124.37/32.48 YES 125.01/32.59 proof of /export/starexec/sandbox/benchmark/theBenchmark.xml 125.01/32.59 # AProVE Commit ID: 48fb2092695e11cc9f56e44b17a92a5f88ffb256 marcel 20180622 unpublished dirty 125.01/32.59 125.01/32.59 125.01/32.59 Termination w.r.t. Q of the given QTRS could be proven: 125.01/32.59 125.01/32.59 (0) QTRS 125.01/32.59 (1) QTRS Reverse [EQUIVALENT, 0 ms] 125.01/32.59 (2) QTRS 125.01/32.59 (3) FlatCCProof [EQUIVALENT, 0 ms] 125.01/32.59 (4) QTRS 125.01/32.59 (5) RootLabelingProof [EQUIVALENT, 34 ms] 125.01/32.59 (6) QTRS 125.01/32.59 (7) QTRSRRRProof [EQUIVALENT, 9808 ms] 125.01/32.59 (8) QTRS 125.01/32.59 (9) QTRSRRRProof [EQUIVALENT, 13 ms] 125.01/32.59 (10) QTRS 125.01/32.59 (11) QTRSRRRProof [EQUIVALENT, 10 ms] 125.01/32.59 (12) QTRS 125.01/32.59 (13) QTRSRRRProof [EQUIVALENT, 40 ms] 125.01/32.59 (14) QTRS 125.01/32.59 (15) QTRSRRRProof [EQUIVALENT, 35 ms] 125.01/32.59 (16) QTRS 125.01/32.59 (17) QTRSRRRProof [EQUIVALENT, 0 ms] 125.01/32.59 (18) QTRS 125.01/32.59 (19) QTRSRRRProof [EQUIVALENT, 28 ms] 125.01/32.59 (20) QTRS 125.01/32.59 (21) DependencyPairsProof [EQUIVALENT, 29 ms] 125.01/32.59 (22) QDP 125.01/32.59 (23) DependencyGraphProof [EQUIVALENT, 0 ms] 125.01/32.59 (24) QDP 125.01/32.59 (25) UsableRulesProof [EQUIVALENT, 0 ms] 125.01/32.59 (26) QDP 125.01/32.59 (27) DependencyGraphProof [EQUIVALENT, 0 ms] 125.01/32.59 (28) QDP 125.01/32.59 (29) UsableRulesProof [EQUIVALENT, 0 ms] 125.01/32.59 (30) QDP 125.01/32.59 (31) QDPOrderProof [EQUIVALENT, 0 ms] 125.01/32.59 (32) QDP 125.01/32.59 (33) DependencyGraphProof [EQUIVALENT, 0 ms] 125.01/32.59 (34) QDP 125.01/32.59 (35) QDPOrderProof [EQUIVALENT, 7 ms] 125.01/32.59 (36) QDP 125.01/32.59 (37) PisEmptyProof [EQUIVALENT, 0 ms] 125.01/32.59 (38) YES 125.01/32.59 125.01/32.59 125.01/32.59 ---------------------------------------- 125.01/32.59 125.01/32.59 (0) 125.01/32.59 Obligation: 125.01/32.59 Q restricted rewrite system: 125.01/32.59 The TRS R consists of the following rules: 125.01/32.59 125.01/32.59 0(0(1(x1))) -> 2(0(3(3(0(1(x1)))))) 125.01/32.59 0(1(0(x1))) -> 0(1(3(4(0(3(x1)))))) 125.01/32.59 0(1(0(x1))) -> 2(0(3(0(1(4(x1)))))) 125.01/32.59 0(1(1(x1))) -> 0(3(1(3(1(x1))))) 125.01/32.59 0(1(1(x1))) -> 1(3(0(1(4(x1))))) 125.01/32.59 0(1(1(x1))) -> 0(1(3(1(3(1(x1)))))) 125.01/32.59 0(1(1(x1))) -> 1(3(2(1(3(0(x1)))))) 125.01/32.59 0(1(1(x1))) -> 1(3(3(1(4(0(x1)))))) 125.01/32.59 0(1(1(x1))) -> 3(0(3(1(5(1(x1)))))) 125.01/32.59 0(1(1(x1))) -> 5(0(3(1(5(1(x1)))))) 125.01/32.59 0(5(0(x1))) -> 3(0(3(5(0(x1))))) 125.01/32.59 0(5(0(x1))) -> 3(5(0(0(3(x1))))) 125.01/32.59 0(5(0(x1))) -> 5(0(3(0(2(x1))))) 125.01/32.59 0(5(0(x1))) -> 5(0(3(3(0(x1))))) 125.01/32.59 0(5(0(x1))) -> 4(5(0(3(3(0(x1)))))) 125.01/32.59 0(5(0(x1))) -> 4(5(0(3(5(0(x1)))))) 125.01/32.59 0(5(0(x1))) -> 5(3(0(1(3(0(x1)))))) 125.01/32.59 2(0(0(x1))) -> 0(3(0(3(2(x1))))) 125.01/32.59 2(0(0(x1))) -> 0(3(3(0(2(3(x1)))))) 125.01/32.59 2(0(0(x1))) -> 0(3(5(2(0(3(x1)))))) 125.01/32.59 5(1(0(x1))) -> 3(5(0(1(4(3(x1)))))) 125.01/32.59 5(1(0(x1))) -> 3(5(1(4(0(3(x1)))))) 125.01/32.59 5(1(1(x1))) -> 3(1(5(1(x1)))) 125.01/32.59 5(1(1(x1))) -> 1(3(1(3(5(x1))))) 125.01/32.59 5(1(1(x1))) -> 1(3(3(3(5(1(x1)))))) 125.01/32.59 5(1(1(x1))) -> 1(3(5(5(1(4(x1)))))) 125.01/32.59 0(2(0(1(x1)))) -> 0(2(3(3(0(1(x1)))))) 125.01/32.59 0(5(1(0(x1)))) -> 0(0(1(3(5(x1))))) 125.01/32.59 0(5(4(0(x1)))) -> 0(4(5(0(3(x1))))) 125.01/32.59 2(0(2(0(x1)))) -> 3(0(3(0(2(2(x1)))))) 125.01/32.59 2(0(4(1(x1)))) -> 2(3(0(1(4(4(x1)))))) 125.01/32.59 2(0(5(0(x1)))) -> 0(0(3(5(2(x1))))) 125.01/32.59 2(2(4(1(x1)))) -> 3(2(4(3(2(1(x1)))))) 125.01/32.59 5(1(0(1(x1)))) -> 0(5(1(4(3(1(x1)))))) 125.01/32.59 5(1(1(0(x1)))) -> 0(5(1(5(1(x1))))) 125.01/32.59 5(1(2(0(x1)))) -> 3(1(3(5(0(2(x1)))))) 125.01/32.59 5(1(5(0(x1)))) -> 5(3(5(0(1(x1))))) 125.01/32.59 5(2(0(1(x1)))) -> 5(1(0(3(2(x1))))) 125.01/32.59 5(3(1(1(x1)))) -> 5(3(1(3(1(5(x1)))))) 125.01/32.59 5(4(1(1(x1)))) -> 5(1(4(1(4(5(x1)))))) 125.01/32.59 5(5(1(0(x1)))) -> 5(0(5(1(3(x1))))) 125.01/32.59 5(5(1(1(x1)))) -> 5(1(3(5(0(1(x1)))))) 125.01/32.59 0(2(4(1(0(x1))))) -> 2(4(0(0(1(3(x1)))))) 125.01/32.59 0(5(5(1(1(x1))))) -> 5(1(3(5(0(1(x1)))))) 125.01/32.59 2(2(2(4(1(x1))))) -> 1(2(2(1(4(2(x1)))))) 125.01/32.59 2(5(0(1(1(x1))))) -> 5(1(2(0(1(3(x1)))))) 125.01/32.60 5(0(2(4(1(x1))))) -> 5(1(4(0(3(2(x1)))))) 125.01/32.60 5(2(4(1(0(x1))))) -> 0(2(3(4(5(1(x1)))))) 125.01/32.60 5(3(0(4(1(x1))))) -> 5(3(0(1(4(1(x1)))))) 125.01/32.60 5(3(4(1(1(x1))))) -> 1(4(3(5(2(1(x1)))))) 125.01/32.60 125.01/32.60 Q is empty. 125.01/32.60 125.01/32.60 ---------------------------------------- 125.01/32.60 125.01/32.60 (1) QTRS Reverse (EQUIVALENT) 125.01/32.60 We applied the QTRS Reverse Processor [REVERSE]. 125.01/32.60 ---------------------------------------- 125.01/32.60 125.01/32.60 (2) 125.01/32.60 Obligation: 125.01/32.60 Q restricted rewrite system: 125.01/32.60 The TRS R consists of the following rules: 125.01/32.60 125.01/32.60 1(0(0(x1))) -> 1(0(3(3(0(2(x1)))))) 125.01/32.60 0(1(0(x1))) -> 3(0(4(3(1(0(x1)))))) 125.01/32.60 0(1(0(x1))) -> 4(1(0(3(0(2(x1)))))) 125.01/32.60 1(1(0(x1))) -> 1(3(1(3(0(x1))))) 125.01/32.60 1(1(0(x1))) -> 4(1(0(3(1(x1))))) 125.01/32.60 1(1(0(x1))) -> 1(3(1(3(1(0(x1)))))) 125.01/32.60 1(1(0(x1))) -> 0(3(1(2(3(1(x1)))))) 125.01/32.60 1(1(0(x1))) -> 0(4(1(3(3(1(x1)))))) 125.01/32.60 1(1(0(x1))) -> 1(5(1(3(0(3(x1)))))) 125.01/32.60 1(1(0(x1))) -> 1(5(1(3(0(5(x1)))))) 125.01/32.60 0(5(0(x1))) -> 0(5(3(0(3(x1))))) 125.01/32.60 0(5(0(x1))) -> 3(0(0(5(3(x1))))) 125.01/32.60 0(5(0(x1))) -> 2(0(3(0(5(x1))))) 125.01/32.60 0(5(0(x1))) -> 0(3(3(0(5(x1))))) 125.01/32.60 0(5(0(x1))) -> 0(3(3(0(5(4(x1)))))) 125.01/32.60 0(5(0(x1))) -> 0(5(3(0(5(4(x1)))))) 125.01/32.60 0(5(0(x1))) -> 0(3(1(0(3(5(x1)))))) 125.01/32.60 0(0(2(x1))) -> 2(3(0(3(0(x1))))) 125.01/32.60 0(0(2(x1))) -> 3(2(0(3(3(0(x1)))))) 125.01/32.60 0(0(2(x1))) -> 3(0(2(5(3(0(x1)))))) 125.01/32.60 0(1(5(x1))) -> 3(4(1(0(5(3(x1)))))) 125.01/32.60 0(1(5(x1))) -> 3(0(4(1(5(3(x1)))))) 125.01/32.60 1(1(5(x1))) -> 1(5(1(3(x1)))) 125.01/32.60 1(1(5(x1))) -> 5(3(1(3(1(x1))))) 125.01/32.60 1(1(5(x1))) -> 1(5(3(3(3(1(x1)))))) 125.01/32.60 1(1(5(x1))) -> 4(1(5(5(3(1(x1)))))) 125.01/32.60 1(0(2(0(x1)))) -> 1(0(3(3(2(0(x1)))))) 125.01/32.60 0(1(5(0(x1)))) -> 5(3(1(0(0(x1))))) 125.01/32.60 0(4(5(0(x1)))) -> 3(0(5(4(0(x1))))) 125.01/32.60 0(2(0(2(x1)))) -> 2(2(0(3(0(3(x1)))))) 125.01/32.60 1(4(0(2(x1)))) -> 4(4(1(0(3(2(x1)))))) 125.01/32.60 0(5(0(2(x1)))) -> 2(5(3(0(0(x1))))) 125.01/32.60 1(4(2(2(x1)))) -> 1(2(3(4(2(3(x1)))))) 125.01/32.60 1(0(1(5(x1)))) -> 1(3(4(1(5(0(x1)))))) 125.01/32.60 0(1(1(5(x1)))) -> 1(5(1(5(0(x1))))) 125.01/32.60 0(2(1(5(x1)))) -> 2(0(5(3(1(3(x1)))))) 125.01/32.60 0(5(1(5(x1)))) -> 1(0(5(3(5(x1))))) 125.01/32.60 1(0(2(5(x1)))) -> 2(3(0(1(5(x1))))) 125.01/32.60 1(1(3(5(x1)))) -> 5(1(3(1(3(5(x1)))))) 125.01/32.60 1(1(4(5(x1)))) -> 5(4(1(4(1(5(x1)))))) 125.01/32.60 0(1(5(5(x1)))) -> 3(1(5(0(5(x1))))) 125.01/32.60 1(1(5(5(x1)))) -> 1(0(5(3(1(5(x1)))))) 125.01/32.60 0(1(4(2(0(x1))))) -> 3(1(0(0(4(2(x1)))))) 125.01/32.60 1(1(5(5(0(x1))))) -> 1(0(5(3(1(5(x1)))))) 125.01/32.60 1(4(2(2(2(x1))))) -> 2(4(1(2(2(1(x1)))))) 125.01/32.60 1(1(0(5(2(x1))))) -> 3(1(0(2(1(5(x1)))))) 125.01/32.60 1(4(2(0(5(x1))))) -> 2(3(0(4(1(5(x1)))))) 125.01/32.60 0(1(4(2(5(x1))))) -> 1(5(4(3(2(0(x1)))))) 125.01/32.60 1(4(0(3(5(x1))))) -> 1(4(1(0(3(5(x1)))))) 125.01/32.60 1(1(4(3(5(x1))))) -> 1(2(5(3(4(1(x1)))))) 125.01/32.60 125.01/32.60 Q is empty. 125.01/32.60 125.01/32.60 ---------------------------------------- 125.01/32.60 125.01/32.60 (3) FlatCCProof (EQUIVALENT) 125.01/32.60 We used flat context closure [ROOTLAB] 125.01/32.60 As Q is empty the flat context closure was sound AND complete. 125.01/32.60 125.01/32.60 ---------------------------------------- 125.01/32.60 125.01/32.60 (4) 125.01/32.60 Obligation: 125.01/32.60 Q restricted rewrite system: 125.01/32.60 The TRS R consists of the following rules: 125.01/32.60 125.01/32.60 1(0(0(x1))) -> 1(0(3(3(0(2(x1)))))) 125.01/32.60 1(1(0(x1))) -> 1(3(1(3(0(x1))))) 125.01/32.60 1(1(0(x1))) -> 1(3(1(3(1(0(x1)))))) 125.01/32.60 1(1(0(x1))) -> 1(5(1(3(0(3(x1)))))) 125.01/32.60 1(1(0(x1))) -> 1(5(1(3(0(5(x1)))))) 125.01/32.60 0(5(0(x1))) -> 0(5(3(0(3(x1))))) 125.01/32.60 0(5(0(x1))) -> 0(3(3(0(5(x1))))) 125.01/32.60 0(5(0(x1))) -> 0(3(3(0(5(4(x1)))))) 125.01/32.60 0(5(0(x1))) -> 0(5(3(0(5(4(x1)))))) 125.01/32.60 0(5(0(x1))) -> 0(3(1(0(3(5(x1)))))) 125.01/32.60 1(1(5(x1))) -> 1(5(1(3(x1)))) 125.01/32.60 1(1(5(x1))) -> 1(5(3(3(3(1(x1)))))) 125.01/32.60 1(0(2(0(x1)))) -> 1(0(3(3(2(0(x1)))))) 125.01/32.60 1(4(2(2(x1)))) -> 1(2(3(4(2(3(x1)))))) 125.01/32.60 1(0(1(5(x1)))) -> 1(3(4(1(5(0(x1)))))) 125.01/32.60 1(1(5(5(x1)))) -> 1(0(5(3(1(5(x1)))))) 125.01/32.60 1(1(5(5(0(x1))))) -> 1(0(5(3(1(5(x1)))))) 125.01/32.60 1(4(0(3(5(x1))))) -> 1(4(1(0(3(5(x1)))))) 125.01/32.60 1(1(4(3(5(x1))))) -> 1(2(5(3(4(1(x1)))))) 125.01/32.60 1(0(1(0(x1)))) -> 1(3(0(4(3(1(0(x1))))))) 125.01/32.60 0(0(1(0(x1)))) -> 0(3(0(4(3(1(0(x1))))))) 125.01/32.60 3(0(1(0(x1)))) -> 3(3(0(4(3(1(0(x1))))))) 125.01/32.60 2(0(1(0(x1)))) -> 2(3(0(4(3(1(0(x1))))))) 125.01/32.60 4(0(1(0(x1)))) -> 4(3(0(4(3(1(0(x1))))))) 125.01/32.60 5(0(1(0(x1)))) -> 5(3(0(4(3(1(0(x1))))))) 125.01/32.60 1(0(1(0(x1)))) -> 1(4(1(0(3(0(2(x1))))))) 125.01/32.60 0(0(1(0(x1)))) -> 0(4(1(0(3(0(2(x1))))))) 125.01/32.60 3(0(1(0(x1)))) -> 3(4(1(0(3(0(2(x1))))))) 125.01/32.60 2(0(1(0(x1)))) -> 2(4(1(0(3(0(2(x1))))))) 125.01/32.60 4(0(1(0(x1)))) -> 4(4(1(0(3(0(2(x1))))))) 125.01/32.60 5(0(1(0(x1)))) -> 5(4(1(0(3(0(2(x1))))))) 125.01/32.60 1(1(1(0(x1)))) -> 1(4(1(0(3(1(x1)))))) 125.01/32.60 0(1(1(0(x1)))) -> 0(4(1(0(3(1(x1)))))) 125.01/32.60 3(1(1(0(x1)))) -> 3(4(1(0(3(1(x1)))))) 125.01/32.60 2(1(1(0(x1)))) -> 2(4(1(0(3(1(x1)))))) 125.01/32.60 4(1(1(0(x1)))) -> 4(4(1(0(3(1(x1)))))) 125.01/32.60 5(1(1(0(x1)))) -> 5(4(1(0(3(1(x1)))))) 125.01/32.60 1(1(1(0(x1)))) -> 1(0(3(1(2(3(1(x1))))))) 125.01/32.60 0(1(1(0(x1)))) -> 0(0(3(1(2(3(1(x1))))))) 125.01/32.60 3(1(1(0(x1)))) -> 3(0(3(1(2(3(1(x1))))))) 125.01/32.60 2(1(1(0(x1)))) -> 2(0(3(1(2(3(1(x1))))))) 125.01/32.60 4(1(1(0(x1)))) -> 4(0(3(1(2(3(1(x1))))))) 125.01/32.60 5(1(1(0(x1)))) -> 5(0(3(1(2(3(1(x1))))))) 125.01/32.60 1(1(1(0(x1)))) -> 1(0(4(1(3(3(1(x1))))))) 125.01/32.60 0(1(1(0(x1)))) -> 0(0(4(1(3(3(1(x1))))))) 125.01/32.60 3(1(1(0(x1)))) -> 3(0(4(1(3(3(1(x1))))))) 125.01/32.60 2(1(1(0(x1)))) -> 2(0(4(1(3(3(1(x1))))))) 125.01/32.60 4(1(1(0(x1)))) -> 4(0(4(1(3(3(1(x1))))))) 125.01/32.60 5(1(1(0(x1)))) -> 5(0(4(1(3(3(1(x1))))))) 125.01/32.60 1(0(5(0(x1)))) -> 1(3(0(0(5(3(x1)))))) 125.01/32.60 0(0(5(0(x1)))) -> 0(3(0(0(5(3(x1)))))) 125.01/32.60 3(0(5(0(x1)))) -> 3(3(0(0(5(3(x1)))))) 125.01/32.60 2(0(5(0(x1)))) -> 2(3(0(0(5(3(x1)))))) 125.01/32.60 4(0(5(0(x1)))) -> 4(3(0(0(5(3(x1)))))) 125.01/32.60 5(0(5(0(x1)))) -> 5(3(0(0(5(3(x1)))))) 125.01/32.60 1(0(5(0(x1)))) -> 1(2(0(3(0(5(x1)))))) 125.01/32.60 0(0(5(0(x1)))) -> 0(2(0(3(0(5(x1)))))) 125.01/32.60 3(0(5(0(x1)))) -> 3(2(0(3(0(5(x1)))))) 125.01/32.60 2(0(5(0(x1)))) -> 2(2(0(3(0(5(x1)))))) 125.01/32.60 4(0(5(0(x1)))) -> 4(2(0(3(0(5(x1)))))) 125.01/32.60 5(0(5(0(x1)))) -> 5(2(0(3(0(5(x1)))))) 125.01/32.60 1(0(0(2(x1)))) -> 1(2(3(0(3(0(x1)))))) 125.01/32.60 0(0(0(2(x1)))) -> 0(2(3(0(3(0(x1)))))) 125.01/32.60 3(0(0(2(x1)))) -> 3(2(3(0(3(0(x1)))))) 125.01/32.60 2(0(0(2(x1)))) -> 2(2(3(0(3(0(x1)))))) 125.01/32.60 4(0(0(2(x1)))) -> 4(2(3(0(3(0(x1)))))) 125.01/32.60 5(0(0(2(x1)))) -> 5(2(3(0(3(0(x1)))))) 125.01/32.60 1(0(0(2(x1)))) -> 1(3(2(0(3(3(0(x1))))))) 125.01/32.60 0(0(0(2(x1)))) -> 0(3(2(0(3(3(0(x1))))))) 125.01/32.60 3(0(0(2(x1)))) -> 3(3(2(0(3(3(0(x1))))))) 125.01/32.60 2(0(0(2(x1)))) -> 2(3(2(0(3(3(0(x1))))))) 125.01/32.60 4(0(0(2(x1)))) -> 4(3(2(0(3(3(0(x1))))))) 125.01/32.60 5(0(0(2(x1)))) -> 5(3(2(0(3(3(0(x1))))))) 125.01/32.60 1(0(0(2(x1)))) -> 1(3(0(2(5(3(0(x1))))))) 125.01/32.60 0(0(0(2(x1)))) -> 0(3(0(2(5(3(0(x1))))))) 125.01/32.60 3(0(0(2(x1)))) -> 3(3(0(2(5(3(0(x1))))))) 125.01/32.60 2(0(0(2(x1)))) -> 2(3(0(2(5(3(0(x1))))))) 125.01/32.60 4(0(0(2(x1)))) -> 4(3(0(2(5(3(0(x1))))))) 125.01/32.60 5(0(0(2(x1)))) -> 5(3(0(2(5(3(0(x1))))))) 125.01/32.60 1(0(1(5(x1)))) -> 1(3(4(1(0(5(3(x1))))))) 125.01/32.60 0(0(1(5(x1)))) -> 0(3(4(1(0(5(3(x1))))))) 125.01/32.60 3(0(1(5(x1)))) -> 3(3(4(1(0(5(3(x1))))))) 125.01/32.60 2(0(1(5(x1)))) -> 2(3(4(1(0(5(3(x1))))))) 125.01/32.60 4(0(1(5(x1)))) -> 4(3(4(1(0(5(3(x1))))))) 125.01/32.60 5(0(1(5(x1)))) -> 5(3(4(1(0(5(3(x1))))))) 125.01/32.60 