- (* 2 |ULTIMATE.start_main_~d~0#1|))) .cse51)))) (.cse57 (or .cse14 (let ((.cse76 (+ .cse43 .cse78))) (and (or .cse27 .cse28 (= |ULTIMATE.start_main_~A~0#1| (+ .cse75 .cse76))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse77 .cse76)) .cse31))))) (.cse60 (or .cse14 (let ((.cse74 (- .cse19))) (let ((.cse64 (+ .cse36 .cse74)) (.cse68 (+ .cse36 (+ (- 1) .cse74)))) (and (or .cse27 (and (or .cse18 (and (or .cse62 (= |ULTIMATE.start_main_~A~0#1| (+ .cse63 .cse64))) (or .cse65 .cse66 (= |ULTIMATE.start_main_~A~0#1| (+ .cse67 .cse64))))) (or .cse15 (and (or .cse65 (= |ULTIMATE.start_main_~A~0#1| (+ .cse67 .cse68)) .cse66) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse63 .cse68)) .cse62)) .cse16)) .cse28) (or .cse31 (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse69 .cse64)) .cse70 .cse71) (or .cse72 (= |ULTIMATE.start_main_~A~0#1| (+ .cse73 .cse64)))) .cse18) (or (and (or .cse70 .cse71 (= |ULTIMATE.start_main_~A~0#1| (+ .cse69 .cse68))) (or .cse72 (= |ULTIMATE.start_main_~A~0#1| (+ .cse73 .cse68)))) .cse15 .cse16))))))))) (or (and .cse52 .cse0 .cse53 .cse54) (and .cse55 .cse56 .cse52 .cse0 .cse53 .cse57 .cse58 .cse59 .cse3 .cse60 (= |ULTIMATE.start_main_~r~0#1| (+ (+ |ULTIMATE.start_main_~A~0#1| (* |ULTIMATE.start_main_~B~0#1| (- 2))) .cse61)) (= (+ |ULTIMATE.start_main_~q~0#1| (- 2)) 1)) (and .cse55 .cse56 .cse52 .cse0 .cse53 .cse57 .cse58 .cse59 .cse60 .cse54)))))) (or (let ((.cse45 (= 1 |ULTIMATE.start_main_~p~0#1|))) (and (or .cse27 .cse34 (and (or .cse14 (and (or .cse15 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse17 .cse35) .cse36)) .cse16) (or .cse18 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse19 .cse35) .cse36))))) (or .cse20 (and (or .cse24 .cse25 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse23 .cse35) .cse37))) (or .cse21 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse22 .cse35) .cse37)))) .cse26)) .cse28 .cse29) (or .cse38 .cse30 (and (or .cse20 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse23 .cse39) .cse37)) .cse24 .cse25) (or .cse21 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse22 .cse39) .cse37)))) .cse26) (or .cse14 (and (or .cse18 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse19 .cse39) .cse36))) (or .cse15 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse17 .cse39) .cse36)) .cse16)))) .cse31) .cse40 (or (and (or .cse20 .cse26 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse41 .cse42) .cse43))) (or .cse14 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse44 .cse42) .cse43)))) .cse45 .cse46) (or .cse45 .cse47 .cse46) .cse48)) (and (= (+ .cse49 .cse7) 0) .cse40 .cse2 .cse50 (= |ULTIMATE.start_main_~r~0#1| (+ (+ |ULTIMATE.start_main_~A~0#1| (- 2)) .cse51)))))) (.cse33 (= |ULTIMATE.start_main_~B~0#1| |ULTIMATE.start_main_~d~0#1|))) (or (let ((.cse1 (+ |ULTIMATE.start_main_~A~0#1| (* |ULTIMATE.start_main_~r~0#1| (- 1))))) (and .cse0 (= .cse1 (* 2 |ULTIMATE.start_main_~B~0#1|)) .cse2 .cse3 (let ((.cse6 (= 0 (mod (+ |ULTIMATE.start_main_~A~0#1| |ULTIMATE.start_main_~r~0#1|) 2))) (.cse4 (div (+ |ULTIMATE.start_main_~A~0#1| (- |ULTIMATE.start_main_~r~0#1|)) 2)) (.cse5 (< .cse1 0))) (or (and (= |ULTIMATE.start_main_~d~0#1| .cse4) (or (not .cse5) .cse6)) (and (not .cse6) (= |ULTIMATE.start_main_~d~0#1| (+ 1 .cse4)) .cse5))) (= (+ |ULTIMATE.start_main_~q~0#1| .cse7) 0))) (and .cse8 .cse2 .cse9 .cse10 .cse11 .cse3) (and .cse2 .cse10 .cse12 .cse3) (and .cse13 (or (and (or .cse14 (and (or .cse15 .cse16 (= |ULTIMATE.start_main_~B~0#1| .cse17)) (or .cse18 (= |ULTIMATE.start_main_~B~0#1| .cse19)))) (or .cse20 (and (or .cse21 (= |ULTIMATE.start_main_~B~0#1| .cse22)) (or (= |ULTIMATE.start_main_~B~0#1| .cse23) .cse24 .cse25)) .cse26)) (and (or .cse27 .cse28 .cse29) (or .cse30 .cse31))) .cse32 .cse33) (and .cse2 .cse10 .cse11 .cse3) (and .cse2 .cse10 .cse3 .cse32) (and .cse13 .cse12 .cse33)))))))))) [2023-02-18 18:27:03,366 INFO L899 garLoopResultBuilder]: For program point L46(lines 44 56) no Hoare annotation was computed. [2023-02-18 18:27:03,366 INFO L899 garLoopResultBuilder]: For program point $Ultimate##0(line -1) no Hoare annotation was computed. [2023-02-18 18:27:03,369 INFO L895 garLoopResultBuilder]: At program point L34-2(lines 34 42) the Hoare annotation is: (let ((.cse32 (div |ULTIMATE.start_main_~d~0#1| 2)) (.cse40 (div |ULTIMATE.start_main_~p~0#1| 2))) (let ((.cse37 (+ 1 .cse40)) (.cse252 (- .cse32))) (let ((.cse260 (+ (- 1) .cse252)) (.cse206 (+ |ULTIMATE.start_main_~q~0#1| .cse37)) (.cse47 (+ |ULTIMATE.start_main_~q~0#1| .cse40)) (.cse264 (mod |ULTIMATE.start_main_~d~0#1| 2)) (.cse228 (+ .cse40 1))) (let ((.cse214 (div |ULTIMATE.start_main_~p~0#1| 4)) (.cse212 (div .cse228 2)) (.cse231 (+ .cse32 1)) (.cse76 (= 1 |ULTIMATE.start_main_~p~0#1|)) (.cse176 (- |ULTIMATE.start_main_~d~0#1|)) (.cse34 (= 0 .cse264)) (.cse270 (< |ULTIMATE.start_main_~p~0#1| 0)) (.cse38 (= 0 (mod |ULTIMATE.start_main_~p~0#1| 2))) (.cse44 (+ |ULTIMATE.start_main_~r~0#1| .cse252)) (.cse269 (< |ULTIMATE.start_main_~d~0#1| 0)) (.cse272 (* .cse47 |ULTIMATE.start_main_~B~0#1|)) (.cse271 (* .cse206 |ULTIMATE.start_main_~B~0#1|)) (.cse45 (+ |ULTIMATE.start_main_~r~0#1| .cse260))) (let ((.cse101 (= 1 .cse40)) (.cse100 (= 1 .cse37)) (.cse200 (= |ULTIMATE.start_main_~A~0#1| (+ .cse271 .cse45))) (.cse205 (= |ULTIMATE.start_main_~A~0#1| (+ .cse272 .cse45))) (.cse36 (not .cse269)) (.cse204 (= |ULTIMATE.start_main_~A~0#1| (+ .cse272 .cse44))) (.cse41 (and .cse270 (not .cse38))) (.cse202 (= |ULTIMATE.start_main_~A~0#1| (+ .cse271 .cse44))) (.cse39 (not .cse270)) (.cse33 (and .cse269 (not .cse34))) (.cse211 (+ |ULTIMATE.start_main_~q~0#1| |ULTIMATE.start_main_~p~0#1|)) (.cse87 (+ |ULTIMATE.start_main_~r~0#1| .cse176)) (.cse2 (= |ULTIMATE.start_main_~r~0#1| |ULTIMATE.start_main_~A~0#1|)) (.cse26 (= |ULTIMATE.start_main_~A~0#1| (+ (* |ULTIMATE.start_main_~d~0#1| |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse263 (not .cse76)) (.cse121 (div |ULTIMATE.start_main_~d~0#1| 4)) (.cse106 (div .cse231 2)) (.cse35 (+ 1 .cse32)) (.cse97 (= 0 (mod .cse228 2))) (.cse267 (< .cse37 0)) (.cse213 (+ 1 .cse212)) (.cse215 (+ 1 .cse214)) (.cse268 (< .cse40 0)) (.cse55 (= 0 (mod .cse40 2)))) (let ((.cse48 (and .cse268 (not .cse55))) (.cse135 (= 1 .cse214)) (.cse56 (not .cse268)) (.cse148 (= 1 .cse215)) (.cse168 (= 1 .cse213)) (.cse98 (not .cse267)) (.cse157 (= 1 .cse212)) (.cse88 (and .cse267 (not .cse97))) (.cse92 (= 0 (mod .cse231 2))) (.cse261 (< .cse35 0)) (.cse116 (= 0 (mod .cse32 2))) (.cse262 (< .cse32 0)) (.cse177 (* 2 |ULTIMATE.start_main_~d~0#1|)) (.cse175 (* 2 |ULTIMATE.start_main_~p~0#1|)) (.cse107 (- .cse106)) (.cse122 (- .cse121)) (.cse265 (div .cse176 (- 2))) (.cse20 (or .cse26 .cse263)) (.cse0 (or .cse2 (= (+ |ULTIMATE.start_main_~A~0#1| (* (- 1) |ULTIMATE.start_main_~r~0#1|)) 0))) (.cse108 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse211 |ULTIMATE.start_main_~B~0#1|) .cse87))) (.cse1 (= 0 |ULTIMATE.start_main_~q~0#1|)) (.cse241 (or (and (or .cse204 .cse41) (or .cse38 .cse202 .cse39)) .cse33)) (.cse237 (or (and (or .cse38 .cse200 .cse39) (or .cse205 .cse41)) .cse34 .cse36)) (.cse3 (= |ULTIMATE.start_main_~q~0#1| 0)) (.cse4 (= |ULTIMATE.start_main_~B~0#1| 1)) (.cse5 (= |ULTIMATE.start_main_~A~0#1| (+ (* |ULTIMATE.start_main_~q~0#1| |ULTIMATE.start_main_~B~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse6 (= |ULTIMATE.start_main_~d~0#1| (* |ULTIMATE.start_main_~B~0#1| |ULTIMATE.start_main_~p~0#1|))) (.cse256 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse35 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|)) .cse34 .cse36) (or .cse33 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse32 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))))) (.cse253 (and (or .cse41 (not .cse101)) (or .cse38 (not .cse100) .cse39)))) (let ((.cse9 (let ((.cse266 (or .cse256 .cse253))) (or (and .cse0 .cse108 .cse20 .cse266 .cse1 .cse2 .cse241 .cse237 .cse3 .cse4 .cse5 .cse6) (and .cse0 .cse108 .cse266 .cse1 .cse26 .cse2 .cse241 .cse237 .cse3 .cse4 .cse5 .cse6)))) (.cse10 (<= 2 .cse265)) (.cse11 (>= |ULTIMATE.start_main_~r~0#1| .cse265)) (.cse13 (= .cse264 0)) (.cse15 (or (and (or .cse34 (= |ULTIMATE.start_main_~B~0#1| .cse35) .cse36) (or .cse33 (= |ULTIMATE.start_main_~B~0#1| .cse32))) .cse253)) (.cse16 (or .cse263 (= |ULTIMATE.start_main_~B~0#1| |ULTIMATE.start_main_~d~0#1|))) (.cse123 (+ (- 1) .cse122)) (.cse105 (+ (- 1) .cse107)) (.cse62 (+ |ULTIMATE.start_main_~q~0#1| .cse175)) (.cse63 (+ |ULTIMATE.start_main_~r~0#1| (- .cse177))) (.cse115 (not .cse262)) (.cse124 (+ 1 .cse121)) (.cse110 (and (not .cse116) .cse262)) (.cse94 (and (not .cse92) .cse261)) (.cse104 (+ 1 .cse106)) (.cse89 (not .cse261)) (.cse258 (and (or .cse97 (not .cse168) .cse98) (or (not .cse157) .cse88))) (.cse257 (and (or .cse48 (not .cse135)) (or .cse55 .cse56 (not .cse148)))) (.cse7 (* 2 1)) (.cse8 (* 2 |ULTIMATE.start_main_~B~0#1|))) (let ((.cse14 (* 2 .cse8)) (.cse12 (* 2 .cse7)) (.cse18 (or (and (or .cse33 (and (or .cse115 .cse116 (= |ULTIMATE.start_main_~B~0#1| .cse124)) (or .cse110 (= |ULTIMATE.start_main_~B~0#1| .cse121)))) (or .cse34 (and (or .cse94 (= |ULTIMATE.start_main_~B~0#1| .cse106)) (or (= |ULTIMATE.start_main_~B~0#1| .cse104) .cse89 .cse92)) .cse36)) (and (or .cse38 .cse39 .cse258) (or .cse257 .cse41)))) (.cse17 (let ((.cse243 (* (+ .cse206 .cse212) |ULTIMATE.start_main_~B~0#1|)) (.cse245 (* (+ .cse206 .cse213) |ULTIMATE.start_main_~B~0#1|)) (.cse247 (* (+ .cse47 .cse215) |ULTIMATE.start_main_~B~0#1|)) (.cse248 (* (+ .cse47 .cse214) |ULTIMATE.start_main_~B~0#1|)) (.cse249 (* (+ .cse211 .cse37) |ULTIMATE.start_main_~B~0#1|)) (.cse251 (* (+ .cse211 .cse40) |ULTIMATE.start_main_~B~0#1|))) (let ((.cse232 (or (let ((.cse259 (+ .cse87 .cse260))) (and (or .cse38 (= |ULTIMATE.start_main_~A~0#1| (+ .cse249 .cse259)) .cse39) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse251 .cse259)) .cse41))) .cse34 .cse36)) (.cse233 (or .cse38 .cse100 (and (or .cse33 (and (or .cse115 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse124 .cse206) .cse44)) .cse116) (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse121 .cse206) .cse44))))) (or .cse34 (and (or .cse89 .cse92 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse104 .cse206) .cse45))) (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse106 .cse206) .cse45)))) .cse36)) .cse39 .cse258)) (.cse234 (= |ULTIMATE.start_main_~A~0#1| (+ (* (+ .cse62 |ULTIMATE.start_main_~p~0#1|) |ULTIMATE.start_main_~B~0#1|) (+ .cse63 .cse176)))) (.cse235 (or .cse101 .cse257 (and (or .cse34 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse104 .cse47) .cse45)) .cse89 .cse92) (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse106 .cse47) .cse45)))) .cse36) (or .cse33 (and (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse121 .cse47) .cse44))) (or .cse115 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse124 .cse47) .cse44)) .cse116)))) .cse41)) (.cse236 (or .cse76 .cse256 .cse253)) (.cse238 (or .cse34 (let ((.cse255 (+ .cse45 .cse105)) (.cse254 (+ .cse45 .cse107))) (and (or .cse38 (and (or .cse94 (and (or .cse88 (= |ULTIMATE.start_main_~A~0#1| (+ .cse243 .cse254))) (or .cse97 (= |ULTIMATE.start_main_~A~0#1| (+ .cse245 .cse254)) .cse98))) (or .cse89 .cse92 (and (or .cse88 (= |ULTIMATE.start_main_~A~0#1| (+ .cse243 .cse255))) (or .cse97 (= |ULTIMATE.start_main_~A~0#1| (+ .cse245 .cse255)) .cse98)))) .cse39) (or (and (or (and (or .cse48 (= |ULTIMATE.start_main_~A~0#1| (+ .cse248 .cse255))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse247 .cse255)) .cse55 .cse56)) .cse89 .cse92) (or .cse94 (and (or .cse55 .cse56 (= |ULTIMATE.start_main_~A~0#1| (+ .cse247 .cse254))) (or .cse48 (= |ULTIMATE.start_main_~A~0#1| (+ .cse248 .cse254)))))) .cse41))) .cse36)) (.cse239 (or (and (or .cse34 .cse36 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse35 .cse211) .cse87))) (or .cse33 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse32 .cse211) .cse87)))) .cse76 .cse253)) (.cse240 (or .cse33 (let ((.cse250 (+ .cse87 .cse252))) (and (or .cse38 .cse39 (= |ULTIMATE.start_main_~A~0#1| (+ .cse249 .cse250))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse251 .cse250)) .cse41))))) (.cse242 (or .cse33 (let ((.cse244 (+ .cse44 .cse122)) (.cse246 (+ .cse44 .cse123))) (and (or .cse38 (and (or .cse110 (and (or .cse88 (= |ULTIMATE.start_main_~A~0#1| (+ .cse243 .cse244))) (or .cse97 .cse98 (= |ULTIMATE.start_main_~A~0#1| (+ .cse245 .cse244))))) (or .cse115 (and (or .cse97 (= |ULTIMATE.start_main_~A~0#1| (+ .cse245 .cse246)) .cse98) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse243 .cse246)) .cse88)) .cse116)) .cse39) (or .cse41 (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse247 .cse244)) .cse55 .cse56) (or .cse48 (= |ULTIMATE.start_main_~A~0#1| (+ .cse248 .cse244)))) .cse110) (or (and (or .cse55 .cse56 (= |ULTIMATE.start_main_~A~0#1| (+ .cse247 .cse246))) (or .cse48 (= |ULTIMATE.start_main_~A~0#1| (+ .cse248 .cse246)))) .cse115 .cse116)))))))) (or (and .cse232 .cse233 .cse9 .cse10 .cse11 .cse234 .cse235 .cse236 .cse26 .cse237 .cse13 .cse5 .cse238 .cse108 .cse15 .cse239 .cse240 .cse241 .cse16 .cse242) (and .cse232 .cse233 .cse9 .cse10 .cse11 .cse234 .cse235 .cse236 .cse237 .cse13 .cse5 .cse238 .cse108 .cse20 .cse15 .cse239 .cse240 .cse241 .cse16 .cse242)))))) (or (and .cse0 .cse1 (= |ULTIMATE.start_main_~p~0#1| 1) .cse2 (= |ULTIMATE.start_main_~d~0#1| |ULTIMATE.start_main_~B~0#1|) .cse3 .cse4 (<= 1 |ULTIMATE.start_main_~d~0#1|) (= |ULTIMATE.start_main_~d~0#1| 1) .cse5 .cse6) (and (= |ULTIMATE.start_main_~d~0#1| .cse7) (<= 2 |ULTIMATE.start_main_~d~0#1|) .cse0 .cse1 .cse2 .cse3 .cse4 (= |ULTIMATE.start_main_~p~0#1| .cse7) .cse5 .cse6 (= |ULTIMATE.start_main_~d~0#1| .cse8)) (and .cse9 .cse10 .cse11 .cse2 .cse3 .cse4 (= |ULTIMATE.start_main_~d~0#1| .cse12) .cse13 .cse5 (= |ULTIMATE.start_main_~p~0#1| .cse12) (= |ULTIMATE.start_main_~d~0#1| .cse14) .cse15 .cse16 .cse6) (and .cse17 .cse15 .cse2 (= |ULTIMATE.start_main_~d~0#1| (* 2 .cse14)) .cse18 .cse16 .cse3 .cse4 .cse5 .cse6 (= |ULTIMATE.start_main_~p~0#1| (* 2 .cse12))) (and (let ((.cse229 (+ .cse121 1)) (.cse230 (+ .cse106 1))) (let ((.cse222 (+ .cse214 1)) (.cse197 (div .cse231 4)) (.cse223 (< .cse106 0)) (.cse188 (= 0 (mod .cse106 2))) (.cse185 (= 0 (mod .cse230 2))) (.cse224 (< .cse104 0)) (.cse196 (div .cse230 2)) (.cse171 (div |ULTIMATE.start_main_~d~0#1| 8)) (.cse225 (< .cse121 0)) (.cse140 (= 0 (mod .cse121 2))) (.cse174 (div .cse229 2)) (.cse226 (< .cse124 0)) (.cse151 (= 0 (mod .cse229 2))) (.cse227 (+ .cse212 1))) (let ((.cse207 (div .cse228 4)) (.cse219 (< .cse212 0)) (.cse160 (= 0 (mod .cse212 2))) (.cse167 (= 0 (mod .cse227 2))) (.cse220 (< .cse213 0)) (.cse209 (div .cse227 2)) (.cse154 (and .cse226 (not .cse151))) (.cse153 (not .cse226)) (.cse172 (+ 1 .cse174)) (.cse139 (and .cse225 (not .cse140))) (.cse170 (+ 1 .cse171)) (.cse143 (not .cse225)) (.cse195 (+ 1 .cse196)) (.cse183 (not .cse224)) (.cse181 (and .cse224 (not .cse185))) (.cse192 (and .cse223 (not .cse188))) (.cse187 (not .cse223)) (.cse199 (+ 1 .cse197)) (.cse27 (* |ULTIMATE.start_main_~B~0#1| 1)) (.cse52 (div |ULTIMATE.start_main_~p~0#1| 8)) (.cse49 (= 0 (mod .cse214 2))) (.cse60 (div .cse222 2)) (.cse58 (= 0 (mod .cse222 2))) (.cse221 (< .cse215 0)) (.cse54 (< .cse214 0)) (.cse64 (div .cse177 4)) (.cse67 (div .cse175 4))) (let ((.cse66 (+ 1 .cse67)) (.cse65 (+ 1 .cse64)) (.cse28 (+ |ULTIMATE.start_main_~q~0#1| (* 2 .cse175))) (.cse29 (+ |ULTIMATE.start_main_~r~0#1| (- (* 2 .cse177)))) (.cse51 (not .cse54)) (.cse61 (and (not .cse58) .cse221)) (.cse59 (not .cse221)) (.cse57 (+ 1 .cse60)) (.cse53 (not .cse49)) (.cse50 (+ 1 .cse52)) (.cse31 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse27 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse216 (and (or (and (or .cse48 (not (<= 1 .cse214))) (or .cse55 .cse56 (not (<= 1 .cse215)))) .cse41) (or .cse38 .cse39 (and (or (not (<= 1 .cse213)) .cse97 .cse98) (or .cse88 (not (<= 1 .cse212))))))) (.cse217 (and (or .cse34 (and (or .cse94 (not (= .cse27 .cse106))) (or .cse89 .cse92 (not (= .cse27 .cse104)))) .cse36) (or .cse33 (and (or .cse115 (not (= .cse27 .cse124)) .cse116) (or .cse110 (not (= .cse27 .cse121))))))) (.cse46 (and (or .cse89 .cse92 (and (or (not (= .cse27 .cse195)) .cse183 .cse185) (or .cse181 (not (= .cse27 .cse196))))) (or .cse94 (and (or (not (= .cse27 .cse197)) .cse192) (or .cse187 (not (= .cse27 .cse199)) .cse188))))) (.cse42 (and (or (and (or .cse154 (not (= .cse27 .cse174))) (or .cse151 .cse153 (not (= .cse27 .cse172)))) .cse115 .cse116) (or .cse110 (and (or .cse139 (not (= .cse27 .cse171))) (or .cse140 (not (= .cse27 .cse170)) .cse143))))) (.cse210 (+ 1 .cse209)) (.cse165 (not .cse220)) (.cse164 (and .cse220 (not .cse167))) (.cse159 (and .cse219 (not .cse160))) (.cse208 (+ 1 .cse207)) (.cse162 (not .cse219))) (let ((.cse19 (or .cse38 (let ((.cse218 (* .cse27 .cse206))) (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse218 .cse45)) .cse34 .cse46 .cse36) (or .cse42 .cse33 (= |ULTIMATE.start_main_~A~0#1| (+ .cse218 .cse44))))) .cse39 (and (or .cse97 .cse98 (and (or (not (<= 1 .cse210)) .cse165 .cse167) (or (not (<= 1 .cse209)) .cse164))) (or .cse88 (and (or .cse159 (not (<= 1 .cse207))) (or (not (<= 1 .cse208)) .cse160 .cse162)))))) (.cse21 (or .cse31 .cse216 .cse217)) (.cse22 (or .cse216 .cse217 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse27 .cse211) .cse87)))) (.cse23 (let ((.cse75 (>= |ULTIMATE.start_main_~r~0#1| |ULTIMATE.start_main_~d~0#1|)) (.cse111 (* (+ |ULTIMATE.start_main_~q~0#1| .cse213) |ULTIMATE.start_main_~B~0#1|)) (.cse118 (* (+ |ULTIMATE.start_main_~q~0#1| .cse212) |ULTIMATE.start_main_~B~0#1|)) (.cse120 (* (+ |ULTIMATE.start_main_~q~0#1| .cse214) |ULTIMATE.start_main_~B~0#1|)) (.cse119 (* (+ |ULTIMATE.start_main_~q~0#1| .cse215) |ULTIMATE.start_main_~B~0#1|)) (.cse103 (* (+ .cse211 .cse215) |ULTIMATE.start_main_~B~0#1|)) (.cse102 (* (+ .cse211 .cse214) |ULTIMATE.start_main_~B~0#1|)) (.cse99 (* (+ .cse211 .cse213) |ULTIMATE.start_main_~B~0#1|)) (.cse90 (* (+ .cse211 .cse212) |ULTIMATE.start_main_~B~0#1|)) (.cse145 (* (+ .cse47 .cse50) |ULTIMATE.start_main_~B~0#1|)) (.cse144 (and .cse54 .cse53)) (.cse137 (* (+ .cse47 .cse52) |ULTIMATE.start_main_~B~0#1|)) (.cse147 (* (+ .cse47 .cse60) |ULTIMATE.start_main_~B~0#1|)) (.cse146 (* (+ .cse47 .cse57) |ULTIMATE.start_main_~B~0#1|)) (.cse166 (* (+ .cse206 .cse210) |ULTIMATE.start_main_~B~0#1|)) (.cse163 (* (+ .cse206 .cse209) |ULTIMATE.start_main_~B~0#1|)) (.cse161 (* (+ .cse206 .cse208) |ULTIMATE.start_main_~B~0#1|)) (.cse158 (* (+ .cse206 .cse207) |ULTIMATE.start_main_~B~0#1|)) (.cse125 (>= |ULTIMATE.start_main_~r~0#1| .cse35)) (.cse109 (>= |ULTIMATE.start_main_~r~0#1| .cse32))) (let ((.cse77 (let ((.cse203 (not .cse109)) (.cse201 (not .cse125))) (and (or .cse38 (and (or .cse200 .cse34 .cse201 .cse36) (or .cse202 .cse33 .cse203)) .cse39) (or .cse41 (and (or .cse204 .cse33 .cse203) (or .cse205 .cse34 .cse201 .cse36)))))) (.cse68 (or (let ((.cse194 (- .cse196)) (.cse198 (- .cse197))) (let ((.cse193 (>= .cse45 .cse106)) (.cse186 (+ .cse45 (+ (- 1) .cse198))) (.cse189 (not (>= .cse45 .cse199))) (.cse191 (+ .cse45 .cse198)) (.cse190 (not (>= .cse45 .cse197))) (.cse179 (+ .cse45 .cse194)) (.cse180 (not (>= .cse45 .cse196))) (.cse182 (not (>= .cse45 .cse195))) (.cse184 (+ .cse45 (+ (- 1) .cse194))) (.cse178 (>= .cse45 .cse104))) (and (or (and (or .cse89 .cse92 .cse178 (and (or .cse135 .cse48 (and (or .cse49 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse179)) .cse180 .cse181) (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse184)) .cse185)) .cse51) (or .cse144 (and (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse184)) .cse185) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse179)) .cse180 .cse181))))) (or .cse55 .cse56 (and (or .cse59 .cse58 (and (or .cse180 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse179)) .cse181) (or .cse182 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse184)) .cse183 .cse185))) (or .cse61 (and (or .cse182 (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse184)) .cse183 .cse185) (or .cse180 .cse181 (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse179)))))) .cse148))) (or .cse94 (and (or .cse135 (and (or .cse49 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse186)) .cse187 .cse188 .cse189) (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse191)) .cse192)) .cse51) (or .cse144 (and (or .cse187 .cse188 .cse189 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse186))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse191)) .cse190 .cse192)))) .cse48) (or (and (or (and (or .cse190 .cse192 (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse191))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse186)) .cse187 .cse188 .cse189)) .cse61) (or .cse59 .cse58 (and (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse191)) .cse192) (or .cse187 .cse188 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse186)) .cse189)))) .cse55 .cse56 .cse148)) .cse193)) .cse41) (or .cse38 (and (or .cse94 .cse193 (and (or .cse97 .cse168 .cse98 (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse186)) .cse187 .cse188 .cse189) (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse191)) .cse192)) .cse165 .cse167) (or (and (or .cse187 .cse188 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse186)) .cse189) (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse191)) .cse192)) .cse164))) (or .cse157 .cse88 (and (or .cse160 (and (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse191)) .cse192) (or .cse187 .cse188 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse186)) .cse189)) .cse162) (or .cse159 (and (or .cse187 .cse188 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse186)) .cse189) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse191)) .cse190 .cse192))))))) (or .cse89 (and (or .cse97 .cse168 .cse98 (and (or .cse165 .cse167 (and (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse184)) .cse185) (or .cse180 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse179)) .cse181))) (or (and (or .cse180 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse179)) .cse181) (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse184)) .cse185)) .cse164))) (or .cse157 .cse88 (and (or .cse160 (and (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse184)) .cse185) (or .cse180 .cse181 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse179)))) .cse162) (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse179)) .cse180 .cse181) (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse184)) .cse185)) .cse159)))) .cse92 .cse178)) .cse39)))) .cse34 .cse36)) (.cse69 (or (= 1 .cse175) (= |ULTIMATE.start_main_~A~0#1| (+ (* (+ .cse28 |ULTIMATE.start_main_~p~0#1|) |ULTIMATE.start_main_~B~0#1|) (+ .cse29 .cse176))) (not (>= .cse29 |ULTIMATE.start_main_~d~0#1|)) (>= .cse29 .cse177))) (.cse70 (or .cse33 (let ((.cse169 (- .cse171)) (.cse173 (- .cse174))) (let ((.cse149 (>= .cse44 .cse124)) (.cse155 (not (>= .cse44 .cse174))) (.cse156 (+ .cse44 .cse173)) (.cse150 (+ .cse44 (+ (- 1) .cse173))) (.cse152 (not (>= .cse44 .cse172))) (.cse134 (>= .cse44 .cse121)) (.cse136 (not (>= .cse44 .cse171))) (.cse138 (+ .cse44 .cse169)) (.cse142 (not (>= .cse44 .cse170))) (.cse141 (+ .cse44 (+ (- 1) .cse169)))) (and (or .cse41 (and (or .cse110 .cse134 (and (or .cse135 .cse48 (and (or (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse138)) .cse139) (or .cse140 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse141)) .cse142 .cse143)) .cse144) (or (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse138)) .cse139) (or .cse140 .cse142 .cse143 (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse141)))) .cse49 .cse51))) (or .cse55 (and (or (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse138)) .cse139) (or .cse140 .cse142 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse141)) .cse143)) .cse59 .cse58) (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse141)) .cse140 .cse142 .cse143) (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse138)) .cse139)) .cse61)) .cse56 .cse148))) (or .cse149 .cse115 .cse116 (and (or (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse150)) .cse151 .cse152 .cse153) (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse156)))) .cse144) (or (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse156))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse150)) .cse151 .cse152 .cse153)) .cse49 .cse51)) .cse135 .cse48) (or .cse55 .cse56 (and (or (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse156))) (or .cse151 .cse152 .cse153 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse150)))) .cse59 .cse58) (or (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse156))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse150)) .cse151 .cse152 .cse153)) .cse61)) .cse148))))) (or .cse38 .cse39 (and (or .cse149 .cse115 (and (or .cse157 .cse88 (and (or (and (or .cse154 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse156)) .cse155) (or .cse151 .cse152 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse150)) .cse153)) .cse159) (or .cse160 (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse156))) (or .cse151 .cse152 .cse153 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse150)))) .cse162))) (or (and (or (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse156))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse150)) .cse151 .cse152 .cse153)) .cse164) (or .cse165 (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse156))) (or .cse151 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse150)) .cse152 .cse153)) .cse167)) .cse97 .cse168 .cse98)) .cse116) (or .cse110 .cse134 (and (or .cse157 (and (or .cse159 (and (or .cse140 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse141)) .cse142 .cse143) (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse138)) .cse139))) (or .cse160 (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse138)) .cse139) (or .cse140 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse141)) .cse142 .cse143)) .cse162)) .cse88) (or .cse97 .cse168 (and (or .cse165 (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse138)) .cse139) (or .cse140 .cse142 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse141)) .cse143)) .cse167) (or (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse138)) .cse139) (or .cse140 .cse142 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse141)) .cse143)) .cse164)) .cse98)))))))))) (.cse71 (or .cse33 (let ((.cse130 (not (>= .cse87 .cse124))) (.cse131 (+ .cse87 .cse123)) (.cse132 (not (>= .cse87 .cse121))) (.cse133 (+ .cse87 .cse122))) (and (or .cse101 (and (or (and (or .cse115 .cse130 .cse116 (= |ULTIMATE.start_main_~A~0#1| (+ .cse103 .cse131))) (or .cse110 .cse132 (= |ULTIMATE.start_main_~A~0#1| (+ .cse103 .cse133)))) .cse55 .cse56) (or .cse48 (and (or .cse110 .cse132 (= |ULTIMATE.start_main_~A~0#1| (+ .cse102 .cse133))) (or .cse115 .cse130 (= |ULTIMATE.start_main_~A~0#1| (+ .cse102 .cse131)) .cse116)))) .cse41) (or .cse38 .cse100 (and (or .cse97 (and (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ .cse99 .cse133)) .cse132) (or .cse115 .cse130 (= |ULTIMATE.start_main_~A~0#1| (+ .cse99 .cse131)) .cse116)) .cse98) (or (and (or .cse115 .cse130 (= |ULTIMATE.start_main_~A~0#1| (+ .cse90 .cse131)) .cse116) (or .cse110 .cse132 (= |ULTIMATE.start_main_~A~0#1| (+ .cse90 .cse133)))) .cse88)) .cse39))) (>= .cse87 .cse32))) (.cse72 (or .cse34 .cse125 .cse36 (let ((.cse126 (+ |ULTIMATE.start_main_~r~0#1| .cse107)) (.cse127 (not (>= |ULTIMATE.start_main_~r~0#1| .cse106))) (.cse129 (+ |ULTIMATE.start_main_~r~0#1| .cse105)) (.cse128 (not (>= |ULTIMATE.start_main_~r~0#1| .cse104)))) (and (or .cse38 (and (or (and (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse111 .cse126)) .cse127) (or .cse89 .cse92 .cse128 (= |ULTIMATE.start_main_~A~0#1| (+ .cse111 .cse129)))) .cse97 .cse98) (or (and (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse118 .cse126)) .cse127) (or .cse89 (= |ULTIMATE.start_main_~A~0#1| (+ .cse118 .cse129)) .cse92 .cse128)) .cse88)) .cse100 .cse39) (or .cse101 (and (or (and (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse120 .cse126)) .cse127) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse120 .cse129)) .cse89 .cse92 .cse128)) .cse48) (or .cse55 .cse56 (and (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse119 .cse126)) .cse127) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse119 .cse129)) .cse89 .cse92 .cse128)))) .cse41))))) (.cse73 (or .cse33 .cse109 (let ((.cse114 (not (>= |ULTIMATE.start_main_~r~0#1| .cse124))) (.cse117 (+ |ULTIMATE.start_main_~r~0#1| .cse123)) (.cse112 (+ |ULTIMATE.start_main_~r~0#1| .cse122)) (.cse113 (not (>= |ULTIMATE.start_main_~r~0#1| .cse121)))) (and (or .cse38 .cse100 .cse39 (and (or .cse97 .cse98 (and (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ .cse111 .cse112)) .cse113) (or .cse114 .cse115 .cse116 (= |ULTIMATE.start_main_~A~0#1| (+ .cse111 .cse117))))) (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse118 .cse117)) .cse114 .cse115 .cse116) (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ .cse118 .cse112)) .cse113)) .cse88))) (or .cse101 .cse41 (and (or .cse55 (and (or .cse110 .cse113 (= |ULTIMATE.start_main_~A~0#1| (+ .cse119 .cse112))) (or .cse114 (= |ULTIMATE.start_main_~A~0#1| (+ .cse119 .cse117)) .cse115 .cse116)) .cse56) (or .cse48 (and (or .cse114 .cse115 (= |ULTIMATE.start_main_~A~0#1| (+ .cse120 .cse117)) .cse116) (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ .cse120 .cse112)) .cse113))))))))) (.cse74 (or .cse108 (not .cse75))) (.cse78 (or (>= .cse87 .cse35) .cse34 .cse36 (let ((.cse95 (+ .cse87 .cse107)) (.cse96 (not (>= .cse87 .cse106))) (.cse91 (+ .cse87 .cse105)) (.cse93 (not (>= .cse87 .cse104)))) (and (or .cse38 (and (or .cse88 (and (or .cse89 (= |ULTIMATE.start_main_~A~0#1| (+ .cse90 .cse91)) .cse92 .cse93) (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse90 .cse95)) .cse96))) (or .cse97 .cse98 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse99 .cse95)) .cse94 .cse96) (or .cse89 (= |ULTIMATE.start_main_~A~0#1| (+ .cse99 .cse91)) .cse92 .cse93)))) .cse100 .cse39) (or .cse101 (and (or .cse48 (and (or .cse89 .cse92 .cse93 (= |ULTIMATE.start_main_~A~0#1| (+ .cse102 .cse91))) (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse102 .cse95)) .cse96))) (or (and (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse103 .cse95)) .cse96) (or .cse89 (= |ULTIMATE.start_main_~A~0#1| (+ .cse103 .cse91)) .cse92 .cse93)) .cse55 .cse56)) .cse41))))) (.cse79 (or (let ((.cse86 (- .cse64))) (let ((.cse82 (+ .cse63 (+ (- 1) .cse86))) (.cse80 (not (>= .cse63 .cse65))) (.cse84 (+ .cse63 .cse86)) (.cse83 (not (>= .cse63 .cse64)))) (and (or .cse38 (let ((.cse81 (* (+ .cse62 .cse66) |ULTIMATE.start_main_~B~0#1|))) (and (or .cse34 .cse80 (= |ULTIMATE.start_main_~A~0#1| (+ .cse81 .cse82)) .cse36) (or .cse33 .cse83 (= |ULTIMATE.start_main_~A~0#1| (+ .cse81 .cse84))))) .cse39) (or (let ((.cse85 (* (+ .cse62 .cse67) |ULTIMATE.start_main_~B~0#1|))) (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse85 .cse82)) .cse34 .cse80 .cse36) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse85 .cse84)) .cse33 .cse83))) .cse41)))) (>= .cse63 |ULTIMATE.start_main_~d~0#1|) .cse76))) (or (and .cse68 .cse18 .cse69 .cse70 .cse71 .cse5 .cse72 .cse73 .cse17 .cse74 .cse15 (or .cse75 .cse76 .cse77) .cse78 .cse16 .cse79) (and (or .cse76 .cse77) .cse68 .cse18 .cse69 .cse70 .cse71 .cse5 .cse72 .cse73 .cse17 .cse74 .cse15 .cse78 .cse16 .cse79))))) (.cse24 (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse27 .cse62) .cse63)) (and (or .cse33 (not (= .cse27 .cse64))) (or .cse34 .cse36 (not (= .cse27 .cse65)))) (and (or .cse38 .cse39 (not (<= 1 .cse66))) (or (not (<= 1 .cse67)) .cse41)))) (.cse25 (or (let ((.cse43 (* .cse27 .cse47))) (and (or .cse42 (= |ULTIMATE.start_main_~A~0#1| (+ .cse43 .cse44)) .cse33) (or .cse34 (= |ULTIMATE.start_main_~A~0#1| (+ .cse43 .cse45)) .cse46 .cse36))) .cse41 (and (or .cse48 (and (or .cse49 (not (<= 1 .cse50)) .cse51) (or (not (<= 1 .cse52)) (and .cse53 .cse54)))) (or .cse55 .cse56 (and (or (not (<= 1 .cse57)) .cse58 .cse59) (or (not (<= 1 .cse60)) .cse61)))))) (.cse30 (or .cse31 (and (or (not (= .cse27 .cse32)) .cse33) (or .cse34 (not (= .cse27 .cse35)) .cse36)) (and (or (not (<= 1 .cse37)) .cse38 .cse39) (or (not (<= 1 .cse40)) .cse41))))) (or (and .cse19 .cse20 .cse21 .cse22 .cse2 .cse4 .cse23 .cse24 .cse25 .cse6) (and .cse19 .cse21 .cse22 .cse26 .cse2 .cse4 .cse23 .cse24 .cse25 (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse27 .cse28) .cse29)) (not (= .cse27 |ULTIMATE.start_main_~d~0#1|)) (not (<= 1 |ULTIMATE.start_main_~p~0#1|))) .cse6 .cse30) (and .cse19 .cse20 .cse21 .cse22 .cse2 .cse4 .cse23 .cse24 .cse25 .cse6 .cse30))))))) .cse2 .cse4 .cse5 .cse6)))))))))) [2023-02-18 18:27:03,369 INFO L899 garLoopResultBuilder]: For program point L59(line 59) no Hoare annotation was computed. [2023-02-18 18:27:03,372 INFO L895 garLoopResultBuilder]: At program point L35(line 35) the Hoare annotation is: (let ((.cse32 (div |ULTIMATE.start_main_~d~0#1| 2)) (.cse40 (div |ULTIMATE.start_main_~p~0#1| 2))) (let ((.cse37 (+ 1 .cse40)) (.cse252 (- .cse32))) (let ((.cse260 (+ (- 1) .cse252)) (.cse206 (+ |ULTIMATE.start_main_~q~0#1| .cse37)) (.cse47 (+ |ULTIMATE.start_main_~q~0#1| .cse40)) (.cse264 (mod |ULTIMATE.start_main_~d~0#1| 2)) (.cse228 (+ .cse40 1))) (let ((.cse214 (div |ULTIMATE.start_main_~p~0#1| 4)) (.cse212 (div .cse228 2)) (.cse231 (+ .cse32 1)) (.cse76 (= 1 |ULTIMATE.start_main_~p~0#1|)) (.cse176 (- |ULTIMATE.start_main_~d~0#1|)) (.cse34 (= 0 .cse264)) (.cse270 (< |ULTIMATE.start_main_~p~0#1| 0)) (.cse38 (= 0 (mod |ULTIMATE.start_main_~p~0#1| 2))) (.cse44 (+ |ULTIMATE.start_main_~r~0#1| .cse252)) (.cse269 (< |ULTIMATE.start_main_~d~0#1| 0)) (.cse272 (* .cse47 |ULTIMATE.start_main_~B~0#1|)) (.cse271 (* .cse206 |ULTIMATE.start_main_~B~0#1|)) (.cse45 (+ |ULTIMATE.start_main_~r~0#1| .cse260))) (let ((.cse101 (= 1 .cse40)) (.cse100 (= 1 .cse37)) (.cse200 (= |ULTIMATE.start_main_~A~0#1| (+ .cse271 .cse45))) (.cse205 (= |ULTIMATE.start_main_~A~0#1| (+ .cse272 .cse45))) (.cse36 (not .cse269)) (.cse204 (= |ULTIMATE.start_main_~A~0#1| (+ .cse272 .cse44))) (.cse41 (and .cse270 (not .cse38))) (.cse202 (= |ULTIMATE.start_main_~A~0#1| (+ .cse271 .cse44))) (.cse39 (not .cse270)) (.cse33 (and .cse269 (not .cse34))) (.cse211 (+ |ULTIMATE.start_main_~q~0#1| |ULTIMATE.start_main_~p~0#1|)) (.cse87 (+ |ULTIMATE.start_main_~r~0#1| .cse176)) (.cse2 (= |ULTIMATE.start_main_~r~0#1| |ULTIMATE.start_main_~A~0#1|)) (.cse26 (= |ULTIMATE.start_main_~A~0#1| (+ (* |ULTIMATE.start_main_~d~0#1| |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse263 (not .cse76)) (.cse121 (div |ULTIMATE.start_main_~d~0#1| 4)) (.cse106 (div .cse231 2)) (.cse35 (+ 1 .cse32)) (.cse97 (= 0 (mod .cse228 2))) (.cse267 (< .cse37 0)) (.cse213 (+ 1 .cse212)) (.cse215 (+ 1 .cse214)) (.cse268 (< .cse40 0)) (.cse55 (= 0 (mod .cse40 2)))) (let ((.cse48 (and .cse268 (not .cse55))) (.cse135 (= 1 .cse214)) (.cse56 (not .cse268)) (.cse148 (= 1 .cse215)) (.cse168 (= 1 .cse213)) (.cse98 (not .cse267)) (.cse157 (= 1 .cse212)) (.cse88 (and .cse267 (not .cse97))) (.cse92 (= 0 (mod .cse231 2))) (.cse261 (< .cse35 0)) (.cse116 (= 0 (mod .cse32 2))) (.cse262 (< .cse32 0)) (.cse177 (* 2 |ULTIMATE.start_main_~d~0#1|)) (.cse175 (* 2 |ULTIMATE.start_main_~p~0#1|)) (.cse107 (- .cse106)) (.cse122 (- .cse121)) (.cse265 (div .cse176 (- 2))) (.cse20 (or .cse26 .cse263)) (.cse0 (or .cse2 (= (+ |ULTIMATE.start_main_~A~0#1| (* (- 1) |ULTIMATE.start_main_~r~0#1|)) 0))) (.cse108 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse211 |ULTIMATE.start_main_~B~0#1|) .cse87))) (.cse1 (= 0 |ULTIMATE.start_main_~q~0#1|)) (.cse241 (or (and (or .cse204 .cse41) (or .cse38 .cse202 .cse39)) .cse33)) (.cse237 (or (and (or .cse38 .cse200 .cse39) (or .cse205 .cse41)) .cse34 .cse36)) (.cse3 (= |ULTIMATE.start_main_~q~0#1| 0)) (.cse4 (= |ULTIMATE.start_main_~B~0#1| 1)) (.cse5 (= |ULTIMATE.start_main_~A~0#1| (+ (* |ULTIMATE.start_main_~q~0#1| |ULTIMATE.start_main_~B~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse6 (= |ULTIMATE.start_main_~d~0#1| (* |ULTIMATE.start_main_~B~0#1| |ULTIMATE.start_main_~p~0#1|))) (.cse256 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse35 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|)) .cse34 .cse36) (or .cse33 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse32 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))))) (.cse253 (and (or .cse41 (not .cse101)) (or .cse38 (not .cse100) .cse39)))) (let ((.cse9 (let ((.cse266 (or .cse256 .cse253))) (or (and .cse0 .cse108 .cse20 .cse266 .cse1 .cse2 .cse241 .cse237 .cse3 .cse4 .cse5 .cse6) (and .cse0 .cse108 .cse266 .cse1 .cse26 .cse2 .cse241 .cse237 .cse3 .cse4 .cse5 .cse6)))) (.cse10 (<= 2 .cse265)) (.cse11 (>= |ULTIMATE.start_main_~r~0#1| .cse265)) (.cse13 (= .cse264 0)) (.cse15 (or (and (or .cse34 (= |ULTIMATE.start_main_~B~0#1| .cse35) .cse36) (or .cse33 (= |ULTIMATE.start_main_~B~0#1| .cse32))) .cse253)) (.cse16 (or .cse263 (= |ULTIMATE.start_main_~B~0#1| |ULTIMATE.start_main_~d~0#1|))) (.cse123 (+ (- 1) .cse122)) (.cse105 (+ (- 1) .cse107)) (.cse62 (+ |ULTIMATE.start_main_~q~0#1| .cse175)) (.cse63 (+ |ULTIMATE.start_main_~r~0#1| (- .cse177))) (.cse115 (not .cse262)) (.cse124 (+ 1 .cse121)) (.cse110 (and (not .cse116) .cse262)) (.cse94 (and (not .cse92) .cse261)) (.cse104 (+ 1 .cse106)) (.cse89 (not .cse261)) (.cse258 (and (or .cse97 (not .cse168) .cse98) (or (not .cse157) .cse88))) (.cse257 (and (or .cse48 (not .cse135)) (or .cse55 .cse56 (not .cse148)))) (.cse7 (* 2 1)) (.cse8 (* 2 |ULTIMATE.start_main_~B~0#1|))) (let ((.cse14 (* 2 .cse8)) (.cse12 (* 2 .cse7)) (.cse18 (or (and (or .cse33 (and (or .cse115 .cse116 (= |ULTIMATE.start_main_~B~0#1| .cse124)) (or .cse110 (= |ULTIMATE.start_main_~B~0#1| .cse121)))) (or .cse34 (and (or .cse94 (= |ULTIMATE.start_main_~B~0#1| .cse106)) (or (= |ULTIMATE.start_main_~B~0#1| .cse104) .cse89 .cse92)) .cse36)) (and (or .cse38 .cse39 .cse258) (or .cse257 .cse41)))) (.cse17 (let ((.cse243 (* (+ .cse206 .cse212) |ULTIMATE.start_main_~B~0#1|)) (.cse245 (* (+ .cse206 .cse213) |ULTIMATE.start_main_~B~0#1|)) (.cse247 (* (+ .cse47 .cse215) |ULTIMATE.start_main_~B~0#1|)) (.cse248 (* (+ .cse47 .cse214) |ULTIMATE.start_main_~B~0#1|)) (.cse249 (* (+ .cse211 .cse37) |ULTIMATE.start_main_~B~0#1|)) (.cse251 (* (+ .cse211 .cse40) |ULTIMATE.start_main_~B~0#1|))) (let ((.cse232 (or (let ((.cse259 (+ .cse87 .cse260))) (and (or .cse38 (= |ULTIMATE.start_main_~A~0#1| (+ .cse249 .cse259)) .cse39) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse251 .cse259)) .cse41))) .cse34 .cse36)) (.cse233 (or .cse38 .cse100 (and (or .cse33 (and (or .cse115 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse124 .cse206) .cse44)) .cse116) (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse121 .cse206) .cse44))))) (or .cse34 (and (or .cse89 .cse92 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse104 .cse206) .cse45))) (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse106 .cse206) .cse45)))) .cse36)) .cse39 .cse258)) (.cse234 (= |ULTIMATE.start_main_~A~0#1| (+ (* (+ .cse62 |ULTIMATE.start_main_~p~0#1|) |ULTIMATE.start_main_~B~0#1|) (+ .cse63 .cse176)))) (.cse235 (or .cse101 .cse257 (and (or .cse34 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse104 .cse47) .cse45)) .cse89 .cse92) (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse106 .cse47) .cse45)))) .cse36) (or .cse33 (and (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse121 .cse47) .cse44))) (or .cse115 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse124 .cse47) .cse44)) .cse116)))) .cse41)) (.cse236 (or .cse76 .cse256 .cse253)) (.cse238 (or .cse34 (let ((.cse255 (+ .cse45 .cse105)) (.cse254 (+ .cse45 .cse107))) (and (or .cse38 (and (or .cse94 (and (or .cse88 (= |ULTIMATE.start_main_~A~0#1| (+ .cse243 .cse254))) (or .cse97 (= |ULTIMATE.start_main_~A~0#1| (+ .cse245 .cse254)) .cse98))) (or .cse89 .cse92 (and (or .cse88 (= |ULTIMATE.start_main_~A~0#1| (+ .cse243 .cse255))) (or .cse97 (= |ULTIMATE.start_main_~A~0#1| (+ .cse245 .cse255)) .cse98)))) .cse39) (or (and (or (and (or .cse48 (= |ULTIMATE.start_main_~A~0#1| (+ .cse248 .cse255))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse247 .cse255)) .cse55 .cse56)) .cse89 .cse92) (or .cse94 (and (or .cse55 .cse56 (= |ULTIMATE.start_main_~A~0#1| (+ .cse247 .cse254))) (or .cse48 (= |ULTIMATE.start_main_~A~0#1| (+ .cse248 .cse254)))))) .cse41))) .cse36)) (.cse239 (or (and (or .cse34 .cse36 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse35 .cse211) .cse87))) (or .cse33 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse32 .cse211) .cse87)))) .cse76 .cse253)) (.cse240 (or .cse33 (let ((.cse250 (+ .cse87 .cse252))) (and (or .cse38 .cse39 (= |ULTIMATE.start_main_~A~0#1| (+ .cse249 .cse250))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse251 .cse250)) .cse41))))) (.cse242 (or .cse33 (let ((.cse244 (+ .cse44 .cse122)) (.cse246 (+ .cse44 .cse123))) (and (or .cse38 (and (or .cse110 (and (or .cse88 (= |ULTIMATE.start_main_~A~0#1| (+ .cse243 .cse244))) (or .cse97 .cse98 (= |ULTIMATE.start_main_~A~0#1| (+ .cse245 .cse244))))) (or .cse115 (and (or .cse97 (= |ULTIMATE.start_main_~A~0#1| (+ .cse245 .cse246)) .cse98) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse243 .cse246)) .cse88)) .cse116)) .cse39) (or .cse41 (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse247 .cse244)) .cse55 .cse56) (or .cse48 (= |ULTIMATE.start_main_~A~0#1| (+ .cse248 .cse244)))) .cse110) (or (and (or .cse55 .cse56 (= |ULTIMATE.start_main_~A~0#1| (+ .cse247 .cse246))) (or .cse48 (= |ULTIMATE.start_main_~A~0#1| (+ .cse248 .cse246)))) .cse115 .cse116)))))))) (or (and .cse232 .cse233 .cse9 .cse10 .cse11 .cse234 .cse235 .cse236 .cse26 .cse237 .cse13 .cse5 .cse238 .cse108 .cse15 .cse239 .cse240 .cse241 .cse16 .cse242) (and .cse232 .cse233 .cse9 .cse10 .cse11 .cse234 .cse235 .cse236 .cse237 .cse13 .cse5 .cse238 .cse108 .cse20 .cse15 .cse239 .cse240 .cse241 .cse16 .cse242)))))) (or (and .cse0 .cse1 (= |ULTIMATE.start_main_~p~0#1| 1) .cse2 (= |ULTIMATE.start_main_~d~0#1| |ULTIMATE.start_main_~B~0#1|) .cse3 .cse4 (<= 1 |ULTIMATE.start_main_~d~0#1|) (= |ULTIMATE.start_main_~d~0#1| 1) .cse5 .cse6) (and (= |ULTIMATE.start_main_~d~0#1| .cse7) (<= 2 |ULTIMATE.start_main_~d~0#1|) .cse0 .cse1 .cse2 .cse3 .cse4 (= |ULTIMATE.start_main_~p~0#1| .cse7) .cse5 .cse6 (= |ULTIMATE.start_main_~d~0#1| .cse8)) (and .cse9 .cse10 .cse11 .cse2 .cse3 .cse4 (= |ULTIMATE.start_main_~d~0#1| .cse12) .cse13 .cse5 (= |ULTIMATE.start_main_~p~0#1| .cse12) (= |ULTIMATE.start_main_~d~0#1| .cse14) .cse15 .cse16 .cse6) (and .cse17 .cse15 .cse2 (= |ULTIMATE.start_main_~d~0#1| (* 2 .cse14)) .cse18 .cse16 .cse3 .cse4 .cse5 .cse6 (= |ULTIMATE.start_main_~p~0#1| (* 2 .cse12))) (and (let ((.cse229 (+ .cse121 1)) (.cse230 (+ .cse106 1))) (let ((.cse222 (+ .cse214 1)) (.cse197 (div .cse231 4)) (.cse223 (< .cse106 0)) (.cse188 (= 0 (mod .cse106 2))) (.cse185 (= 0 (mod .cse230 2))) (.cse224 (< .cse104 0)) (.cse196 (div .cse230 2)) (.cse171 (div |ULTIMATE.start_main_~d~0#1| 8)) (.cse225 (< .cse121 0)) (.cse140 (= 0 (mod .cse121 2))) (.cse174 (div .cse229 2)) (.cse226 (< .cse124 0)) (.cse151 (= 0 (mod .cse229 2))) (.cse227 (+ .cse212 1))) (let ((.cse207 (div .cse228 4)) (.cse219 (< .cse212 0)) (.cse160 (= 0 (mod .cse212 2))) (.cse167 (= 0 (mod .cse227 2))) (.cse220 (< .cse213 0)) (.cse209 (div .cse227 2)) (.cse154 (and .cse226 (not .cse151))) (.cse153 (not .cse226)) (.cse172 (+ 1 .cse174)) (.cse139 (and .cse225 (not .cse140))) (.cse170 (+ 1 .cse171)) (.cse143 (not .cse225)) (.cse195 (+ 1 .cse196)) (.cse183 (not .cse224)) (.cse181 (and .cse224 (not .cse185))) (.cse192 (and .cse223 (not .cse188))) (.cse187 (not .cse223)) (.cse199 (+ 1 .cse197)) (.cse27 (* |ULTIMATE.start_main_~B~0#1| 1)) (.cse52 (div |ULTIMATE.start_main_~p~0#1| 8)) (.cse49 (= 0 (mod .cse214 2))) (.cse60 (div .cse222 2)) (.cse58 (= 0 (mod .cse222 2))) (.cse221 (< .cse215 0)) (.cse54 (< .cse214 0)) (.cse64 (div .cse177 4)) (.cse67 (div .cse175 4))) (let ((.cse66 (+ 1 .cse67)) (.cse65 (+ 1 .cse64)) (.cse28 (+ |ULTIMATE.start_main_~q~0#1| (* 2 .cse175))) (.cse29 (+ |ULTIMATE.start_main_~r~0#1| (- (* 2 .cse177)))) (.cse51 (not .cse54)) (.cse61 (and (not .cse58) .cse221)) (.cse59 (not .cse221)) (.cse57 (+ 1 .cse60)) (.cse53 (not .cse49)) (.cse50 (+ 1 .cse52)) (.cse31 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse27 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse216 (and (or (and (or .cse48 (not (<= 1 .cse214))) (or .cse55 .cse56 (not (<= 1 .cse215)))) .cse41) (or .cse38 .cse39 (and (or (not (<= 1 .cse213)) .cse97 .cse98) (or .cse88 (not (<= 1 .cse212))))))) (.cse217 (and (or .cse34 (and (or .cse94 (not (= .cse27 .cse106))) (or .cse89 .cse92 (not (= .cse27 .cse104)))) .cse36) (or .cse33 (and (or .cse115 (not (= .cse27 .cse124)) .cse116) (or .cse110 (not (= .cse27 .cse121))))))) (.cse46 (and (or .cse89 .cse92 (and (or (not (= .cse27 .cse195)) .cse183 .cse185) (or .cse181 (not (= .cse27 .cse196))))) (or .cse94 (and (or (not (= .cse27 .cse197)) .cse192) (or .cse187 (not (= .cse27 .cse199)) .cse188))))) (.cse42 (and (or (and (or .cse154 (not (= .cse27 .cse174))) (or .cse151 .cse153 (not (= .cse27 .cse172)))) .cse115 .cse116) (or .cse110 (and (or .cse139 (not (= .cse27 .cse171))) (or .cse140 (not (= .cse27 .cse170)) .cse143))))) (.cse210 (+ 1 .cse209)) (.cse165 (not .cse220)) (.cse164 (and .cse220 (not .cse167))) (.cse159 (and .cse219 (not .cse160))) (.cse208 (+ 1 .cse207)) (.cse162 (not .cse219))) (let ((.cse19 (or .cse38 (let ((.cse218 (* .cse27 .cse206))) (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse218 .cse45)) .cse34 .cse46 .cse36) (or .cse42 .cse33 (= |ULTIMATE.start_main_~A~0#1| (+ .cse218 .cse44))))) .cse39 (and (or .cse97 .cse98 (and (or (not (<= 1 .cse210)) .cse165 .cse167) (or (not (<= 1 .cse209)) .cse164))) (or .cse88 (and (or .cse159 (not (<= 1 .cse207))) (or (not (<= 1 .cse208)) .cse160 .cse162)))))) (.cse21 (or .cse31 .cse216 .cse217)) (.cse22 (or .cse216 .cse217 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse27 .cse211) .cse87)))) (.cse23 (let ((.cse75 (>= |ULTIMATE.start_main_~r~0#1| |ULTIMATE.start_main_~d~0#1|)) (.cse111 (* (+ |ULTIMATE.start_main_~q~0#1| .cse213) |ULTIMATE.start_main_~B~0#1|)) (.cse118 (* (+ |ULTIMATE.start_main_~q~0#1| .cse212) |ULTIMATE.start_main_~B~0#1|)) (.cse120 (* (+ |ULTIMATE.start_main_~q~0#1| .cse214) |ULTIMATE.start_main_~B~0#1|)) (.cse119 (* (+ |ULTIMATE.start_main_~q~0#1| .cse215) |ULTIMATE.start_main_~B~0#1|)) (.cse103 (* (+ .cse211 .cse215) |ULTIMATE.start_main_~B~0#1|)) (.cse102 (* (+ .cse211 .cse214) |ULTIMATE.start_main_~B~0#1|)) (.cse99 (* (+ .cse211 .cse213) |ULTIMATE.start_main_~B~0#1|)) (.cse90 (* (+ .cse211 .cse212) |ULTIMATE.start_main_~B~0#1|)) (.cse145 (* (+ .cse47 .cse50) |ULTIMATE.start_main_~B~0#1|)) (.cse144 (and .cse54 .cse53)) (.cse137 (* (+ .cse47 .cse52) |ULTIMATE.start_main_~B~0#1|)) (.cse147 (* (+ .cse47 .cse60) |ULTIMATE.start_main_~B~0#1|)) (.cse146 (* (+ .cse47 .cse57) |ULTIMATE.start_main_~B~0#1|)) (.cse166 (* (+ .cse206 .cse210) |ULTIMATE.start_main_~B~0#1|)) (.cse163 (* (+ .cse206 .cse209) |ULTIMATE.start_main_~B~0#1|)) (.cse161 (* (+ .cse206 .cse208) |ULTIMATE.start_main_~B~0#1|)) (.cse158 (* (+ .cse206 .cse207) |ULTIMATE.start_main_~B~0#1|)) (.cse125 (>= |ULTIMATE.start_main_~r~0#1| .cse35)) (.cse109 (>= |ULTIMATE.start_main_~r~0#1| .cse32))) (let ((.cse77 (let ((.cse203 (not .cse109)) (.cse201 (not .cse125))) (and (or .cse38 (and (or .cse200 .cse34 .cse201 .cse36) (or .cse202 .cse33 .cse203)) .cse39) (or .cse41 (and (or .cse204 .cse33 .cse203) (or .cse205 .cse34 .cse201 .cse36)))))) (.cse68 (or (let ((.cse194 (- .cse196)) (.cse198 (- .cse197))) (let ((.cse193 (>= .cse45 .cse106)) (.cse186 (+ .cse45 (+ (- 1) .cse198))) (.cse189 (not (>= .cse45 .cse199))) (.cse191 (+ .cse45 .cse198)) (.cse190 (not (>= .cse45 .cse197))) (.cse179 (+ .cse45 .cse194)) (.cse180 (not (>= .cse45 .cse196))) (.cse182 (not (>= .cse45 .cse195))) (.cse184 (+ .cse45 (+ (- 1) .cse194))) (.cse178 (>= .cse45 .cse104))) (and (or (and (or .cse89 .cse92 .cse178 (and (or .cse135 .cse48 (and (or .cse49 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse179)) .cse180 .cse181) (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse184)) .cse185)) .cse51) (or .cse144 (and (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse184)) .cse185) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse179)) .cse180 .cse181))))) (or .cse55 .cse56 (and (or .cse59 .cse58 (and (or .cse180 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse179)) .cse181) (or .cse182 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse184)) .cse183 .cse185))) (or .cse61 (and (or .cse182 (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse184)) .cse183 .cse185) (or .cse180 .cse181 (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse179)))))) .cse148))) (or .cse94 (and (or .cse135 (and (or .cse49 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse186)) .cse187 .cse188 .cse189) (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse191)) .cse192)) .cse51) (or .cse144 (and (or .cse187 .cse188 .cse189 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse186))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse191)) .cse190 .cse192)))) .cse48) (or (and (or (and (or .cse190 .cse192 (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse191))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse186)) .cse187 .cse188 .cse189)) .cse61) (or .cse59 .cse58 (and (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse191)) .cse192) (or .cse187 .cse188 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse186)) .cse189)))) .cse55 .cse56 .cse148)) .cse193)) .cse41) (or .cse38 (and (or .cse94 .cse193 (and (or .cse97 .cse168 .cse98 (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse186)) .cse187 .cse188 .cse189) (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse191)) .cse192)) .cse165 .cse167) (or (and (or .cse187 .cse188 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse186)) .cse189) (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse191)) .cse192)) .cse164))) (or .cse157 .cse88 (and (or .cse160 (and (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse191)) .cse192) (or .cse187 .cse188 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse186)) .cse189)) .cse162) (or .cse159 (and (or .cse187 .cse188 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse186)) .cse189) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse191)) .cse190 .cse192))))))) (or .cse89 (and (or .cse97 .cse168 .cse98 (and (or .cse165 .cse167 (and (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse184)) .cse185) (or .cse180 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse179)) .cse181))) (or (and (or .cse180 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse179)) .cse181) (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse184)) .cse185)) .cse164))) (or .cse157 .cse88 (and (or .cse160 (and (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse184)) .cse185) (or .cse180 .cse181 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse179)))) .cse162) (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse179)) .cse180 .cse181) (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse184)) .cse185)) .cse159)))) .cse92 .cse178)) .cse39)))) .cse34 .cse36)) (.cse69 (or (= 1 .cse175) (= |ULTIMATE.start_main_~A~0#1| (+ (* (+ .cse28 |ULTIMATE.start_main_~p~0#1|) |ULTIMATE.start_main_~B~0#1|) (+ .cse29 .cse176))) (not (>= .cse29 |ULTIMATE.start_main_~d~0#1|)) (>= .cse29 .cse177))) (.cse70 (or .cse33 (let ((.cse169 (- .cse171)) (.cse173 (- .cse174))) (let ((.cse149 (>= .cse44 .cse124)) (.cse155 (not (>= .cse44 .cse174))) (.cse156 (+ .cse44 .cse173)) (.cse150 (+ .cse44 (+ (- 1) .cse173))) (.cse152 (not (>= .cse44 .cse172))) (.cse134 (>= .cse44 .cse121)) (.cse136 (not (>= .cse44 .cse171))) (.cse138 (+ .cse44 .cse169)) (.cse142 (not (>= .cse44 .cse170))) (.cse141 (+ .cse44 (+ (- 1) .cse169)))) (and (or .cse41 (and (or .cse110 .cse134 (and (or .cse135 .cse48 (and (or (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse138)) .cse139) (or .cse140 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse141)) .cse142 .cse143)) .cse144) (or (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse138)) .cse139) (or .cse140 .cse142 .cse143 (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse141)))) .cse49 .cse51))) (or .cse55 (and (or (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse138)) .cse139) (or .cse140 .cse142 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse141)) .cse143)) .cse59 .cse58) (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse141)) .cse140 .cse142 .cse143) (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse138)) .cse139)) .cse61)) .cse56 .cse148))) (or .cse149 .cse115 .cse116 (and (or (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse150)) .cse151 .cse152 .cse153) (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse156)))) .cse144) (or (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse156))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse150)) .cse151 .cse152 .cse153)) .cse49 .cse51)) .cse135 .cse48) (or .cse55 .cse56 (and (or (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse156))) (or .cse151 .cse152 .cse153 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse150)))) .cse59 .cse58) (or (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse156))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse150)) .cse151 .cse152 .cse153)) .cse61)) .cse148))))) (or .cse38 .cse39 (and (or .cse149 .cse115 (and (or .cse157 .cse88 (and (or (and (or .cse154 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse156)) .cse155) (or .cse151 .cse152 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse150)) .cse153)) .cse159) (or .cse160 (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse156))) (or .cse151 .cse152 .cse153 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse150)))) .cse162))) (or (and (or (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse156))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse150)) .cse151 .cse152 .cse153)) .cse164) (or .cse165 (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse156))) (or .cse151 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse150)) .cse152 .cse153)) .cse167)) .cse97 .cse168 .cse98)) .cse116) (or .cse110 .cse134 (and (or .cse157 (and (or .cse159 (and (or .cse140 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse141)) .cse142 .cse143) (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse138)) .cse139))) (or .cse160 (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse138)) .cse139) (or .cse140 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse141)) .cse142 .cse143)) .cse162)) .cse88) (or .cse97 .cse168 (and (or .cse165 (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse138)) .cse139) (or .cse140 .cse142 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse141)) .cse143)) .cse167) (or (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse138)) .cse139) (or .cse140 .cse142 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse141)) .cse143)) .cse164)) .cse98)))))))))) (.cse71 (or .cse33 (let ((.cse130 (not (>= .cse87 .cse124))) (.cse131 (+ .cse87 .cse123)) (.cse132 (not (>= .cse87 .cse121))) (.cse133 (+ .cse87 .cse122))) (and (or .cse101 (and (or (and (or .cse115 .cse130 .cse116 (= |ULTIMATE.start_main_~A~0#1| (+ .cse103 .cse131))) (or .cse110 .cse132 (= |ULTIMATE.start_main_~A~0#1| (+ .cse103 .cse133)))) .cse55 .cse56) (or .cse48 (and (or .cse110 .cse132 (= |ULTIMATE.start_main_~A~0#1| (+ .cse102 .cse133))) (or .cse115 .cse130 (= |ULTIMATE.start_main_~A~0#1| (+ .cse102 .cse131)) .cse116)))) .cse41) (or .cse38 .cse100 (and (or .cse97 (and (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ .cse99 .cse133)) .cse132) (or .cse115 .cse130 (= |ULTIMATE.start_main_~A~0#1| (+ .cse99 .cse131)) .cse116)) .cse98) (or (and (or .cse115 .cse130 (= |ULTIMATE.start_main_~A~0#1| (+ .cse90 .cse131)) .cse116) (or .cse110 .cse132 (= |ULTIMATE.start_main_~A~0#1| (+ .cse90 .cse133)))) .cse88)) .cse39))) (>= .cse87 .cse32))) (.cse72 (or .cse34 .cse125 .cse36 (let ((.cse126 (+ |ULTIMATE.start_main_~r~0#1| .cse107)) (.cse127 (not (>= |ULTIMATE.start_main_~r~0#1| .cse106))) (.cse129 (+ |ULTIMATE.start_main_~r~0#1| .cse105)) (.cse128 (not (>= |ULTIMATE.start_main_~r~0#1| .cse104)))) (and (or .cse38 (and (or (and (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse111 .cse126)) .cse127) (or .cse89 .cse92 .cse128 (= |ULTIMATE.start_main_~A~0#1| (+ .cse111 .cse129)))) .cse97 .cse98) (or (and (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse118 .cse126)) .cse127) (or .cse89 (= |ULTIMATE.start_main_~A~0#1| (+ .cse118 .cse129)) .cse92 .cse128)) .cse88)) .cse100 .cse39) (or .cse101 (and (or (and (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse120 .cse126)) .cse127) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse120 .cse129)) .cse89 .cse92 .cse128)) .cse48) (or .cse55 .cse56 (and (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse119 .cse126)) .cse127) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse119 .cse129)) .cse89 .cse92 .cse128)))) .cse41))))) (.cse73 (or .cse33 .cse109 (let ((.cse114 (not (>= |ULTIMATE.start_main_~r~0#1| .cse124))) (.cse117 (+ |ULTIMATE.start_main_~r~0#1| .cse123)) (.cse112 (+ |ULTIMATE.start_main_~r~0#1| .cse122)) (.cse113 (not (>= |ULTIMATE.start_main_~r~0#1| .cse121)))) (and (or .cse38 .cse100 .cse39 (and (or .cse97 .cse98 (and (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ .cse111 .cse112)) .cse113) (or .cse114 .cse115 .cse116 (= |ULTIMATE.start_main_~A~0#1| (+ .cse111 .cse117))))) (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse118 .cse117)) .cse114 .cse115 .cse116) (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ .cse118 .cse112)) .cse113)) .cse88))) (or .cse101 .cse41 (and (or .cse55 (and (or .cse110 .cse113 (= |ULTIMATE.start_main_~A~0#1| (+ .cse119 .cse112))) (or .cse114 (= |ULTIMATE.start_main_~A~0#1| (+ .cse119 .cse117)) .cse115 .cse116)) .cse56) (or .cse48 (and (or .cse114 .cse115 (= |ULTIMATE.start_main_~A~0#1| (+ .cse120 .cse117)) .cse116) (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ .cse120 .cse112)) .cse113))))))))) (.cse74 (or .cse108 (not .cse75))) (.cse78 (or (>= .cse87 .cse35) .cse34 .cse36 (let ((.cse95 (+ .cse87 .cse107)) (.cse96 (not (>= .cse87 .cse106))) (.cse91 (+ .cse87 .cse105)) (.cse93 (not (>= .cse87 .cse104)))) (and (or .cse38 (and (or .cse88 (and (or .cse89 (= |ULTIMATE.start_main_~A~0#1| (+ .cse90 .cse91)) .cse92 .cse93) (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse90 .cse95)) .cse96))) (or .cse97 .cse98 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse99 .cse95)) .cse94 .cse96) (or .cse89 (= |ULTIMATE.start_main_~A~0#1| (+ .cse99 .cse91)) .cse92 .cse93)))) .cse100 .cse39) (or .cse101 (and (or .cse48 (and (or .cse89 .cse92 .cse93 (= |ULTIMATE.start_main_~A~0#1| (+ .cse102 .cse91))) (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse102 .cse95)) .cse96))) (or (and (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse103 .cse95)) .cse96) (or .cse89 (= |ULTIMATE.start_main_~A~0#1| (+ .cse103 .cse91)) .cse92 .cse93)) .cse55 .cse56)) .cse41))))) (.cse79 (or (let ((.cse86 (- .cse64))) (let ((.cse82 (+ .cse63 (+ (- 1) .cse86))) (.cse80 (not (>= .cse63 .cse65))) (.cse84 (+ .cse63 .cse86)) (.cse83 (not (>= .cse63 .cse64)))) (and (or .cse38 (let ((.cse81 (* (+ .cse62 .cse66) |ULTIMATE.start_main_~B~0#1|))) (and (or .cse34 .cse80 (= |ULTIMATE.start_main_~A~0#1| (+ .cse81 .cse82)) .cse36) (or .cse33 .cse83 (= |ULTIMATE.start_main_~A~0#1| (+ .cse81 .cse84))))) .cse39) (or (let ((.cse85 (* (+ .cse62 .cse67) |ULTIMATE.start_main_~B~0#1|))) (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse85 .cse82)) .cse34 .cse80 .cse36) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse85 .cse84)) .cse33 .cse83))) .cse41)))) (>= .cse63 |ULTIMATE.start_main_~d~0#1|) .cse76))) (or (and .cse68 .cse18 .cse69 .cse70 .cse71 .cse5 .cse72 .cse73 .cse17 .cse74 .cse15 (or .cse75 .cse76 .cse77) .cse78 .cse16 .cse79) (and (or .cse76 .cse77) .cse68 .cse18 .cse69 .cse70 .cse71 .cse5 .cse72 .cse73 .cse17 .cse74 .cse15 .cse78 .cse16 .cse79))))) (.cse24 (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse27 .cse62) .cse63)) (and (or .cse33 (not (= .cse27 .cse64))) (or .cse34 .cse36 (not (= .cse27 .cse65)))) (and (or .cse38 .cse39 (not (<= 1 .cse66))) (or (not (<= 1 .cse67)) .cse41)))) (.cse25 (or (let ((.cse43 (* .cse27 .cse47))) (and (or .cse42 (= |ULTIMATE.start_main_~A~0#1| (+ .cse43 .cse44)) .cse33) (or .cse34 (= |ULTIMATE.start_main_~A~0#1| (+ .cse43 .cse45)) .cse46 .cse36))) .cse41 (and (or .cse48 (and (or .cse49 (not (<= 1 .cse50)) .cse51) (or (not (<= 1 .cse52)) (and .cse53 .cse54)))) (or .cse55 .cse56 (and (or (not (<= 1 .cse57)) .cse58 .cse59) (or (not (<= 1 .cse60)) .cse61)))))) (.cse30 (or .cse31 (and (or (not (= .cse27 .cse32)) .cse33) (or .cse34 (not (= .cse27 .cse35)) .cse36)) (and (or (not (<= 1 .cse37)) .cse38 .cse39) (or (not (<= 1 .cse40)) .cse41))))) (or (and .cse19 .cse20 .cse21 .cse22 .cse2 .cse4 .cse23 .cse24 .cse25 .cse6) (and .cse19 .cse21 .cse22 .cse26 .cse2 .cse4 .cse23 .cse24 .cse25 (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse27 .cse28) .cse29)) (not (= .cse27 |ULTIMATE.start_main_~d~0#1|)) (not (<= 1 |ULTIMATE.start_main_~p~0#1|))) .cse6 .cse30) (and .cse19 .cse20 .cse21 .cse22 .cse2 .cse4 .cse23 .cse24 .cse25 .cse6 .cse30))))))) .cse2 .cse4 .cse5 .cse6)))))))))) [2023-02-18 18:27:03,375 INFO L895 garLoopResultBuilder]: At program point L35-1(line 35) the Hoare annotation is: (let ((.cse32 (div |ULTIMATE.start_main_~d~0#1| 2)) (.cse40 (div |ULTIMATE.start_main_~p~0#1| 2))) (let ((.cse37 (+ 1 .cse40)) (.cse252 (- .cse32))) (let ((.cse260 (+ (- 1) .cse252)) (.cse206 (+ |ULTIMATE.start_main_~q~0#1| .cse37)) (.cse47 (+ |ULTIMATE.start_main_~q~0#1| .cse40)) (.cse264 (mod |ULTIMATE.start_main_~d~0#1| 2)) (.cse228 (+ .cse40 1))) (let ((.cse214 (div |ULTIMATE.start_main_~p~0#1| 4)) (.cse212 (div .cse228 2)) (.cse231 (+ .cse32 1)) (.cse76 (= 1 |ULTIMATE.start_main_~p~0#1|)) (.cse176 (- |ULTIMATE.start_main_~d~0#1|)) (.cse34 (= 0 .cse264)) (.cse270 (< |ULTIMATE.start_main_~p~0#1| 0)) (.cse38 (= 0 (mod |ULTIMATE.start_main_~p~0#1| 2))) (.cse44 (+ |ULTIMATE.start_main_~r~0#1| .cse252)) (.cse269 (< |ULTIMATE.start_main_~d~0#1| 0)) (.cse272 (* .cse47 |ULTIMATE.start_main_~B~0#1|)) (.cse271 (* .cse206 |ULTIMATE.start_main_~B~0#1|)) (.cse45 (+ |ULTIMATE.start_main_~r~0#1| .cse260))) (let ((.cse101 (= 1 .cse40)) (.cse100 (= 1 .cse37)) (.cse200 (= |ULTIMATE.start_main_~A~0#1| (+ .cse271 .cse45))) (.cse205 (= |ULTIMATE.start_main_~A~0#1| (+ .cse272 .cse45))) (.cse36 (not .cse269)) (.cse204 (= |ULTIMATE.start_main_~A~0#1| (+ .cse272 .cse44))) (.cse41 (and .cse270 (not .cse38))) (.cse202 (= |ULTIMATE.start_main_~A~0#1| (+ .cse271 .cse44))) (.cse39 (not .cse270)) (.cse33 (and .cse269 (not .cse34))) (.cse211 (+ |ULTIMATE.start_main_~q~0#1| |ULTIMATE.start_main_~p~0#1|)) (.cse87 (+ |ULTIMATE.start_main_~r~0#1| .cse176)) (.cse2 (= |ULTIMATE.start_main_~r~0#1| |ULTIMATE.start_main_~A~0#1|)) (.cse26 (= |ULTIMATE.start_main_~A~0#1| (+ (* |ULTIMATE.start_main_~d~0#1| |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse263 (not .cse76)) (.cse121 (div |ULTIMATE.start_main_~d~0#1| 4)) (.cse106 (div .cse231 2)) (.cse35 (+ 1 .cse32)) (.cse97 (= 0 (mod .cse228 2))) (.cse267 (< .cse37 0)) (.cse213 (+ 1 .cse212)) (.cse215 (+ 1 .cse214)) (.cse268 (< .cse40 0)) (.cse55 (= 0 (mod .cse40 2)))) (let ((.cse48 (and .cse268 (not .cse55))) (.cse135 (= 1 .cse214)) (.cse56 (not .cse268)) (.cse148 (= 1 .cse215)) (.cse168 (= 1 .cse213)) (.cse98 (not .cse267)) (.cse157 (= 1 .cse212)) (.cse88 (and .cse267 (not .cse97))) (.cse92 (= 0 (mod .cse231 2))) (.cse261 (< .cse35 0)) (.cse116 (= 0 (mod .cse32 2))) (.cse262 (< .cse32 0)) (.cse177 (* 2 |ULTIMATE.start_main_~d~0#1|)) (.cse175 (* 2 |ULTIMATE.start_main_~p~0#1|)) (.cse107 (- .cse106)) (.cse122 (- .cse121)) (.cse265 (div .cse176 (- 2))) (.cse20 (or .cse26 .cse263)) (.cse0 (or .cse2 (= (+ |ULTIMATE.start_main_~A~0#1| (* (- 1) |ULTIMATE.start_main_~r~0#1|)) 0))) (.cse108 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse211 |ULTIMATE.start_main_~B~0#1|) .cse87))) (.cse1 (= 0 |ULTIMATE.start_main_~q~0#1|)) (.cse241 (or (and (or .cse204 .cse41) (or .cse38 .cse202 .cse39)) .cse33)) (.cse237 (or (and (or .cse38 .cse200 .cse39) (or .cse205 .cse41)) .cse34 .cse36)) (.cse3 (= |ULTIMATE.start_main_~q~0#1| 0)) (.cse4 (= |ULTIMATE.start_main_~B~0#1| 1)) (.cse5 (= |ULTIMATE.start_main_~A~0#1| (+ (* |ULTIMATE.start_main_~q~0#1| |ULTIMATE.start_main_~B~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse6 (= |ULTIMATE.start_main_~d~0#1| (* |ULTIMATE.start_main_~B~0#1| |ULTIMATE.start_main_~p~0#1|))) (.cse256 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse35 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|)) .cse34 .cse36) (or .cse33 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse32 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))))) (.cse253 (and (or .cse41 (not .cse101)) (or .cse38 (not .cse100) .cse39)))) (let ((.cse9 (let ((.cse266 (or .cse256 .cse253))) (or (and .cse0 .cse108 .cse20 .cse266 .cse1 .cse2 .cse241 .cse237 .cse3 .cse4 .cse5 .cse6) (and .cse0 .cse108 .cse266 .cse1 .cse26 .cse2 .cse241 .cse237 .cse3 .cse4 .cse5 .cse6)))) (.cse10 (<= 2 .cse265)) (.cse11 (>= |ULTIMATE.start_main_~r~0#1| .cse265)) (.cse13 (= .cse264 0)) (.cse15 (or (and (or .cse34 (= |ULTIMATE.start_main_~B~0#1| .cse35) .cse36) (or .cse33 (= |ULTIMATE.start_main_~B~0#1| .cse32))) .cse253)) (.cse16 (or .cse263 (= |ULTIMATE.start_main_~B~0#1| |ULTIMATE.start_main_~d~0#1|))) (.cse123 (+ (- 1) .cse122)) (.cse105 (+ (- 1) .cse107)) (.cse62 (+ |ULTIMATE.start_main_~q~0#1| .cse175)) (.cse63 (+ |ULTIMATE.start_main_~r~0#1| (- .cse177))) (.cse115 (not .cse262)) (.cse124 (+ 1 .cse121)) (.cse110 (and (not .cse116) .cse262)) (.cse94 (and (not .cse92) .cse261)) (.cse104 (+ 1 .cse106)) (.cse89 (not .cse261)) (.cse258 (and (or .cse97 (not .cse168) .cse98) (or (not .cse157) .cse88))) (.cse257 (and (or .cse48 (not .cse135)) (or .cse55 .cse56 (not .cse148)))) (.cse7 (* 2 1)) (.cse8 (* 2 |ULTIMATE.start_main_~B~0#1|))) (let ((.cse14 (* 2 .cse8)) (.cse12 (* 2 .cse7)) (.cse18 (or (and (or .cse33 (and (or .cse115 .cse116 (= |ULTIMATE.start_main_~B~0#1| .cse124)) (or .cse110 (= |ULTIMATE.start_main_~B~0#1| .cse121)))) (or .cse34 (and (or .cse94 (= |ULTIMATE.start_main_~B~0#1| .cse106)) (or (= |ULTIMATE.start_main_~B~0#1| .cse104) .cse89 .cse92)) .cse36)) (and (or .cse38 .cse39 .cse258) (or .cse257 .cse41)))) (.cse17 (let ((.cse243 (* (+ .cse206 .cse212) |ULTIMATE.start_main_~B~0#1|)) (.cse245 (* (+ .cse206 .cse213) |ULTIMATE.start_main_~B~0#1|)) (.cse247 (* (+ .cse47 .cse215) |ULTIMATE.start_main_~B~0#1|)) (.cse248 (* (+ .cse47 .cse214) |ULTIMATE.start_main_~B~0#1|)) (.cse249 (* (+ .cse211 .cse37) |ULTIMATE.start_main_~B~0#1|)) (.cse251 (* (+ .cse211 .cse40) |ULTIMATE.start_main_~B~0#1|))) (let ((.cse232 (or (let ((.cse259 (+ .cse87 .cse260))) (and (or .cse38 (= |ULTIMATE.start_main_~A~0#1| (+ .cse249 .cse259)) .cse39) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse251 .cse259)) .cse41))) .cse34 .cse36)) (.cse233 (or .cse38 .cse100 (and (or .cse33 (and (or .cse115 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse124 .cse206) .cse44)) .cse116) (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse121 .cse206) .cse44))))) (or .cse34 (and (or .cse89 .cse92 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse104 .cse206) .cse45))) (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse106 .cse206) .cse45)))) .cse36)) .cse39 .cse258)) (.cse234 (= |ULTIMATE.start_main_~A~0#1| (+ (* (+ .cse62 |ULTIMATE.start_main_~p~0#1|) |ULTIMATE.start_main_~B~0#1|) (+ .cse63 .cse176)))) (.cse235 (or .cse101 .cse257 (and (or .cse34 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse104 .cse47) .cse45)) .cse89 .cse92) (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse106 .cse47) .cse45)))) .cse36) (or .cse33 (and (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse121 .cse47) .cse44))) (or .cse115 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse124 .cse47) .cse44)) .cse116)))) .cse41)) (.cse236 (or .cse76 .cse256 .cse253)) (.cse238 (or .cse34 (let ((.cse255 (+ .cse45 .cse105)) (.cse254 (+ .cse45 .cse107))) (and (or .cse38 (and (or .cse94 (and (or .cse88 (= |ULTIMATE.start_main_~A~0#1| (+ .cse243 .cse254))) (or .cse97 (= |ULTIMATE.start_main_~A~0#1| (+ .cse245 .cse254)) .cse98))) (or .cse89 .cse92 (and (or .cse88 (= |ULTIMATE.start_main_~A~0#1| (+ .cse243 .cse255))) (or .cse97 (= |ULTIMATE.start_main_~A~0#1| (+ .cse245 .cse255)) .cse98)))) .cse39) (or (and (or (and (or .cse48 (= |ULTIMATE.start_main_~A~0#1| (+ .cse248 .cse255))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse247 .cse255)) .cse55 .cse56)) .cse89 .cse92) (or .cse94 (and (or .cse55 .cse56 (= |ULTIMATE.start_main_~A~0#1| (+ .cse247 .cse254))) (or .cse48 (= |ULTIMATE.start_main_~A~0#1| (+ .cse248 .cse254)))))) .cse41))) .cse36)) (.cse239 (or (and (or .cse34 .cse36 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse35 .cse211) .cse87))) (or .cse33 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse32 .cse211) .cse87)))) .cse76 .cse253)) (.cse240 (or .cse33 (let ((.cse250 (+ .cse87 .cse252))) (and (or .cse38 .cse39 (= |ULTIMATE.start_main_~A~0#1| (+ .cse249 .cse250))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse251 .cse250)) .cse41))))) (.cse242 (or .cse33 (let ((.cse244 (+ .cse44 .cse122)) (.cse246 (+ .cse44 .cse123))) (and (or .cse38 (and (or .cse110 (and (or .cse88 (= |ULTIMATE.start_main_~A~0#1| (+ .cse243 .cse244))) (or .cse97 .cse98 (= |ULTIMATE.start_main_~A~0#1| (+ .cse245 .cse244))))) (or .cse115 (and (or .cse97 (= |ULTIMATE.start_main_~A~0#1| (+ .cse245 .cse246)) .cse98) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse243 .cse246)) .cse88)) .cse116)) .cse39) (or .cse41 (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse247 .cse244)) .cse55 .cse56) (or .cse48 (= |ULTIMATE.start_main_~A~0#1| (+ .cse248 .cse244)))) .cse110) (or (and (or .cse55 .cse56 (= |ULTIMATE.start_main_~A~0#1| (+ .cse247 .cse246))) (or .cse48 (= |ULTIMATE.start_main_~A~0#1| (+ .cse248 .cse246)))) .cse115 .cse116)))))))) (or (and .cse232 .cse233 .cse9 .cse10 .cse11 .cse234 .cse235 .cse236 .cse26 .cse237 .cse13 .cse5 .cse238 .cse108 .cse15 .cse239 .cse240 .cse241 .cse16 .cse242) (and .cse232 .cse233 .cse9 .cse10 .cse11 .cse234 .cse235 .cse236 .cse237 .cse13 .cse5 .cse238 .cse108 .cse20 .cse15 .cse239 .cse240 .cse241 .cse16 .cse242)))))) (or (and .cse0 .cse1 (= |ULTIMATE.start_main_~p~0#1| 1) .cse2 (= |ULTIMATE.start_main_~d~0#1| |ULTIMATE.start_main_~B~0#1|) .cse3 .cse4 (<= 1 |ULTIMATE.start_main_~d~0#1|) (= |ULTIMATE.start_main_~d~0#1| 1) .cse5 .cse6) (and (= |ULTIMATE.start_main_~d~0#1| .cse7) (<= 2 |ULTIMATE.start_main_~d~0#1|) .cse0 .cse1 .cse2 .cse3 .cse4 (= |ULTIMATE.start_main_~p~0#1| .cse7) .cse5 .cse6 (= |ULTIMATE.start_main_~d~0#1| .cse8)) (and .cse9 .cse10 .cse11 .cse2 .cse3 .cse4 (= |ULTIMATE.start_main_~d~0#1| .cse12) .cse13 .cse5 (= |ULTIMATE.start_main_~p~0#1| .cse12) (= |ULTIMATE.start_main_~d~0#1| .cse14) .cse15 .cse16 .cse6) (and .cse17 .cse15 .cse2 (= |ULTIMATE.start_main_~d~0#1| (* 2 .cse14)) .cse18 .cse16 .cse3 .cse4 .cse5 .cse6 (= |ULTIMATE.start_main_~p~0#1| (* 2 .cse12))) (and (let ((.cse229 (+ .cse121 1)) (.cse230 (+ .cse106 1))) (let ((.cse222 (+ .cse214 1)) (.cse197 (div .cse231 4)) (.cse223 (< .cse106 0)) (.cse188 (= 0 (mod .cse106 2))) (.cse185 (= 0 (mod .cse230 2))) (.cse224 (< .cse104 0)) (.cse196 (div .cse230 2)) (.cse171 (div |ULTIMATE.start_main_~d~0#1| 8)) (.cse225 (< .cse121 0)) (.cse140 (= 0 (mod .cse121 2))) (.cse174 (div .cse229 2)) (.cse226 (< .cse124 0)) (.cse151 (= 0 (mod .cse229 2))) (.cse227 (+ .cse212 1))) (let ((.cse207 (div .cse228 4)) (.cse219 (< .cse212 0)) (.cse160 (= 0 (mod .cse212 2))) (.cse167 (= 0 (mod .cse227 2))) (.cse220 (< .cse213 0)) (.cse209 (div .cse227 2)) (.cse154 (and .cse226 (not .cse151))) (.cse153 (not .cse226)) (.cse172 (+ 1 .cse174)) (.cse139 (and .cse225 (not .cse140))) (.cse170 (+ 1 .cse171)) (.cse143 (not .cse225)) (.cse195 (+ 1 .cse196)) (.cse183 (not .cse224)) (.cse181 (and .cse224 (not .cse185))) (.cse192 (and .cse223 (not .cse188))) (.cse187 (not .cse223)) (.cse199 (+ 1 .cse197)) (.cse27 (* |ULTIMATE.start_main_~B~0#1| 1)) (.cse52 (div |ULTIMATE.start_main_~p~0#1| 8)) (.cse49 (= 0 (mod .cse214 2))) (.cse60 (div .cse222 2)) (.cse58 (= 0 (mod .cse222 2))) (.cse221 (< .cse215 0)) (.cse54 (< .cse214 0)) (.cse64 (div .cse177 4)) (.cse67 (div .cse175 4))) (let ((.cse66 (+ 1 .cse67)) (.cse65 (+ 1 .cse64)) (.cse28 (+ |ULTIMATE.start_main_~q~0#1| (* 2 .cse175))) (.cse29 (+ |ULTIMATE.start_main_~r~0#1| (- (* 2 .cse177)))) (.cse51 (not .cse54)) (.cse61 (and (not .cse58) .cse221)) (.cse59 (not .cse221)) (.cse57 (+ 1 .cse60)) (.cse53 (not .cse49)) (.cse50 (+ 1 .cse52)) (.cse31 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse27 |ULTIMATE.start_main_~q~0#1|) |ULTIMATE.start_main_~r~0#1|))) (.cse216 (and (or (and (or .cse48 (not (<= 1 .cse214))) (or .cse55 .cse56 (not (<= 1 .cse215)))) .cse41) (or .cse38 .cse39 (and (or (not (<= 1 .cse213)) .cse97 .cse98) (or .cse88 (not (<= 1 .cse212))))))) (.cse217 (and (or .cse34 (and (or .cse94 (not (= .cse27 .cse106))) (or .cse89 .cse92 (not (= .cse27 .cse104)))) .cse36) (or .cse33 (and (or .cse115 (not (= .cse27 .cse124)) .cse116) (or .cse110 (not (= .cse27 .cse121))))))) (.cse46 (and (or .cse89 .cse92 (and (or (not (= .cse27 .cse195)) .cse183 .cse185) (or .cse181 (not (= .cse27 .cse196))))) (or .cse94 (and (or (not (= .cse27 .cse197)) .cse192) (or .cse187 (not (= .cse27 .cse199)) .cse188))))) (.cse42 (and (or (and (or .cse154 (not (= .cse27 .cse174))) (or .cse151 .cse153 (not (= .cse27 .cse172)))) .cse115 .cse116) (or .cse110 (and (or .cse139 (not (= .cse27 .cse171))) (or .cse140 (not (= .cse27 .cse170)) .cse143))))) (.cse210 (+ 1 .cse209)) (.cse165 (not .cse220)) (.cse164 (and .cse220 (not .cse167))) (.cse159 (and .cse219 (not .cse160))) (.cse208 (+ 1 .cse207)) (.cse162 (not .cse219))) (let ((.cse19 (or .cse38 (let ((.cse218 (* .cse27 .cse206))) (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse218 .cse45)) .cse34 .cse46 .cse36) (or .cse42 .cse33 (= |ULTIMATE.start_main_~A~0#1| (+ .cse218 .cse44))))) .cse39 (and (or .cse97 .cse98 (and (or (not (<= 1 .cse210)) .cse165 .cse167) (or (not (<= 1 .cse209)) .cse164))) (or .cse88 (and (or .cse159 (not (<= 1 .cse207))) (or (not (<= 1 .cse208)) .cse160 .cse162)))))) (.cse21 (or .cse31 .cse216 .cse217)) (.cse22 (or .cse216 .cse217 (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse27 .cse211) .cse87)))) (.cse23 (let ((.cse75 (>= |ULTIMATE.start_main_~r~0#1| |ULTIMATE.start_main_~d~0#1|)) (.cse111 (* (+ |ULTIMATE.start_main_~q~0#1| .cse213) |ULTIMATE.start_main_~B~0#1|)) (.cse118 (* (+ |ULTIMATE.start_main_~q~0#1| .cse212) |ULTIMATE.start_main_~B~0#1|)) (.cse120 (* (+ |ULTIMATE.start_main_~q~0#1| .cse214) |ULTIMATE.start_main_~B~0#1|)) (.cse119 (* (+ |ULTIMATE.start_main_~q~0#1| .cse215) |ULTIMATE.start_main_~B~0#1|)) (.cse103 (* (+ .cse211 .cse215) |ULTIMATE.start_main_~B~0#1|)) (.cse102 (* (+ .cse211 .cse214) |ULTIMATE.start_main_~B~0#1|)) (.cse99 (* (+ .cse211 .cse213) |ULTIMATE.start_main_~B~0#1|)) (.cse90 (* (+ .cse211 .cse212) |ULTIMATE.start_main_~B~0#1|)) (.cse145 (* (+ .cse47 .cse50) |ULTIMATE.start_main_~B~0#1|)) (.cse144 (and .cse54 .cse53)) (.cse137 (* (+ .cse47 .cse52) |ULTIMATE.start_main_~B~0#1|)) (.cse147 (* (+ .cse47 .cse60) |ULTIMATE.start_main_~B~0#1|)) (.cse146 (* (+ .cse47 .cse57) |ULTIMATE.start_main_~B~0#1|)) (.cse166 (* (+ .cse206 .cse210) |ULTIMATE.start_main_~B~0#1|)) (.cse163 (* (+ .cse206 .cse209) |ULTIMATE.start_main_~B~0#1|)) (.cse161 (* (+ .cse206 .cse208) |ULTIMATE.start_main_~B~0#1|)) (.cse158 (* (+ .cse206 .cse207) |ULTIMATE.start_main_~B~0#1|)) (.cse125 (>= |ULTIMATE.start_main_~r~0#1| .cse35)) (.cse109 (>= |ULTIMATE.start_main_~r~0#1| .cse32))) (let ((.cse77 (let ((.cse203 (not .cse109)) (.cse201 (not .cse125))) (and (or .cse38 (and (or .cse200 .cse34 .cse201 .cse36) (or .cse202 .cse33 .cse203)) .cse39) (or .cse41 (and (or .cse204 .cse33 .cse203) (or .cse205 .cse34 .cse201 .cse36)))))) (.cse68 (or (let ((.cse194 (- .cse196)) (.cse198 (- .cse197))) (let ((.cse193 (>= .cse45 .cse106)) (.cse186 (+ .cse45 (+ (- 1) .cse198))) (.cse189 (not (>= .cse45 .cse199))) (.cse191 (+ .cse45 .cse198)) (.cse190 (not (>= .cse45 .cse197))) (.cse179 (+ .cse45 .cse194)) (.cse180 (not (>= .cse45 .cse196))) (.cse182 (not (>= .cse45 .cse195))) (.cse184 (+ .cse45 (+ (- 1) .cse194))) (.cse178 (>= .cse45 .cse104))) (and (or (and (or .cse89 .cse92 .cse178 (and (or .cse135 .cse48 (and (or .cse49 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse179)) .cse180 .cse181) (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse184)) .cse185)) .cse51) (or .cse144 (and (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse184)) .cse185) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse179)) .cse180 .cse181))))) (or .cse55 .cse56 (and (or .cse59 .cse58 (and (or .cse180 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse179)) .cse181) (or .cse182 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse184)) .cse183 .cse185))) (or .cse61 (and (or .cse182 (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse184)) .cse183 .cse185) (or .cse180 .cse181 (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse179)))))) .cse148))) (or .cse94 (and (or .cse135 (and (or .cse49 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse186)) .cse187 .cse188 .cse189) (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse191)) .cse192)) .cse51) (or .cse144 (and (or .cse187 .cse188 .cse189 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse186))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse191)) .cse190 .cse192)))) .cse48) (or (and (or (and (or .cse190 .cse192 (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse191))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse186)) .cse187 .cse188 .cse189)) .cse61) (or .cse59 .cse58 (and (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse191)) .cse192) (or .cse187 .cse188 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse186)) .cse189)))) .cse55 .cse56 .cse148)) .cse193)) .cse41) (or .cse38 (and (or .cse94 .cse193 (and (or .cse97 .cse168 .cse98 (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse186)) .cse187 .cse188 .cse189) (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse191)) .cse192)) .cse165 .cse167) (or (and (or .cse187 .cse188 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse186)) .cse189) (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse191)) .cse192)) .cse164))) (or .cse157 .cse88 (and (or .cse160 (and (or .cse190 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse191)) .cse192) (or .cse187 .cse188 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse186)) .cse189)) .cse162) (or .cse159 (and (or .cse187 .cse188 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse186)) .cse189) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse191)) .cse190 .cse192))))))) (or .cse89 (and (or .cse97 .cse168 .cse98 (and (or .cse165 .cse167 (and (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse184)) .cse185) (or .cse180 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse179)) .cse181))) (or (and (or .cse180 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse179)) .cse181) (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse184)) .cse185)) .cse164))) (or .cse157 .cse88 (and (or .cse160 (and (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse184)) .cse185) (or .cse180 .cse181 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse179)))) .cse162) (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse179)) .cse180 .cse181) (or .cse182 .cse183 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse184)) .cse185)) .cse159)))) .cse92 .cse178)) .cse39)))) .cse34 .cse36)) (.cse69 (or (= 1 .cse175) (= |ULTIMATE.start_main_~A~0#1| (+ (* (+ .cse28 |ULTIMATE.start_main_~p~0#1|) |ULTIMATE.start_main_~B~0#1|) (+ .cse29 .cse176))) (not (>= .cse29 |ULTIMATE.start_main_~d~0#1|)) (>= .cse29 .cse177))) (.cse70 (or .cse33 (let ((.cse169 (- .cse171)) (.cse173 (- .cse174))) (let ((.cse149 (>= .cse44 .cse124)) (.cse155 (not (>= .cse44 .cse174))) (.cse156 (+ .cse44 .cse173)) (.cse150 (+ .cse44 (+ (- 1) .cse173))) (.cse152 (not (>= .cse44 .cse172))) (.cse134 (>= .cse44 .cse121)) (.cse136 (not (>= .cse44 .cse171))) (.cse138 (+ .cse44 .cse169)) (.cse142 (not (>= .cse44 .cse170))) (.cse141 (+ .cse44 (+ (- 1) .cse169)))) (and (or .cse41 (and (or .cse110 .cse134 (and (or .cse135 .cse48 (and (or (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse138)) .cse139) (or .cse140 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse141)) .cse142 .cse143)) .cse144) (or (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse138)) .cse139) (or .cse140 .cse142 .cse143 (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse141)))) .cse49 .cse51))) (or .cse55 (and (or (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse138)) .cse139) (or .cse140 .cse142 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse141)) .cse143)) .cse59 .cse58) (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse141)) .cse140 .cse142 .cse143) (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse138)) .cse139)) .cse61)) .cse56 .cse148))) (or .cse149 .cse115 .cse116 (and (or (and (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse150)) .cse151 .cse152 .cse153) (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse137 .cse156)))) .cse144) (or (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse156))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse145 .cse150)) .cse151 .cse152 .cse153)) .cse49 .cse51)) .cse135 .cse48) (or .cse55 .cse56 (and (or (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse156))) (or .cse151 .cse152 .cse153 (= |ULTIMATE.start_main_~A~0#1| (+ .cse146 .cse150)))) .cse59 .cse58) (or (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse156))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse147 .cse150)) .cse151 .cse152 .cse153)) .cse61)) .cse148))))) (or .cse38 .cse39 (and (or .cse149 .cse115 (and (or .cse157 .cse88 (and (or (and (or .cse154 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse156)) .cse155) (or .cse151 .cse152 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse150)) .cse153)) .cse159) (or .cse160 (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse156))) (or .cse151 .cse152 .cse153 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse150)))) .cse162))) (or (and (or (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse156))) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse150)) .cse151 .cse152 .cse153)) .cse164) (or .cse165 (and (or .cse154 .cse155 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse156))) (or .cse151 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse150)) .cse152 .cse153)) .cse167)) .cse97 .cse168 .cse98)) .cse116) (or .cse110 .cse134 (and (or .cse157 (and (or .cse159 (and (or .cse140 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse141)) .cse142 .cse143) (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse158 .cse138)) .cse139))) (or .cse160 (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse138)) .cse139) (or .cse140 (= |ULTIMATE.start_main_~A~0#1| (+ .cse161 .cse141)) .cse142 .cse143)) .cse162)) .cse88) (or .cse97 .cse168 (and (or .cse165 (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse138)) .cse139) (or .cse140 .cse142 (= |ULTIMATE.start_main_~A~0#1| (+ .cse166 .cse141)) .cse143)) .cse167) (or (and (or .cse136 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse138)) .cse139) (or .cse140 .cse142 (= |ULTIMATE.start_main_~A~0#1| (+ .cse163 .cse141)) .cse143)) .cse164)) .cse98)))))))))) (.cse71 (or .cse33 (let ((.cse130 (not (>= .cse87 .cse124))) (.cse131 (+ .cse87 .cse123)) (.cse132 (not (>= .cse87 .cse121))) (.cse133 (+ .cse87 .cse122))) (and (or .cse101 (and (or (and (or .cse115 .cse130 .cse116 (= |ULTIMATE.start_main_~A~0#1| (+ .cse103 .cse131))) (or .cse110 .cse132 (= |ULTIMATE.start_main_~A~0#1| (+ .cse103 .cse133)))) .cse55 .cse56) (or .cse48 (and (or .cse110 .cse132 (= |ULTIMATE.start_main_~A~0#1| (+ .cse102 .cse133))) (or .cse115 .cse130 (= |ULTIMATE.start_main_~A~0#1| (+ .cse102 .cse131)) .cse116)))) .cse41) (or .cse38 .cse100 (and (or .cse97 (and (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ .cse99 .cse133)) .cse132) (or .cse115 .cse130 (= |ULTIMATE.start_main_~A~0#1| (+ .cse99 .cse131)) .cse116)) .cse98) (or (and (or .cse115 .cse130 (= |ULTIMATE.start_main_~A~0#1| (+ .cse90 .cse131)) .cse116) (or .cse110 .cse132 (= |ULTIMATE.start_main_~A~0#1| (+ .cse90 .cse133)))) .cse88)) .cse39))) (>= .cse87 .cse32))) (.cse72 (or .cse34 .cse125 .cse36 (let ((.cse126 (+ |ULTIMATE.start_main_~r~0#1| .cse107)) (.cse127 (not (>= |ULTIMATE.start_main_~r~0#1| .cse106))) (.cse129 (+ |ULTIMATE.start_main_~r~0#1| .cse105)) (.cse128 (not (>= |ULTIMATE.start_main_~r~0#1| .cse104)))) (and (or .cse38 (and (or (and (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse111 .cse126)) .cse127) (or .cse89 .cse92 .cse128 (= |ULTIMATE.start_main_~A~0#1| (+ .cse111 .cse129)))) .cse97 .cse98) (or (and (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse118 .cse126)) .cse127) (or .cse89 (= |ULTIMATE.start_main_~A~0#1| (+ .cse118 .cse129)) .cse92 .cse128)) .cse88)) .cse100 .cse39) (or .cse101 (and (or (and (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse120 .cse126)) .cse127) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse120 .cse129)) .cse89 .cse92 .cse128)) .cse48) (or .cse55 .cse56 (and (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse119 .cse126)) .cse127) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse119 .cse129)) .cse89 .cse92 .cse128)))) .cse41))))) (.cse73 (or .cse33 .cse109 (let ((.cse114 (not (>= |ULTIMATE.start_main_~r~0#1| .cse124))) (.cse117 (+ |ULTIMATE.start_main_~r~0#1| .cse123)) (.cse112 (+ |ULTIMATE.start_main_~r~0#1| .cse122)) (.cse113 (not (>= |ULTIMATE.start_main_~r~0#1| .cse121)))) (and (or .cse38 .cse100 .cse39 (and (or .cse97 .cse98 (and (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ .cse111 .cse112)) .cse113) (or .cse114 .cse115 .cse116 (= |ULTIMATE.start_main_~A~0#1| (+ .cse111 .cse117))))) (or (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse118 .cse117)) .cse114 .cse115 .cse116) (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ .cse118 .cse112)) .cse113)) .cse88))) (or .cse101 .cse41 (and (or .cse55 (and (or .cse110 .cse113 (= |ULTIMATE.start_main_~A~0#1| (+ .cse119 .cse112))) (or .cse114 (= |ULTIMATE.start_main_~A~0#1| (+ .cse119 .cse117)) .cse115 .cse116)) .cse56) (or .cse48 (and (or .cse114 .cse115 (= |ULTIMATE.start_main_~A~0#1| (+ .cse120 .cse117)) .cse116) (or .cse110 (= |ULTIMATE.start_main_~A~0#1| (+ .cse120 .cse112)) .cse113))))))))) (.cse74 (or .cse108 (not .cse75))) (.cse78 (or (>= .cse87 .cse35) .cse34 .cse36 (let ((.cse95 (+ .cse87 .cse107)) (.cse96 (not (>= .cse87 .cse106))) (.cse91 (+ .cse87 .cse105)) (.cse93 (not (>= .cse87 .cse104)))) (and (or .cse38 (and (or .cse88 (and (or .cse89 (= |ULTIMATE.start_main_~A~0#1| (+ .cse90 .cse91)) .cse92 .cse93) (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse90 .cse95)) .cse96))) (or .cse97 .cse98 (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse99 .cse95)) .cse94 .cse96) (or .cse89 (= |ULTIMATE.start_main_~A~0#1| (+ .cse99 .cse91)) .cse92 .cse93)))) .cse100 .cse39) (or .cse101 (and (or .cse48 (and (or .cse89 .cse92 .cse93 (= |ULTIMATE.start_main_~A~0#1| (+ .cse102 .cse91))) (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse102 .cse95)) .cse96))) (or (and (or .cse94 (= |ULTIMATE.start_main_~A~0#1| (+ .cse103 .cse95)) .cse96) (or .cse89 (= |ULTIMATE.start_main_~A~0#1| (+ .cse103 .cse91)) .cse92 .cse93)) .cse55 .cse56)) .cse41))))) (.cse79 (or (let ((.cse86 (- .cse64))) (let ((.cse82 (+ .cse63 (+ (- 1) .cse86))) (.cse80 (not (>= .cse63 .cse65))) (.cse84 (+ .cse63 .cse86)) (.cse83 (not (>= .cse63 .cse64)))) (and (or .cse38 (let ((.cse81 (* (+ .cse62 .cse66) |ULTIMATE.start_main_~B~0#1|))) (and (or .cse34 .cse80 (= |ULTIMATE.start_main_~A~0#1| (+ .cse81 .cse82)) .cse36) (or .cse33 .cse83 (= |ULTIMATE.start_main_~A~0#1| (+ .cse81 .cse84))))) .cse39) (or (let ((.cse85 (* (+ .cse62 .cse67) |ULTIMATE.start_main_~B~0#1|))) (and (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse85 .cse82)) .cse34 .cse80 .cse36) (or (= |ULTIMATE.start_main_~A~0#1| (+ .cse85 .cse84)) .cse33 .cse83))) .cse41)))) (>= .cse63 |ULTIMATE.start_main_~d~0#1|) .cse76))) (or (and .cse68 .cse18 .cse69 .cse70 .cse71 .cse5 .cse72 .cse73 .cse17 .cse74 .cse15 (or .cse75 .cse76 .cse77) .cse78 .cse16 .cse79) (and (or .cse76 .cse77) .cse68 .cse18 .cse69 .cse70 .cse71 .cse5 .cse72 .cse73 .cse17 .cse74 .cse15 .cse78 .cse16 .cse79))))) (.cse24 (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse27 .cse62) .cse63)) (and (or .cse33 (not (= .cse27 .cse64))) (or .cse34 .cse36 (not (= .cse27 .cse65)))) (and (or .cse38 .cse39 (not (<= 1 .cse66))) (or (not (<= 1 .cse67)) .cse41)))) (.cse25 (or (let ((.cse43 (* .cse27 .cse47))) (and (or .cse42 (= |ULTIMATE.start_main_~A~0#1| (+ .cse43 .cse44)) .cse33) (or .cse34 (= |ULTIMATE.start_main_~A~0#1| (+ .cse43 .cse45)) .cse46 .cse36))) .cse41 (and (or .cse48 (and (or .cse49 (not (<= 1 .cse50)) .cse51) (or (not (<= 1 .cse52)) (and .cse53 .cse54)))) (or .cse55 .cse56 (and (or (not (<= 1 .cse57)) .cse58 .cse59) (or (not (<= 1 .cse60)) .cse61)))))) (.cse30 (or .cse31 (and (or (not (= .cse27 .cse32)) .cse33) (or .cse34 (not (= .cse27 .cse35)) .cse36)) (and (or (not (<= 1 .cse37)) .cse38 .cse39) (or (not (<= 1 .cse40)) .cse41))))) (or (and .cse19 .cse20 .cse21 .cse22 .cse2 .cse4 .cse23 .cse24 .cse25 .cse6) (and .cse19 .cse21 .cse22 .cse26 .cse2 .cse4 .cse23 .cse24 .cse25 (or (= |ULTIMATE.start_main_~A~0#1| (+ (* .cse27 .cse28) .cse29)) (not (= .cse27 |ULTIMATE.start_main_~d~0#1|)) (not (<= 1 |ULTIMATE.start_main_~p~0#1|))) .cse6 .cse30) (and .cse19 .cse20 .cse21 .cse22 .cse2 .cse4 .cse23 .cse24 .cse25 .cse6 .cse30))))))) .cse2 .cse4 .cse5 .cse6)))))))))) [2023-02-18 18:27:03,375 INFO L899 garLoopResultBuilder]: For program point L16(lines 16 17) no Hoare annotation was computed. [2023-02-18 18:27:03,375 INFO L899 garLoopResultBuilder]: For program point L15(lines 15 18) no Hoare annotation was computed. [2023-02-18 18:27:03,375 INFO L899 garLoopResultBuilder]: For program point L15-2(lines 14 20) no Hoare annotation was computed. [2023-02-18 18:27:03,375 INFO L899 garLoopResultBuilder]: For program point __VERIFIER_assertEXIT(lines 14 20) no Hoare annotation was computed. [2023-02-18 18:27:03,375 INFO L902 garLoopResultBuilder]: At program point $Ultimate##0(lines 14 20) the Hoare annotation is: true [2023-02-18 18:27:03,375 INFO L899 garLoopResultBuilder]: For program point __VERIFIER_assertErr0ASSERT_VIOLATIONERROR_FUNCTION(line 17) no Hoare annotation was computed. [2023-02-18 18:27:03,377 INFO L445 BasicCegarLoop]: Path program histogram: [3, 3, 2, 2, 1, 1, 1, 1, 1, 1] [2023-02-18 18:27:03,379 INFO L178 ceAbstractionStarter]: Computing trace abstraction results [2023-02-18 18:27:03,724 INFO L202 PluginConnector]: Adding new model de.uni_freiburg.informatik.ultimate.plugins.generator.traceabstraction CFG 18.02 06:27:03 BoogieIcfgContainer [2023-02-18 18:27:03,724 INFO L132 PluginConnector]: ------------------------ END TraceAbstraction---------------------------- [2023-02-18 18:27:03,725 INFO L113 PluginConnector]: ------------------------Witness Printer---------------------------- [2023-02-18 18:27:03,725 INFO L271 PluginConnector]: Initializing Witness Printer... [2023-02-18 18:27:03,725 INFO L275 PluginConnector]: Witness Printer initialized [2023-02-18 18:27:03,726 INFO L185 PluginConnector]: Executing the observer RCFGCatcher from plugin Witness Printer for "de.uni_freiburg.informatik.ultimate.plugins.generator.rcfgbuilder CFG 18.02 06:25:38" (3/4) ... [2023-02-18 18:27:03,728 INFO L137 WitnessPrinter]: Generating witness for correct program [2023-02-18 18:27:03,734 INFO L361 RCFGBacktranslator]: Ignoring RootEdge to procedure __VERIFIER_assert [2023-02-18 18:27:03,739 INFO L961 BoogieBacktranslator]: Reduced CFG by removing 16 nodes and edges [2023-02-18 18:27:03,739 INFO L961 BoogieBacktranslator]: Reduced CFG by removing 7 nodes and edges [2023-02-18 18:27:03,739 INFO L961 BoogieBacktranslator]: Reduced CFG by removing 3 nodes and edges [2023-02-18 18:27:03,739 INFO L961 BoogieBacktranslator]: Reduced CFG by removing 1 nodes and edges [2023-02-18 18:27:03,739 INFO L961 BoogieBacktranslator]: Reduced CFG by removing 1 nodes and edges [2023-02-18 18:27:03,846 INFO L141 WitnessManager]: Wrote witness to /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/witness.graphml [2023-02-18 18:27:03,847 INFO L132 PluginConnector]: ------------------------ END Witness Printer---------------------------- [2023-02-18 18:27:03,847 INFO L158 Benchmark]: Toolchain (without parser) took 86286.25ms. Allocated memory was 123.7MB in the beginning and 218.1MB in the end (delta: 94.4MB). Free memory was 94.2MB in the beginning and 141.2MB in the end (delta: -47.0MB). Peak memory consumption was 50.2MB. Max. memory is 16.1GB. [2023-02-18 18:27:03,848 INFO L158 Benchmark]: CDTParser took 0.17ms. Allocated memory is still 123.7MB. Free memory is still 82.7MB. There was no memory consumed. Max. memory is 16.1GB. [2023-02-18 18:27:03,848 INFO L158 Benchmark]: CACSL2BoogieTranslator took 203.88ms. Allocated memory is still 123.7MB. Free memory was 94.2MB in the beginning and 83.6MB in the end (delta: 10.6MB). Peak memory consumption was 10.5MB. Max. memory is 16.1GB. [2023-02-18 18:27:03,848 INFO L158 Benchmark]: Boogie Procedure Inliner took 26.58ms. Allocated memory is still 123.7MB. Free memory was 83.6MB in the beginning and 82.0MB in the end (delta: 1.6MB). Peak memory consumption was 2.1MB. Max. memory is 16.1GB. [2023-02-18 18:27:03,849 INFO L158 Benchmark]: Boogie Preprocessor took 22.32ms. Allocated memory is still 123.7MB. Free memory was 82.0MB in the beginning and 81.0MB in the end (delta: 1.1MB). Peak memory consumption was 2.1MB. Max. memory is 16.1GB. [2023-02-18 18:27:03,849 INFO L158 Benchmark]: RCFGBuilder took 282.78ms. Allocated memory is still 123.7MB. Free memory was 81.0MB in the beginning and 70.5MB in the end (delta: 10.5MB). Peak memory consumption was 10.5MB. Max. memory is 16.1GB. [2023-02-18 18:27:03,849 INFO L158 Benchmark]: TraceAbstraction took 85620.75ms. Allocated memory was 123.7MB in the beginning and 218.1MB in the end (delta: 94.4MB). Free memory was 69.8MB in the beginning and 153.1MB in the end (delta: -83.2MB). Peak memory consumption was 111.7MB. Max. memory is 16.1GB. [2023-02-18 18:27:03,849 INFO L158 Benchmark]: Witness Printer took 121.91ms. Allocated memory is still 218.1MB. Free memory was 152.7MB in the beginning and 141.2MB in the end (delta: 11.5MB). Peak memory consumption was 12.6MB. Max. memory is 16.1GB. [2023-02-18 18:27:03,855 INFO L339 ainManager$Toolchain]: ####################### End [Toolchain 1] ####################### --- Results --- * Results from de.uni_freiburg.informatik.ultimate.core: - StatisticsResult: Toolchain Benchmarks Benchmark results are: * CDTParser took 0.17ms. Allocated memory is still 123.7MB. Free memory is still 82.7MB. There was no memory consumed. Max. memory is 16.1GB. * CACSL2BoogieTranslator took 203.88ms. Allocated memory is still 123.7MB. Free memory was 94.2MB in the beginning and 83.6MB in the end (delta: 10.6MB). Peak memory consumption was 10.5MB. Max. memory is 16.1GB. * Boogie Procedure Inliner took 26.58ms. Allocated memory is still 123.7MB. Free memory was 83.6MB in the beginning and 82.0MB in the end (delta: 1.6MB). Peak memory consumption was 2.1MB. Max. memory is 16.1GB. * Boogie Preprocessor took 22.32ms. Allocated memory is still 123.7MB. Free memory was 82.0MB in the beginning and 81.0MB in the end (delta: 1.1MB). Peak memory consumption was 2.1MB. Max. memory is 16.1GB. * RCFGBuilder took 282.78ms. Allocated memory is still 123.7MB. Free memory was 81.0MB in the beginning and 70.5MB in the end (delta: 10.5MB). Peak memory consumption was 10.5MB. Max. memory is 16.1GB. * TraceAbstraction took 85620.75ms. Allocated memory was 123.7MB in the beginning and 218.1MB in the end (delta: 94.4MB). Free memory was 69.8MB in the beginning and 153.1MB in the end (delta: -83.2MB). Peak memory consumption was 111.7MB. Max. memory is 16.1GB. * Witness Printer took 121.91ms. Allocated memory is still 218.1MB. Free memory was 152.7MB in the beginning and 141.2MB in the end (delta: 11.5MB). Peak memory consumption was 12.6MB. Max. memory is 16.1GB. * Results from de.uni_freiburg.informatik.ultimate.plugins.generator.traceabstraction: - StatisticsResult: ErrorAutomatonStatistics NumberErrorTraces: 0, NumberStatementsAllTraces: 0, NumberRelevantStatements: 0, 0.0s ErrorAutomatonConstructionTimeTotal, 0.0s FaulLocalizationTime, NumberStatementsFirstTrace: -1, TraceLengthAvg: 0, 0.0s ErrorAutomatonConstructionTimeAvg, 0.0s ErrorAutomatonDifferenceTimeAvg, 0.0s ErrorAutomatonDifferenceTimeTotal, NumberOfNoEnhancement: 0, NumberOfFiniteEnhancement: 0, NumberOfInfiniteEnhancement: 0 - PositiveResult [Line: 17]: call to reach_error is unreachable For all program executions holds that call to reach_error is unreachable at this location - StatisticsResult: Ultimate Automizer benchmark data CFG has 2 procedures, 26 locations, 1 error locations. Started 1 CEGAR loops. OverallTime: 85.2s, OverallIterations: 16, TraceHistogramMax: 21, PathProgramHistogramMax: 3, EmptinessCheckTime: 0.0s, AutomataDifference: 64.4s, DeadEndRemovalTime: 0.0s, HoareAnnotationTime: 0.1s, InitialAbstractionConstructionTime: 0.0s, HoareTripleCheckerStatistics: 6 mSolverCounterUnknown, 559 SdHoareTripleChecker+Valid, 53.7s IncrementalHoareTripleChecker+Time, 0 mSdLazyCounter, 504 mSDsluCounter, 1868 SdHoareTripleChecker+Invalid, 52.8s Time, 0 mProtectedAction, 0 SdHoareTripleChecker+Unchecked, 0 IncrementalHoareTripleChecker+Unchecked, 1402 mSDsCounter, 763 IncrementalHoareTripleChecker+Valid, 0 mProtectedPredicate, 6273 IncrementalHoareTripleChecker+Invalid, 7042 SdHoareTripleChecker+Unknown, 0 mSolverCounterNotChecked, 763 mSolverCounterUnsat, 466 mSDtfsCounter, 6273 mSolverCounterSat, 0.1s SdHoareTripleChecker+Time, 6 IncrementalHoareTripleChecker+Unknown, PredicateUnifierStatistics: 0 DeclaredPredicates, 1959 GetRequests, 1650 SyntacticMatches, 38 SemanticMatches, 271 ConstructedPredicates, 0 IntricatePredicates, 0 DeprecatedPredicates, 850 ImplicationChecksByTransitivity, 16.3s Time, 0.0s BasicInterpolantAutomatonTime, BiggestAbstraction: size=209occurred in iteration=14, InterpolantAutomatonStates: 195, traceCheckStatistics: No data available, InterpolantConsolidationStatistics: No data available, PathInvariantsStatistics: No data available, 0/0 InterpolantCoveringCapability, TotalInterpolationStatistics: No data available, 0.0s DumpTime, AutomataMinimizationStatistics: 1.1s AutomataMinimizationTime, 16 MinimizatonAttempts, 101 StatesRemovedByMinimization, 10 NontrivialMinimizations, HoareAnnotationStatistics: 0.0s HoareAnnotationTime, 11 LocationsWithAnnotation, 168 PreInvPairs, 274 NumberOfFragments, 789164 HoareAnnotationTreeSize, 168 FomulaSimplifications, 0 FormulaSimplificationTreeSizeReduction, 0.0s HoareSimplificationTime, 11 FomulaSimplificationsInter, 0 FormulaSimplificationTreeSizeReductionInter, 0.0s HoareSimplificationTimeInter, RefinementEngineStatistics: TRACE_CHECK: 0.1s SsaConstructionTime, 0.4s SatisfiabilityAnalysisTime, 15.7s InterpolantComputationTime, 1136 NumberOfCodeBlocks, 1001 NumberOfCodeBlocksAsserted, 26 NumberOfCheckSat, 1878 ConstructedInterpolants, 1 QuantifiedInterpolants, 112661 SizeOfPredicates, 67 NumberOfNonLiveVariables, 2553 ConjunctsInSsa, 444 ConjunctsInUnsatCore, 26 InterpolantComputations, 4 PerfectInterpolantSequences, 8040/9122 InterpolantCoveringCapability, INVARIANT_SYNTHESIS: No data available, INTERPOLANT_CONSOLIDATION: No data available, ABSTRACT_INTERPRETATION: No data available, PDR: No data available, ACCELERATED_INTERPOLATION: No data available, SIFA: No data available, ReuseStatistics: No data available - AllSpecificationsHoldResult: All specifications hold 1 specifications checked. All of them hold - InvariantResult [Line: 44]: Loop Invariant Derived loop invariant: ((((((((((((((((((((((((((((((((0 == d % 2 || r >= 1 + d / 2) || !(d < 0)) || ((((0 == p % 2 || (((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -((d / 2 + 1) / 2))))) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && (((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p / 4) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + p / 4) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (p / 2 < 0 && !(0 == p / 2 % 2))) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || ((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + p / 4)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + (1 + p / 4)) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2))))) && (((d < 0 && !(0 == d % 2)) || r >= d / 2) || ((((0 == p % 2 || 1 == 1 + p / 2) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 4))) || !(r >= d / 4)) && (((!(r >= 1 + d / 4) || !(d / 2 < 0)) || 0 == d / 2 % 2) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 4)))))) && (((((A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 4))) || !(r >= 1 + d / 4)) || !(d / 2 < 0)) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -(d / 4))) || !(r >= d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) && ((1 == p / 2 || (p < 0 && !(0 == p % 2))) || (((0 == p / 2 % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r >= d / 4)) || A == (q + (1 + p / 4)) * B + (r + -(d / 4))) && (((!(r >= 1 + d / 4) || A == (q + (1 + p / 4)) * B + (r + (-1 + -(d / 4)))) || !(d / 2 < 0)) || 0 == d / 2 % 2))) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(r >= 1 + d / 4) || !(d / 2 < 0)) || A == (q + p / 4) * B + (r + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p / 4) * B + (r + -(d / 4))) || !(r >= d / 4))))))))) && (A == (q + p) * B + (r + -d) || !(r >= d))) && ((A == B * 1 * q + r || (((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 <= p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 <= 1 + p / 4))) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || !(p < 0)) || (((!(1 <= 1 + (p / 2 + 1) / 2) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && ((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || !(1 <= (p / 2 + 1) / 2)))))) || (((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || !(B * 1 == (d / 2 + 1) / 2)) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(B * 1 == 1 + (d / 2 + 1) / 2)))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || !(B * 1 == 1 + d / 4)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || !(B * 1 == d / 4))))))) && (((1 == 2 * p || A == (q + 2 * (2 * p) + p) * B + (r + -(2 * (2 * d)) + -d)) || !(r + -(2 * (2 * d)) >= d)) || r + -(2 * (2 * d)) >= 2 * d)) && B == 1) && ((A == d * q + r || !(1 == p)) || !(d == B * p))) && A == q * B + r) && d == B * p) || (((((((((((2 <= d && d == 2 * 1) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && (!(1 == p) || B == d)) && q + p * -1 == 0) && r == A + -d) && B == 1) && p == 2 * 1) && A == q * B + r) && r + d == A) && d == 2 * B)) || ((((((((((((((A == (q + 2 * p + p) * B + (r + -(2 * d) + -d) && p == 2) && B == 1) && q == 0 + 2 * (2 * 1)) && !(r >= d)) && d == B * 2) && A == q * B + r) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && q + 2 * (2 * 1) * -1 == 0) && r + 2 * (2 * B) == A) && (!(1 == p) || B == d)) && r == A + -(2 * (2 * B))) && (A == q * B + r || (1 <= d && A == q * B + r))) && d == B * p)) || ((((((d == 2 * 1 && r == A) && q == 0) && B == 1) && p == 2 * 1) && d == B * p) && d == 2 * B)) || ((((p == 1 && r == A) && d == B) && q == 0) && B == 1)) || ((((((((((((((((1 == p || (((0 == p % 2 || ((((A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0)) && ((A == (q + (1 + p / 2)) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((A == (q + p / 2) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)) && (((A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0)))))) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (((1 == 2 * p || A == (q + 2 * (2 * p) + p) * B + (r + -(2 * (2 * d)) + -d)) || !(r + -(2 * (2 * d)) >= d)) || r + -(2 * (2 * d)) >= 2 * d)) && B == 1) && (((d < 0 && !(0 == d % 2)) || (((1 == p / 2 || (((((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || 0 == d / 2 % 2) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -(d / 4)))) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (1 + p / 4)) * B + (r + -d + -(d / 4)))) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + p / 4) * B + (r + -d + -(d / 4))) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2))) && (((0 == p % 2 || 1 == 1 + p / 2) || (((0 == (p / 2 + 1) % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -(d / 4))) || !(r + -d >= d / 4)) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))) || !(1 + p / 2 < 0)) && (((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -(d / 4)))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || !(p < 0)))) || r + -d >= d / 2)) && ((A == B * 1 * (q + 2 * (2 * p)) + (r + -(2 * (2 * d))) || !(B * 1 == d)) || !(1 <= p))) && A == q * B + r) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && (A == (q + p) * B + (r + -d) || !(r >= d))) && (((r + -d >= 1 + d / 2 || 0 == d % 2) || !(d < 0)) || ((((0 == p % 2 || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || ((((!(1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || (((A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -((d / 2 + 1) / 2)) || (!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0)) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + p / 4) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0)))) || (p < 0 && !(0 == p % 2)))))) && (!(1 == p) || B == d)) && (A == q * B + r || (1 <= d && A == q * B + r))) && d == B * p) && ((A == B * 1 * q + r || ((!(B * 1 == d / 2) || (d < 0 && !(0 == d % 2))) && ((0 == d % 2 || !(B * 1 == 1 + d / 2)) || !(d < 0)))) || (((!(1 <= 1 + p / 2) || 0 == p % 2) || !(p < 0)) && (!(1 <= p / 2) || (p < 0 && !(0 == p % 2)))))) && (((((0 == p % 2 || ((((0 == d % 2 || !(r + -(2 * d) >= 1 + 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + (-1 + -(2 * d / 4)))) || !(d < 0)) && (((d < 0 && !(0 == d % 2)) || !(r + -(2 * d) >= 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + -(2 * d / 4))))) || !(p < 0)) && (((((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + (-1 + -(2 * d / 4))) || 0 == d % 2) || !(r + -(2 * d) >= 1 + 2 * d / 4)) || !(d < 0)) && ((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + -(2 * d / 4)) || (d < 0 && !(0 == d % 2))) || !(r + -(2 * d) >= 2 * d / 4))) || (p < 0 && !(0 == p % 2)))) || r + -(2 * d) >= d) || 1 == p))) || (((((((q + 2 * (2 * 1) * -1 == 0 && p == 1) && d == B) && r + 2 * (2 * B) == A) && !(r >= B * 2)) && B == 1) && (A == q * B + r || (1 <= d && A == q * B + r))) && A == q * B + r)) || ((((r == A && p == 1) && d == B) && q == 0) && B == 1)) || (((((A + r * -1 == 2 * B && p == 1) && B == 1) && (A == q * B + r || (1 <= d && A == q * B + r))) && ((d == (A + -r) / 2 && (!(A + r * -1 < 0) || 0 == (A + r) % 2)) || ((!(0 == (A + r) % 2) && d == 1 + (A + -r) / 2) && A + r * -1 < 0))) && q + 2 * 1 * -1 == 0)) || (((B == 1 && ((A == d * q + r || !(1 == p)) || !(d == B * p))) && A == q * B + r) && d == B * p)) || ((((r == A && ((((((((((((((((((((((((((((A == B * 1 * q + r || (((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 <= p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 <= 1 + p / 4))) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || !(p < 0)) || (((!(1 <= 1 + (p / 2 + 1) / 2) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && ((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || !(1 <= (p / 2 + 1) / 2)))))) || (((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || !(B * 1 == (d / 2 + 1) / 2)) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(B * 1 == 1 + (d / 2 + 1) / 2)))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || !(B * 1 == 1 + d / 4)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || !(B * 1 == d / 4)))))) && ((((((((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 2) || (((1 == p / 4 || (p / 2 < 0 && !(0 == p / 2 % 2))) || (((0 == p / 4 % 2 || (((A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2))) || !(p / 4 < 0)) && ((p / 4 < 0 && !(0 == p / 4 % 2)) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))))))) && (((0 == p / 2 % 2 || !(p / 2 < 0)) || (((!(1 + p / 4 < 0) || 0 == (p / 4 + 1) % 2) || (((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2))) && ((!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))))))) || 1 == 1 + p / 4))) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 == p / 4 || (((0 == p / 4 % 2 || ((((A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))) || !(p / 4 < 0)) && ((p / 4 < 0 && !(0 == p / 4 % 2)) || ((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) || A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) && ((A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4)) || !(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4)) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))))) || (p / 2 < 0 && !(0 == p / 2 % 2))) && ((((((((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) && (((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)) && ((!(1 + p / 4 < 0) || 0 == (p / 4 + 1) % 2) || (((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && (((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4))))) || 0 == p / 2 % 2) || !(p / 2 < 0)) || 1 == 1 + p / 4))) || r + (-1 + -(d / 2)) >= (d / 2 + 1) / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || ((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || r + (-1 + -(d / 2)) >= (d / 2 + 1) / 2) || ((((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)) || (((((((A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2)))) || !(1 + (p / 2 + 1) / 2 < 0)) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && (((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2)))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || (((0 == (p / 2 + 1) / 2 % 2 || (((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && (((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)))) || !((p / 2 + 1) / 2 < 0)) && (((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || ((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4)) || !(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4)) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))))))) && (((!(1 + d / 2 < 0) || ((((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)) || (((!(1 + (p / 2 + 1) / 2 < 0) || 0 == ((p / 2 + 1) / 2 + 1) % 2) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))))) && ((((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2)) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || (((0 == (p / 2 + 1) / 2 % 2 || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))))) || !((p / 2 + 1) / 2 < 0)) && ((((A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2)) || ((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2))))))) || 0 == (d / 2 + 1) % 2) || r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 2))) || !(p < 0))) || 0 == d % 2) || !(d < 0))) && ((((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || 0 == d / 2 % 2) || B == 1 + d / 4) && ((!(0 == d / 2 % 2) && d / 2 < 0) || B == d / 4))) && ((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || B == (d / 2 + 1) / 2) && ((B == 1 + (d / 2 + 1) / 2 || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2))) || !(d < 0))) || (((0 == p % 2 || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) && ((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4))) || (p < 0 && !(0 == p % 2)))))) && (((1 == 2 * p || A == (q + 2 * (2 * p) + p) * B + (r + -(2 * (2 * d)) + -d)) || !(r + -(2 * (2 * d)) >= d)) || r + -(2 * (2 * d)) >= 2 * d)) && (((d < 0 && !(0 == d % 2)) || (((1 == p / 2 || (((((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || 0 == d / 2 % 2) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -(d / 4)))) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (1 + p / 4)) * B + (r + -d + -(d / 4)))) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + p / 4) * B + (r + -d + -(d / 4))) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2))) && (((0 == p % 2 || 1 == 1 + p / 2) || (((0 == (p / 2 + 1) % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -(d / 4))) || !(r + -d >= d / 4)) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))) || !(1 + p / 2 < 0)) && (((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -(d / 4)))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || !(p < 0)))) || r + -d >= d / 2)) && ((A == B * 1 * (q + 2 * (2 * p)) + (r + -(2 * (2 * d))) || !(B * 1 == d)) || !(1 <= p))) && (((((((((((((((((((((((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0)) && ((((0 == p % 2 || 1 == 1 + p / 2) || (((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || A == (1 + d / 4) * (q + (1 + p / 2)) + (r + -(d / 2))) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + (1 + p / 2)) + (r + -(d / 2))))) && ((0 == d % 2 || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || A == (1 + (d / 2 + 1) / 2) * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))))) || !(d < 0)))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)))))) && 2 <= -d / -2) && r >= -d / -2) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4)))) || (((0 == d % 2 || (((A == (1 + (d / 2 + 1) / 2) * (q + p / 2) + (r + (-1 + -(d / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + p / 2) + (r + (-1 + -(d / 2)))))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + p / 2) + (r + -(d / 2))) && ((!(d / 2 < 0) || A == (1 + d / 4) * (q + p / 2) + (r + -(d / 2))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2)))) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && A == d * q + r) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && d % 2 == 0) && A == q * B + r) && ((0 == d % 2 || (((0 == p % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) || !(1 + p / 2 < 0)))) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) || !(1 + p / 2 < 0)))))) || !(p < 0)) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2))))) || !(d < 0))) && A == (q + p) * B + (r + -d)) && ((((((((((A == (q + p) * B + (r + -d) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && A == d * q + r) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p) || (((((((((A == (q + p) * B + (r + -d) && (A == d * q + r || !(1 == p))) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == d % 2 || !(d < 0)) || A == (1 + d / 2) * (q + p) + (r + -d)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * (q + p) + (r + -d))) || 1 == p) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (!(1 == p) || B == d)) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || (((!(0 == d / 2 % 2) && d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 4))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 4))))) && ((!(d / 2 < 0) || (((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) || !(1 + p / 2 < 0)) && (A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 0 == d / 2 % 2))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((((A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + -(d / 4)) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + -(d / 4)))) || (!(0 == d / 2 % 2) && d / 2 < 0)) && (((((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + (-1 + -(d / 4))))) || !(d / 2 < 0)) || 0 == d / 2 % 2)))))) || ((((((((((((((((((((((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0)) && ((((0 == p % 2 || 1 == 1 + p / 2) || (((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || A == (1 + d / 4) * (q + (1 + p / 2)) + (r + -(d / 2))) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + (1 + p / 2)) + (r + -(d / 2))))) && ((0 == d % 2 || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || A == (1 + (d / 2 + 1) / 2) * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))))) || !(d < 0)))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)))))) && 2 <= -d / -2) && r >= -d / -2) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4)))) || (((0 == d % 2 || (((A == (1 + (d / 2 + 1) / 2) * (q + p / 2) + (r + (-1 + -(d / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + p / 2) + (r + (-1 + -(d / 2)))))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + p / 2) + (r + -(d / 2))) && ((!(d / 2 < 0) || A == (1 + d / 4) * (q + p / 2) + (r + -(d / 2))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2)))) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && d % 2 == 0) && A == q * B + r) && ((0 == d % 2 || (((0 == p % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) || !(1 + p / 2 < 0)))) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) || !(1 + p / 2 < 0)))))) || !(p < 0)) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2))))) || !