1(0(1(5(x1)))) -> 1(3(0(4(1(5(3(x1))))))) 125.01/32.60 0(0(1(5(x1)))) -> 0(3(0(4(1(5(3(x1))))))) 125.01/32.60 3(0(1(5(x1)))) -> 3(3(0(4(1(5(3(x1))))))) 125.01/32.60 2(0(1(5(x1)))) -> 2(3(0(4(1(5(3(x1))))))) 125.01/32.60 4(0(1(5(x1)))) -> 4(3(0(4(1(5(3(x1))))))) 125.01/32.60 5(0(1(5(x1)))) -> 5(3(0(4(1(5(3(x1))))))) 125.01/32.60 1(1(1(5(x1)))) -> 1(5(3(1(3(1(x1)))))) 125.01/32.60 0(1(1(5(x1)))) -> 0(5(3(1(3(1(x1)))))) 125.01/32.60 3(1(1(5(x1)))) -> 3(5(3(1(3(1(x1)))))) 125.01/32.60 2(1(1(5(x1)))) -> 2(5(3(1(3(1(x1)))))) 125.01/32.60 4(1(1(5(x1)))) -> 4(5(3(1(3(1(x1)))))) 125.01/32.60 5(1(1(5(x1)))) -> 5(5(3(1(3(1(x1)))))) 125.01/32.60 1(1(1(5(x1)))) -> 1(4(1(5(5(3(1(x1))))))) 125.01/32.60 0(1(1(5(x1)))) -> 0(4(1(5(5(3(1(x1))))))) 125.01/32.60 3(1(1(5(x1)))) -> 3(4(1(5(5(3(1(x1))))))) 125.01/32.60 2(1(1(5(x1)))) -> 2(4(1(5(5(3(1(x1))))))) 125.01/32.60 4(1(1(5(x1)))) -> 4(4(1(5(5(3(1(x1))))))) 125.01/32.60 5(1(1(5(x1)))) -> 5(4(1(5(5(3(1(x1))))))) 125.01/32.60 1(0(1(5(0(x1))))) -> 1(5(3(1(0(0(x1)))))) 125.01/32.60 0(0(1(5(0(x1))))) -> 0(5(3(1(0(0(x1)))))) 125.01/32.60 3(0(1(5(0(x1))))) -> 3(5(3(1(0(0(x1)))))) 125.01/32.60 2(0(1(5(0(x1))))) -> 2(5(3(1(0(0(x1)))))) 125.01/32.60 4(0(1(5(0(x1))))) -> 4(5(3(1(0(0(x1)))))) 125.01/32.60 5(0(1(5(0(x1))))) -> 5(5(3(1(0(0(x1)))))) 125.01/32.60 1(0(4(5(0(x1))))) -> 1(3(0(5(4(0(x1)))))) 125.01/32.60 0(0(4(5(0(x1))))) -> 0(3(0(5(4(0(x1)))))) 125.01/32.60 3(0(4(5(0(x1))))) -> 3(3(0(5(4(0(x1)))))) 125.01/32.60 2(0(4(5(0(x1))))) -> 2(3(0(5(4(0(x1)))))) 125.01/32.60 4(0(4(5(0(x1))))) -> 4(3(0(5(4(0(x1)))))) 125.01/32.60 5(0(4(5(0(x1))))) -> 5(3(0(5(4(0(x1)))))) 125.01/32.60 1(0(2(0(2(x1))))) -> 1(2(2(0(3(0(3(x1))))))) 125.01/32.60 0(0(2(0(2(x1))))) -> 0(2(2(0(3(0(3(x1))))))) 125.01/32.60 3(0(2(0(2(x1))))) -> 3(2(2(0(3(0(3(x1))))))) 125.01/32.60 2(0(2(0(2(x1))))) -> 2(2(2(0(3(0(3(x1))))))) 125.01/32.60 4(0(2(0(2(x1))))) -> 4(2(2(0(3(0(3(x1))))))) 125.01/32.60 5(0(2(0(2(x1))))) -> 5(2(2(0(3(0(3(x1))))))) 125.01/32.60 1(1(4(0(2(x1))))) -> 1(4(4(1(0(3(2(x1))))))) 125.01/32.60 0(1(4(0(2(x1))))) -> 0(4(4(1(0(3(2(x1))))))) 125.01/32.60 3(1(4(0(2(x1))))) -> 3(4(4(1(0(3(2(x1))))))) 125.01/32.60 2(1(4(0(2(x1))))) -> 2(4(4(1(0(3(2(x1))))))) 125.01/32.60 4(1(4(0(2(x1))))) -> 4(4(4(1(0(3(2(x1))))))) 125.01/32.60 5(1(4(0(2(x1))))) -> 5(4(4(1(0(3(2(x1))))))) 125.01/32.60 1(0(5(0(2(x1))))) -> 1(2(5(3(0(0(x1)))))) 125.01/32.60 0(0(5(0(2(x1))))) -> 0(2(5(3(0(0(x1)))))) 125.01/32.60 3(0(5(0(2(x1))))) -> 3(2(5(3(0(0(x1)))))) 125.01/32.60 2(0(5(0(2(x1))))) -> 2(2(5(3(0(0(x1)))))) 125.01/32.60 4(0(5(0(2(x1))))) -> 4(2(5(3(0(0(x1)))))) 125.01/32.60 5(0(5(0(2(x1))))) -> 5(2(5(3(0(0(x1)))))) 125.01/32.60 1(0(1(1(5(x1))))) -> 1(1(5(1(5(0(x1)))))) 125.01/32.60 0(0(1(1(5(x1))))) -> 0(1(5(1(5(0(x1)))))) 125.01/32.60 3(0(1(1(5(x1))))) -> 3(1(5(1(5(0(x1)))))) 125.01/32.60 2(0(1(1(5(x1))))) -> 2(1(5(1(5(0(x1)))))) 125.01/32.60 4(0(1(1(5(x1))))) -> 4(1(5(1(5(0(x1)))))) 125.01/32.60 5(0(1(1(5(x1))))) -> 5(1(5(1(5(0(x1)))))) 125.01/32.60 1(0(2(1(5(x1))))) -> 1(2(0(5(3(1(3(x1))))))) 125.01/32.60 0(0(2(1(5(x1))))) -> 0(2(0(5(3(1(3(x1))))))) 125.01/32.60 3(0(2(1(5(x1))))) -> 3(2(0(5(3(1(3(x1))))))) 125.01/32.60 2(0(2(1(5(x1))))) -> 2(2(0(5(3(1(3(x1))))))) 125.01/32.60 4(0(2(1(5(x1))))) -> 4(2(0(5(3(1(3(x1))))))) 125.01/32.60 5(0(2(1(5(x1))))) -> 5(2(0(5(3(1(3(x1))))))) 125.01/32.60 1(0(5(1(5(x1))))) -> 1(1(0(5(3(5(x1)))))) 125.01/32.60 0(0(5(1(5(x1))))) -> 0(1(0(5(3(5(x1)))))) 125.01/32.60 3(0(5(1(5(x1))))) -> 3(1(0(5(3(5(x1)))))) 125.01/32.60 2(0(5(1(5(x1))))) -> 2(1(0(5(3(5(x1)))))) 125.01/32.60 4(0(5(1(5(x1))))) -> 4(1(0(5(3(5(x1)))))) 125.01/32.60 5(0(5(1(5(x1))))) -> 5(1(0(5(3(5(x1)))))) 125.01/32.60 1(1(0(2(5(x1))))) -> 1(2(3(0(1(5(x1)))))) 125.01/32.60 0(1(0(2(5(x1))))) -> 0(2(3(0(1(5(x1)))))) 125.01/32.60 3(1(0(2(5(x1))))) -> 3(2(3(0(1(5(x1)))))) 125.01/32.60 2(1(0(2(5(x1))))) -> 2(2(3(0(1(5(x1)))))) 125.01/32.60 4(1(0(2(5(x1))))) -> 4(2(3(0(1(5(x1)))))) 125.01/32.60 5(1(0(2(5(x1))))) -> 5(2(3(0(1(5(x1)))))) 125.01/32.60 1(1(1(3(5(x1))))) -> 1(5(1(3(1(3(5(x1))))))) 125.01/32.60 0(1(1(3(5(x1))))) -> 0(5(1(3(1(3(5(x1))))))) 125.01/32.60 3(1(1(3(5(x1))))) -> 3(5(1(3(1(3(5(x1))))))) 125.01/32.60 2(1(1(3(5(x1))))) -> 2(5(1(3(1(3(5(x1))))))) 125.01/32.60 4(1(1(3(5(x1))))) -> 4(5(1(3(1(3(5(x1))))))) 125.01/32.60 5(1(1(3(5(x1))))) -> 5(5(1(3(1(3(5(x1))))))) 125.01/32.60 1(1(1(4(5(x1))))) -> 1(5(4(1(4(1(5(x1))))))) 125.01/32.60 0(1(1(4(5(x1))))) -> 0(5(4(1(4(1(5(x1))))))) 125.01/32.60 3(1(1(4(5(x1))))) -> 3(5(4(1(4(1(5(x1))))))) 125.01/32.60 2(1(1(4(5(x1))))) -> 2(5(4(1(4(1(5(x1))))))) 125.01/32.60 4(1(1(4(5(x1))))) -> 4(5(4(1(4(1(5(x1))))))) 125.01/32.60 5(1(1(4(5(x1))))) -> 5(5(4(1(4(1(5(x1))))))) 125.01/32.60 1(0(1(5(5(x1))))) -> 1(3(1(5(0(5(x1)))))) 125.01/32.60 0(0(1(5(5(x1))))) -> 0(3(1(5(0(5(x1)))))) 125.01/32.60 3(0(1(5(5(x1))))) -> 3(3(1(5(0(5(x1)))))) 125.01/32.60 2(0(1(5(5(x1))))) -> 2(3(1(5(0(5(x1)))))) 125.01/32.60 4(0(1(5(5(x1))))) -> 4(3(1(5(0(5(x1)))))) 125.01/32.60 5(0(1(5(5(x1))))) -> 5(3(1(5(0(5(x1)))))) 125.01/32.60 1(0(1(4(2(0(x1)))))) -> 1(3(1(0(0(4(2(x1))))))) 125.01/32.60 0(0(1(4(2(0(x1)))))) -> 0(3(1(0(0(4(2(x1))))))) 125.01/32.60 3(0(1(4(2(0(x1)))))) -> 3(3(1(0(0(4(2(x1))))))) 125.01/32.60 2(0(1(4(2(0(x1)))))) -> 2(3(1(0(0(4(2(x1))))))) 125.01/32.60 4(0(1(4(2(0(x1)))))) -> 4(3(1(0(0(4(2(x1))))))) 125.01/32.60 5(0(1(4(2(0(x1)))))) -> 5(3(1(0(0(4(2(x1))))))) 125.01/32.60 1(1(4(2(2(2(x1)))))) -> 1(2(4(1(2(2(1(x1))))))) 125.01/32.60 0(1(4(2(2(2(x1)))))) -> 0(2(4(1(2(2(1(x1))))))) 125.01/32.60 3(1(4(2(2(2(x1)))))) -> 3(2(4(1(2(2(1(x1))))))) 125.01/32.60 2(1(4(2(2(2(x1)))))) -> 2(2(4(1(2(2(1(x1))))))) 125.01/32.60 4(1(4(2(2(2(x1)))))) -> 4(2(4(1(2(2(1(x1))))))) 125.01/32.60 5(1(4(2(2(2(x1)))))) -> 5(2(4(1(2(2(1(x1))))))) 125.01/32.60 1(1(1(0(5(2(x1)))))) -> 1(3(1(0(2(1(5(x1))))))) 125.01/32.60 0(1(1(0(5(2(x1)))))) -> 0(3(1(0(2(1(5(x1))))))) 125.01/32.60 3(1(1(0(5(2(x1)))))) -> 3(3(1(0(2(1(5(x1))))))) 125.01/32.60 2(1(1(0(5(2(x1)))))) -> 2(3(1(0(2(1(5(x1))))))) 125.01/32.60 4(1(1(0(5(2(x1)))))) -> 4(3(1(0(2(1(5(x1))))))) 125.01/32.60 5(1(1(0(5(2(x1)))))) -> 5(3(1(0(2(1(5(x1))))))) 125.01/32.60 1(1(4(2(0(5(x1)))))) -> 1(2(3(0(4(1(5(x1))))))) 125.01/32.60 0(1(4(2(0(5(x1)))))) -> 0(2(3(0(4(1(5(x1))))))) 125.01/32.60 3(1(4(2(0(5(x1)))))) -> 3(2(3(0(4(1(5(x1))))))) 125.01/32.60 2(1(4(2(0(5(x1)))))) -> 2(2(3(0(4(1(5(x1))))))) 125.01/32.60 4(1(4(2(0(5(x1)))))) -> 4(2(3(0(4(1(5(x1))))))) 125.01/32.60 5(1(4(2(0(5(x1)))))) -> 5(2(3(0(4(1(5(x1))))))) 125.01/32.60 1(0(1(4(2(5(x1)))))) -> 1(1(5(4(3(2(0(x1))))))) 125.01/32.60 0(0(1(4(2(5(x1)))))) -> 0(1(5(4(3(2(0(x1))))))) 125.01/32.60 3(0(1(4(2(5(x1)))))) -> 3(1(5(4(3(2(0(x1))))))) 125.01/32.60 2(0(1(4(2(5(x1)))))) -> 2(1(5(4(3(2(0(x1))))))) 125.01/32.60 4(0(1(4(2(5(x1)))))) -> 4(1(5(4(3(2(0(x1))))))) 125.01/32.60 5(0(1(4(2(5(x1)))))) -> 5(1(5(4(3(2(0(x1))))))) 125.01/32.60 125.01/32.60 Q is empty. 125.01/32.60 125.01/32.60 ---------------------------------------- 125.01/32.60 125.01/32.60 (5) RootLabelingProof (EQUIVALENT) 125.01/32.60 We used plain root labeling [ROOTLAB] with the following heuristic: 125.01/32.60 LabelAll: All function symbols get labeled 125.01/32.60 125.01/32.60 As Q is empty the root labeling was sound AND complete. 125.01/32.60 125.01/32.60 ---------------------------------------- 125.01/32.60 125.01/32.60 (6) 125.01/32.60 Obligation: 125.01/32.60 Q restricted rewrite system: 125.01/32.60 The TRS R consists of the following rules: 125.01/32.60 125.01/32.60 1_{0_1}(0_{0_1}(0_{1_1}(x1))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{0_1}(0_{0_1}(x1))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{0_1}(0_{3_1}(x1))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{0_1}(0_{2_1}(x1))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{0_1}(0_{5_1}(x1))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{0_1}(0_{4_1}(x1))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{4_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{1_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(x1))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{0_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(x1))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{3_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(x1))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{2_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(x1))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{5_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{5_1}(x1))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{4_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{4_1}(x1))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{1_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{0_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{3_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{2_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{5_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{5_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{4_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{4_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{1_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{0_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{3_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{2_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{5_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{5_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{4_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{4_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{1_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{0_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{3_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{2_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{5_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{0_1}(0_{4_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{1_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(x1))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{0_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(x1))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{3_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(x1))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{2_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(x1))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{5_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(3_{5_1}(x1))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{4_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(3_{4_1}(x1))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{1_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{1_1}(x1))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{0_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{0_1}(x1))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{3_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{3_1}(x1))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{2_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{2_1}(x1))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{5_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{5_1}(x1))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{4_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(x1))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{1_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{1_1}(x1)))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{0_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(x1)))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{3_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{3_1}(x1)))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{2_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{2_1}(x1)))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{5_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{5_1}(x1)))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{4_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{4_1}(x1)))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{1_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{1_1}(x1)))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{0_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(x1)))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{3_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{3_1}(x1)))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{2_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{2_1}(x1)))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{5_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{5_1}(x1)))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{4_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{4_1}(x1)))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{1_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{0_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{3_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{2_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{5_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.60 0_{5_1}(5_{0_1}(0_{4_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{1_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(x1)))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{0_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(x1)))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{3_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{3_1}(x1)))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{2_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{2_1}(x1)))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{5_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{5_1}(x1)))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{4_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{4_1}(x1)))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{1_1}(x1))) -> 1_{5_1}(5_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{0_1}(x1))) -> 1_{5_1}(5_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{3_1}(x1))) -> 1_{5_1}(5_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{2_1}(x1))) -> 1_{5_1}(5_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{5_1}(x1))) -> 1_{5_1}(5_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{4_1}(x1))) -> 1_{5_1}(5_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{2_1}(2_{0_1}(0_{5_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{5_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{2_1}(2_{0_1}(0_{4_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{4_1}(x1)))))) 125.01/32.60 1_{4_1}(4_{2_1}(2_{2_1}(2_{1_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{4_1}(4_{2_1}(2_{3_1}(3_{1_1}(x1)))))) 125.01/32.60 1_{4_1}(4_{2_1}(2_{2_1}(2_{0_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{4_1}(4_{2_1}(2_{3_1}(3_{0_1}(x1)))))) 125.01/32.60 1_{4_1}(4_{2_1}(2_{2_1}(2_{3_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{4_1}(4_{2_1}(2_{3_1}(3_{3_1}(x1)))))) 125.01/32.60 1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{4_1}(4_{2_1}(2_{3_1}(3_{2_1}(x1)))))) 125.01/32.60 1_{4_1}(4_{2_1}(2_{2_1}(2_{5_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{4_1}(4_{2_1}(2_{3_1}(3_{5_1}(x1)))))) 125.01/32.60 1_{4_1}(4_{2_1}(2_{2_1}(2_{4_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{4_1}(4_{2_1}(2_{3_1}(3_{4_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{5_1}(5_{1_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{5_1}(5_{2_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{5_1}(5_{5_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{5_1}(5_{4_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.60 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.60 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.60 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.60 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.60 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.60 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{4_1}(4_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{4_1}(4_{1_1}(1_{1_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{4_1}(4_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{4_1}(4_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{4_1}(4_{1_1}(1_{3_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{4_1}(4_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{4_1}(4_{1_1}(1_{2_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{4_1}(4_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{4_1}(4_{1_1}(1_{5_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{4_1}(4_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{4_1}(4_{1_1}(1_{4_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{5_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{4_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{5_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{4_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{5_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{4_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{5_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{4_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{5_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{4_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{5_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{4_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{4_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{4_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{4_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{4_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{4_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{4_1}(x1))))))) 125.01/32.60 1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.60 0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.60 0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.60 0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.60 0_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.60 0_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.60 0_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.60 3_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.60 3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.60 3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.60 3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.60 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.60 3_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.60 2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.60 2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.60 2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.60 2_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.60 2_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.60 2_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.60 4_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.60 4_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.60 4_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.60 4_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.60 4_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.60 4_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.60 5_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.60 5_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.60 5_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.60 5_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.60 5_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.60 5_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.60 1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.60 1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.60 1_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.60 1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.60 1_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.60 1_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.60 0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.60 0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.60 0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.60 0_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.60 0_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.60 0_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.60 3_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.60 3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.60 3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.60 3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.60 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.60 3_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.60 2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.60 2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.60 2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.60 2_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.60 2_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.60 2_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.60 4_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 4_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.60 4_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 4_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.60 4_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 4_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.60 4_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 4_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.60 4_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 4_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.60 4_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 4_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.60 5_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 5_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.60 5_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 5_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.60 5_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 5_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.60 5_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 5_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.60 5_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 5_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.60 5_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 5_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.60 1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 1_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.60 1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 1_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.60 1_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 1_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.60 1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 1_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.60 1_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 1_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.60 1_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 1_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.60 0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 0_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.60 0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 0_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.60 0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 0_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.60 0_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 0_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.60 0_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 0_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.60 0_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 0_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.60 3_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 3_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.60 3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 3_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.60 3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 3_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.60 3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 3_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.60 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 3_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.60 3_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 3_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.60 2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 2_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.60 2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 2_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.60 2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 2_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.60 2_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 2_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.60 2_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 2_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.60 2_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 2_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.60 