(d < 0))) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((((((((A == (q + p) * B + (r + -d) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && A == d * q + r) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p) || (((((((((A == (q + p) * B + (r + -d) && (A == d * q + r || !(1 == p))) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == d % 2 || !(d < 0)) || A == (1 + d / 2) * (q + p) + (r + -d)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * (q + p) + (r + -d))) || 1 == p) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (!(1 == p) || B == d)) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || (((!(0 == d / 2 % 2) && d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 4))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 4))))) && ((!(d / 2 < 0) || (((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) || !(1 + p / 2 < 0)) && (A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 0 == d / 2 % 2))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((((A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + -(d / 4)) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + -(d / 4)))) || (!(0 == d / 2 % 2) && d / 2 < 0)) && (((((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + (-1 + -(d / 4))))) || !(d / 2 < 0)) || 0 == d / 2 % 2)))))))) && (((d < 0 && !(0 == d % 2)) || r >= d / 2) || ((((0 == p % 2 || 1 == 1 + p / 2) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 4))) || !(r >= d / 4)) && (((!(r >= 1 + d / 4) || !(d / 2 < 0)) || 0 == d / 2 % 2) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 4)))))) && (((((A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 4))) || !(r >= 1 + d / 4)) || !(d / 2 < 0)) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -(d / 4))) || !(r >= d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) && ((1 == p / 2 || (p < 0 && !(0 == p % 2))) || (((0 == p / 2 % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r >= d / 4)) || A == (q + (1 + p / 4)) * B + (r + -(d / 4))) && (((!(r >= 1 + d / 4) || A == (q + (1 + p / 4)) * B + (r + (-1 + -(d / 4)))) || !(d / 2 < 0)) || 0 == d / 2 % 2))) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(r >= 1 + d / 4) || !(d / 2 < 0)) || A == (q + p / 4) * B + (r + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p / 4) * B + (r + -(d / 4))) || !(r >= d / 4))))))))) && (((r + -d >= 1 + d / 2 || 0 == d % 2) || !(d < 0)) || ((((0 == p % 2 || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || ((((!(1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || (((A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -((d / 2 + 1) / 2)) || (!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0)) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + p / 4) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0)))) || (p < 0 && !(0 == p % 2)))))) && (((((0 == p % 2 || ((((0 == d % 2 || !(r + -(2 * d) >= 1 + 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + (-1 + -(2 * d / 4)))) || !(d < 0)) && (((d < 0 && !(0 == d % 2)) || !(r + -(2 * d) >= 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + -(2 * d / 4))))) || !(p < 0)) && (((((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + (-1 + -(2 * d / 4))) || 0 == d % 2) || !(r + -(2 * d) >= 1 + 2 * d / 4)) || !(d < 0)) && ((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + -(2 * d / 4)) || (d < 0 && !(0 == d % 2))) || !(r + -(2 * d) >= 2 * d / 4))) || (p < 0 && !(0 == p % 2)))) || r + -(2 * d) >= d) || 1 == p)) && (1 == p || (((0 == p % 2 || ((((A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0)) && ((A == (q + (1 + p / 2)) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((A == (q + p / 2) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)) && (((A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0))))))) && (((0 == p % 2 || ((((A == B * 1 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2))) || 0 == d % 2) || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((!(B * 1 == 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2)) || !(B * 1 == ((d / 2 + 1) / 2 + 1) / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || ((!(B * 1 == (d / 2 + 1) / 4) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && ((!((d / 2 + 1) / 2 < 0) || !(B * 1 == 1 + (d / 2 + 1) / 4)) || 0 == (d / 2 + 1) / 2 % 2))))) || !(d < 0)) && ((((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(B * 1 == (d / 4 + 1) / 2)) && ((0 == (d / 4 + 1) % 2 || !(1 + d / 4 < 0)) || !(B * 1 == 1 + (d / 4 + 1) / 2))) || !(d / 2 < 0)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || (((d / 4 < 0 && !(0 == d / 4 % 2)) || !(B * 1 == d / 8)) && ((0 == d / 4 % 2 || !(B * 1 == 1 + d / 8)) || !(d / 4 < 0))))) || (d < 0 && !(0 == d % 2))) || A == B * 1 * (q + (1 + p / 2)) + (r + -(d / 2))))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || (((!(1 <= 1 + ((p / 2 + 1) / 2 + 1) / 2) || !(1 + (p / 2 + 1) / 2 < 0)) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && (!(1 <= ((p / 2 + 1) / 2 + 1) / 2) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || ((((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || !(1 <= (p / 2 + 1) / 4)) && ((!(1 <= 1 + (p / 2 + 1) / 4) || 0 == (p / 2 + 1) / 2 % 2) || !((p / 2 + 1) / 2 < 0))))))) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 <= p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 <= 1 + p / 4))) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || !(p < 0)) || (((!(1 <= 1 + (p / 2 + 1) / 2) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && ((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || !(1 <= (p / 2 + 1) / 2))))) || (((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || !(B * 1 == (d / 2 + 1) / 2)) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(B * 1 == 1 + (d / 2 + 1) / 2)))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || !(B * 1 == 1 + d / 4)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || !(B * 1 == d / 4)))))) || A == B * 1 * (q + p) + (r + -d))) && A == d * q + r) && r == A) && ((d < 0 && !(0 == d % 2)) || (((p < 0 && !(0 == p % 2)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || r + -(d / 2) >= d / 4) || (((1 == p / 4 || (p / 2 < 0 && !(0 == p / 2 % 2))) || (((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0))) || (p / 4 < 0 && !(0 == p / 4 % 2))) && (((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + (-1 + -(d / 8))))) || 0 == p / 4 % 2) || !(p / 4 < 0)))) && (((0 == p / 2 % 2 || ((((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0))) || !(1 + p / 4 < 0)) || 0 == (p / 4 + 1) % 2) && (((((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 8))) || 0 == d / 4 % 2) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) && ((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2)))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)))) || !(p / 2 < 0)) || 1 == 1 + p / 4))) && (((r + -(d / 2) >= 1 + d / 4 || !(d / 2 < 0)) || 0 == d / 2 % 2) || (((((((((A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) && (((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + -((d / 4 + 1) / 2)))) || (p / 4 < 0 && !(0 == p / 4 % 2))) && ((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || 0 == p / 4 % 2) || !(p / 4 < 0))) || 1 == p / 4) || (p / 2 < 0 && !(0 == p / 2 % 2))) && (((0 == p / 2 % 2 || !(p / 2 < 0)) || (((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))))) || !(1 + p / 4 < 0)) || 0 == (p / 4 + 1) % 2) && (((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)))) || 1 == 1 + p / 4))))) && ((0 == p % 2 || !(p < 0)) || ((((r + -(d / 2) >= 1 + d / 4 || !(d / 2 < 0)) || (((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || ((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))) || !(1 + d / 4 < 0))) || ((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2))) && ((0 == (p / 2 + 1) / 2 % 2 || ((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))))) || !((p / 2 + 1) / 2 < 0)))) && (((((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))) && ((!(1 + (p / 2 + 1) / 2 < 0) || ((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)))) || 0 == ((p / 2 + 1) / 2 + 1) % 2)) || 0 == (p / 2 + 1) % 2) || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || r + -(d / 2) >= d / 4) || (((1 == (p / 2 + 1) / 2 || ((((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || ((((0 == d / 4 % 2 || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) && ((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))))) && ((0 == (p / 2 + 1) / 2 % 2 || (((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)))) || !((p / 2 + 1) / 2 < 0)))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) && (((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || (((!(1 + (p / 2 + 1) / 2 < 0) || (((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0)))) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && ((((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) || !(1 + p / 2 < 0))))))))) && B == 1) && ((A == B * 1 * (q + 2 * p) + (r + -(2 * d)) || (((d < 0 && !(0 == d % 2)) || !(B * 1 == 2 * d / 4)) && ((0 == d % 2 || !(d < 0)) || !(B * 1 == 1 + 2 * d / 4)))) || (((0 == p % 2 || !(p < 0)) || !(1 <= 1 + 2 * p / 4)) && (!(1 <= 2 * p / 4) || (p < 0 && !(0 == p % 2)))))) && (((((((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(B * 1 == (d / 4 + 1) / 2)) && ((0 == (d / 4 + 1) % 2 || !(1 + d / 4 < 0)) || !(B * 1 == 1 + (d / 4 + 1) / 2))) || !(d / 2 < 0)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || (((d / 4 < 0 && !(0 == d / 4 % 2)) || !(B * 1 == d / 8)) && ((0 == d / 4 % 2 || !(B * 1 == 1 + d / 8)) || !(d / 4 < 0))))) || A == B * 1 * (q + p / 2) + (r + -(d / 2))) || (d < 0 && !(0 == d % 2))) && (((0 == d % 2 || A == B * 1 * (q + p / 2) + (r + (-1 + -(d / 2)))) || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((!(B * 1 == 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2)) || !(B * 1 == ((d / 2 + 1) / 2 + 1) / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || ((!(B * 1 == (d / 2 + 1) / 4) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && ((!((d / 2 + 1) / 2 < 0) || !(B * 1 == 1 + (d / 2 + 1) / 4)) || 0 == (d / 2 + 1) / 2 % 2))))) || !(d < 0))) || (p < 0 && !(0 == p % 2))) || (((p / 2 < 0 && !(0 == p / 2 % 2)) || (((0 == p / 4 % 2 || !(1 <= 1 + p / 8)) || !(p / 4 < 0)) && (!(1 <= p / 8) || (!(0 == p / 4 % 2) && p / 4 < 0)))) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || (((!(1 <= 1 + (p / 4 + 1) / 2) || 0 == (p / 4 + 1) % 2) || !(1 + p / 4 < 0)) && (!(1 <= (p / 4 + 1) / 2) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0))))))) && A == q * B + r) && (((0 == d % 2 || r >= 1 + d / 2) || !(d < 0)) || ((((0 == p % 2 || (((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -((d / 2 + 1) / 2))))) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && (((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p / 4) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + p / 4) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (p / 2 < 0 && !(0 == p / 2 % 2))) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || ((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + p / 4)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + (1 + p / 4)) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2)))))) && (A == (q + p) * B + (r + -d) || !(r >= d))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (!(1 == p) || B == d)) && d == B * p) && ((A == B * 1 * q + r || ((!(B * 1 == d / 2) || (d < 0 && !(0 == d % 2))) && ((0 == d % 2 || !(B * 1 == 1 + d / 2)) || !(d < 0)))) || (((!(1 <= 1 + p / 2) || 0 == p % 2) || !(p < 0)) && (!(1 <= p / 2) || (p < 0 && !(0 == p % 2)))))) || (((((((((((((((((((((((((((A == B * 1 * q + r || (((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 <= p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 <= 1 + p / 4))) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || !(p < 0)) || (((!(1 <= 1 + (p / 2 + 1) / 2) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && ((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || !(1 <= (p / 2 + 1) / 2)))))) || (((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || !(B * 1 == (d / 2 + 1) / 2)) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(B * 1 == 1 + (d / 2 + 1) / 2)))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || !(B * 1 == 1 + d / 4)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || !(B * 1 == d / 4)))))) && ((((((((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 2) || (((1 == p / 4 || (p / 2 < 0 && !(0 == p / 2 % 2))) || (((0 == p / 4 % 2 || (((A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2))) || !(p / 4 < 0)) && ((p / 4 < 0 && !(0 == p / 4 % 2)) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))))))) && (((0 == p / 2 % 2 || !(p / 2 < 0)) || (((!(1 + p / 4 < 0) || 0 == (p / 4 + 1) % 2) || (((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2))) && ((!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))))))) || 1 == 1 + p / 4))) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 == p / 4 || (((0 == p / 4 % 2 || ((((A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))) || !(p / 4 < 0)) && ((p / 4 < 0 && !(0 == p / 4 % 2)) || ((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) || A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) && ((A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4)) || !(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4)) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))))) || (p / 2 < 0 && !(0 == p / 2 % 2))) && ((((((((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) && (((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)) && ((!(1 + p / 4 < 0) || 0 == (p / 4 + 1) % 2) || (((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && (((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4))))) || 0 == p / 2 % 2) || !(p / 2 < 0)) || 1 == 1 + p / 4))) || r + (-1 + -(d / 2)) >= (d / 2 + 1) / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || ((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || r + (-1 + -(d / 2)) >= (d / 2 + 1) / 2) || ((((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)) || (((((((A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2)))) || !(1 + (p / 2 + 1) / 2 < 0)) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && (((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2)))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || (((0 == (p / 2 + 1) / 2 % 2 || (((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && (((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)))) || !((p / 2 + 1) / 2 < 0)) && (((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || ((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4)) || !(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4)) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))))))) && (((!(1 + d / 2 < 0) || ((((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)) || (((!(1 + (p / 2 + 1) / 2 < 0) || 0 == ((p / 2 + 1) / 2 + 1) % 2) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))))) && ((((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2)) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || (((0 == (p / 2 + 1) / 2 % 2 || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))))) || !((p / 2 + 1) / 2 < 0)) && ((((A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2)) || ((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2))))))) || 0 == (d / 2 + 1) % 2) || r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 2))) || !(p < 0))) || 0 == d % 2) || !(d < 0))) && ((((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || 0 == d / 2 % 2) || B == 1 + d / 4) && ((!(0 == d / 2 % 2) && d / 2 < 0) || B == d / 4))) && ((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || B == (d / 2 + 1) / 2) && ((B == 1 + (d / 2 + 1) / 2 || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2))) || !(d < 0))) || (((0 == p % 2 || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) && ((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4))) || (p < 0 && !(0 == p % 2)))))) && (((1 == 2 * p || A == (q + 2 * (2 * p) + p) * B + (r + -(2 * (2 * d)) + -d)) || !(r + -(2 * (2 * d)) >= d)) || r + -(2 * (2 * d)) >= 2 * d)) && (((d < 0 && !(0 == d % 2)) || (((1 == p / 2 || (((((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || 0 == d / 2 % 2) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -(d / 4)))) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (1 + p / 4)) * B + (r + -d + -(d / 4)))) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + p / 4) * B + (r + -d + -(d / 4))) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2))) && (((0 == p % 2 || 1 == 1 + p / 2) || (((0 == (p / 2 + 1) % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -(d / 4))) || !(r + -d >= d / 4)) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))) || !(1 + p / 2 < 0)) && (((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -(d / 4)))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || !(p < 0)))) || r + -d >= d / 2)) && ((A == B * 1 * (q + 2 * (2 * p)) + (r + -(2 * (2 * d))) || !(B * 1 == d)) || !(1 <= p))) && (((((((((((((((((((((((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0)) && ((((0 == p % 2 || 1 == 1 + p / 2) || (((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || A == (1 + d / 4) * (q + (1 + p / 2)) + (r + -(d / 2))) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + (1 + p / 2)) + (r + -(d / 2))))) && ((0 == d % 2 || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || A == (1 + (d / 2 + 1) / 2) * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))))) || !(d < 0)))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)))))) && 2 <= -d / -2) && r >= -d / -2) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4)))) || (((0 == d % 2 || (((A == (1 + (d / 2 + 1) / 2) * (q + p / 2) + (r + (-1 + -(d / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + p / 2) + (r + (-1 + -(d / 2)))))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + p / 2) + (r + -(d / 2))) && ((!(d / 2 < 0) || A == (1 + d / 4) * (q + p / 2) + (r + -(d / 2))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2)))) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && A == d * q + r) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && d % 2 == 0) && A == q * B + r) && ((0 == d % 2 || (((0 == p % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) || !(1 + p / 2 < 0)))) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) || !(1 + p / 2 < 0)))))) || !(p < 0)) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2))))) || !(d < 0))) && A == (q + p) * B + (r + -d)) && ((((((((((A == (q + p) * B + (r + -d) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && A == d * q + r) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p) || (((((((((A == (q + p) * B + (r + -d) && (A == d * q + r || !(1 == p))) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == d % 2 || !(d < 0)) || A == (1 + d / 2) * (q + p) + (r + -d)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * (q + p) + (r + -d))) || 1 == p) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (!(1 == p) || B == d)) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || (((!(0 == d / 2 % 2) && d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 4))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 4))))) && ((!(d / 2 < 0) || (((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) || !(1 + p / 2 < 0)) && (A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 0 == d / 2 % 2))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((((A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + -(d / 4)) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + -(d / 4)))) || (!(0 == d / 2 % 2) && d / 2 < 0)) && (((((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + (-1 + -(d / 4))))) || !(d / 2 < 0)) || 0 == d / 2 % 2)))))) || ((((((((((((((((((((((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0)) && ((((0 == p % 2 || 1 == 1 + p / 2) || (((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || A == (1 + d / 4) * (q + (1 + p / 2)) + (r + -(d / 2))) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + (1 + p / 2)) + (r + -(d / 2))))) && ((0 == d % 2 || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || A == (1 + (d / 2 + 1) / 2) * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))))) || !(d < 0)))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)))))) && 2 <= -d / -2) && r >= -d / -2) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4)))) || (((0 == d % 2 || (((A == (1 + (d / 2 + 1) / 2) * (q + p / 2) + (r + (-1 + -(d / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + p / 2) + (r + (-1 + -(d / 2)))))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + p / 2) + (r + -(d / 2))) && ((!(d / 2 < 0) || A == (1 + d / 4) * (q + p / 2) + (r + -(d / 2))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2)))) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && d % 2 == 0) && A == q * B + r) && ((0 == d % 2 || (((0 == p % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) || !(1 + p / 2 < 0)))) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) || !(1 + p / 2 < 0)))))) || !(p < 0)) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2))))) || !(d < 0))) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((((((((A == (q + p) * B + (r + -d) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && A == d * q + r) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p) || (((((((((A == (q + p) * B + (r + -d) && (A == d * q + r || !(1 == p))) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == d % 2 || !(d < 0)) || A == (1 + d / 2) * (q + p) + (r + -d)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * (q + p) + (r + -d))) || 1 == p) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (!(1 == p) || B == d)) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || (((!(0 == d / 2 % 2) && d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 4))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 4))))) && ((!(d / 2 < 0) || (((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) || !(1 + p / 2 < 0)) && (A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 0 == d / 2 % 2))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((((A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + -(d / 4)) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + -(d / 4)))) || (!(0 == d / 2 % 2) && d / 2 < 0)) && (((((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + (-1 + -(d / 4))))) || !(d / 2 < 0)) || 0 == d / 2 % 2)))))))) && (((d < 0 && !(0 == d % 2)) || r >= d / 2) || ((((0 == p % 2 || 1 == 1 + p / 2) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 4))) || !(r >= d / 4)) && (((!(r >= 1 + d / 4) || !(d / 2 < 0)) || 0 == d / 2 % 2) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 4)))))) && (((((A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 4))) || !(r >= 1 + d / 4)) || !(d / 2 < 0)) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -(d / 4))) || !(r >= d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) && ((1 == p / 2 || (p < 0 && !(0 == p % 2))) || (((0 == p / 2 % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r >= d / 4)) || A == (q + (1 + p / 4)) * B + (r + -(d / 4))) && (((!(r >= 1 + d / 4) || A == (q + (1 + p / 4)) * B + (r + (-1 + -(d / 4)))) || !(d / 2 < 0)) || 0 == d / 2 % 2))) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(r >= 1 + d / 4) || !(d / 2 < 0)) || A == (q + p / 4) * B + (r + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p / 4) * B + (r + -(d / 4))) || !(r >= d / 4))))))))) && (A == d * q + r || !(1 == p))) && (((r + -d >= 1 + d / 2 || 0 == d % 2) || !(d < 0)) || ((((0 == p % 2 || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || ((((!(1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || (((A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -((d / 2 + 1) / 2)) || (!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0)) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + p / 4) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0)))) || (p < 0 && !(0 == p % 2)))))) && (((((0 == p % 2 || ((((0 == d % 2 || !(r + -(2 * d) >= 1 + 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + (-1 + -(2 * d / 4)))) || !(d < 0)) && (((d < 0 && !(0 == d % 2)) || !(r + -(2 * d) >= 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + -(2 * d / 4))))) || !(p < 0)) && (((((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + (-1 + -(2 * d / 4))) || 0 == d % 2) || !(r + -(2 * d) >= 1 + 2 * d / 4)) || !(d < 0)) && ((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + -(2 * d / 4)) || (d < 0 && !(0 == d % 2))) || !(r + -(2 * d) >= 2 * d / 4))) || (p < 0 && !(0 == p % 2)))) || r + -(2 * d) >= d) || 1 == p)) && (1 == p || (((0 == p % 2 || ((((A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0)) && ((A == (q + (1 + p / 2)) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((A == (q + p / 2) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)) && (((A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0))))))) && (((0 == p % 2 || ((((A == B * 1 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2))) || 0 == d % 2) || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((!(B * 1 == 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2)) || !(B * 1 == ((d / 2 + 1) / 2 + 1) / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || ((!(B * 1 == (d / 2 + 1) / 4) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && ((!((d / 2 + 1) / 2 < 0) || !(B * 1 == 1 + (d / 2 + 1) / 4)) || 0 == (d / 2 + 1) / 2 % 2))))) || !(d < 0)) && ((((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(B * 1 == (d / 4 + 1) / 2)) && ((0 == (d / 4 + 1) % 2 || !(1 + d / 4 < 0)) || !(B * 1 == 1 + (d / 4 + 1) / 2))) || !(d / 2 < 0)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || (((d / 4 < 0 && !(0 == d / 4 % 2)) || !(B * 1 == d / 8)) && ((0 == d / 4 % 2 || !(B * 1 == 1 + d / 8)) || !(d / 4 < 0))))) || (d < 0 && !(0 == d % 2))) || A == B * 1 * (q + (1 + p / 2)) + (r + -(d / 2))))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || (((!(1 <= 1 + ((p / 2 + 1) / 2 + 1) / 2) || !(1 + (p / 2 + 1) / 2 < 0)) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && (!(1 <= ((p / 2 + 1) / 2 + 1) / 2) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || ((((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || !(1 <= (p / 2 + 1) / 4)) && ((!(1 <= 1 + (p / 2 + 1) / 4) || 0 == (p / 2 + 1) / 2 % 2) || !((p / 2 + 1) / 2 < 0))))))) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 <= p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 <= 1 + p / 4))) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || !(p < 0)) || (((!(1 <= 1 + (p / 2 + 1) / 2) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && ((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || !(1 <= (p / 2 + 1) / 2))))) || (((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || !(B * 1 == (d / 2 + 1) / 2)) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(B * 1 == 1 + (d / 2 + 1) / 2)))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || !(B * 1 == 1 + d / 4)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || !(B * 1 == d / 4)))))) || A == B * 1 * (q + p) + (r + -d))) && r == A) && ((d < 0 && !(0 == d % 2)) || (((p < 0 && !(0 == p % 2)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || r + -(d / 2) >= d / 4) || (((1 == p / 4 || (p / 2 < 0 && !(0 == p / 2 % 2))) || (((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0))) || (p / 4 < 0 && !(0 == p / 4 % 2))) && (((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + (-1 + -(d / 8))))) || 0 == p / 4 % 2) || !(p / 4 < 0)))) && (((0 == p / 2 % 2 || ((((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0))) || !(1 + p / 4 < 0)) || 0 == (p / 4 + 1) % 2) && (((((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 8))) || 0 == d / 4 % 2) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) && ((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2)))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)))) || !(p / 2 < 0)) || 1 == 1 + p / 4))) && (((r + -(d / 2) >= 1 + d / 4 || !(d / 2 < 0)) || 0 == d / 2 % 2) || (((((((((A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) && (((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + -((d / 4 + 1) / 2)))) || (p / 4 < 0 && !(0 == p / 4 % 2))) && ((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || 0 == p / 4 % 2) || !(p / 4 < 0))) || 1 == p / 4) || (p / 2 < 0 && !(0 == p / 2 % 2))) && (((0 == p / 2 % 2 || !(p / 2 < 0)) || (((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))))) || !(1 + p / 4 < 0)) || 0 == (p / 4 + 1) % 2) && (((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)))) || 1 == 1 + p / 4))))) && ((0 == p % 2 || !(p < 0)) || ((((r + -(d / 2) >= 1 + d / 4 || !(d / 2 < 0)) || (((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || ((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))) || !(1 + d / 4 < 0))) || ((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2))) && ((0 == (p / 2 + 1) / 2 % 2 || ((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))))) || !((p / 2 + 1) / 2 < 0)))) && (((((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))) && ((!(1 + (p / 2 + 1) / 2 < 0) || ((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)))) || 0 == ((p / 2 + 1) / 2 + 1) % 2)) || 0 == (p / 2 + 1) % 2) || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || r + -(d / 2) >= d / 4) || (((1 == (p / 2 + 1) / 2 || ((((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || ((((0 == d / 4 % 2 || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) && ((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))))) && ((0 == (p / 2 + 1) / 2 % 2 || (((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)))) || !((p / 2 + 1) / 2 < 0)))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) && (((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || (((!(1 + (p / 2 + 1) / 2 < 0) || (((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0)))) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && ((((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) || !(1 + p / 2 < 0))))))))) && B == 1) && ((A == B * 1 * (q + 2 * p) + (r + -(2 * d)) || (((d < 0 && !(0 == d % 2)) || !(B * 1 == 2 * d / 4)) && ((0 == d % 2 || !(d < 0)) || !(B * 1 == 1 + 2 * d / 4)))) || (((0 == p % 2 || !(p < 0)) || !(1 <= 1 + 2 * p / 4)) && (!(1 <= 2 * p / 4) || (p < 0 && !(0 == p % 2)))))) && (((((((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(B * 1 == (d / 4 + 1) / 2)) && ((0 == (d / 4 + 1) % 2 || !(1 + d / 4 < 0)) || !(B * 1 == 1 + (d / 4 + 1) / 2))) || !(d / 2 < 0)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || (((d / 4 < 0 && !(0 == d / 4 % 2)) || !(B * 1 == d / 8)) && ((0 == d / 4 % 2 || !(B * 1 == 1 + d / 8)) || !(d / 4 < 0))))) || A == B * 1 * (q + p / 2) + (r + -(d / 2))) || (d < 0 && !(0 == d % 2))) && (((0 == d % 2 || A == B * 1 * (q + p / 2) + (r + (-1 + -(d / 2)))) || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((!(B * 1 == 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2)) || !(B * 1 == ((d / 2 + 1) / 2 + 1) / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || ((!(B * 1 == (d / 2 + 1) / 4) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && ((!((d / 2 + 1) / 2 < 0) || !(B * 1 == 1 + (d / 2 + 1) / 4)) || 0 == (d / 2 + 1) / 2 % 2))))) || !(d < 0))) || (p < 0 && !(0 == p % 2))) || (((p / 2 < 0 && !(0 == p / 2 % 2)) || (((0 == p / 4 % 2 || !(1 <= 1 + p / 8)) || !(p / 4 < 0)) && (!(1 <= p / 8) || (!(0 == p / 4 % 2) && p / 4 < 0)))) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || (((!(1 <= 1 + (p / 4 + 1) / 2) || 0 == (p / 4 + 1) % 2) || !(1 + p / 4 < 0)) && (!(1 <= (p / 4 + 1) / 2) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0))))))) && A == q * B + r) && (((0 == d % 2 || r >= 1 + d / 2) || !(d < 0)) || ((((0 == p % 2 || (((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -((d / 2 + 1) / 2))))) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && (((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p / 4) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + p / 4) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (p / 2 < 0 && !(0 == p / 2 % 2))) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || ((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + p / 4)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + (1 + p / 4)) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2)))))) && (A == (q + p) * B + (r + -d) || !(r >= d))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (!(1 == p) || B == d)) && d == B * p) && ((A == B * 1 * q + r || ((!(B * 1 == d / 2) || (d < 0 && !(0 == d % 2))) && ((0 == d % 2 || !(B * 1 == 1 + d / 2)) || !(d < 0)))) || (((!(1 <= 1 + p / 2) || 0 == p % 2) || !(p < 0)) && (!(1 <= p / 2) || (p < 0 && !(0 == p % 2)))))))) && B == 1) && A == q * B + r) && d == B * p)) || (((((((((((A == (q + p) * B + (r + -d) || !(r >= d)) && (((r + -d >= 1 + d / 2 || 0 == d % 2) || !(d < 0)) || ((((0 == p % 2 || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || ((((!(1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || (((A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -((d / 2 + 1) / 2)) || (!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0)) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + p / 4) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0)))) || (p < 0 && !(0 == p % 2)))))) && (((1 == 2 * p || A == (q + 2 * (2 * p) + p) * B + (r + -(2 * (2 * d)) + -d)) || !(r + -(2 * (2 * d)) >= d)) || r + -(2 * (2 * d)) >= 2 * d)) && B == 1) && (A == q * B + r || (1 <= d && A == q * B + r))) && (((d < 0 && !(0 == d % 2)) || (((1 == p / 2 || (((((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || 0 == d / 2 % 2) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -(d / 4)))) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (1 + p / 4)) * B + (r + -d + -(d / 4)))) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + p / 4) * B + (r + -d + -(d / 4))) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2))) && (((0 == p % 2 || 1 == 1 + p / 2) || (((0 == (p / 2 + 1) % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -(d / 4))) || !(r + -d >= d / 4)) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))) || !(1 + p / 2 < 0)) && (((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -(d / 4)))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || !(p < 0)))) || r + -d >= d / 2)) && ((A == B * 1 * (q + 2 * (2 * p)) + (r + -(2 * (2 * d))) || !(B * 1 == d)) || !(1 <= p))) && A == q * B + r) && d == B * p) && ((A == B * 1 * q + r || ((!(B * 1 == d / 2) || (d < 0 && !(0 == d % 2))) && ((0 == d % 2 || !(B * 1 == 1 + d / 2)) || !(d < 0)))) || (((!(1 <= 1 + p / 2) || 0 == p % 2) || !(p < 0)) && (!(1 <= p / 2) || (p < 0 && !(0 == p % 2)))))) && (((((0 == p % 2 || ((((0 == d % 2 || !(r + -(2 * d) >= 1 + 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + (-1 + -(2 * d / 4)))) || !(d < 0)) && (((d < 0 && !(0 == d % 2)) || !(r + -(2 * d) >= 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + -(2 * d / 4))))) || !(p < 0)) && (((((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + (-1 + -(2 * d / 4))) || 0 == d % 2) || !(r + -(2 * d) >= 1 + 2 * d / 4)) || !(d < 0)) && ((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + -(2 * d / 4)) || (d < 0 && !(0 == d % 2))) || !(r + -(2 * d) >= 2 * d / 4))) || (p < 0 && !(0 == p % 2)))) || r + -(2 * d) >= d) || 1 == p))) || (((((((A == (q + p) * B + (r + -d) && (A == d * q + r || !(1 == p))) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (!(1 == p) || B == d)) && B == 1) && ((A == d * q + r || !(1 == p)) || !(d == B * p))) && A == q * B + r) && d == B * p)) || ((((((A == (q + p) * B + (r + -d) || !(r >= d)) && (((1 == 2 * p || A == (q + 2 * (2 * p) + p) * B + (r + -(2 * (2 * d)) + -d)) || !(r + -(2 * (2 * d)) >= d)) || r + -(2 * (2 * d)) >= 2 * d)) && B == 1) && ((A == d * q + r || !(1 == p)) || !(d == B * p))) && A == q * B + r) && d == B * p)) || ((((((((((((((0 == d % 2 || r >= 1 + d / 2) || !(d < 0)) || ((((0 == p % 2 || (((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -((d / 2 + 1) / 2))))) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && (((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p / 4) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + p / 4) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (p / 2 < 0 && !(0 == p / 2 % 2))) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || ((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + p / 4)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + (1 + p / 4)) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2))))) && (((d < 0 && !(0 == d % 2)) || r >= d / 2) || ((((0 == p % 2 || 1 == 1 + p / 2) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 4))) || !(r >= d / 4)) && (((!(r >= 1 + d / 4) || !(d / 2 < 0)) || 0 == d / 2 % 2) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 4)))))) && (((((A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 4))) || !(r >= 1 + d / 4)) || !(d / 2 < 0)) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -(d / 4))) || !(r >= d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) && ((1 == p / 2 || (p < 0 && !(0 == p % 2))) || (((0 == p / 2 % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r >= d / 4)) || A == (q + (1 + p / 4)) * B + (r + -(d / 4))) && (((!(r >= 1 + d / 4) || A == (q + (1 + p / 4)) * B + (r + (-1 + -(d / 4)))) || !(d / 2 < 0)) || 0 == d / 2 % 2))) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(r >= 1 + d / 4) || !(d / 2 < 0)) || A == (q + p / 4) * B + (r + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p / 4) * B + (r + -(d / 4))) || !(r >= d / 4))))))))) && (A == (q + p) * B + (r + -d) || !(r >= d))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((A == B * 1 * q + r || (((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 <= p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 <= 1 + p / 4))) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || !(p < 0)) || (((!(1 <= 1 + (p / 2 + 1) / 2) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && ((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || !(1 <= (p / 2 + 1) / 2)))))) || (((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || !(B * 1 == (d / 2 + 1) / 2)) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(B * 1 == 1 + (d / 2 + 1) / 2)))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || !(B * 1 == 1 + d / 4)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || !(B * 1 == d / 4))))))) && (!(1 == p) || B == d)) && (((1 == 2 * p || A == (q + 2 * (2 * p) + p) * B + (r + -(2 * (2 * d)) + -d)) || !(r + -(2 * (2 * d)) >= d)) || r + -(2 * (2 * d)) >= 2 * d)) && B == 1) && ((A == d * q + r || !(1 == p)) || !(d == B * p))) && A == q * B + r) && ((((((((((((2 <= d && (((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (((((0 == d % 2 || !(d < 0)) || A == (1 + d / 2) * (q + p) + (r + -d)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * (q + p) + (r + -d))) || 1 == p) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && (!(1 == p) || B == d)) && A == q * B + r) || ((((((((((2 <= d && (((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && (!(1 == p) || B == d)) && A == q * B + r))) && d == B * p)) || ((((((((((((((((((((((((1 == p || (((0 == p % 2 || ((((A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0)) && ((A == (q + (1 + p / 2)) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((A == (q + p / 2) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)) && (((A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0)))))) && (((0 == p % 2 || ((((A == B * 1 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2))) || 0 == d % 2) || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((!(B * 1 == 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2)) || !(B * 1 == ((d / 2 + 1) / 2 + 1) / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || ((!(B * 1 == (d / 2 + 1) / 4) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && ((!((d / 2 + 1) / 2 < 0) || !(B * 1 == 1 + (d / 2 + 1) / 4)) || 0 == (d / 2 + 1) / 2 % 2))))) || !(d < 0)) && ((((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(B * 1 == (d / 4 + 1) / 2)) && ((0 == (d / 4 + 1) % 2 || !(1 + d / 4 < 0)) || !(B * 1 == 1 + (d / 4 + 1) / 2))) || !(d / 2 < 0)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || (((d / 4 < 0 && !(0 == d / 4 % 2)) || !(B * 1 == d / 8)) && ((0 == d / 4 % 2 || !(B * 1 == 1 + d / 8)) || !(d / 4 < 0))))) || (d < 0 && !(0 == d % 2))) || A == B * 1 * (q + (1 + p / 2)) + (r + -(d / 2))))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || (((!(1 <= 1 + ((p / 2 + 1) / 2 + 1) / 2) || !(1 + (p / 2 + 1) / 2 < 0)) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && (!(1 <= ((p / 2 + 1) / 2 + 1) / 2) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || ((((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || !(1 <= (p / 2 + 1) / 4)) && ((!(1 <= 1 + (p / 2 + 1) / 4) || 0 == (p / 2 + 1) / 2 % 2) || !((p / 2 + 1) / 2 < 0))))))) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && ((A == B * 1 * q + r || (((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 <= p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 <= 1 + p / 4))) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || !(p < 0)) || (((!(1 <= 1 + (p / 2 + 1) / 2) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && ((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || !(1 <= (p / 2 + 1) / 2)))))) || (((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || !(B * 1 == (d / 2 + 1) / 2)) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(B * 1 == 1 + (d / 2 + 1) / 2)))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || !(B * 1 == 1 + d / 4)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || !(B * 1 == d / 4))))))) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 <= p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 <= 1 + p / 4))) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || !(p < 0)) || (((!(1 <= 1 + (p / 2 + 1) / 2) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && ((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || !(1 <= (p / 2 + 1) / 2))))) || (((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || !(B * 1 == (d / 2 + 1) / 2)) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(B * 1 == 1 + (d / 2 + 1) / 2)))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || !(B * 1 == 1 + d / 4)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || !(B * 1 == d / 4)))))) || A == B * 1 * (q + p) + (r + -d))) && ((((((((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 2) || (((1 == p / 4 || (p / 2 < 0 && !(0 == p / 2 % 2))) || (((0 == p / 4 % 2 || (((A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2))) || !(p / 4 < 0)) && ((p / 4 < 0 && !(0 == p / 4 % 2)) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))))))) && (((0 == p / 2 % 2 || !(p / 2 < 0)) || (((!(1 + p / 4 < 0) || 0 == (p / 4 + 1) % 2) || (((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2))) && ((!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))))))) || 1 == 1 + p / 4))) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 == p / 4 || (((0 == p / 4 % 2 || ((((A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))) || !(p / 4 < 0)) && ((p / 4 < 0 && !(0 == p / 4 % 2)) || ((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) || A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) && ((A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4)) || !(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4)) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))))) || (p / 2 < 0 && !(0 == p / 2 % 2))) && ((((((((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) && (((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)) && ((!(1 + p / 4 < 0) || 0 == (p / 4 + 1) % 2) || (((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && (((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4))))) || 0 == p / 2 % 2) || !(p / 2 < 0)) || 1 == 1 + p / 4))) || r + (-1 + -(d / 2)) >= (d / 2 + 1) / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || ((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || r + (-1 + -(d / 2)) >= (d / 2 + 1) / 2) || ((((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)) || (((((((A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2)))) || !(1 + (p / 2 + 1) / 2 < 0)) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && (((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2)))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || (((0 == (p / 2 + 1) / 2 % 2 || (((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && (((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)))) || !((p / 2 + 1) / 2 < 0)) && (((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || ((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4)) || !(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4)) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))))))) && (((!(1 + d / 2 < 0) || ((((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)) || (((!(1 + (p / 2 + 1) / 2 < 0) || 0 == ((p / 2 + 1) / 2 + 1) % 2) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))))) && ((((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2)) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || (((0 == (p / 2 + 1) / 2 % 2 || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))))) || !((p / 2 + 1) / 2 < 0)) && ((((A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2)) || ((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2))))))) || 0 == (d / 2 + 1) % 2) || r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 2))) || !(p < 0))) || 0 == d % 2) || !(d < 0))) && (((1 == 2 * p || A == (q + 2 * (2 * p) + p) * B + (r + -(2 * (2 * d)) + -d)) || !(r + -(2 * (2 * d)) >= d)) || r + -(2 * (2 * d)) >= 2 * d)) && ((d < 0 && !(0 == d % 2)) || (((p < 0 && !(0 == p % 2)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || r + -(d / 2) >= d / 4) || (((1 == p / 4 || (p / 2 < 0 && !(0 == p / 2 % 2))) || (((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0))) || (p / 4 < 0 && !(0 == p / 4 % 2))) && (((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + (-1 + -(d / 8))))) || 0 == p / 4 % 2) || !(p / 4 < 0)))) && (((0 == p / 2 % 2 || ((((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0))) || !(1 + p / 4 < 0)) || 0 == (p / 4 + 1) % 2) && (((((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 8))) || 0 == d / 4 % 2) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) && ((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2)))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)))) || !(p / 2 < 0)) || 1 == 1 + p / 4))) && (((r + -(d / 2) >= 1 + d / 4 || !(d / 2 < 0)) || 0 == d / 2 % 2) || (((((((((A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) && (((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + -((d / 4 + 1) / 2)))) || (p / 4 < 0 && !(0 == p / 4 % 2))) && ((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || 0 == p / 4 % 2) || !(p / 4 < 0))) || 1 == p / 4) || (p / 2 < 0 && !(0 == p / 2 % 2))) && (((0 == p / 2 % 2 || !(p / 2 < 0)) || (((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))))) || !(1 + p / 4 < 0)) || 0 == (p / 4 + 1) % 2) && (((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)))) || 1 == 1 + p / 4))))) && ((0 == p % 2 || !(p < 0)) || ((((r + -(d / 2) >= 1 + d / 4 || !(d / 2 < 0)) || (((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || ((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))) || !(1 + d / 4 < 0))) || ((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2))) && ((0 == (p / 2 + 1) / 2 % 2 || ((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))))) || !((p / 2 + 1) / 2 < 0)))) && (((((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))) && ((!(1 + (p / 2 + 1) / 2 < 0) || ((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)))) || 0 == ((p / 2 + 1) / 2 + 1) % 2)) || 0 == (p / 2 + 1) % 2) || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || r + -(d / 2) >= d / 4) || (((1 == (p / 2 + 1) / 2 || ((((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || ((((0 == d / 4 % 2 || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) && ((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))))) && ((0 == (p / 2 + 1) / 2 % 2 || (((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)))) || !((p / 2 + 1) / 2 < 0)))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) && (((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || (((!(1 + (p / 2 + 1) / 2 < 0) || (((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0)))) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && ((((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) || !(1 + p / 2 < 0))))))))) && B == 1) && (((d < 0 && !(0 == d % 2)) || (((1 == p / 2 || (((((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || 0 == d / 2 % 2) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -(d / 4)))) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (1 + p / 4)) * B + (r + -d + -(d / 4)))) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + p / 4) * B + (r + -d + -(d / 4))) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2))) && (((0 == p % 2 || 1 == 1 + p / 2) || (((0 == (p / 2 + 1) % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -(d / 4))) || !(r + -d >= d / 4)) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))) || !(1 + p / 2 < 0)) && (((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -(d / 4)))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || !(p < 0)))) || r + -d >= d / 2)) && ((A == B * 1 * (q + 2 * p) + (r + -(2 * d)) || (((d < 0 && !(0 == d % 2)) || !(B * 1 == 2 * d / 4)) && ((0 == d % 2 || !(d < 0)) || !(B * 1 == 1 + 2 * d / 4)))) || (((0 == p % 2 || !(p < 0)) || !(1 <= 1 + 2 * p / 4)) && (!(1 <= 2 * p / 4) || (p < 0 && !(0 == p % 2)))))) && (((((((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(B * 1 == (d / 4 + 1) / 2)) && ((0 == (d / 4 + 1) % 2 || !(1 + d / 4 < 0)) || !(B * 1 == 1 + (d / 4 + 1) / 2))) || !(d / 2 < 0)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || (((d / 4 < 0 && !(0 == d / 4 % 2)) || !(B * 1 == d / 8)) && ((0 == d / 4 % 2 || !(B * 1 == 1 + d / 8)) || !(d / 4 < 0))))) || A == B * 1 * (q + p / 2) + (r + -(d / 2))) || (d < 0 && !(0 == d % 2))) && (((0 == d % 2 || A == B * 1 * (q + p / 2) + (r + (-1 + -(d / 2)))) || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((!(B * 1 == 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2)) || !(B * 1 == ((d / 2 + 1) / 2 + 1) / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || ((!(B * 1 == (d / 2 + 1) / 4) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && ((!((d / 2 + 1) / 2 < 0) || !(B * 1 == 1 + (d / 2 + 1) / 4)) || 0 == (d / 2 + 1) / 2 % 2))))) || !(d < 0))) || (p < 0 && !(0 == p % 2))) || (((p / 2 < 0 && !(0 == p / 2 % 2)) || (((0 == p / 4 % 2 || !(1 <= 1 + p / 8)) || !(p / 4 < 0)) && (!(1 <= p / 8) || (!(0 == p / 4 % 2) && p / 4 < 0)))) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || (((!(1 <= 1 + (p / 4 + 1) / 2) || 0 == (p / 4 + 1) % 2) || !(1 + p / 4 < 0)) && (!(1 <= (p / 4 + 1) / 2) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0))))))) && ((A == B * 1 * (q + 2 * (2 * p)) + (r + -(2 * (2 * d))) || !(B * 1 == d)) || !(1 <= p))) && A == q * B + r) && (((0 == d % 2 || r >= 1 + d / 2) || !(d < 0)) || ((((0 == p % 2 || (((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -((d / 2 + 1) / 2))))) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && (((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p / 4) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + p / 4) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (p / 2 < 0 && !(0 == p / 2 % 2))) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || ((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + p / 4)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + (1 + p / 4)) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2)))))) && (((d < 0 && !(0 == d % 2)) || r >= d / 2) || ((((0 == p % 2 || 1 == 1 + p / 2) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 4))) || !(r >= d / 4)) && (((!(r >= 1 + d / 4) || !(d / 2 < 0)) || 0 == d / 2 % 2) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 4)))))) && (((((A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 4))) || !(r >= 1 + d / 4)) || !(d / 2 < 0)) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -(d / 4))) || !(r >= d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) && ((1 == p / 2 || (p < 0 && !(0 == p % 2))) || (((0 == p / 2 % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r >= d / 4)) || A == (q + (1 + p / 4)) * B + (r + -(d / 4))) && (((!(r >= 1 + d / 4) || A == (q + (1 + p / 4)) * B + (r + (-1 + -(d / 4)))) || !(d / 2 < 0)) || 0 == d / 2 % 2))) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(r >= 1 + d / 4) || !(d / 2 < 0)) || A == (q + p / 4) * B + (r + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p / 4) * B + (r + -(d / 4))) || !(r >= d / 4))))))))) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && (A == (q + p) * B + (r + -d) || !(r >= d))) && (((r + -d >= 1 + d / 2 || 0 == d % 2) || !(d < 0)) || ((((0 == p % 2 || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || ((((!(1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || (((A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -((d / 2 + 1) / 2)) || (!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0)) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + p / 4) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0)))) || (p < 0 && !(0 == p % 2)))))) && (!(1 == p) || B == d)) && d == B * p) && ((A == B * 1 * q + r || ((!(B * 1 == d / 2) || (d < 0 && !(0 == d % 2))) && ((0 == d % 2 || !(B * 1 == 1 + d / 2)) || !(d < 0)))) || (((!(1 <= 1 + p / 2) || 0 == p % 2) || !(p < 0)) && (!(1 <= p / 2) || (p < 0 && !(0 == p % 2)))))) && (((((0 == p % 2 || ((((0 == d % 2 || !(r + -(2 * d) >= 1 + 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + (-1 + -(2 * d / 4)))) || !(d < 0)) && (((d < 0 && !(0 == d % 2)) || !(r + -(2 * d) >= 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + -(2 * d / 4))))) || !(p < 0)) && (((((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + (-1 + -(2 * d / 4))) || 0 == d % 2) || !(r + -(2 * d) >= 1 + 2 * d / 4)) || !(d < 0)) && ((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + -(2 * d / 4)) || (d < 0 && !(0 == d % 2))) || !(r + -(2 * d) >= 2 * d / 4))) || (p < 0 && !(0 == p % 2)))) || r + -(2 * d) >= d) || 1 == p))) || ((((((((((((((1 == p || (((0 == p % 2 || ((((A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0)) && ((A == (q + (1 + p / 2)) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((A == (q + p / 2) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)) && (((A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0)))))) && A + B * -4 >= B) && r == A + B * -4 + -B) && B == 1) && q == 0 + 2 * (2 * 1) + p) && (((0 == d % 2 || r >= 1 + d / 2) || !(d < 0)) || ((((0 == p % 2 || (((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -((d / 2 + 1) / 2))))) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && (((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p / 4) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + p / 4) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (p / 2 < 0 && !(0 == p / 2 % 2))) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || ((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + p / 4)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + (1 + p / 4)) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2)))))) && (((d < 0 && !(0 == d % 2)) || r >= d / 2) || ((((0 == p % 2 || 1 == 1 + p / 2) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 4))) || !(r >= d / 4)) && (((!(r >= 1 + d / 4) || !(d / 2 < 0)) || 0 == d / 2 % 2) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 4)))))) && (((((A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 4))) || !(r >= 1 + d / 4)) || !(d / 2 < 0)) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -(d / 4))) || !(r >= d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) && ((1 == p / 2 || (p < 0 && !(0 == p % 2))) || (((0 == p / 2 % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r >= d / 4)) || A == (q + (1 + p / 4)) * B + (r + -(d / 4))) && (((!(r >= 1 + d / 4) || A == (q + (1 + p / 4)) * B + (r + (-1 + -(d / 4)))) || !(d / 2 < 0)) || 0 == d / 2 % 2))) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(r >= 1 + d / 4) || !(d / 2 < 0)) || A == (q + p / 4) * B + (r + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p / 4) * B + (r + -(d / 4))) || !(r >= d / 4))))))))) && (A == (q + p) * B + (r + -d) || !(r >= d))) && r + d == A + -(2 * (2 * B))) && p <= 1) && d == B) && q + -4 == 1) && !(A + B * -4 >= B * 2)) && d == B * p)) || (((((((((((q == 0 + p && d == 2 * (2 * B)) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (!(1 == p) || B == d)) && q + p * -1 == 0) && B == 1) && r == A + -d) && A == q * B + r) && ((((((((((((2 <= d && (((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (((((0 == d % 2 || !(d < 0)) || A == (1 + d / 2) * (q + p) + (r + -d)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * (q + p) + (r + -d))) || 1 == p) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && (!(1 == p) || B == d)) && A == q * B + r) || ((((((((((2 <= d && (((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && (!(1 == p) || B == d)) && A == q * B + r))) && r + d == A) && d == B * p) && p == 2 * (2 * 1))) || (((((((((((((((((1 == p || (((0 == p % 2 || ((((A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0)) && ((A == (q + (1 + p / 2)) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((A == (q + p / 2) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)) && (((A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0)))))) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 <= p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 <= 1 + p / 4))) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || !(p < 0)) || (((!(1 <= 1 + (p / 2 + 1) / 2) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && ((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || !(1 <= (p / 2 + 1) / 2))))) || (((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || !(B * 1 == (d / 2 + 1) / 2)) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(B * 1 == 1 + (d / 2 + 1) / 2)))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || !(B * 1 == 1 + d / 4)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || !(B * 1 == d / 4)))))) || A == B * 1 * (q + p) + (r + -d))) && (((1 == 2 * p || A == (q + 2 * (2 * p) + p) * B + (r + -(2 * (2 * d)) + -d)) || !(r + -(2 * (2 * d)) >= d)) || r + -(2 * (2 * d)) >= 2 * d)) && B == 1) && (((d < 0 && !(0 == d % 2)) || (((1 == p / 2 || (((((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || 0 == d / 2 % 2) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -(d / 4)))) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (1 + p / 4)) * B + (r + -d + -(d / 4)))) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + p / 4) * B + (r + -d + -(d / 4))) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2))) && (((0 == p % 2 || 1 == 1 + p / 2) || (((0 == (p / 2 + 1) % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -(d / 4))) || !(r + -d >= d / 4)) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))) || !(1 + p / 2 < 0)) && (((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -(d / 4)))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || !(p < 0)))) || r + -d >= d / 2)) && ((A == B * 1 * (q + 2 * (2 * p)) + (r + -(2 * (2 * d))) || !(B * 1 == d)) || !(1 <= p))) && A == q * B + r) && (A == (q + p) * B + (r + -d) || !(r >= d))) && (((r + -d >= 1 + d / 2 || 0 == d % 2) || !(d < 0)) || ((((0 == p % 2 || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || ((((!(1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || (((A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -((d / 2 + 1) / 2)) || (!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0)) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + p / 4) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0)))) || (p < 0 && !(0 == p % 2)))))) && (A == q * B + r || (1 <= d && A == q * B + r))) && d == B * p) && ((A == B * 1 * q + r || ((!(B * 1 == d / 2) || (d < 0 && !(0 == d % 2))) && ((0 == d % 2 || !(B * 1 == 1 + d / 2)) || !(d < 0)))) || (((!(1 <= 1 + p / 2) || 0 == p % 2) || !(p < 0)) && (!(1 <= p / 2) || (p < 0 && !(0 == p % 2)))))) && (((((0 == p % 2 || ((((0 == d % 2 || !(r + -(2 * d) >= 1 + 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + (-1 + -(2 * d / 4)))) || !(d < 0)) && (((d < 0 && !(0 == d % 2)) || !(r + -(2 * d) >= 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + -(2 * d / 4))))) || !(p < 0)) && (((((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + (-1 + -(2 * d / 4))) || 0 == d % 2) || !(r + -(2 * d) >= 1 + 2 * d / 4)) || !(d < 0)) && ((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + -(2 * d / 4)) || (d < 0 && !(0 == d % 2))) || !(r + -(2 * d) >= 2 * d / 4))) || (p < 0 && !(0 == p % 2)))) || r + -(2 * d) >= d) || 1 == p)) || ((((((((((((1 == p || (((0 == p % 2 || ((((A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0)) && ((A == (q + (1 + p / 2)) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((A == (q + p / 2) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)) && (((A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0)))))) && (A == (q + p) * B + (r + -d) || !(r >= d))) && (((r + -d >= 1 + d / 2 || 0 == d % 2) || !(d < 0)) || ((((0 == p % 2 || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || ((((!(1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || (((A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -((d / 2 + 1) / 2)) || (!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0)) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + p / 4) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0)))) || (p < 0 && !(0 == p % 2)))))) && (((1 == 2 * p || A == (q + 2 * (2 * p) + p) * B + (r + -(2 * (2 * d)) + -d)) || !(r + -(2 * (2 * d)) >= d)) || r + -(2 * (2 * d)) >= 2 * d)) && B == 1) && (A == q * B + r || (1 <= d && A == q * B + r))) && (((d < 0 && !(0 == d % 2)) || (((1 == p / 2 || (((((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || 0 == d / 2 % 2) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -(d / 4)))) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (1 + p / 4)) * B + (r + -d + -(d / 4)))) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + p / 4) * B + (r + -d + -(d / 4))) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2))) && (((0 == p % 2 || 1 == 1 + p / 2) || (((0 == (p / 2 + 1) % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -(d / 4))) || !(r + -d >= d / 4)) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))) || !(1 + p / 2 < 0)) && (((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -(d / 4)))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || !(p < 0)))) || r + -d >= d / 2)) && ((A == B * 1 * (q + 2 * (2 * p)) + (r + -(2 * (2 * d))) || !(B * 1 == d)) || !(1 <= p))) && A == q * B + r) && d == B * p) && ((A == B * 1 * q + r || ((!(B * 1 == d / 2) || (d < 0 && !(0 == d % 2))) && ((0 == d % 2 || !(B * 1 == 1 + d / 2)) || !(d < 0)))) || (((!(1 <= 1 + p / 2) || 0 == p % 2) || !(p < 0)) && (!(1 <= p / 2) || (p < 0 && !(0 == p % 2)))))) && (((((0 == p % 2 || ((((0 == d % 2 || !(r + -(2 * d) >= 1 + 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + (-1 + -(2 * d / 4)))) || !(d < 0)) && (((d < 0 && !(0 == d % 2)) || !(r + -(2 * d) >= 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + -(2 * d / 4))))) || !(p < 0)) && (((((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + (-1 + -(2 * d / 4))) || 0 == d % 2) || !(r + -(2 * d) >= 1 + 2 * d / 4)) || !(d < 0)) && ((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + -(2 * d / 4)) || (d < 0 && !(0 == d % 2))) || !(r + -(2 * d) >= 2 * d / 4))) || (p < 0 && !(0 == p % 2)))) || r + -(2 * d) >= d) || 1 == p))) && B == 1) && A == q * B + r) && d == B * p)) || (((((((((((d == 2 * (2 * B) && 2 <= -d / -2) && ((((((((((A == (q + p) * B + (r + -d) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && A == d * q + r) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p) || (((((((((A == (q + p) * B + (r + -d) && (A == d * q + r || !(1 == p))) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && r >= -d / -2) && r == A) && (!(1 == p) || B == d)) && q == 0) && B == 1) && d == 2 * (2 * 1)) && d % 2 == 0) && p == 2 * (2 * 1))) || ((((((((((((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0)))) && r == A) && d == 2 * (2 * (2 * B))) && ((((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || 0 == d / 2 % 2) || B == 1 + d / 4) && ((!(0 == d / 2 % 2) && d / 2 < 0) || B == d / 4))) && ((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || B == (d / 2 + 1) / 2) && ((B == 1 + (d / 2 + 1) / 2 || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2))) || !(d < 0))) || (((0 == p % 2 || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) && ((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4))) || (p < 0 && !(0 == p % 2)))))) && (!(1 == p) || B == d)) && q == 0) && B == 1) && A == q * B + r) && (((((((((((((((((((((((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0)) && ((((0 == p % 2 || 1 == 1 + p / 2) || (((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || A == (1 + d / 4) * (q + (1 + p / 2)) + (r + -(d / 2))) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + (1 + p / 2)) + (r + -(d / 2))))) && ((0 == d % 2 || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || A == (1 + (d / 2 + 1) / 2) * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))))) || !(d < 0)))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)))))) && 2 <= -d / -2) && r >= -d / -2) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4)))) || (((0 == d % 2 || (((A == (1 + (d / 2 + 1) / 2) * (q + p / 2) + (r + (-1 + -(d / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + p / 2) + (r + (-1 + -(d / 2)))))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + p / 2) + (r + -(d / 2))) && ((!(d / 2 < 0) || A == (1 + d / 4) * (q + p / 2) + (r + -(d / 2))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2)))) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && A == d * q + r) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && d % 2 == 0) && A == q * B + r) && ((0 == d % 2 || (((0 == p % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) || !(1 + p / 2 < 0)))) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) || !(1 + p / 2 < 0)))))) || !(p < 0)) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2))))) || !(d < 0))) && A == (q + p) * B + (r + -d)) && ((((((((((A == (q + p) * B + (r + -d) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && A == d * q + r) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p) || (((((((((A == (q + p) * B + (r + -d) && (A == d * q + r || !(1 == p))) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == d % 2 || !(d < 0)) || A == (1 + d / 2) * (q + p) + (r + -d)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * (q + p) + (r + -d))) || 1 == p) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (!(1 == p) || B == d)) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || (((!(0 == d / 2 % 2) && d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 4))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 4))))) && ((!(d / 2 < 0) || (((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) || !(1 + p / 2 < 0)) && (A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 0 == d / 2 % 2))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((((A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + -(d / 4)) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + -(d / 4)))) || (!(0 == d / 2 % 2) && d / 2 < 0)) && (((((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + (-1 + -(d / 4))))) || !(d / 2 < 0)) || 0 == d / 2 % 2)))))) || ((((((((((((((((((((((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0)) && ((((0 == p % 2 || 1 == 1 + p / 2) || (((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || A == (1 + d / 4) * (q + (1 + p / 2)) + (r + -(d / 2))) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + (1 + p / 2)) + (r + -(d / 2))))) && ((0 == d % 2 || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || A == (1 + (d / 2 + 1) / 2) * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))))) || !(d < 0)))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)))))) && 2 <= -d / -2) && r >= -d / -2) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4)))) || (((0 == d % 2 || (((A == (1 + (d / 2 + 1) / 2) * (q + p / 2) + (r + (-1 + -(d / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + p / 2) + (r + (-1 + -(d / 2)))))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + p / 2) + (r + -(d / 2))) && ((!(d / 2 < 0) || A == (1 + d / 4) * (q + p / 2) + (r + -(d / 2))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2)))) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && d % 2 == 0) && A == q * B + r) && ((0 == d % 2 || (((0 == p % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) || !(1 + p / 2 < 0)))) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) || !(1 + p / 2 < 0)))))) || !(p < 0)) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2))))) || !(d < 0))) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((((((((A == (q + p) * B + (r + -d) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && A == d * q + r) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p) || (((((((((A == (q + p) * B + (r + -d) && (A == d * q + r || !(1 == p))) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == d % 2 || !(d < 0)) || A == (1 + d / 2) * (q + p) + (r + -d)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * (q + p) + (r + -d))) || 1 == p) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (!(1 == p) || B == d)) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || (((!(0 == d / 2 % 2) && d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 4))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 4))))) && ((!(d / 2 < 0) || (((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) || !(1 + p / 2 < 0)) && (A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 0 == d / 2 % 2))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((((A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + -(d / 4)) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + -(d / 4)))) || (!(0 == d / 2 % 2) && d / 2 < 0)) && (((((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + (-1 + -(d / 4))))) || !(d / 2 < 0)) || 0 == d / 2 % 2)))))))) && d == B * p) && p == 2 * (2 * (2 * 1)))) || ((((((((((((((((((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0)) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && p == 1) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && B == 1) && r == A + B * -2 + -B) && d == 1) && r == A + -2 + -d) && ((0 == d % 2 || (((0 == p % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) || !(1 + p / 2 < 0)))) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) || !(1 + p / 2 < 0)))))) || !(p < 0)) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2))))) || !(d < 0))) && A == (q + p) * B + (r + -d)) && q + p * -1 + 2 * 1 * -1 == 0) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && d == B) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || (((!(0 == d / 2 % 2) && d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 4))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 4))))) && ((!(d / 2 < 0) || (((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) || !(1 + p / 2 < 0)) && (A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 0 == d / 2 % 2))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((((A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + -(d / 4)) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + -(d / 4)))) || (!(0 == d / 2 % 2) && d / 2 < 0)) && (((((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + (-1 + -(d / 4))))) || !(d / 2 < 0)) || 0 == d / 2 % 2)))))) && q + -2 == 1)) || ((((((((((A == (q + p) * B + (r + -d) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && p == 1) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && d == B) && r == A + -B) && B == 1) && r == A + -d) && q + p * -1 == 0) && q + 1 * -1 == 0) && d == 1) - InvariantResult [Line: 22]: Loop Invariant Derived loop invariant: 1 - InvariantResult [Line: 34]: Loop Invariant Derived loop invariant: ((((((((((((((r == A || A + -1 * r == 0) && 0 == q) && p == 1) && r == A) && d == B) && q == 0) && B == 1) && 1 <= d) && d == 1) && A == q * B + r) && d == B * p) || ((((((((((d == 2 * 1 && 2 <= d) && (r == A || A + -1 * r == 0)) && 0 == q) && r == A) && q == 0) && B == 1) && p == 2 * 1) && A == q * B + r) && d == B * p) && d == 2 * B)) || ((((((((((((((((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p) || ((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && A == d * q + r) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p)) && 2 <= -d / -2) && r >= -d / -2) && r == A) && q == 0) && B == 1) && d == 2 * (2 * 1)) && d % 2 == 0) && A == q * B + r) && p == 2 * (2 * 1)) && d == 2 * (2 * B)) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (!(1 == p) || B == d)) && d == B * p)) || (((((((((((((((((((((((((((((((((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0)) && ((((0 == p % 2 || 1 == 1 + p / 2) || (((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || A == (1 + d / 4) * (q + (1 + p / 2)) + (r + -(d / 2))) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + (1 + p / 2)) + (r + -(d / 2))))) && ((0 == d % 2 || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || A == (1 + (d / 2 + 1) / 2) * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))))) || !(d < 0)))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)))))) && (((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p) || ((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && A == d * q + r) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p))) && 2 <= -d / -2) && r >= -d / -2) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4)))) || (((0 == d % 2 || (((A == (1 + (d / 2 + 1) / 2) * (q + p / 2) + (r + (-1 + -(d / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + p / 2) + (r + (-1 + -(d / 2)))))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + p / 2) + (r + -(d / 2))) && ((!(d / 2 < 0) || A == (1 + d / 4) * (q + p / 2) + (r + -(d / 2))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2)))) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && A == d * q + r) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && d % 2 == 0) && A == q * B + r) && ((0 == d % 2 || (((0 == p % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) || !(1 + p / 2 < 0)))) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) || !(1 + p / 2 < 0)))))) || !(p < 0)) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2))))) || !(d < 0))) && A == (q + p) * B + (r + -d)) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == d % 2 || !(d < 0)) || A == (1 + d / 2) * (q + p) + (r + -d)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * (q + p) + (r + -d))) || 1 == p) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (!(1 == p) || B == d)) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || (((!(0 == d / 2 % 2) && d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 4))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 4))))) && ((!(d / 2 < 0) || (((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) || !(1 + p / 2 < 0)) && (A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 0 == d / 2 % 2))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((((A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + -(d / 4)) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + -(d / 4)))) || (!(0 == d / 2 % 2) && d / 2 < 0)) && (((((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + (-1 + -(d / 4))))) || !(d / 2 < 0)) || 0 == d / 2 % 2)))))) || ((((((((((((((((((((((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0)) && ((((0 == p % 2 || 1 == 1 + p / 2) || (((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || A == (1 + d / 4) * (q + (1 + p / 2)) + (r + -(d / 2))) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + (1 + p / 2)) + (r + -(d / 2))))) && ((0 == d % 2 || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || A == (1 + (d / 2 + 1) / 2) * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))))) || !(d < 0)))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)))))) && (((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p) || ((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && A == d * q + r) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p))) && 2 <= -d / -2) && r >= -d / -2) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4)))) || (((0 == d % 2 || (((A == (1 + (d / 2 + 1) / 2) * (q + p / 2) + (r + (-1 + -(d / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + p / 2) + (r + (-1 + -(d / 2)))))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + p / 2) + (r + -(d / 2))) && ((!(d / 2 < 0) || A == (1 + d / 4) * (q + p / 2) + (r + -(d / 2))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2)))) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && d % 2 == 0) && A == q * B + r) && ((0 == d % 2 || (((0 == p % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) || !(1 + p / 2 < 0)))) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) || !(1 + p / 2 < 0)))))) || !(p < 0)) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2))))) || !(d < 0))) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == d % 2 || !(d < 0)) || A == (1 + d / 2) * (q + p) + (r + -d)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * (q + p) + (r + -d))) || 1 == p) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (!(1 == p) || B == d)) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || (((!(0 == d / 2 % 2) && d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 4))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 4))))) && ((!(d / 2 < 0) || (((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) || !(1 + p / 2 < 0)) && (A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 0 == d / 2 % 2))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((((A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + -(d / 4)) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + -(d / 4)))) || (!(0 == d / 2 % 2) && d / 2 < 0)) && (((((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + (-1 + -(d / 4))))) || !