4_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 4_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.60 4_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 4_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.60 4_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 4_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.60 4_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 4_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.60 4_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 4_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.60 4_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 4_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.60 5_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 5_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.60 5_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 5_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.60 5_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 5_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.60 5_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 5_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.60 5_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 5_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.60 5_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 5_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1)))))) 125.01/32.60 0_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1)))))) 125.01/32.60 0_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1)))))) 125.01/32.60 0_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1)))))) 125.01/32.60 0_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1)))))) 125.01/32.60 0_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1)))))) 125.01/32.60 0_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1)))))) 125.01/32.60 3_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1)))))) 125.01/32.60 3_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1)))))) 125.01/32.60 3_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1)))))) 125.01/32.60 3_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1)))))) 125.01/32.60 3_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1)))))) 125.01/32.60 3_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1)))))) 125.01/32.60 2_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1)))))) 125.01/32.60 2_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1)))))) 125.01/32.60 2_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1)))))) 125.01/32.60 2_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1)))))) 125.01/32.60 2_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1)))))) 125.01/32.60 2_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1)))))) 125.01/32.60 4_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1)))))) 125.01/32.60 4_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1)))))) 125.01/32.60 4_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1)))))) 125.01/32.60 4_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1)))))) 125.01/32.60 4_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1)))))) 125.01/32.60 4_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1)))))) 125.01/32.60 5_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1)))))) 125.01/32.60 5_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1)))))) 125.01/32.60 5_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1)))))) 125.01/32.60 5_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1)))))) 125.01/32.60 5_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1)))))) 125.01/32.60 5_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.60 0_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.60 0_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.60 0_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.60 0_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.60 0_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.60 0_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.60 3_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.60 3_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.60 3_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.60 3_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.60 3_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.60 3_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.60 2_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.60 2_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.60 2_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.60 2_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.60 2_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.60 2_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.60 4_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 4_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.60 4_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 4_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.60 4_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 4_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.60 4_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 4_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.60 4_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 4_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.60 4_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 4_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.60 5_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 5_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.60 5_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 5_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.60 5_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 5_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.60 5_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 5_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.60 5_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 5_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.60 5_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 5_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{4_1}(x1)))))) 125.01/32.60 0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(x1)))))) 125.01/32.60 0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(x1)))))) 125.01/32.60 0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(x1)))))) 125.01/32.60 0_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(x1)))))) 125.01/32.60 0_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(x1)))))) 125.01/32.60 0_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{4_1}(x1)))))) 125.01/32.60 3_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(x1)))))) 125.01/32.60 3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(x1)))))) 125.01/32.60 3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(x1)))))) 125.01/32.60 3_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(x1)))))) 125.01/32.60 3_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(x1)))))) 125.01/32.60 3_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{4_1}(x1)))))) 125.01/32.60 2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(x1)))))) 125.01/32.60 2_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(x1)))))) 125.01/32.60 2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(x1)))))) 125.01/32.60 2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(x1)))))) 125.01/32.60 2_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(x1)))))) 125.01/32.60 2_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{4_1}(x1)))))) 125.01/32.60 4_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(x1)))))) 125.01/32.60 4_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(x1)))))) 125.01/32.60 4_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(x1)))))) 125.01/32.60 4_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(x1)))))) 125.01/32.60 4_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(x1)))))) 125.01/32.60 4_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{4_1}(x1)))))) 125.01/32.60 5_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(x1)))))) 125.01/32.60 5_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(x1)))))) 125.01/32.60 5_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(x1)))))) 125.01/32.60 5_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(x1)))))) 125.01/32.60 5_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(x1)))))) 125.01/32.60 5_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{4_1}(x1)))))) 125.01/32.60 1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 1_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 1_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 1_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 1_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 1_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 1_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 3_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 3_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 3_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 3_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 3_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 3_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 2_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 2_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 2_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 2_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 2_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 2_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 5_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 5_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 5_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 5_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 5_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 5_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.60 0_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.60 3_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.60 2_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.60 4_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.60 5_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.60 1_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 0_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 0_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 0_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 0_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 0_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 0_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 3_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 3_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 3_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 3_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 3_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 3_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 2_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 2_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 2_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 2_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 2_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 2_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 4_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 4_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 4_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 4_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 4_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 4_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 5_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 5_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 5_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 5_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 5_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 5_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 1_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 1_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 1_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 1_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 1_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 1_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 2_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 2_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 2_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 2_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 2_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 2_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 4_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 4_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 4_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 4_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 4_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 4_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 1_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 1_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 1_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 1_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 1_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 1_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 4_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 4_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 4_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 4_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 4_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 4_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 5_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 5_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 5_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 5_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 5_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 5_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 1_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 1_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 1_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 1_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 1_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{5_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 1_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{4_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 0_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 0_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 0_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 0_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 0_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{5_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 0_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{4_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 3_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 3_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 3_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 3_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 3_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{5_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 3_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{4_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 2_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 2_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 2_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 2_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 2_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{5_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 2_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{4_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{5_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{4_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 5_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 5_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 5_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 5_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 5_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{5_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 5_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{4_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 3_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 3_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 3_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 3_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 3_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 3_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 2_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 2_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 2_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 2_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 2_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 2_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 4_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 4_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 4_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 4_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 4_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 4_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 5_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 5_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 5_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 5_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 5_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 5_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 3_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 3_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 3_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 3_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 3_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 3_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 2_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 2_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 2_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 2_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 2_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 2_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 4_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 4_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 4_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 4_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 4_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 4_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 3_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 3_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 3_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 3_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 3_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 3_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 2_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 2_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 2_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 2_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 2_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 2_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 3_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 3_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 3_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 3_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 3_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 3_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 2_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 2_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 2_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 2_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 2_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 2_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 0_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 0_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 0_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 0_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 0_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 0_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 5_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 5_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 5_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 5_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 5_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 5_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 0_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 0_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 0_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 0_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 0_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 0_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 2_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 2_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 2_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 2_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 2_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 2_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 5_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 5_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 5_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 5_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 5_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 5_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{1_1}(x1))))) -> 1_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{0_1}(x1))))) -> 1_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{3_1}(x1))))) -> 1_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{2_1}(x1))))) -> 1_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{5_1}(x1))))) -> 1_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{4_1}(x1))))) -> 1_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{1_1}(x1))))) -> 0_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{0_1}(x1))))) -> 0_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{3_1}(x1))))) -> 0_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{2_1}(x1))))) -> 0_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{5_1}(x1))))) -> 0_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{4_1}(x1))))) -> 0_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{1_1}(x1))))) -> 3_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{0_1}(x1))))) -> 3_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{3_1}(x1))))) -> 3_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{2_1}(x1))))) -> 3_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{5_1}(x1))))) -> 3_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{4_1}(x1))))) -> 3_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{1_1}(x1))))) -> 2_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{0_1}(x1))))) -> 2_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{3_1}(x1))))) -> 2_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{2_1}(x1))))) -> 2_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{5_1}(x1))))) -> 2_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{4_1}(x1))))) -> 2_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{1_1}(x1))))) -> 4_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{0_1}(x1))))) -> 4_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{3_1}(x1))))) -> 4_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{2_1}(x1))))) -> 4_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{5_1}(x1))))) -> 4_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{4_1}(x1))))) -> 4_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{1_1}(x1))))) -> 5_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{0_1}(x1))))) -> 5_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{3_1}(x1))))) -> 5_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{2_1}(x1))))) -> 5_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{5_1}(x1))))) -> 5_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{4_1}(x1))))) -> 5_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{1_1}(x1))))) -> 1_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(x1))))) -> 1_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(x1))))) -> 1_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{2_1}(x1))))) -> 1_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{5_1}(x1))))) -> 1_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{4_1}(x1))))) -> 1_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{1_1}(x1))))) -> 0_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(x1))))) -> 0_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(x1))))) -> 0_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{2_1}(x1))))) -> 