(d / 2 < 0)) || 0 == d / 2 % 2))))))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && r == A) && d == 2 * (2 * (2 * B))) && ((((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || 0 == d / 2 % 2) || B == 1 + d / 4) && ((!(0 == d / 2 % 2) && d / 2 < 0) || B == d / 4))) && ((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || B == (d / 2 + 1) / 2) && ((B == 1 + (d / 2 + 1) / 2 || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2))) || !(d < 0))) || (((0 == p % 2 || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) && ((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4))) || (p < 0 && !(0 == p % 2)))))) && (!(1 == p) || B == d)) && q == 0) && B == 1) && A == q * B + r) && d == B * p) && p == 2 * (2 * (2 * 1)))) || ((((((((((((((((((0 == p % 2 || ((((A == B * 1 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2))) || 0 == d % 2) || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((!(B * 1 == 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2)) || !(B * 1 == ((d / 2 + 1) / 2 + 1) / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || ((!(B * 1 == (d / 2 + 1) / 4) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && ((!((d / 2 + 1) / 2 < 0) || !(B * 1 == 1 + (d / 2 + 1) / 4)) || 0 == (d / 2 + 1) / 2 % 2))))) || !(d < 0)) && ((((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(B * 1 == (d / 4 + 1) / 2)) && ((0 == (d / 4 + 1) % 2 || !(1 + d / 4 < 0)) || !(B * 1 == 1 + (d / 4 + 1) / 2))) || !(d / 2 < 0)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || (((d / 4 < 0 && !(0 == d / 4 % 2)) || !(B * 1 == d / 8)) && ((0 == d / 4 % 2 || !(B * 1 == 1 + d / 8)) || !(d / 4 < 0))))) || (d < 0 && !(0 == d % 2))) || A == B * 1 * (q + (1 + p / 2)) + (r + -(d / 2))))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || (((!(1 <= 1 + ((p / 2 + 1) / 2 + 1) / 2) || !(1 + (p / 2 + 1) / 2 < 0)) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && (!(1 <= ((p / 2 + 1) / 2 + 1) / 2) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || ((((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || !(1 <= (p / 2 + 1) / 4)) && ((!(1 <= 1 + (p / 2 + 1) / 4) || 0 == (p / 2 + 1) / 2 % 2) || !((p / 2 + 1) / 2 < 0)))))) && (A == d * q + r || !(1 == p))) && ((A == B * 1 * q + r || (((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 <= p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 <= 1 + p / 4))) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || !(p < 0)) || (((!(1 <= 1 + (p / 2 + 1) / 2) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && ((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || !(1 <= (p / 2 + 1) / 2)))))) || (((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || !(B * 1 == (d / 2 + 1) / 2)) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(B * 1 == 1 + (d / 2 + 1) / 2)))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || !(B * 1 == 1 + d / 4)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || !(B * 1 == d / 4))))))) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 <= p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 <= 1 + p / 4))) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || !(p < 0)) || (((!(1 <= 1 + (p / 2 + 1) / 2) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && ((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || !(1 <= (p / 2 + 1) / 2))))) || (((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || !(B * 1 == (d / 2 + 1) / 2)) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(B * 1 == 1 + (d / 2 + 1) / 2)))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || !(B * 1 == 1 + d / 4)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || !(B * 1 == d / 4)))))) || A == B * 1 * (q + p) + (r + -d))) && r == A) && B == 1) && (((((((((((((((((((((((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 2) || (((1 == p / 4 || (p / 2 < 0 && !(0 == p / 2 % 2))) || (((0 == p / 4 % 2 || (((A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2))) || !(p / 4 < 0)) && ((p / 4 < 0 && !(0 == p / 4 % 2)) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))))))) && (((0 == p / 2 % 2 || !(p / 2 < 0)) || (((!(1 + p / 4 < 0) || 0 == (p / 4 + 1) % 2) || (((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2))) && ((!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))))))) || 1 == 1 + p / 4))) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 == p / 4 || (((0 == p / 4 % 2 || ((((A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))) || !(p / 4 < 0)) && ((p / 4 < 0 && !(0 == p / 4 % 2)) || ((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) || A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) && ((A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4)) || !(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4)) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))))) || (p / 2 < 0 && !(0 == p / 2 % 2))) && ((((((((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) && (((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)) && ((!(1 + p / 4 < 0) || 0 == (p / 4 + 1) % 2) || (((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && (((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4))))) || 0 == p / 2 % 2) || !(p / 2 < 0)) || 1 == 1 + p / 4))) || r + (-1 + -(d / 2)) >= (d / 2 + 1) / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || ((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || r + (-1 + -(d / 2)) >= (d / 2 + 1) / 2) || ((((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)) || (((((((A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2)))) || !(1 + (p / 2 + 1) / 2 < 0)) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && (((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2)))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || (((0 == (p / 2 + 1) / 2 % 2 || (((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && (((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)))) || !((p / 2 + 1) / 2 < 0)) && (((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || ((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4)) || !(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4)) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))))))) && (((!(1 + d / 2 < 0) || ((((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)) || (((!(1 + (p / 2 + 1) / 2 < 0) || 0 == ((p / 2 + 1) / 2 + 1) % 2) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))))) && ((((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2)) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || (((0 == (p / 2 + 1) / 2 % 2 || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))))) || !((p / 2 + 1) / 2 < 0)) && ((((A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2)) || ((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2))))))) || 0 == (d / 2 + 1) % 2) || r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 2))) || !(p < 0))) || 0 == d % 2) || !(d < 0)) && ((((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || 0 == d / 2 % 2) || B == 1 + d / 4) && ((!(0 == d / 2 % 2) && d / 2 < 0) || B == d / 4))) && ((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || B == (d / 2 + 1) / 2) && ((B == 1 + (d / 2 + 1) / 2 || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2))) || !(d < 0))) || (((0 == p % 2 || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) && ((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4))) || (p < 0 && !(0 == p % 2)))))) && (((1 == 2 * p || A == (q + 2 * (2 * p) + p) * B + (r + -(2 * (2 * d)) + -d)) || !(r + -(2 * (2 * d)) >= d)) || r + -(2 * (2 * d)) >= 2 * d)) && ((d < 0 && !(0 == d % 2)) || (((p < 0 && !(0 == p % 2)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || r + -(d / 2) >= d / 4) || (((1 == p / 4 || (p / 2 < 0 && !(0 == p / 2 % 2))) || (((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0))) || (p / 4 < 0 && !(0 == p / 4 % 2))) && (((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + (-1 + -(d / 8))))) || 0 == p / 4 % 2) || !(p / 4 < 0)))) && (((0 == p / 2 % 2 || ((((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0))) || !(1 + p / 4 < 0)) || 0 == (p / 4 + 1) % 2) && (((((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 8))) || 0 == d / 4 % 2) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) && ((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2)))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)))) || !(p / 2 < 0)) || 1 == 1 + p / 4))) && (((r + -(d / 2) >= 1 + d / 4 || !(d / 2 < 0)) || 0 == d / 2 % 2) || (((((((((A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) && (((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + -((d / 4 + 1) / 2)))) || (p / 4 < 0 && !(0 == p / 4 % 2))) && ((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || 0 == p / 4 % 2) || !(p / 4 < 0))) || 1 == p / 4) || (p / 2 < 0 && !(0 == p / 2 % 2))) && (((0 == p / 2 % 2 || !(p / 2 < 0)) || (((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))))) || !(1 + p / 4 < 0)) || 0 == (p / 4 + 1) % 2) && (((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)))) || 1 == 1 + p / 4))))) && ((0 == p % 2 || !(p < 0)) || ((((r + -(d / 2) >= 1 + d / 4 || !(d / 2 < 0)) || (((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || ((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))) || !(1 + d / 4 < 0))) || ((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2))) && ((0 == (p / 2 + 1) / 2 % 2 || ((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))))) || !((p / 2 + 1) / 2 < 0)))) && (((((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))) && ((!(1 + (p / 2 + 1) / 2 < 0) || ((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)))) || 0 == ((p / 2 + 1) / 2 + 1) % 2)) || 0 == (p / 2 + 1) % 2) || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || r + -(d / 2) >= d / 4) || (((1 == (p / 2 + 1) / 2 || ((((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || ((((0 == d / 4 % 2 || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) && ((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))))) && ((0 == (p / 2 + 1) / 2 % 2 || (((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)))) || !((p / 2 + 1) / 2 < 0)))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) && (((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || (((!(1 + (p / 2 + 1) / 2 < 0) || (((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0)))) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && ((((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) || !(1 + p / 2 < 0))))))))) && (((d < 0 && !(0 == d % 2)) || (((1 == p / 2 || (((((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || 0 == d / 2 % 2) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -(d / 4)))) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (1 + p / 4)) * B + (r + -d + -(d / 4)))) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + p / 4) * B + (r + -d + -(d / 4))) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2))) && (((0 == p % 2 || 1 == 1 + p / 2) || (((0 == (p / 2 + 1) % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -(d / 4))) || !(r + -d >= d / 4)) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))) || !(1 + p / 2 < 0)) && (((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -(d / 4)))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || !(p < 0)))) || r + -d >= d / 2)) && A == q * B + r) && (((0 == d % 2 || r >= 1 + d / 2) || !(d < 0)) || ((((0 == p % 2 || (((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -((d / 2 + 1) / 2))))) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && (((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p / 4) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + p / 4) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (p / 2 < 0 && !(0 == p / 2 % 2))) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || ((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + p / 4)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + (1 + p / 4)) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2)))))) && (((d < 0 && !(0 == d % 2)) || r >= d / 2) || ((((0 == p % 2 || 1 == 1 + p / 2) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 4))) || !(r >= d / 4)) && (((!(r >= 1 + d / 4) || !(d / 2 < 0)) || 0 == d / 2 % 2) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 4)))))) && (((((A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 4))) || !(r >= 1 + d / 4)) || !(d / 2 < 0)) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -(d / 4))) || !(r >= d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) && ((1 == p / 2 || (p < 0 && !(0 == p % 2))) || (((0 == p / 2 % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r >= d / 4)) || A == (q + (1 + p / 4)) * B + (r + -(d / 4))) && (((!(r >= 1 + d / 4) || A == (q + (1 + p / 4)) * B + (r + (-1 + -(d / 4)))) || !(d / 2 < 0)) || 0 == d / 2 % 2))) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(r >= 1 + d / 4) || !(d / 2 < 0)) || A == (q + p / 4) * B + (r + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p / 4) * B + (r + -(d / 4))) || !(r >= d / 4))))))))) && (((((((((((((((((((((((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0)) && ((((0 == p % 2 || 1 == 1 + p / 2) || (((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || A == (1 + d / 4) * (q + (1 + p / 2)) + (r + -(d / 2))) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + (1 + p / 2)) + (r + -(d / 2))))) && ((0 == d % 2 || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || A == (1 + (d / 2 + 1) / 2) * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))))) || !(d < 0)))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)))))) && (((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p) || ((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && A == d * q + r) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p))) && 2 <= -d / -2) && r >= -d / -2) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4)))) || (((0 == d % 2 || (((A == (1 + (d / 2 + 1) / 2) * (q + p / 2) + (r + (-1 + -(d / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + p / 2) + (r + (-1 + -(d / 2)))))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + p / 2) + (r + -(d / 2))) && ((!(d / 2 < 0) || A == (1 + d / 4) * (q + p / 2) + (r + -(d / 2))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2)))) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && A == d * q + r) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && d % 2 == 0) && A == q * B + r) && ((0 == d % 2 || (((0 == p % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) || !(1 + p / 2 < 0)))) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) || !(1 + p / 2 < 0)))))) || !(p < 0)) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2))))) || !(d < 0))) && A == (q + p) * B + (r + -d)) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == d % 2 || !(d < 0)) || A == (1 + d / 2) * (q + p) + (r + -d)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * (q + p) + (r + -d))) || 1 == p) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (!(1 == p) || B == d)) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || (((!(0 == d / 2 % 2) && d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 4))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 4))))) && ((!(d / 2 < 0) || (((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) || !(1 + p / 2 < 0)) && (A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 0 == d / 2 % 2))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((((A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + -(d / 4)) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + -(d / 4)))) || (!(0 == d / 2 % 2) && d / 2 < 0)) && (((((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + (-1 + -(d / 4))))) || !(d / 2 < 0)) || 0 == d / 2 % 2)))))) || ((((((((((((((((((((((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0)) && ((((0 == p % 2 || 1 == 1 + p / 2) || (((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || A == (1 + d / 4) * (q + (1 + p / 2)) + (r + -(d / 2))) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + (1 + p / 2)) + (r + -(d / 2))))) && ((0 == d % 2 || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || A == (1 + (d / 2 + 1) / 2) * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))))) || !(d < 0)))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)))))) && (((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p) || ((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && A == d * q + r) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p))) && 2 <= -d / -2) && r >= -d / -2) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4)))) || (((0 == d % 2 || (((A == (1 + (d / 2 + 1) / 2) * (q + p / 2) + (r + (-1 + -(d / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + p / 2) + (r + (-1 + -(d / 2)))))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + p / 2) + (r + -(d / 2))) && ((!(d / 2 < 0) || A == (1 + d / 4) * (q + p / 2) + (r + -(d / 2))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2)))) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && d % 2 == 0) && A == q * B + r) && ((0 == d % 2 || (((0 == p % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) || !(1 + p / 2 < 0)))) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) || !(1 + p / 2 < 0)))))) || !(p < 0)) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2))))) || !(d < 0))) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == d % 2 || !(d < 0)) || A == (1 + d / 2) * (q + p) + (r + -d)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * (q + p) + (r + -d))) || 1 == p) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (!(1 == p) || B == d)) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || (((!(0 == d / 2 % 2) && d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 4))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 4))))) && ((!(d / 2 < 0) || (((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) || !(1 + p / 2 < 0)) && (A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 0 == d / 2 % 2))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((((A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + -(d / 4)) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + -(d / 4)))) || (!(0 == d / 2 % 2) && d / 2 < 0)) && (((((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + (-1 + -(d / 4))))) || !(d / 2 < 0)) || 0 == d / 2 % 2)))))))) && (A == (q + p) * B + (r + -d) || !(r >= d))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((r >= d || 1 == p) || (((0 == p % 2 || ((((A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0)) && ((A == (q + (1 + p / 2)) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((A == (q + p / 2) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)) && (((A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0))))))) && (((r + -d >= 1 + d / 2 || 0 == d % 2) || !(d < 0)) || ((((0 == p % 2 || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || ((((!(1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || (((A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -((d / 2 + 1) / 2)) || (!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0)) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + p / 4) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0)))) || (p < 0 && !(0 == p % 2)))))) && (!(1 == p) || B == d)) && (((((0 == p % 2 || ((((0 == d % 2 || !(r + -(2 * d) >= 1 + 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + (-1 + -(2 * d / 4)))) || !(d < 0)) && (((d < 0 && !(0 == d % 2)) || !(r + -(2 * d) >= 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + -(2 * d / 4))))) || !(p < 0)) && (((((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + (-1 + -(2 * d / 4))) || 0 == d % 2) || !(r + -(2 * d) >= 1 + 2 * d / 4)) || !(d < 0)) && ((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + -(2 * d / 4)) || (d < 0 && !(0 == d % 2))) || !(r + -(2 * d) >= 2 * d / 4))) || (p < 0 && !(0 == p % 2)))) || r + -(2 * d) >= d) || 1 == p)) || (((((((((((((((1 == p || (((0 == p % 2 || ((((A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0)) && ((A == (q + (1 + p / 2)) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((A == (q + p / 2) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)) && (((A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0)))))) && ((((((((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 2) || (((1 == p / 4 || (p / 2 < 0 && !(0 == p / 2 % 2))) || (((0 == p / 4 % 2 || (((A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2))) || !(p / 4 < 0)) && ((p / 4 < 0 && !(0 == p / 4 % 2)) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))))))) && (((0 == p / 2 % 2 || !(p / 2 < 0)) || (((!(1 + p / 4 < 0) || 0 == (p / 4 + 1) % 2) || (((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2))) && ((!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))))))) || 1 == 1 + p / 4))) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 == p / 4 || (((0 == p / 4 % 2 || ((((A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))) || !(p / 4 < 0)) && ((p / 4 < 0 && !(0 == p / 4 % 2)) || ((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) || A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) && ((A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4)) || !(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4)) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))))) || (p / 2 < 0 && !(0 == p / 2 % 2))) && ((((((((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) && (((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)) && ((!(1 + p / 4 < 0) || 0 == (p / 4 + 1) % 2) || (((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && (((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4))))) || 0 == p / 2 % 2) || !(p / 2 < 0)) || 1 == 1 + p / 4))) || r + (-1 + -(d / 2)) >= (d / 2 + 1) / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || ((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || r + (-1 + -(d / 2)) >= (d / 2 + 1) / 2) || ((((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)) || (((((((A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2)))) || !(1 + (p / 2 + 1) / 2 < 0)) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && (((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2)))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || (((0 == (p / 2 + 1) / 2 % 2 || (((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && (((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)))) || !((p / 2 + 1) / 2 < 0)) && (((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || ((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4)) || !(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4)) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))))))) && (((!(1 + d / 2 < 0) || ((((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)) || (((!(1 + (p / 2 + 1) / 2 < 0) || 0 == ((p / 2 + 1) / 2 + 1) % 2) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))))) && ((((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2)) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || (((0 == (p / 2 + 1) / 2 % 2 || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))))) || !((p / 2 + 1) / 2 < 0)) && ((((A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2)) || ((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2))))))) || 0 == (d / 2 + 1) % 2) || r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 2))) || !(p < 0))) || 0 == d % 2) || !(d < 0))) && ((((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || 0 == d / 2 % 2) || B == 1 + d / 4) && ((!(0 == d / 2 % 2) && d / 2 < 0) || B == d / 4))) && ((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || B == (d / 2 + 1) / 2) && ((B == 1 + (d / 2 + 1) / 2 || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2))) || !(d < 0))) || (((0 == p % 2 || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) && ((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4))) || (p < 0 && !(0 == p % 2)))))) && (((1 == 2 * p || A == (q + 2 * (2 * p) + p) * B + (r + -(2 * (2 * d)) + -d)) || !(r + -(2 * (2 * d)) >= d)) || r + -(2 * (2 * d)) >= 2 * d)) && ((d < 0 && !(0 == d % 2)) || (((p < 0 && !(0 == p % 2)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || r + -(d / 2) >= d / 4) || (((1 == p / 4 || (p / 2 < 0 && !(0 == p / 2 % 2))) || (((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0))) || (p / 4 < 0 && !(0 == p / 4 % 2))) && (((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + (-1 + -(d / 8))))) || 0 == p / 4 % 2) || !(p / 4 < 0)))) && (((0 == p / 2 % 2 || ((((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0))) || !(1 + p / 4 < 0)) || 0 == (p / 4 + 1) % 2) && (((((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 8))) || 0 == d / 4 % 2) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) && ((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2)))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)))) || !(p / 2 < 0)) || 1 == 1 + p / 4))) && (((r + -(d / 2) >= 1 + d / 4 || !(d / 2 < 0)) || 0 == d / 2 % 2) || (((((((((A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) && (((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + -((d / 4 + 1) / 2)))) || (p / 4 < 0 && !(0 == p / 4 % 2))) && ((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || 0 == p / 4 % 2) || !(p / 4 < 0))) || 1 == p / 4) || (p / 2 < 0 && !(0 == p / 2 % 2))) && (((0 == p / 2 % 2 || !(p / 2 < 0)) || (((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))))) || !(1 + p / 4 < 0)) || 0 == (p / 4 + 1) % 2) && (((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)))) || 1 == 1 + p / 4))))) && ((0 == p % 2 || !(p < 0)) || ((((r + -(d / 2) >= 1 + d / 4 || !(d / 2 < 0)) || (((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || ((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))) || !(1 + d / 4 < 0))) || ((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2))) && ((0 == (p / 2 + 1) / 2 % 2 || ((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))))) || !((p / 2 + 1) / 2 < 0)))) && (((((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))) && ((!(1 + (p / 2 + 1) / 2 < 0) || ((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)))) || 0 == ((p / 2 + 1) / 2 + 1) % 2)) || 0 == (p / 2 + 1) % 2) || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || r + -(d / 2) >= d / 4) || (((1 == (p / 2 + 1) / 2 || ((((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || ((((0 == d / 4 % 2 || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) && ((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))))) && ((0 == (p / 2 + 1) / 2 % 2 || (((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)))) || !((p / 2 + 1) / 2 < 0)))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) && (((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || (((!(1 + (p / 2 + 1) / 2 < 0) || (((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0)))) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && ((((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) || !(1 + p / 2 < 0))))))))) && (((d < 0 && !(0 == d % 2)) || (((1 == p / 2 || (((((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || 0 == d / 2 % 2) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -(d / 4)))) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (1 + p / 4)) * B + (r + -d + -(d / 4)))) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + p / 4) * B + (r + -d + -(d / 4))) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2))) && (((0 == p % 2 || 1 == 1 + p / 2) || (((0 == (p / 2 + 1) % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -(d / 4))) || !(r + -d >= d / 4)) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))) || !(1 + p / 2 < 0)) && (((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -(d / 4)))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || !(p < 0)))) || r + -d >= d / 2)) && A == q * B + r) && (((0 == d % 2 || r >= 1 + d / 2) || !(d < 0)) || ((((0 == p % 2 || (((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -((d / 2 + 1) / 2))))) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && (((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p / 4) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + p / 4) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (p / 2 < 0 && !(0 == p / 2 % 2))) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || ((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + p / 4)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + (1 + p / 4)) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2)))))) && (((d < 0 && !(0 == d % 2)) || r >= d / 2) || ((((0 == p % 2 || 1 == 1 + p / 2) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 4))) || !(r >= d / 4)) && (((!(r >= 1 + d / 4) || !(d / 2 < 0)) || 0 == d / 2 % 2) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 4)))))) && (((((A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 4))) || !(r >= 1 + d / 4)) || !(d / 2 < 0)) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -(d / 4))) || !(r >= d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) && ((1 == p / 2 || (p < 0 && !(0 == p % 2))) || (((0 == p / 2 % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r >= d / 4)) || A == (q + (1 + p / 4)) * B + (r + -(d / 4))) && (((!(r >= 1 + d / 4) || A == (q + (1 + p / 4)) * B + (r + (-1 + -(d / 4)))) || !(d / 2 < 0)) || 0 == d / 2 % 2))) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(r >= 1 + d / 4) || !(d / 2 < 0)) || A == (q + p / 4) * B + (r + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p / 4) * B + (r + -(d / 4))) || !(r >= d / 4))))))))) && (((((((((((((((((((((((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0)) && ((((0 == p % 2 || 1 == 1 + p / 2) || (((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || A == (1 + d / 4) * (q + (1 + p / 2)) + (r + -(d / 2))) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + (1 + p / 2)) + (r + -(d / 2))))) && ((0 == d % 2 || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || A == (1 + (d / 2 + 1) / 2) * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))))) || !(d < 0)))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)))))) && (((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p) || ((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && A == d * q + r) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p))) && 2 <= -d / -2) && r >= -d / -2) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4)))) || (((0 == d % 2 || (((A == (1 + (d / 2 + 1) / 2) * (q + p / 2) + (r + (-1 + -(d / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + p / 2) + (r + (-1 + -(d / 2)))))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + p / 2) + (r + -(d / 2))) && ((!(d / 2 < 0) || A == (1 + d / 4) * (q + p / 2) + (r + -(d / 2))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2)))) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && A == d * q + r) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && d % 2 == 0) && A == q * B + r) && ((0 == d % 2 || (((0 == p % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) || !(1 + p / 2 < 0)))) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) || !(1 + p / 2 < 0)))))) || !(p < 0)) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2))))) || !(d < 0))) && A == (q + p) * B + (r + -d)) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == d % 2 || !(d < 0)) || A == (1 + d / 2) * (q + p) + (r + -d)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * (q + p) + (r + -d))) || 1 == p) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (!(1 == p) || B == d)) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || (((!(0 == d / 2 % 2) && d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 4))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 4))))) && ((!(d / 2 < 0) || (((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) || !(1 + p / 2 < 0)) && (A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 0 == d / 2 % 2))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((((A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + -(d / 4)) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + -(d / 4)))) || (!(0 == d / 2 % 2) && d / 2 < 0)) && (((((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + (-1 + -(d / 4))))) || !(d / 2 < 0)) || 0 == d / 2 % 2)))))) || ((((((((((((((((((((((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0)) && ((((0 == p % 2 || 1 == 1 + p / 2) || (((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || A == (1 + d / 4) * (q + (1 + p / 2)) + (r + -(d / 2))) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + (1 + p / 2)) + (r + -(d / 2))))) && ((0 == d % 2 || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || A == (1 + (d / 2 + 1) / 2) * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))))) || !(d < 0)))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)))))) && (((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p) || ((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && A == d * q + r) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p))) && 2 <= -d / -2) && r >= -d / -2) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4)))) || (((0 == d % 2 || (((A == (1 + (d / 2 + 1) / 2) * (q + p / 2) + (r + (-1 + -(d / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + p / 2) + (r + (-1 + -(d / 2)))))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + p / 2) + (r + -(d / 2))) && ((!(d / 2 < 0) || A == (1 + d / 4) * (q + p / 2) + (r + -(d / 2))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2)))) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && d % 2 == 0) && A == q * B + r) && ((0 == d % 2 || (((0 == p % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) || !(1 + p / 2 < 0)))) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) || !(1 + p / 2 < 0)))))) || !(p < 0)) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2))))) || !(d < 0))) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == d % 2 || !(d < 0)) || A == (1 + d / 2) * (q + p) + (r + -d)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * (q + p) + (r + -d))) || 1 == p) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (!(1 == p) || B == d)) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || (((!(0 == d / 2 % 2) && d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 4))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 4))))) && ((!(d / 2 < 0) || (((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) || !(1 + p / 2 < 0)) && (A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 0 == d / 2 % 2))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((((A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + -(d / 4)) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + -(d / 4)))) || (!(0 == d / 2 % 2) && d / 2 < 0)) && (((((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + (-1 + -(d / 4))))) || !(d / 2 < 0)) || 0 == d / 2 % 2)))))))) && (A == (q + p) * B + (r + -d) || !(r >= d))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((r + -d >= 1 + d / 2 || 0 == d % 2) || !(d < 0)) || ((((0 == p % 2 || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || ((((!(1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || (((A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -((d / 2 + 1) / 2)) || (!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0)) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + p / 4) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0)))) || (p < 0 && !(0 == p % 2)))))) && (!(1 == p) || B == d)) && (((((0 == p % 2 || ((((0 == d % 2 || !(r + -(2 * d) >= 1 + 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + (-1 + -(2 * d / 4)))) || !(d < 0)) && (((d < 0 && !(0 == d % 2)) || !(r + -(2 * d) >= 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + -(2 * d / 4))))) || !(p < 0)) && (((((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + (-1 + -(2 * d / 4))) || 0 == d % 2) || !(r + -(2 * d) >= 1 + 2 * d / 4)) || !(d < 0)) && ((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + -(2 * d / 4)) || (d < 0 && !(0 == d % 2))) || !(r + -(2 * d) >= 2 * d / 4))) || (p < 0 && !(0 == p % 2)))) || r + -(2 * d) >= d) || 1 == p)))) && ((A == B * 1 * (q + 2 * p) + (r + -(2 * d)) || (((d < 0 && !(0 == d % 2)) || !(B * 1 == 2 * d / 4)) && ((0 == d % 2 || !(d < 0)) || !(B * 1 == 1 + 2 * d / 4)))) || (((0 == p % 2 || !(p < 0)) || !(1 <= 1 + 2 * p / 4)) && (!(1 <= 2 * p / 4) || (p < 0 && !(0 == p % 2)))))) && (((((((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(B * 1 == (d / 4 + 1) / 2)) && ((0 == (d / 4 + 1) % 2 || !(1 + d / 4 < 0)) || !(B * 1 == 1 + (d / 4 + 1) / 2))) || !(d / 2 < 0)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || (((d / 4 < 0 && !(0 == d / 4 % 2)) || !(B * 1 == d / 8)) && ((0 == d / 4 % 2 || !(B * 1 == 1 + d / 8)) || !(d / 4 < 0))))) || A == B * 1 * (q + p / 2) + (r + -(d / 2))) || (d < 0 && !(0 == d % 2))) && (((0 == d % 2 || A == B * 1 * (q + p / 2) + (r + (-1 + -(d / 2)))) || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((!(B * 1 == 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2)) || !(B * 1 == ((d / 2 + 1) / 2 + 1) / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || ((!(B * 1 == (d / 2 + 1) / 4) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && ((!((d / 2 + 1) / 2 < 0) || !(B * 1 == 1 + (d / 2 + 1) / 4)) || 0 == (d / 2 + 1) / 2 % 2))))) || !(d < 0))) || (p < 0 && !(0 == p % 2))) || (((p / 2 < 0 && !(0 == p / 2 % 2)) || (((0 == p / 4 % 2 || !(1 <= 1 + p / 8)) || !(p / 4 < 0)) && (!(1 <= p / 8) || (!(0 == p / 4 % 2) && p / 4 < 0)))) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || (((!(1 <= 1 + (p / 4 + 1) / 2) || 0 == (p / 4 + 1) % 2) || !(1 + p / 4 < 0)) && (!(1 <= (p / 4 + 1) / 2) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0))))))) && d == B * p) || ((((((((((((((0 == p % 2 || ((((A == B * 1 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2))) || 0 == d % 2) || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((!(B * 1 == 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2)) || !(B * 1 == ((d / 2 + 1) / 2 + 1) / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || ((!(B * 1 == (d / 2 + 1) / 4) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && ((!((d / 2 + 1) / 2 < 0) || !(B * 1 == 1 + (d / 2 + 1) / 4)) || 0 == (d / 2 + 1) / 2 % 2))))) || !(d < 0)) && ((((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(B * 1 == (d / 4 + 1) / 2)) && ((0 == (d / 4 + 1) % 2 || !(1 + d / 4 < 0)) || !(B * 1 == 1 + (d / 4 + 1) / 2))) || !(d / 2 < 0)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || (((d / 4 < 0 && !(0 == d / 4 % 2)) || !(B * 1 == d / 8)) && ((0 == d / 4 % 2 || !(B * 1 == 1 + d / 8)) || !(d / 4 < 0))))) || (d < 0 && !(0 == d % 2))) || A == B * 1 * (q + (1 + p / 2)) + (r + -(d / 2))))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || (((!(1 <= 1 + ((p / 2 + 1) / 2 + 1) / 2) || !(1 + (p / 2 + 1) / 2 < 0)) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && (!(1 <= ((p / 2 + 1) / 2 + 1) / 2) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || ((((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || !(1 <= (p / 2 + 1) / 4)) && ((!(1 <= 1 + (p / 2 + 1) / 4) || 0 == (p / 2 + 1) / 2 % 2) || !((p / 2 + 1) / 2 < 0)))))) && ((A == B * 1 * q + r || (((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 <= p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 <= 1 + p / 4))) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || !(p < 0)) || (((!(1 <= 1 + (p / 2 + 1) / 2) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && ((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || !(1 <= (p / 2 + 1) / 2)))))) || (((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || !(B * 1 == (d / 2 + 1) / 2)) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(B * 1 == 1 + (d / 2 + 1) / 2)))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || !(B * 1 == 1 + d / 4)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || !(B * 1 == d / 4))))))) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 <= p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 <= 1 + p / 4))) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || !(p < 0)) || (((!(1 <= 1 + (p / 2 + 1) / 2) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && ((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || !(1 <= (p / 2 + 1) / 2))))) || (((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || !(B * 1 == (d / 2 + 1) / 2)) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(B * 1 == 1 + (d / 2 + 1) / 2)))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || !(B * 1 == 1 + d / 4)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || !(B * 1 == d / 4)))))) || A == B * 1 * (q + p) + (r + -d))) && A == d * q + r) && r == A) && B == 1) && (((((((((((((((((((((((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 2) || (((1 == p / 4 || (p / 2 < 0 && !(0 == p / 2 % 2))) || (((0 == p / 4 % 2 || (((A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2))) || !(p / 4 < 0)) && ((p / 4 < 0 && !(0 == p / 4 % 2)) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))))))) && (((0 == p / 2 % 2 || !(p / 2 < 0)) || (((!(1 + p / 4 < 0) || 0 == (p / 4 + 1) % 2) || (((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2))) && ((!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))))))) || 1 == 1 + p / 4))) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 == p / 4 || (((0 == p / 4 % 2 || ((((A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))) || !(p / 4 < 0)) && ((p / 4 < 0 && !(0 == p / 4 % 2)) || ((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) || A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) && ((A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4)) || !(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4)) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))))) || (p / 2 < 0 && !(0 == p / 2 % 2))) && ((((((((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) && (((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)) && ((!(1 + p / 4 < 0) || 0 == (p / 4 + 1) % 2) || (((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && (((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4))))) || 0 == p / 2 % 2) || !(p / 2 < 0)) || 1 == 1 + p / 4))) || r + (-1 + -(d / 2)) >= (d / 2 + 1) / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || ((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || r + (-1 + -(d / 2)) >= (d / 2 + 1) / 2) || ((((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)) || (((((((A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2)))) || !(1 + (p / 2 + 1) / 2 < 0)) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && (((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2)))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || (((0 == (p / 2 + 1) / 2 % 2 || (((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && (((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)))) || !((p / 2 + 1) / 2 < 0)) && (((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || ((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4)) || !(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4)) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))))))) && (((!(1 + d / 2 < 0) || ((((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)) || (((!(1 + (p / 2 + 1) / 2 < 0) || 0 == ((p / 2 + 1) / 2 + 1) % 2) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))))) && ((((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2)) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || (((0 == (p / 2 + 1) / 2 % 2 || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))))) || !((p / 2 + 1) / 2 < 0)) && ((((A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2)) || ((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2))))))) || 0 == (d / 2 + 1) % 2) || r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 2))) || !(p < 0))) || 0 == d % 2) || !(d < 0)) && ((((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || 0 == d / 2 % 2) || B == 1 + d / 4) && ((!(0 == d / 2 % 2) && d / 2 < 0) || B == d / 4))) && ((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || B == (d / 2 + 1) / 2) && ((B == 1 + (d / 2 + 1) / 2 || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2))) || !(d < 0))) || (((0 == p % 2 || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) && ((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4))) || (p < 0 && !(0 == p % 2)))))) && (((1 == 2 * p || A == (q + 2 * (2 * p) + p) * B + (r + -(2 * (2 * d)) + -d)) || !(r + -(2 * (2 * d)) >= d)) || r + -(2 * (2 * d)) >= 2 * d)) && ((d < 0 && !(0 == d % 2)) || (((p < 0 && !(0 == p % 2)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || r + -(d / 2) >= d / 4) || (((1 == p / 4 || (p / 2 < 0 && !(0 == p / 2 % 2))) || (((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0))) || (p / 4 < 0 && !(0 == p / 4 % 2))) && (((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + (-1 + -(d / 8))))) || 0 == p / 4 % 2) || !(p / 4 < 0)))) && (((0 == p / 2 % 2 || ((((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0))) || !(1 + p / 4 < 0)) || 0 == (p / 4 + 1) % 2) && (((((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 8))) || 0 == d / 4 % 2) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) && ((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2)))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)))) || !(p / 2 < 0)) || 1 == 1 + p / 4))) && (((r + -(d / 2) >= 1 + d / 4 || !(d / 2 < 0)) || 0 == d / 2 % 2) || (((((((((A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) && (((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + -((d / 4 + 1) / 2)))) || (p / 4 < 0 && !(0 == p / 4 % 2))) && ((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || 0 == p / 4 % 2) || !(p / 4 < 0))) || 1 == p / 4) || (p / 2 < 0 && !(0 == p / 2 % 2))) && (((0 == p / 2 % 2 || !(p / 2 < 0)) || (((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))))) || !(1 + p / 4 < 0)) || 0 == (p / 4 + 1) % 2) && (((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)))) || 1 == 1 + p / 4))))) && ((0 == p % 2 || !(p < 0)) || ((((r + -(d / 2) >= 1 + d / 4 || !(d / 2 < 0)) || (((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || ((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))) || !(1 + d / 4 < 0))) || ((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2))) && ((0 == (p / 2 + 1) / 2 % 2 || ((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))))) || !((p / 2 + 1) / 2 < 0)))) && (((((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))) && ((!(1 + (p / 2 + 1) / 2 < 0) || ((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)))) || 0 == ((p / 2 + 1) / 2 + 1) % 2)) || 0 == (p / 2 + 1) % 2) || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || r + -(d / 2) >= d / 4) || (((1 == (p / 2 + 1) / 2 || ((((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || ((((0 == d / 4 % 2 || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) && ((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))))) && ((0 == (p / 2 + 1) / 2 % 2 || (((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)))) || !((p / 2 + 1) / 2 < 0)))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) && (((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || (((!(1 + (p / 2 + 1) / 2 < 0) || (((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0)))) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && ((((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) || !(1 + p / 2 < 0))))))))) && (((d < 0 && !(0 == d % 2)) || (((1 == p / 2 || (((((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || 0 == d / 2 % 2) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -(d / 4)))) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (1 + p / 4)) * B + (r + -d + -(d / 4)))) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + p / 4) * B + (r + -d + -(d / 4))) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2))) && (((0 == p % 2 || 1 == 1 + p / 2) || (((0 == (p / 2 + 1) % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -(d / 4))) || !(r + -d >= d / 4)) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))) || !(1 + p / 2 < 0)) && (((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -(d / 4)))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || !(p < 0)))) || r + -d >= d / 2)) && A == q * B + r) && (((0 == d % 2 || r >= 1 + d / 2) || !(d < 0)) || ((((0 == p % 2 || (((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -((d / 2 + 1) / 2))))) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && (((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p / 4) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + p / 4) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (p / 2 < 0 && !(0 == p / 2 % 2))) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || ((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + p / 4)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + (1 + p / 4)) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2)))))) && (((d < 0 && !(0 == d % 2)) || r >= d / 2) || ((((0 == p % 2 || 1 == 1 + p / 2) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 4))) || !(r >= d / 4)) && (((!(r >= 1 + d / 4) || !(d / 2 < 0)) || 0 == d / 2 % 2) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 4)))))) && (((((A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 4))) || !(r >= 1 + d / 4)) || !(d / 2 < 0)) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -(d / 4))) || !(r >= d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) && ((1 == p / 2 || (p < 0 && !(0 == p % 2))) || (((0 == p / 2 % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r >= d / 4)) || A == (q + (1 + p / 4)) * B + (r + -(d / 4))) && (((!(r >= 1 + d / 4) || A == (q + (1 + p / 4)) * B + (r + (-1 + -(d / 4)))) || !(d / 2 < 0)) || 0 == d / 2 % 2))) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(r >= 1 + d / 4) || !(d / 2 < 0)) || A == (q + p / 4) * B + (r + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p / 4) * B + (r + -(d / 4))) || !(r >= d / 4))))))))) && (((((((((((((((((((((((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0)) && ((((0 == p % 2 || 1 == 1 + p / 2) || (((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || A == (1 + d / 4) * (q + (1 + p / 2)) + (r + -(d / 2))) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + (1 + p / 2)) + (r + -(d / 2))))) && ((0 == d % 2 || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || A == (1 + (d / 2 + 1) / 2) * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))))) || !(d < 0)))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)))))) && (((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p) || ((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && A == d * q + r) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p))) && 2 <= -d / -2) && r >= -d / -2) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4)))) || (((0 == d % 2 || (((A == (1 + (d / 2 + 1) / 2) * (q + p / 2) + (r + (-1 + -(d / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + p / 2) + (r + (-1 + -(d / 2)))))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + p / 2) + (r + -(d / 2))) && ((!(d / 2 < 0) || A == (1 + d / 4) * (q + p / 2) + (r + -(d / 2))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2)))) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && A == d * q + r) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && d % 2 == 0) && A == q * B + r) && ((0 == d % 2 || (((0 == p % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) || !(1 + p / 2 < 0)))) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) || !(1 + p / 2 < 0)))))) || !(p < 0)) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2))))) || !(d < 0))) && A == (q + p) * B + (r + -d)) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == d % 2 || !(d < 0)) || A == (1 + d / 2) * (q + p) + (r + -d)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * (q + p) + (r + -d))) || 1 == p) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (!(1 == p) || B == d)) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || (((!(0 == d / 2 % 2) && d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 4))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 4))))) && ((!(d / 2 < 0) || (((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) || !(1 + p / 2 < 0)) && (A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 0 == d / 2 % 2))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((((A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + -(d / 4)) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + -(d / 4)))) || (!(0 == d / 2 % 2) && d / 2 < 0)) && (((((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + (-1 + -(d / 4))))) || !(d / 2 < 0)) || 0 == d / 2 % 2)))))) || ((((((((((((((((((((((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0)) && ((((0 == p % 2 || 1 == 1 + p / 2) || (((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || A == (1 + d / 4) * (q + (1 + p / 2)) + (r + -(d / 2))) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + (1 + p / 2)) + (r + -(d / 2))))) && ((0 == d % 2 || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || A == (1 + (d / 2 + 1) / 2) * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))))) || !(d < 0)))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)))))) && (((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p) || ((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && A == d * q + r) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p))) && 2 <= -d / -2) && r >= -d / -2) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4)))) || (((0 == d % 2 || (((A == (1 + (d / 2 + 1) / 2) * (q + p / 2) + (r + (-1 + -(d / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + p / 2) + (r + (-1 + -(d / 2)))))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + p / 2) + (r + -(d / 2))) && ((!(d / 2 < 0) || A == (1 + d / 4) * (q + p / 2) + (r + -(d / 2))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2)))) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && d % 2 == 0) && A == q * B + r) && ((0 == d % 2 || (((0 == p % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) || !(1 + p / 2 < 0)))) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) || !(1 + p / 2 < 0)))))) || !(p < 0)) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2))))) || !(d < 0))) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == d % 2 || !(d < 0)) || A == (1 + d / 2) * (q + p) + (r + -d)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * (q + p) + (r + -d))) || 1 == p) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (!(1 == p) || B == d)) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || (((!(0 == d / 2 % 2) && d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 4))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 4))))) && ((!(d / 2 < 0) || (((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) || !(1 + p / 2 < 0)) && (A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 0 == d / 2 % 2))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((((A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + -(d / 4)) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + -(d / 4)))) || (!(0 == d / 2 % 2) && d / 2 < 0)) && (((((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + (-1 + -(d / 4))))) || !(d / 2 < 0)) || 0 == d / 2 % 2)))))))) && (A == (q + p) * B + (r + -d) || !(r >= d))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((r >= d || 1 == p) || (((0 == p % 2 || ((((A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0)) && ((A == (q + (1 + p / 2)) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((A == (q + p / 2) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)) && (((A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0))))))) && (((r + -d >= 1 + d / 2 || 0 == d % 2) || !(d < 0)) || ((((0 == p % 2 || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || ((((!(1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || (((A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -((d / 2 + 1) / 2)) || (!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0)) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + p / 4) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0)))) || (p < 0 && !(0 == p % 2)))))) && (!(1 == p) || B == d)) && (((((0 == p % 2 || ((((0 == d % 2 || !(r + -(2 * d) >= 1 + 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + (-1 + -(2 * d / 4)))) || !(d < 0)) && (((d < 0 && !(0 == d % 2)) || !(r + -(2 * d) >= 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + -(2 * d / 4))))) || !(p < 0)) && (((((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + (-1 + -(2 * d / 4))) || 0 == d % 2) || !(r + -(2 * d) >= 1 + 2 * d / 4)) || !(d < 0)) && ((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + -(2 * d / 4)) || (d < 0 && !(0 == d % 2))) || !(r + -(2 * d) >= 2 * d / 4))) || (p < 0 && !(0 == p % 2)))) || r + -(2 * d) >= d) || 1 == p)) || (((((((((((((((1 == p || (((0 == p % 2 || ((((A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0)) && ((A == (q + (1 + p / 2)) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((A == (q + p / 2) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)) && (((A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0)))))) && ((((((((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 2) || (((1 == p / 4 || (p / 2 < 0 && !(0 == p / 2 % 2))) || (((0 == p / 4 % 2 || (((A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2))) || !(p / 4 < 0)) && ((p / 4 < 0 && !(0 == p / 4 % 2)) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))))))) && (((0 == p / 2 % 2 || !(p / 2 < 0)) || (((!(1 + p / 4 < 0) || 0 == (p / 4 + 1) % 2) || (((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2))) && ((!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))))))) || 1 == 1 + p / 4))) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 == p / 4 || (((0 == p / 4 % 2 || ((((A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))) || !(p / 4 < 0)) && ((p / 4 < 0 && !(0 == p / 4 % 2)) || ((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) || A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) && ((A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4)) || !(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4)) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))))) || (p / 2 < 0 && !(0 == p / 2 % 2))) && ((((((((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) && (((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)) && ((!(1 + p / 4 < 0) || 0 == (p / 4 + 1) % 2) || (((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && (((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4))))) || 0 == p / 2 % 2) || !(p / 2 < 0)) || 1 == 1 + p / 4))) || r + (-1 + -(d / 2)) >= (d / 2 + 1) / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || ((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || r + (-1 + -(d / 2)) >= (d / 2 + 1) / 2) || ((((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)) || (((((((A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2)))) || !(1 + (p / 2 + 1) / 2 < 0)) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && (((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2)))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || (((0 == (p / 2 + 1) / 2 % 2 || (((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && (((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)))) || !((p / 2 + 1) / 2 < 0)) && (((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || ((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4)) || !(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4)) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))))))) && (((!(1 + d / 2 < 0) || ((((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)) || (((!(1 + (p / 2 + 1) / 2 < 0) || 0 == ((p / 2 + 1) / 2 + 1) % 2) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))))) && ((((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2)) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || (((0 == (p / 2 + 1) / 2 % 2 || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))))) || !((p / 2 + 1) / 2 < 0)) && ((((A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2)) || ((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2))))))) || 0 == (d / 2 + 1) % 2) || r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 2))) || !(p < 0))) || 0 == d % 2) || !(d < 0))) && ((((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || 0 == d / 2 % 2) || B == 1 + d / 4) && ((!(0 == d / 2 % 2) && d / 2 < 0) || B == d / 4))) && ((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || B == (d / 2 + 1) / 2) && ((B == 1 + (d / 2 + 1) / 2 || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2))) || !(d < 0))) || (((0 == p % 2 || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) && ((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4))) || (p < 0 && !(0 == p % 2)))))) && (((1 == 2 * p || A == (q + 2 * (2 * p) + p) * B + (r + -(2 * (2 * d)) + -d)) || !(r + -(2 * (2 * d)) >= d)) || r + -(2 * (2 * d)) >= 2 * d)) && ((d < 0 && !(0 == d % 2)) || (((p < 0 && !(0 == p % 2)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || r + -(d / 2) >= d / 4) || (((1 == p / 4 || (p / 2 < 0 && !(0 == p / 2 % 2))) || (((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0))) || (p / 4 < 0 && !(0 == p / 4 % 2))) && (((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + (-1 + -(d / 8))))) || 0 == p / 4 % 2) || !(p / 4 < 0)))) && (((0 == p / 2 % 2 || ((((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0))) || !(1 + p / 4 < 0)) || 0 == (p / 4 + 1) % 2) && (((((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 8))) || 0 == d / 4 % 2) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) && ((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2)))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)))) || !(p / 2 < 0)) || 1 == 1 + p / 4))) && (((r + -(d / 2) >= 1 + d / 4 || !(d / 2 < 0)) || 0 == d / 2 % 2) || (((((((((A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) && (((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + -((d / 4 + 1) / 2)))) || (p / 4 < 0 && !(0 == p / 4 % 2))) && ((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || 0 == p / 4 % 2) || !(p / 4 < 0))) || 1 == p / 4) || (p / 2 < 0 && !(0 == p / 2 % 2))) && (((0 == p / 2 % 2 || !(p / 2 < 0)) || (((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))))) || !(1 + p / 4 < 0)) || 0 == (p / 4 + 1) % 2) && (((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)))) || 1 == 1 + p / 4))))) && ((0 == p % 2 || !(p < 0)) || ((((r + -(d / 2) >= 1 + d / 4 || !(d / 2 < 0)) || (((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || ((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))) || !(1 + d / 4 < 0))) || ((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2))) && ((0 == (p / 2 + 1) / 2 % 2 || ((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))))) || !((p / 2 + 1) / 2 < 0)))) && (((((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))) && ((!(1 + (p / 2 + 1) / 2 < 0) || ((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)))) || 0 == ((p / 2 + 1) / 2 + 1) % 2)) || 0 == (p / 2 + 1) % 2) || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || r + -(d / 2) >= d / 4) || (((1 == (p / 2 + 1) / 2 || ((((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || ((((0 == d / 4 % 2 || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) && ((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))))) && ((0 == (p / 2 + 1) / 2 % 2 || (((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)))) || !((p / 2 + 1) / 2 < 0)))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) && (((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || (((!(1 + (p / 2 + 1) / 2 < 0) || (((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0)))) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && ((((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) || !(1 + p / 2 < 0))))))))) && (((d < 0 && !(0 == d % 2)) || (((1 == p / 2 || (((((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || 0 == d / 2 % 2) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -(d / 4)))) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (1 + p / 4)) * B + (r + -d + -(d / 4)))) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + p / 4) * B + (r + -d + -(d / 4))) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2))) && (((0 == p % 2 || 1 == 1 + p / 2) || (((0 == (p / 2 + 1) % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -(d / 4))) || !(r + -d >= d / 4)) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))) || !(1 + p / 2 < 0)) && (((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -(d / 4)))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || !(p < 0)))) || r + -d >= d / 2)) && A == q * B + r) && (((0 == d % 2 || r >= 1 + d / 2) || !(d < 0)) || ((((0 == p % 2 || (((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -((d / 2 + 1) / 2))))) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && (((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p / 4) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + p / 4) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (p / 2 < 0 && !(0 == p / 2 % 2))) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || ((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + p / 4)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + (1 + p / 4)) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2)))))) && (((d < 0 && !(0 == d % 2)) || r >= d / 2) || ((((0 == p % 2 || 1 == 1 + p / 2) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 4))) || !(r >= d / 4)) && (((!(r >= 1 + d / 4) || !(d / 2 < 0)) || 0 == d / 2 % 2) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 4)))))) && (((((A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 4))) || !(r >= 1 + d / 4)) || !(d / 2 < 0)) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -(d / 4))) || !(r >= d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) && ((1 == p / 2 || (p < 0 && !(0 == p % 2))) || (((0 == p / 2 % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r >= d / 4)) || A == (q + (1 + p / 4)) * B + (r + -(d / 4))) && (((!(r >= 1 + d / 4) || A == (q + (1 + p / 4)) * B + (r + (-1 + -(d / 4)))) || !(d / 2 < 0)) || 0 == d / 2 % 2))) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(r >= 1 + d / 4) || !(d / 2 < 0)) || A == (q + p / 4) * B + (r + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p / 4) * B + (r + -(d / 4))) || !(r >= d / 4))))))))) && (((((((((((((((((((((((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0)) && ((((0 == p % 2 || 1 == 1 + p / 2) || (((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || A == (1 + d / 4) * (q + (1 + p / 2)) + (r + -(d / 2))) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + (1 + p / 2)) + (r + -(d / 2))))) && ((0 == d % 2 || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || A == (1 + (d / 2 + 1) / 2) * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))))) || !(d < 0)))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)))))) && (((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p) || ((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && A == d * q + r) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p))) && 2 <= -d / -2) && r >= -d / -2) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4)))) || (((0 == d % 2 || (((A == (1 + (d / 2 + 1) / 2) * (q + p / 2) + (r + (-1 + -(d / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + p / 2) + (r + (-1 + -(d / 2)))))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + p / 2) + (r + -(d / 2))) && ((!(d / 2 < 0) || A == (1 + d / 4) * (q + p / 2) + (r + -(d / 2))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2)))) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && A == d * q + r) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && d % 2 == 0) && A == q * B + r) && ((0 == d % 2 || (((0 == p % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) || !(1 + p / 2 < 0)))) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) || !(1 + p / 2 < 0)))))) || !(p < 0)) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2))))) || !(d < 0))) && A == (q + p) * B + (r + -d)) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == d % 2 || !(d < 0)) || A == (1 + d / 2) * (q + p) + (r + -d)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * (q + p) + (r + -d))) || 1 == p) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (!(1 == p) || B == d)) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || (((!(0 == d / 2 % 2) && d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 4))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 4))))) && ((!(d / 2 < 0) || (((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) || !(1 + p / 2 < 0)) && (A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 0 == d / 2 % 2))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((((A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + -(d / 4)) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + -(d / 4)))) || (!(0 == d / 2 % 2) && d / 2 < 0)) && (((((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + (-1 + -(d / 4))))) || !(d / 2 < 0)) || 0 == d / 2 % 2)))))) || ((((((((((((((((((((((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0)) && ((((0 == p % 2 || 1 == 1 + p / 2) || (((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || A == (1 + d / 4) * (q + (1 + p / 2)) + (r + -(d / 2))) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + (1 + p / 2)) + (r + -(d / 2))))) && ((0 == d % 2 || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || A == (1 + (d / 2 + 1) / 2) * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))))) || !(d < 0)))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)))))) && (((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p) || ((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && A == d * q + r) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p))) && 2 <= -d / -2) && r >= -d / -2) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4)))) || (((0 == d % 2 || (((A == (1 + (d / 2 + 1) / 2) * (q + p / 2) + (r + (-1 + -(d / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + p / 2) + (r + (-1 + -(d / 2)))))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + p / 2) + (r + -(d / 2))) && ((!(d / 2 < 0) || A == (1 + d / 4) * (q + p / 2) + (r + -(d / 2))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2)))) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && d % 2 == 0) && A == q * B + r) && ((0 == d % 2 || (((0 == p % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) || !(1 + p / 2 < 0)))) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) || !(1 + p / 2 < 0)))))) || !(p < 0)) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2))))) || !(d < 0))) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == d % 2 || !(d < 0)) || A == (1 + d / 2) * (q + p) + (r + -d)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * (q + p) + (r + -d))) || 1 == p) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (!(1 == p) || B == d)) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || (((!(0 == d / 2 % 2) && d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 4))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 4))))) && ((!(d / 2 < 0) || (((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) || !(1 + p / 2 < 0)) && (A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 0 == d / 2 % 2))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((((A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + -(d / 4)) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + -(d / 4)))) || (!(0 == d / 2 % 2) && d / 2 < 0)) && (((((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + (-1 + -(d / 4))))) || !(d / 2 < 0)) || 0 == d / 2 % 2)))))))) && (A == (q + p) * B + (r + -d) || !(r >= d))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((r + -d >= 1 + d / 2 || 0 == d % 2) || !(d < 0)) || ((((0 == p % 2 || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || ((((!(1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || (((A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -((d / 2 + 1) / 2)) || (!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0)) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + p / 4) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0)))) || (p < 0 && !(0 == p % 2)))))) && (!(1 == p) || B == d)) && (((((0 == p % 2 || ((((0 == d % 2 || !(r + -(2 * d) >= 1 + 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + (-1 + -(2 * d / 4)))) || !(d < 0)) && (((d < 0 && !(0 == d % 2)) || !(r + -(2 * d) >= 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + -(2 * d / 4))))) || !(p < 0)) && (((((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + (-1 + -(2 * d / 4))) || 0 == d % 2) || !(r + -(2 * d) >= 1 + 2 * d / 4)) || !(d < 0)) && ((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + -(2 * d / 4)) || (d < 0 && !(0 == d % 2))) || !(r + -(2 * d) >= 2 * d / 4))) || (p < 0 && !(0 == p % 2)))) || r + -(2 * d) >= d) || 1 == p)))) && ((A == B * 1 * (q + 2 * p) + (r + -(2 * d)) || (((d < 0 && !(0 == d % 2)) || !(B * 1 == 2 * d / 4)) && ((0 == d % 2 || !(d < 0)) || !(B * 1 == 1 + 2 * d / 4)))) || (((0 == p % 2 || !(p < 0)) || !(1 <= 1 + 2 * p / 4)) && (!(1 <= 2 * p / 4) || (p < 0 && !(0 == p % 2)))))) && (((((((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(B * 1 == (d / 4 + 1) / 2)) && ((0 == (d / 4 + 1) % 2 || !(1 + d / 4 < 0)) || !(B * 1 == 1 + (d / 4 + 1) / 2))) || !(d / 2 < 0)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || (((d / 4 < 0 && !(0 == d / 4 % 2)) || !(B * 1 == d / 8)) && ((0 == d / 4 % 2 || !(B * 1 == 1 + d / 8)) || !(d / 4 < 0))))) || A == B * 1 * (q + p / 2) + (r + -(d / 2))) || (d < 0 && !(0 == d % 2))) && (((0 == d % 2 || A == B * 1 * (q + p / 2) + (r + (-1 + -(d / 2)))) || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((!(B * 1 == 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2)) || !(B * 1 == ((d / 2 + 1) / 2 + 1) / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || ((!(B * 1 == (d / 2 + 1) / 4) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && ((!((d / 2 + 1) / 2 < 0) || !(B * 1 == 1 + (d / 2 + 1) / 4)) || 0 == (d / 2 + 1) / 2 % 2))))) || !(d < 0))) || (p < 0 && !(0 == p % 2))) || (((p / 2 < 0 && !(0 == p / 2 % 2)) || (((0 == p / 4 % 2 || !(1 <= 1 + p / 8)) || !(p / 4 < 0)) && (!(1 <= p / 8) || (!(0 == p / 4 % 2) && p / 4 < 0)))) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || (((!(1 <= 1 + (p / 4 + 1) / 2) || 0 == (p / 4 + 1) % 2) || !(1 + p / 4 < 0)) && (!(1 <= (p / 4 + 1) / 2) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0))))))) && ((A == B * 1 * (q + 2 * (2 * p)) + (r + -(2 * (2 * d))) || !(B * 1 == d)) || !(1 <= p))) && d == B * p) && ((A == B * 1 * q + r || ((!(B * 1 == d / 2) || (d < 0 && !(0 == d % 2))) && ((0 == d % 2 || !(B * 1 == 1 + d / 2)) || !(d < 0)))) || (((!(1 <= 1 + p / 2) || 0 == p % 2) || !(p < 0)) && (!(1 <= p / 2) || (p < 0 && !(0 == p % 2))))))) || (((((((((((((0 == p % 2 || ((((A == B * 1 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2))) || 0 == d % 2) || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((!(B * 1 == 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2)) || !(B * 1 == ((d / 2 + 1) / 2 + 1) / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || ((!(B * 1 == (d / 2 + 1) / 4) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && ((!((d / 2 + 1) / 2 < 0) || !(B * 1 == 1 + (d / 2 + 1) / 4)) || 0 == (d / 2 + 1) / 2 % 2))))) || !(d < 0)) && ((((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(B * 1 == (d / 4 + 1) / 2)) && ((0 == (d / 4 + 1) % 2 || !(1 + d / 4 < 0)) || !(B * 1 == 1 + (d / 4 + 1) / 2))) || !(d / 2 < 0)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || (((d / 4 < 0 && !(0 == d / 4 % 2)) || !(B * 1 == d / 8)) && ((0 == d / 4 % 2 || !(B * 1 == 1 + d / 8)) || !(d / 4 < 0))))) || (d < 0 && !(0 == d % 2))) || A == B * 1 * (q + (1 + p / 2)) + (r + -(d / 2))))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || (((!(1 <= 1 + ((p / 2 + 1) / 2 + 1) / 2) || !(1 + (p / 2 + 1) / 2 < 0)) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && (!(1 <= ((p / 2 + 1) / 2 + 1) / 2) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || ((((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || !(1 <= (p / 2 + 1) / 4)) && ((!(1 <= 1 + (p / 2 + 1) / 4) || 0 == (p / 2 + 1) / 2 % 2) || !((p / 2 + 1) / 2 < 0)))))) && (A == d * q + r || !(1 == p))) && ((A == B * 1 * q + r || (((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 <= p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 <= 1 + p / 4))) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || !(p < 0)) || (((!(1 <= 1 + (p / 2 + 1) / 2) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && ((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || !(1 <= (p / 2 + 1) / 2)))))) || (((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || !(B * 1 == (d / 2 + 1) / 2)) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(B * 1 == 1 + (d / 2 + 1) / 2)))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || !(B * 1 == 1 + d / 4)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || !(B * 1 == d / 4))))))) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 <= p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 <= 1 + p / 4))) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || !(p < 0)) || (((!(1 <= 1 + (p / 2 + 1) / 2) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && ((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || !(1 <= (p / 2 + 1) / 2))))) || (((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || !(B * 1 == (d / 2 + 1) / 2)) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(B * 1 == 1 + (d / 2 + 1) / 2)))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || !(B * 1 == 1 + d / 4)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || !(B * 1 == d / 4)))))) || A == B * 1 * (q + p) + (r + -d))) && r == A) && B == 1) && (((((((((((((((((((((((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 2) || (((1 == p / 4 || (p / 2 < 0 && !(0 == p / 2 % 2))) || (((0 == p / 4 % 2 || (((A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2))) || !(p / 4 < 0)) && ((p / 4 < 0 && !(0 == p / 4 % 2)) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))))))) && (((0 == p / 2 % 2 || !(p / 2 < 0)) || (((!(1 + p / 4 < 0) || 0 == (p / 4 + 1) % 2) || (((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2))) && ((!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))))))) || 1 == 1 + p / 4))) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 == p / 4 || (((0 == p / 4 % 2 || ((((A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))) || !(p / 4 < 0)) && ((p / 4 < 0 && !(0 == p / 4 % 2)) || ((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) || A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) && ((A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4)) || !