0_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{5_1}(x1))))) -> 0_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{4_1}(x1))))) -> 0_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{1_1}(x1))))) -> 3_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(x1))))) -> 3_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(x1))))) -> 3_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{2_1}(x1))))) -> 3_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{5_1}(x1))))) -> 3_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{4_1}(x1))))) -> 3_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{1_1}(x1))))) -> 2_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(x1))))) -> 2_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(x1))))) -> 2_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{2_1}(x1))))) -> 2_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{5_1}(x1))))) -> 2_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{4_1}(x1))))) -> 2_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{1_1}(x1))))) -> 4_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(x1))))) -> 4_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(x1))))) -> 4_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{2_1}(x1))))) -> 4_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{5_1}(x1))))) -> 4_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{4_1}(x1))))) -> 4_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{1_1}(x1))))) -> 5_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(x1))))) -> 5_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(x1))))) -> 5_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{2_1}(x1))))) -> 5_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{5_1}(x1))))) -> 5_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{4_1}(x1))))) -> 5_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{1_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{1_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{0_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{0_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{3_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{3_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{2_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{2_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{5_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{4_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{4_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{1_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{1_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{0_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{0_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{3_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{3_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{2_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{2_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{5_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{4_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{4_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{1_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{1_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{0_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{0_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{3_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{3_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{2_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{2_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{5_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{4_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{4_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{1_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{1_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{0_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{0_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{3_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{3_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{2_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{2_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{5_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{4_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{4_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{1_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{1_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{0_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{0_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{3_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{3_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{2_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{2_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{5_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{4_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{4_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{1_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{1_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{0_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{0_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{3_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{3_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{2_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{2_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{5_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{4_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{4_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(x1)))))) -> 1_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(x1)))))) -> 1_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(x1)))))) -> 1_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(x1)))))) -> 1_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{5_1}(x1)))))) -> 1_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{4_1}(x1)))))) -> 1_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(x1)))))) -> 0_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(x1)))))) -> 0_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(x1)))))) -> 0_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(x1)))))) -> 0_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{5_1}(x1)))))) -> 0_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{4_1}(x1)))))) -> 0_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(x1)))))) -> 3_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(x1)))))) -> 3_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(x1)))))) -> 3_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(x1)))))) -> 3_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{5_1}(x1)))))) -> 3_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{4_1}(x1)))))) -> 3_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(x1)))))) -> 2_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(x1)))))) -> 2_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(x1)))))) -> 2_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(x1)))))) -> 2_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{5_1}(x1)))))) -> 2_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{4_1}(x1)))))) -> 2_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(x1)))))) -> 4_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(x1)))))) -> 4_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(x1)))))) -> 4_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(x1)))))) -> 4_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{5_1}(x1)))))) -> 4_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{4_1}(x1)))))) -> 4_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(x1)))))) -> 5_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(x1)))))) -> 5_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(x1)))))) -> 5_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(x1)))))) -> 5_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{5_1}(x1)))))) -> 5_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{4_1}(x1)))))) -> 5_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{1_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{0_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{3_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{2_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{5_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{4_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{1_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{0_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{3_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{2_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{5_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{4_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{1_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{0_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{3_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{2_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{5_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{4_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{1_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{0_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{3_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{2_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{5_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{4_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{1_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{0_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{3_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{2_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{5_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{4_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{1_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{0_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{3_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{2_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{5_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{4_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{1_1}(x1)))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{0_1}(x1)))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(x1)))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{2_1}(x1)))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{5_1}(x1)))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{4_1}(x1)))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{1_1}(x1)))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{0_1}(x1)))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(x1)))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{2_1}(x1)))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{5_1}(x1)))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{4_1}(x1)))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{1_1}(x1)))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{0_1}(x1)))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(x1)))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{2_1}(x1)))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{5_1}(x1)))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{4_1}(x1)))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{1_1}(x1)))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{0_1}(x1)))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(x1)))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{2_1}(x1)))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{5_1}(x1)))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{4_1}(x1)))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{1_1}(x1)))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{0_1}(x1)))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(x1)))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{2_1}(x1)))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{5_1}(x1)))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{4_1}(x1)))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{1_1}(x1)))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{0_1}(x1)))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(x1)))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{2_1}(x1)))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{5_1}(x1)))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{4_1}(x1)))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{1_1}(x1)))))) -> 1_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{0_1}(x1)))))) -> 