(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4)) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))))) || (p / 2 < 0 && !(0 == p / 2 % 2))) && ((((((((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) && (((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)) && ((!(1 + p / 4 < 0) || 0 == (p / 4 + 1) % 2) || (((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && (((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4))))) || 0 == p / 2 % 2) || !(p / 2 < 0)) || 1 == 1 + p / 4))) || r + (-1 + -(d / 2)) >= (d / 2 + 1) / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || ((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || r + (-1 + -(d / 2)) >= (d / 2 + 1) / 2) || ((((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)) || (((((((A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2)))) || !(1 + (p / 2 + 1) / 2 < 0)) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && (((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2)))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || (((0 == (p / 2 + 1) / 2 % 2 || (((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && (((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)))) || !((p / 2 + 1) / 2 < 0)) && (((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || ((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4)) || !(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4)) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))))))) && (((!(1 + d / 2 < 0) || ((((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)) || (((!(1 + (p / 2 + 1) / 2 < 0) || 0 == ((p / 2 + 1) / 2 + 1) % 2) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))))) && ((((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2)) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || (((0 == (p / 2 + 1) / 2 % 2 || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))))) || !((p / 2 + 1) / 2 < 0)) && ((((A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2)) || ((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2))))))) || 0 == (d / 2 + 1) % 2) || r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 2))) || !(p < 0))) || 0 == d % 2) || !(d < 0)) && ((((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || 0 == d / 2 % 2) || B == 1 + d / 4) && ((!(0 == d / 2 % 2) && d / 2 < 0) || B == d / 4))) && ((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || B == (d / 2 + 1) / 2) && ((B == 1 + (d / 2 + 1) / 2 || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2))) || !(d < 0))) || (((0 == p % 2 || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) && ((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4))) || (p < 0 && !(0 == p % 2)))))) && (((1 == 2 * p || A == (q + 2 * (2 * p) + p) * B + (r + -(2 * (2 * d)) + -d)) || !(r + -(2 * (2 * d)) >= d)) || r + -(2 * (2 * d)) >= 2 * d)) && ((d < 0 && !(0 == d % 2)) || (((p < 0 && !(0 == p % 2)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || r + -(d / 2) >= d / 4) || (((1 == p / 4 || (p / 2 < 0 && !(0 == p / 2 % 2))) || (((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0))) || (p / 4 < 0 && !(0 == p / 4 % 2))) && (((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + (-1 + -(d / 8))))) || 0 == p / 4 % 2) || !(p / 4 < 0)))) && (((0 == p / 2 % 2 || ((((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0))) || !(1 + p / 4 < 0)) || 0 == (p / 4 + 1) % 2) && (((((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 8))) || 0 == d / 4 % 2) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) && ((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2)))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)))) || !(p / 2 < 0)) || 1 == 1 + p / 4))) && (((r + -(d / 2) >= 1 + d / 4 || !(d / 2 < 0)) || 0 == d / 2 % 2) || (((((((((A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) && (((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + -((d / 4 + 1) / 2)))) || (p / 4 < 0 && !(0 == p / 4 % 2))) && ((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || 0 == p / 4 % 2) || !(p / 4 < 0))) || 1 == p / 4) || (p / 2 < 0 && !(0 == p / 2 % 2))) && (((0 == p / 2 % 2 || !(p / 2 < 0)) || (((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))))) || !(1 + p / 4 < 0)) || 0 == (p / 4 + 1) % 2) && (((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)))) || 1 == 1 + p / 4))))) && ((0 == p % 2 || !(p < 0)) || ((((r + -(d / 2) >= 1 + d / 4 || !(d / 2 < 0)) || (((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || ((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))) || !(1 + d / 4 < 0))) || ((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2))) && ((0 == (p / 2 + 1) / 2 % 2 || ((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))))) || !((p / 2 + 1) / 2 < 0)))) && (((((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))) && ((!(1 + (p / 2 + 1) / 2 < 0) || ((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)))) || 0 == ((p / 2 + 1) / 2 + 1) % 2)) || 0 == (p / 2 + 1) % 2) || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || r + -(d / 2) >= d / 4) || (((1 == (p / 2 + 1) / 2 || ((((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || ((((0 == d / 4 % 2 || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) && ((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))))) && ((0 == (p / 2 + 1) / 2 % 2 || (((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)))) || !((p / 2 + 1) / 2 < 0)))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) && (((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || (((!(1 + (p / 2 + 1) / 2 < 0) || (((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0)))) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && ((((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) || !(1 + p / 2 < 0))))))))) && (((d < 0 && !(0 == d % 2)) || (((1 == p / 2 || (((((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || 0 == d / 2 % 2) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -(d / 4)))) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (1 + p / 4)) * B + (r + -d + -(d / 4)))) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + p / 4) * B + (r + -d + -(d / 4))) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2))) && (((0 == p % 2 || 1 == 1 + p / 2) || (((0 == (p / 2 + 1) % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -(d / 4))) || !(r + -d >= d / 4)) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))) || !(1 + p / 2 < 0)) && (((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -(d / 4)))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || !(p < 0)))) || r + -d >= d / 2)) && A == q * B + r) && (((0 == d % 2 || r >= 1 + d / 2) || !(d < 0)) || ((((0 == p % 2 || (((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -((d / 2 + 1) / 2))))) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && (((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p / 4) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + p / 4) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (p / 2 < 0 && !(0 == p / 2 % 2))) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || ((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + p / 4)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + (1 + p / 4)) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2)))))) && (((d < 0 && !(0 == d % 2)) || r >= d / 2) || ((((0 == p % 2 || 1 == 1 + p / 2) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 4))) || !(r >= d / 4)) && (((!(r >= 1 + d / 4) || !(d / 2 < 0)) || 0 == d / 2 % 2) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 4)))))) && (((((A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 4))) || !(r >= 1 + d / 4)) || !(d / 2 < 0)) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -(d / 4))) || !(r >= d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) && ((1 == p / 2 || (p < 0 && !(0 == p % 2))) || (((0 == p / 2 % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r >= d / 4)) || A == (q + (1 + p / 4)) * B + (r + -(d / 4))) && (((!(r >= 1 + d / 4) || A == (q + (1 + p / 4)) * B + (r + (-1 + -(d / 4)))) || !(d / 2 < 0)) || 0 == d / 2 % 2))) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(r >= 1 + d / 4) || !(d / 2 < 0)) || A == (q + p / 4) * B + (r + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p / 4) * B + (r + -(d / 4))) || !(r >= d / 4))))))))) && (((((((((((((((((((((((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0)) && ((((0 == p % 2 || 1 == 1 + p / 2) || (((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || A == (1 + d / 4) * (q + (1 + p / 2)) + (r + -(d / 2))) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + (1 + p / 2)) + (r + -(d / 2))))) && ((0 == d % 2 || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || A == (1 + (d / 2 + 1) / 2) * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))))) || !(d < 0)))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)))))) && (((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p) || ((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && A == d * q + r) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p))) && 2 <= -d / -2) && r >= -d / -2) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4)))) || (((0 == d % 2 || (((A == (1 + (d / 2 + 1) / 2) * (q + p / 2) + (r + (-1 + -(d / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + p / 2) + (r + (-1 + -(d / 2)))))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + p / 2) + (r + -(d / 2))) && ((!(d / 2 < 0) || A == (1 + d / 4) * (q + p / 2) + (r + -(d / 2))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2)))) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && A == d * q + r) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && d % 2 == 0) && A == q * B + r) && ((0 == d % 2 || (((0 == p % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) || !(1 + p / 2 < 0)))) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) || !(1 + p / 2 < 0)))))) || !(p < 0)) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2))))) || !(d < 0))) && A == (q + p) * B + (r + -d)) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == d % 2 || !(d < 0)) || A == (1 + d / 2) * (q + p) + (r + -d)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * (q + p) + (r + -d))) || 1 == p) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (!(1 == p) || B == d)) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || (((!(0 == d / 2 % 2) && d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 4))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 4))))) && ((!(d / 2 < 0) || (((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) || !(1 + p / 2 < 0)) && (A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 0 == d / 2 % 2))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((((A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + -(d / 4)) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + -(d / 4)))) || (!(0 == d / 2 % 2) && d / 2 < 0)) && (((((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + (-1 + -(d / 4))))) || !(d / 2 < 0)) || 0 == d / 2 % 2)))))) || ((((((((((((((((((((((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0)) && ((((0 == p % 2 || 1 == 1 + p / 2) || (((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || A == (1 + d / 4) * (q + (1 + p / 2)) + (r + -(d / 2))) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + (1 + p / 2)) + (r + -(d / 2))))) && ((0 == d % 2 || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || A == (1 + (d / 2 + 1) / 2) * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))))) || !(d < 0)))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)))))) && (((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p) || ((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && A == d * q + r) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p))) && 2 <= -d / -2) && r >= -d / -2) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4)))) || (((0 == d % 2 || (((A == (1 + (d / 2 + 1) / 2) * (q + p / 2) + (r + (-1 + -(d / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + p / 2) + (r + (-1 + -(d / 2)))))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + p / 2) + (r + -(d / 2))) && ((!(d / 2 < 0) || A == (1 + d / 4) * (q + p / 2) + (r + -(d / 2))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2)))) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && d % 2 == 0) && A == q * B + r) && ((0 == d % 2 || (((0 == p % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) || !(1 + p / 2 < 0)))) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) || !(1 + p / 2 < 0)))))) || !(p < 0)) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2))))) || !(d < 0))) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == d % 2 || !(d < 0)) || A == (1 + d / 2) * (q + p) + (r + -d)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * (q + p) + (r + -d))) || 1 == p) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (!(1 == p) || B == d)) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || (((!(0 == d / 2 % 2) && d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 4))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 4))))) && ((!(d / 2 < 0) || (((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) || !(1 + p / 2 < 0)) && (A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 0 == d / 2 % 2))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((((A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + -(d / 4)) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + -(d / 4)))) || (!(0 == d / 2 % 2) && d / 2 < 0)) && (((((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + (-1 + -(d / 4))))) || !(d / 2 < 0)) || 0 == d / 2 % 2)))))))) && (A == (q + p) * B + (r + -d) || !(r >= d))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((r >= d || 1 == p) || (((0 == p % 2 || ((((A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0)) && ((A == (q + (1 + p / 2)) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((A == (q + p / 2) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)) && (((A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0))))))) && (((r + -d >= 1 + d / 2 || 0 == d % 2) || !(d < 0)) || ((((0 == p % 2 || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || ((((!(1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || (((A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -((d / 2 + 1) / 2)) || (!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0)) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + p / 4) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0)))) || (p < 0 && !(0 == p % 2)))))) && (!(1 == p) || B == d)) && (((((0 == p % 2 || ((((0 == d % 2 || !(r + -(2 * d) >= 1 + 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + (-1 + -(2 * d / 4)))) || !(d < 0)) && (((d < 0 && !(0 == d % 2)) || !(r + -(2 * d) >= 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + -(2 * d / 4))))) || !(p < 0)) && (((((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + (-1 + -(2 * d / 4))) || 0 == d % 2) || !(r + -(2 * d) >= 1 + 2 * d / 4)) || !(d < 0)) && ((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + -(2 * d / 4)) || (d < 0 && !(0 == d % 2))) || !(r + -(2 * d) >= 2 * d / 4))) || (p < 0 && !(0 == p % 2)))) || r + -(2 * d) >= d) || 1 == p)) || (((((((((((((((1 == p || (((0 == p % 2 || ((((A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0)) && ((A == (q + (1 + p / 2)) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((A == (q + p / 2) * B + (r + -(d / 2)) || (d < 0 && !(0 == d % 2))) || !(r >= d / 2)) && (((A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || 0 == d % 2) || !(r >= 1 + d / 2)) || !(d < 0)))))) && ((((((((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 2) || (((1 == p / 4 || (p / 2 < 0 && !(0 == p / 2 % 2))) || (((0 == p / 4 % 2 || (((A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2))) || !(p / 4 < 0)) && ((p / 4 < 0 && !(0 == p / 4 % 2)) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))))))) && (((0 == p / 2 % 2 || !(p / 2 < 0)) || (((!(1 + p / 4 < 0) || 0 == (p / 4 + 1) % 2) || (((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2))) && ((!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))))))) || 1 == 1 + p / 4))) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 == p / 4 || (((0 == p / 4 % 2 || ((((A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + p / 2 + (1 + p / 8)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))) || !(p / 4 < 0)) && ((p / 4 < 0 && !(0 == p / 4 % 2)) || ((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) || A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) && ((A == (q + p / 2 + p / 8) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4)) || !(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4)) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))))) || (p / 2 < 0 && !(0 == p / 2 % 2))) && ((((((((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) && (((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)) && ((!(1 + p / 4 < 0) || 0 == (p / 4 + 1) % 2) || (((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && (((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4))))) || 0 == p / 2 % 2) || !(p / 2 < 0)) || 1 == 1 + p / 4))) || r + (-1 + -(d / 2)) >= (d / 2 + 1) / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || ((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || r + (-1 + -(d / 2)) >= (d / 2 + 1) / 2) || ((((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)) || (((((((A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4))) || !((d / 2 + 1) / 2 < 0)) || 0 == (d / 2 + 1) / 2 % 2) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2)))) || !(1 + (p / 2 + 1) / 2 < 0)) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && (((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2)))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || (((0 == (p / 2 + 1) / 2 % 2 || (((!(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4))) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && (((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)))) || !((p / 2 + 1) / 2 < 0)) && (((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || ((((!((d / 2 + 1) / 2 < 0) || 0 == (d / 2 + 1) / 2 % 2) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 4)))) || !(r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 4)) && ((A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 4)) || !(r + (-1 + -(d / 2)) >= (d / 2 + 1) / 4)) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))))))))) && (((!(1 + d / 2 < 0) || ((((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)) || (((!(1 + (p / 2 + 1) / 2 < 0) || 0 == ((p / 2 + 1) / 2 + 1) % 2) || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))))) && ((((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2)) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) && ((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || (((0 == (p / 2 + 1) / 2 % 2 || ((((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((!(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2))))) || !((p / 2 + 1) / 2 < 0)) && ((((A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + -(((d / 2 + 1) / 2 + 1) / 2)) || !(r + (-1 + -(d / 2)) >= ((d / 2 + 1) / 2 + 1) / 2)) || (1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2))) && (((!(r + (-1 + -(d / 2)) >= 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -(((d / 2 + 1) / 2 + 1) / 2)))) || 0 == ((d / 2 + 1) / 2 + 1) % 2)) || ((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2))))))) || 0 == (d / 2 + 1) % 2) || r + (-1 + -(d / 2)) >= 1 + (d / 2 + 1) / 2))) || !(p < 0))) || 0 == d % 2) || !(d < 0))) && ((((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || 0 == d / 2 % 2) || B == 1 + d / 4) && ((!(0 == d / 2 % 2) && d / 2 < 0) || B == d / 4))) && ((0 == d % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || B == (d / 2 + 1) / 2) && ((B == 1 + (d / 2 + 1) / 2 || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2))) || !(d < 0))) || (((0 == p % 2 || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) && ((((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4))) || (p < 0 && !(0 == p % 2)))))) && (((1 == 2 * p || A == (q + 2 * (2 * p) + p) * B + (r + -(2 * (2 * d)) + -d)) || !(r + -(2 * (2 * d)) >= d)) || r + -(2 * (2 * d)) >= 2 * d)) && ((d < 0 && !(0 == d % 2)) || (((p < 0 && !(0 == p % 2)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || r + -(d / 2) >= d / 4) || (((1 == p / 4 || (p / 2 < 0 && !(0 == p / 2 % 2))) || (((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0))) || (p / 4 < 0 && !(0 == p / 4 % 2))) && (((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + (-1 + -(d / 8))))) || 0 == p / 4 % 2) || !(p / 4 < 0)))) && (((0 == p / 2 % 2 || ((((((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0))) || !(1 + p / 4 < 0)) || 0 == (p / 4 + 1) % 2) && (((((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 8))) || 0 == d / 4 % 2) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) && ((!(r + -(d / 2) >= d / 8) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2)))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)))) || !(p / 2 < 0)) || 1 == 1 + p / 4))) && (((r + -(d / 2) >= 1 + d / 4 || !(d / 2 < 0)) || 0 == d / 2 % 2) || (((((((((A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) && (((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + p / 8) * B + (r + -(d / 2) + -((d / 4 + 1) / 2)))) || (p / 4 < 0 && !(0 == p / 4 % 2))) && ((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + p / 2 + (1 + p / 8)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || 0 == p / 4 % 2) || !(p / 4 < 0))) || 1 == p / 4) || (p / 2 < 0 && !(0 == p / 2 % 2))) && (((0 == p / 2 % 2 || !(p / 2 < 0)) || (((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) || A == (q + p / 2 + (1 + (p / 4 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))))) || !(1 + p / 4 < 0)) || 0 == (p / 4 + 1) % 2) && (((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + p / 2 + (p / 4 + 1) / 2) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0)))) || 1 == 1 + p / 4))))) && ((0 == p % 2 || !(p < 0)) || ((((r + -(d / 2) >= 1 + d / 4 || !(d / 2 < 0)) || (((1 == (p / 2 + 1) / 2 || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) || ((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))) || !(1 + d / 4 < 0))) || ((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2))) && ((0 == (p / 2 + 1) / 2 % 2 || ((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))))) || !((p / 2 + 1) / 2 < 0)))) && (((((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2))) || 0 == (d / 4 + 1) % 2) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))) && ((!(1 + (p / 2 + 1) / 2 < 0) || ((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(r + -(d / 2) >= (d / 4 + 1) / 2)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + -((d / 4 + 1) / 2))) && (((0 == (d / 4 + 1) % 2 || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -((d / 4 + 1) / 2)))) || !(r + -(d / 2) >= 1 + (d / 4 + 1) / 2)) || !(1 + d / 4 < 0)))) || 0 == ((p / 2 + 1) / 2 + 1) % 2)) || 0 == (p / 2 + 1) % 2) || 1 == 1 + (p / 2 + 1) / 2) || !(1 + p / 2 < 0)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || r + -(d / 2) >= d / 4) || (((1 == (p / 2 + 1) / 2 || ((((p / 2 + 1) / 2 < 0 && !(0 == (p / 2 + 1) / 2 % 2)) || ((((0 == d / 4 % 2 || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)) && ((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (p / 2 + 1) / 4) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))))) && ((0 == (p / 2 + 1) / 2 % 2 || (((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 4)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(r + -(d / 2) >= 1 + d / 8)) || !(d / 4 < 0)))) || !((p / 2 + 1) / 2 < 0)))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))) && (((0 == (p / 2 + 1) % 2 || 1 == 1 + (p / 2 + 1) / 2) || (((!(1 + (p / 2 + 1) / 2 < 0) || (((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + (1 + p / 2) + (1 + ((p / 2 + 1) / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0)))) || 0 == ((p / 2 + 1) / 2 + 1) % 2) && ((((!(r + -(d / 2) >= d / 8) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 8))) || (d / 4 < 0 && !(0 == d / 4 % 2))) && (((0 == d / 4 % 2 || !(r + -(d / 2) >= 1 + d / 8)) || A == (q + (1 + p / 2) + ((p / 2 + 1) / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 8)))) || !(d / 4 < 0))) || (1 + (p / 2 + 1) / 2 < 0 && !(0 == ((p / 2 + 1) / 2 + 1) % 2))))) || !(1 + p / 2 < 0))))))))) && (((d < 0 && !(0 == d % 2)) || (((1 == p / 2 || (((((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || 0 == d / 2 % 2) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -(d / 4)))) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (1 + p / 4)) * B + (r + -d + -(d / 4)))) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + p / 4) * B + (r + -d + -(d / 4))) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2))) && (((0 == p % 2 || 1 == 1 + p / 2) || (((0 == (p / 2 + 1) % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -(d / 4))) || !(r + -d >= d / 4)) && (((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2))) || !(1 + p / 2 < 0)) && (((((!(d / 2 < 0) || !(r + -d >= 1 + d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || !(r + -d >= d / 4)) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -(d / 4)))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || !(p < 0)))) || r + -d >= d / 2)) && A == q * B + r) && (((0 == d % 2 || r >= 1 + d / 2) || !(d < 0)) || ((((0 == p % 2 || (((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -((d / 2 + 1) / 2))))) || 0 == (p / 2 + 1) % 2) || !(1 + p / 2 < 0)) && (((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p / 4) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + p / 4) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2))) || (p / 2 < 0 && !(0 == p / 2 % 2))) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || ((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + (1 + p / 4)) * B + (r + -((d / 2 + 1) / 2))) || !(r >= (d / 2 + 1) / 2)) && (((A == (q + (1 + p / 4)) * B + (r + (-1 + -((d / 2 + 1) / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) || !(r >= 1 + (d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2)))))) && (((d < 0 && !(0 == d % 2)) || r >= d / 2) || ((((0 == p % 2 || 1 == 1 + p / 2) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || ((((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 4))) || !(r >= d / 4)) && (((!(r >= 1 + d / 4) || !(d / 2 < 0)) || 0 == d / 2 % 2) || A == (q + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 4)))))) && (((((A == (q + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 4))) || !(r >= 1 + d / 4)) || !(d / 2 < 0)) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + (p / 2 + 1) / 2) * B + (r + -(d / 4))) || !(r >= d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) && ((1 == p / 2 || (p < 0 && !(0 == p % 2))) || (((0 == p / 2 % 2 || ((((!(0 == d / 2 % 2) && d / 2 < 0) || !(r >= d / 4)) || A == (q + (1 + p / 4)) * B + (r + -(d / 4))) && (((!(r >= 1 + d / 4) || A == (q + (1 + p / 4)) * B + (r + (-1 + -(d / 4)))) || !(d / 2 < 0)) || 0 == d / 2 % 2))) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(r >= 1 + d / 4) || !(d / 2 < 0)) || A == (q + p / 4) * B + (r + (-1 + -(d / 4)))) || 0 == d / 2 % 2) && (((!(0 == d / 2 % 2) && d / 2 < 0) || A == (q + p / 4) * B + (r + -(d / 4))) || !(r >= d / 4))))))))) && (((((((((((((((((((((((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0)) && ((((0 == p % 2 || 1 == 1 + p / 2) || (((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || A == (1 + d / 4) * (q + (1 + p / 2)) + (r + -(d / 2))) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + (1 + p / 2)) + (r + -(d / 2))))) && ((0 == d % 2 || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || A == (1 + (d / 2 + 1) / 2) * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))))) || !(d < 0)))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)))))) && (((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p) || ((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && A == d * q + r) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p))) && 2 <= -d / -2) && r >= -d / -2) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4)))) || (((0 == d % 2 || (((A == (1 + (d / 2 + 1) / 2) * (q + p / 2) + (r + (-1 + -(d / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + p / 2) + (r + (-1 + -(d / 2)))))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + p / 2) + (r + -(d / 2))) && ((!(d / 2 < 0) || A == (1 + d / 4) * (q + p / 2) + (r + -(d / 2))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2)))) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && A == d * q + r) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && d % 2 == 0) && A == q * B + r) && ((0 == d % 2 || (((0 == p % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) || !(1 + p / 2 < 0)))) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) || !(1 + p / 2 < 0)))))) || !(p < 0)) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2))))) || !(d < 0))) && A == (q + p) * B + (r + -d)) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == d % 2 || !(d < 0)) || A == (1 + d / 2) * (q + p) + (r + -d)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * (q + p) + (r + -d))) || 1 == p) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (!(1 == p) || B == d)) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || (((!(0 == d / 2 % 2) && d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 4))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 4))))) && ((!(d / 2 < 0) || (((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) || !(1 + p / 2 < 0)) && (A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 0 == d / 2 % 2))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((((A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + -(d / 4)) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + -(d / 4)))) || (!(0 == d / 2 % 2) && d / 2 < 0)) && (((((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + (-1 + -(d / 4))))) || !(d / 2 < 0)) || 0 == d / 2 % 2)))))) || ((((((((((((((((((((((((0 == p % 2 || A == (q + p + (1 + p / 2)) * B + (r + -d + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p + p / 2) * B + (r + -d + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0)) && ((((0 == p % 2 || 1 == 1 + p / 2) || (((d < 0 && !(0 == d % 2)) || (((!(d / 2 < 0) || A == (1 + d / 4) * (q + (1 + p / 2)) + (r + -(d / 2))) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + (1 + p / 2)) + (r + -(d / 2))))) && ((0 == d % 2 || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || A == (1 + (d / 2 + 1) / 2) * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + (1 + p / 2)) + (r + (-1 + -(d / 2)))))) || !(d < 0)))) || !(p < 0)) || (((0 == (p / 2 + 1) % 2 || !(1 == 1 + (p / 2 + 1) / 2)) || !(1 + p / 2 < 0)) && (!(1 == (p / 2 + 1) / 2) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)))))) && (((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p) || ((((((((((((r == A || A + -1 * r == 0) && A == (q + p) * B + (r + -d)) && ((((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && 0 == q) && A == d * q + r) && r == A) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && q == 0) && B == 1) && A == q * B + r) && d == B * p))) && 2 <= -d / -2) && r >= -d / -2) && A == (q + 2 * p + p) * B + (r + -(2 * d) + -d)) && (((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || !(1 == p / 4)) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || !(1 == 1 + p / 4)))) || (((0 == d % 2 || (((A == (1 + (d / 2 + 1) / 2) * (q + p / 2) + (r + (-1 + -(d / 2))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (d / 2 + 1) / 2 * (q + p / 2) + (r + (-1 + -(d / 2)))))) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || (((!(0 == d / 2 % 2) && d / 2 < 0) || A == d / 4 * (q + p / 2) + (r + -(d / 2))) && ((!(d / 2 < 0) || A == (1 + d / 4) * (q + p / 2) + (r + -(d / 2))) || 0 == d / 2 % 2))))) || (p < 0 && !(0 == p % 2)))) && ((1 == p || (((A == (1 + d / 2) * q + r || 0 == d % 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * q + r))) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + (-1 + -(d / 2)))) || !(p < 0)) && (A == (q + p / 2) * B + (r + (-1 + -(d / 2))) || (p < 0 && !(0 == p % 2)))) || 0 == d % 2) || !(d < 0))) && d % 2 == 0) && A == q * B + r) && ((0 == d % 2 || (((0 == p % 2 || (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) || !(1 + p / 2 < 0)))) && ((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) || !(1 + p / 2 < 0)))))) || !(p < 0)) && (((((((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2)))) && ((A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + (-1 + -((d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0))) || !(1 + d / 2 < 0)) || 0 == (d / 2 + 1) % 2) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || (((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + (-1 + -(d / 2)) + -((d / 2 + 1) / 2)))))) || (p < 0 && !(0 == p % 2))))) || !(d < 0))) && A == (q + p) * B + (r + -d)) && (A == d * q + r || !(1 == p))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((((0 == d % 2 || !(d < 0)) || A == (1 + d / 2) * (q + p) + (r + -d)) && ((d < 0 && !(0 == d % 2)) || A == d / 2 * (q + p) + (r + -d))) || 1 == p) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || !(p < 0)) || A == (q + p + (1 + p / 2)) * B + (r + -d + -(d / 2))) && (A == (q + p + p / 2) * B + (r + -d + -(d / 2)) || (p < 0 && !(0 == p % 2)))))) && (((A == (q + p / 2) * B + (r + -(d / 2)) || (p < 0 && !(0 == p % 2))) && ((0 == p % 2 || A == (q + (1 + p / 2)) * B + (r + -(d / 2))) || !(p < 0))) || (d < 0 && !(0 == d % 2)))) && (!(1 == p) || B == d)) && ((d < 0 && !(0 == d % 2)) || (((0 == p % 2 || (((!(0 == d / 2 % 2) && d / 2 < 0) || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + -(d / 4))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + -(d / 4))))) && ((!(d / 2 < 0) || (((0 == (p / 2 + 1) % 2 || A == (q + (1 + p / 2) + (1 + (p / 2 + 1) / 2)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) || !(1 + p / 2 < 0)) && (A == (q + (1 + p / 2) + (p / 2 + 1) / 2) * B + (r + -(d / 2) + (-1 + -(d / 4))) || (1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2))))) || 0 == d / 2 % 2))) || !(p < 0)) && ((p < 0 && !(0 == p % 2)) || (((((A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + -(d / 4)) || 0 == p / 2 % 2) || !(p / 2 < 0)) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + -(d / 4)))) || (!(0 == d / 2 % 2) && d / 2 < 0)) && (((((0 == p / 2 % 2 || !(p / 2 < 0)) || A == (q + p / 2 + (1 + p / 4)) * B + (r + -(d / 2) + (-1 + -(d / 4)))) && ((p / 2 < 0 && !(0 == p / 2 % 2)) || A == (q + p / 2 + p / 4) * B + (r + -(d / 2) + (-1 + -(d / 4))))) || !(d / 2 < 0)) || 0 == d / 2 % 2)))))))) && (A == (q + p) * B + (r + -d) || !(r >= d))) && ((((0 == d % 2 || B == 1 + d / 2) || !(d < 0)) && ((d < 0 && !(0 == d % 2)) || B == d / 2)) || (((p < 0 && !(0 == p % 2)) || !(1 == p / 2)) && ((0 == p % 2 || !(1 == 1 + p / 2)) || !(p < 0))))) && (((r + -d >= 1 + d / 2 || 0 == d % 2) || !(d < 0)) || ((((0 == p % 2 || (((1 + p / 2 < 0 && !(0 == (p / 2 + 1) % 2)) || ((((!(1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (p / 2 + 1) / 2) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((0 == (p / 2 + 1) % 2 || !(1 + p / 2 < 0)) || (((A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + -((d / 2 + 1) / 2)) || (!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0)) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + (p / 2 + 1) / 2)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)))))) || 1 == 1 + p / 2) || !(p < 0)) && ((1 == p / 2 || (((p / 2 < 0 && !(0 == p / 2 % 2)) || ((((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2)) || A == (q + p + p / 4) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) && (((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + p / 4) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)))) && ((((((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + -((d / 2 + 1) / 2))) || !(r + -d >= (d / 2 + 1) / 2)) && (((!(1 + d / 2 < 0) || A == (q + p + (1 + p / 4)) * B + (r + -d + (-1 + -((d / 2 + 1) / 2)))) || 0 == (d / 2 + 1) % 2) || !(r + -d >= 1 + (d / 2 + 1) / 2))) || 0 == p / 2 % 2) || !(p / 2 < 0)))) || (p < 0 && !(0 == p % 2)))))) && (!(1 == p) || B == d)) && (((((0 == p % 2 || ((((0 == d % 2 || !(r + -(2 * d) >= 1 + 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + (-1 + -(2 * d / 4)))) || !(d < 0)) && (((d < 0 && !(0 == d % 2)) || !(r + -(2 * d) >= 2 * d / 4)) || A == (q + 2 * p + (1 + 2 * p / 4)) * B + (r + -(2 * d) + -(2 * d / 4))))) || !(p < 0)) && (((((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + (-1 + -(2 * d / 4))) || 0 == d % 2) || !(r + -(2 * d) >= 1 + 2 * d / 4)) || !(d < 0)) && ((A == (q + 2 * p + 2 * p / 4) * B + (r + -(2 * d) + -(2 * d / 4)) || (d < 0 && !(0 == d % 2))) || !(r + -(2 * d) >= 2 * d / 4))) || (p < 0 && !(0 == p % 2)))) || r + -(2 * d) >= d) || 1 == p)))) && ((A == B * 1 * (q + 2 * p) + (r + -(2 * d)) || (((d < 0 && !(0 == d % 2)) || !(B * 1 == 2 * d / 4)) && ((0 == d % 2 || !(d < 0)) || !(B * 1 == 1 + 2 * d / 4)))) || (((0 == p % 2 || !(p < 0)) || !(1 <= 1 + 2 * p / 4)) && (!(1 <= 2 * p / 4) || (p < 0 && !(0 == p % 2)))))) && (((((((((((1 + d / 4 < 0 && !(0 == (d / 4 + 1) % 2)) || !(B * 1 == (d / 4 + 1) / 2)) && ((0 == (d / 4 + 1) % 2 || !(1 + d / 4 < 0)) || !(B * 1 == 1 + (d / 4 + 1) / 2))) || !(d / 2 < 0)) || 0 == d / 2 % 2) && ((!(0 == d / 2 % 2) && d / 2 < 0) || (((d / 4 < 0 && !(0 == d / 4 % 2)) || !(B * 1 == d / 8)) && ((0 == d / 4 % 2 || !(B * 1 == 1 + d / 8)) || !(d / 4 < 0))))) || A == B * 1 * (q + p / 2) + (r + -(d / 2))) || (d < 0 && !(0 == d % 2))) && (((0 == d % 2 || A == B * 1 * (q + p / 2) + (r + (-1 + -(d / 2)))) || (((!(1 + d / 2 < 0) || 0 == (d / 2 + 1) % 2) || (((!(B * 1 == 1 + ((d / 2 + 1) / 2 + 1) / 2) || !(1 + (d / 2 + 1) / 2 < 0)) || 0 == ((d / 2 + 1) / 2 + 1) % 2) && ((1 + (d / 2 + 1) / 2 < 0 && !(0 == ((d / 2 + 1) / 2 + 1) % 2)) || !(B * 1 == ((d / 2 + 1) / 2 + 1) / 2)))) && ((!(0 == (d / 2 + 1) % 2) && 1 + d / 2 < 0) || ((!(B * 1 == (d / 2 + 1) / 4) || ((d / 2 + 1) / 2 < 0 && !(0 == (d / 2 + 1) / 2 % 2))) && ((!((d / 2 + 1) / 2 < 0) || !(B * 1 == 1 + (d / 2 + 1) / 4)) || 0 == (d / 2 + 1) / 2 % 2))))) || !(d < 0))) || (p < 0 && !(0 == p % 2))) || (((p / 2 < 0 && !(0 == p / 2 % 2)) || (((0 == p / 4 % 2 || !(1 <= 1 + p / 8)) || !(p / 4 < 0)) && (!(1 <= p / 8) || (!(0 == p / 4 % 2) && p / 4 < 0)))) && ((0 == p / 2 % 2 || !(p / 2 < 0)) || (((!(1 <= 1 + (p / 4 + 1) / 2) || 0 == (p / 4 + 1) % 2) || !(1 + p / 4 < 0)) && (!(1 <= (p / 4 + 1) / 2) || (!(0 == (p / 4 + 1) % 2) && 1 + p / 4 < 0))))))) && d == B * p) && ((A == B * 1 * q + r || ((!(B * 1 == d / 2) || (d < 0 && !(0 == d % 2))) && ((0 == d % 2 || !(B * 1 == 1 + d / 2)) || !(d < 0)))) || (((!(1 <= 1 + p / 2) || 0 == p % 2) || !(p < 0)) && (!(1 <= p / 2) || (p < 0 && !(0 == p % 2))))))) && r == A) && B == 1) && A == q * B + r) && d == B * p) RESULT: Ultimate proved your program to be correct! [2023-02-18 18:27:04,133 INFO L540 MonitoredProcess]: [MP /storage/repos/ultimate/releaseScripts/default/UAutomizer-linux/z3 SMTLIB2_COMPLIANT=true -memory:2024 -smt2 -in -t:2000 (1)] Forceful destruction successful, exit code 0 Received shutdown request... --- End real Ultimate output --- Execution finished normally Writing output log to file Ultimate.log Result: TRUE