1_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{3_1}(x1)))))) -> 1_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{2_1}(x1)))))) -> 1_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{5_1}(x1)))))) -> 1_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{4_1}(x1)))))) -> 1_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{1_1}(x1)))))) -> 0_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{0_1}(x1)))))) -> 0_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{3_1}(x1)))))) -> 0_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{2_1}(x1)))))) -> 0_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{5_1}(x1)))))) -> 0_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{4_1}(x1)))))) -> 0_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{1_1}(x1)))))) -> 3_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{0_1}(x1)))))) -> 3_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{3_1}(x1)))))) -> 3_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{2_1}(x1)))))) -> 3_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{5_1}(x1)))))) -> 3_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{4_1}(x1)))))) -> 3_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{1_1}(x1)))))) -> 2_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{0_1}(x1)))))) -> 2_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{3_1}(x1)))))) -> 2_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{2_1}(x1)))))) -> 2_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{5_1}(x1)))))) -> 2_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{4_1}(x1)))))) -> 2_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{1_1}(x1)))))) -> 4_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{0_1}(x1)))))) -> 4_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{3_1}(x1)))))) -> 4_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{2_1}(x1)))))) -> 4_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{5_1}(x1)))))) -> 4_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{4_1}(x1)))))) -> 4_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{1_1}(x1)))))) -> 5_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{0_1}(x1)))))) -> 5_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{3_1}(x1)))))) -> 5_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{2_1}(x1)))))) -> 5_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{5_1}(x1)))))) -> 5_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{4_1}(x1)))))) -> 5_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 125.01/32.61 Q is empty. 125.01/32.61 125.01/32.61 ---------------------------------------- 125.01/32.61 125.01/32.61 (7) QTRSRRRProof (EQUIVALENT) 125.01/32.61 Used ordering: 125.01/32.61 Polynomial interpretation [POLO]: 125.01/32.61 125.01/32.61 POL(0_{0_1}(x_1)) = 31 + x_1 125.01/32.61 POL(0_{1_1}(x_1)) = 31 + x_1 125.01/32.61 POL(0_{2_1}(x_1)) = 18 + x_1 125.01/32.61 POL(0_{3_1}(x_1)) = x_1 125.01/32.61 POL(0_{4_1}(x_1)) = 1 + x_1 125.01/32.61 POL(0_{5_1}(x_1)) = x_1 125.01/32.61 POL(1_{0_1}(x_1)) = 31 + x_1 125.01/32.61 POL(1_{1_1}(x_1)) = 31 + x_1 125.01/32.61 POL(1_{2_1}(x_1)) = x_1 125.01/32.61 POL(1_{3_1}(x_1)) = x_1 125.01/32.61 POL(1_{4_1}(x_1)) = 16 + x_1 125.01/32.61 POL(1_{5_1}(x_1)) = x_1 125.01/32.61 POL(2_{0_1}(x_1)) = 24 + x_1 125.01/32.61 POL(2_{1_1}(x_1)) = 21 + x_1 125.01/32.61 POL(2_{2_1}(x_1)) = 27 + x_1 125.01/32.61 POL(2_{3_1}(x_1)) = 9 + x_1 125.01/32.61 POL(2_{4_1}(x_1)) = 11 + x_1 125.01/32.61 POL(2_{5_1}(x_1)) = x_1 125.01/32.61 POL(3_{0_1}(x_1)) = 3 + x_1 125.01/32.61 POL(3_{1_1}(x_1)) = x_1 125.01/32.61 POL(3_{2_1}(x_1)) = 6 + x_1 125.01/32.61 POL(3_{3_1}(x_1)) = x_1 125.01/32.61 POL(3_{4_1}(x_1)) = x_1 125.01/32.61 POL(3_{5_1}(x_1)) = x_1 125.01/32.61 POL(4_{0_1}(x_1)) = 33 + x_1 125.01/32.61 POL(4_{1_1}(x_1)) = 2 + x_1 125.01/32.61 POL(4_{2_1}(x_1)) = 8 + x_1 125.01/32.61 POL(4_{3_1}(x_1)) = 1 + x_1 125.01/32.61 POL(4_{4_1}(x_1)) = 15 + x_1 125.01/32.61 POL(4_{5_1}(x_1)) = 2 + x_1 125.01/32.61 POL(5_{0_1}(x_1)) = 31 + x_1 125.01/32.61 POL(5_{1_1}(x_1)) = 31 + x_1 125.01/32.61 POL(5_{2_1}(x_1)) = 18 + x_1 125.01/32.61 POL(5_{3_1}(x_1)) = x_1 125.01/32.61 POL(5_{4_1}(x_1)) = 1 + x_1 125.01/32.61 POL(5_{5_1}(x_1)) = x_1 125.01/32.61 With this ordering the following rules can be removed by the rule removal processor [LPAR04] because they are oriented strictly: 125.01/32.61 125.01/32.61 1_{0_1}(0_{0_1}(0_{1_1}(x1))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{0_1}(0_{0_1}(x1))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{0_1}(0_{3_1}(x1))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{0_1}(0_{2_1}(x1))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{0_1}(0_{5_1}(x1))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{1_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(x1))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{0_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(x1))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{3_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(x1))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{2_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(x1))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{5_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{5_1}(x1))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{4_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{4_1}(x1))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{1_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{0_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{3_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{2_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{5_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{4_1}(x1))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{1_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{0_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{3_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{2_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{5_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{5_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{4_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{4_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{1_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{0_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{3_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{2_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{5_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{0_1}(0_{4_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{1_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(x1))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{0_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(x1))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{3_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(x1))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{2_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(x1))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{5_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(3_{5_1}(x1))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{4_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(3_{4_1}(x1))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{1_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{1_1}(x1))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{0_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{0_1}(x1))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{3_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{3_1}(x1))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{2_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{2_1}(x1))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{5_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{5_1}(x1))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{4_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(x1))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{1_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{1_1}(x1)))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{0_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(x1)))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{3_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{3_1}(x1)))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{2_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{2_1}(x1)))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{5_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{5_1}(x1)))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{4_1}(x1))) -> 0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{4_1}(x1)))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{1_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{1_1}(x1)))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{0_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(x1)))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{3_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{3_1}(x1)))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{2_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{2_1}(x1)))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{5_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{5_1}(x1)))))) 125.01/32.61 0_{5_1}(5_{0_1}(0_{4_1}(x1))) -> 0_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{4_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{5_1}(5_{1_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(x1)))) 125.01/32.61 1_{1_1}(1_{5_1}(5_{0_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{0_1}(x1)))) 125.01/32.61 1_{1_1}(1_{5_1}(5_{2_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{2_1}(x1)))) 125.01/32.61 1_{1_1}(1_{5_1}(5_{4_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{4_1}(x1)))) 125.01/32.61 1_{1_1}(1_{5_1}(5_{1_1}(x1))) -> 1_{5_1}(5_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{5_1}(5_{0_1}(x1))) -> 1_{5_1}(5_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{5_1}(5_{3_1}(x1))) -> 1_{5_1}(5_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{5_1}(5_{2_1}(x1))) -> 1_{5_1}(5_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{5_1}(5_{5_1}(x1))) -> 1_{5_1}(5_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{5_1}(5_{4_1}(x1))) -> 1_{5_1}(5_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{2_1}(2_{0_1}(0_{5_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{2_1}(2_{0_1}(0_{4_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 1_{4_1}(4_{2_1}(2_{2_1}(2_{1_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{4_1}(4_{2_1}(2_{3_1}(3_{1_1}(x1)))))) 125.01/32.61 1_{4_1}(4_{2_1}(2_{2_1}(2_{0_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{4_1}(4_{2_1}(2_{3_1}(3_{0_1}(x1)))))) 125.01/32.61 1_{4_1}(4_{2_1}(2_{2_1}(2_{3_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{4_1}(4_{2_1}(2_{3_1}(3_{3_1}(x1)))))) 125.01/32.61 1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{4_1}(4_{2_1}(2_{3_1}(3_{2_1}(x1)))))) 125.01/32.61 1_{4_1}(4_{2_1}(2_{2_1}(2_{5_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{4_1}(4_{2_1}(2_{3_1}(3_{5_1}(x1)))))) 125.01/32.61 1_{4_1}(4_{2_1}(2_{2_1}(2_{4_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{4_1}(4_{2_1}(2_{3_1}(3_{4_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{4_1}(4_{1_1}(1_{1_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{4_1}(4_{1_1}(1_{3_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{4_1}(4_{1_1}(1_{2_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{4_1}(4_{1_1}(1_{5_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{4_1}(4_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{4_1}(4_{1_1}(1_{4_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{3_1}(3_{1_1}(1_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{4_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{4_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{4_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{4_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{4_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{4_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 4_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 4_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 4_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 4_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 4_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 4_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 5_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 5_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 5_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 5_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 5_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 5_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 1_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 1_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 1_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 1_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 1_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 1_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 1_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 0_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 0_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 0_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 0_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 0_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 0_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 0_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 3_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 3_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 3_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 3_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 3_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 3_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 3_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 2_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 2_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 2_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 2_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 2_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 2_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 2_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 4_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 4_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 4_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 4_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 4_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 4_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 4_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))) -> 5_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))) -> 5_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))) -> 5_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))) -> 5_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(x1)))) -> 5_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.61 5_{1_1}(1_{1_1}(1_{0_1}(0_{4_1}(x1)))) -> 5_{0_1}(0_{4_1}(4_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 4_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 4_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 4_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 4_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 4_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 4_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{0_1}(0_{1_1}(x1)))) -> 5_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{0_1}(0_{0_1}(x1)))) -> 5_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 5_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(x1)))) -> 5_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 5_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{5_1}(5_{0_1}(0_{4_1}(x1)))) -> 5_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 0_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 3_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 2_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 4_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{5_1}(x1)))))) 125.01/32.61 5_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{4_1}(x1)))))) 125.01/32.61 1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 1_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 1_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 1_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 1_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 1_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 1_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 3_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 3_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 3_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 3_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 3_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 3_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 2_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 2_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 2_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 2_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 2_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 2_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 5_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 5_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 5_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 5_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 5_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 5_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 4_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{1_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{3_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{2_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{0_1}(0_{2_1}(2_{5_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{5_1}(x1))))))) 125.01/32.61 5_{0_1}(0_{0_1}(0_{2_1}(2_{4_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{4_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 1_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 1_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 0_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 0_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 0_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 0_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 0_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 0_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 0_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 3_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 3_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 3_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 3_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 3_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 3_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 2_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 2_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 2_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 2_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 2_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.61 2_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 2_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 4_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 4_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 4_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 4_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 4_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 4_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 5_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 5_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 5_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 5_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 5_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 5_{3_1}(3_{4_1}(4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 1_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 0_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 4_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{1_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{0_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{3_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{2_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{5_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 5_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(3_{4_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(x1)))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(x1)))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(x1)))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(x1)))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{5_1}(x1)))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{4_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 3_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 2_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 4_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{1_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{2_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1)))) -> 5_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(3_{1_1}(1_{4_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 1_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 0_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 3_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 2_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 4_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 5_{5_1}(5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 1_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 1_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 1_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 1_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 1_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 1_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 0_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 2_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 2_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 2_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 2_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 2_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 2_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 4_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 4_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 4_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 4_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 4_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 4_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 5_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 1_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 1_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 1_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 1_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 1_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{5_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 1_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{4_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{5_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{4_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{5_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{4_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{5_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{4_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 4_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 4_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 4_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 4_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 4_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{5_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 4_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{4_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 5_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 5_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 5_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 5_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 5_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{5_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 5_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{4_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 1_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 1_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 1_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 1_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 1_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{5_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 1_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{4_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 0_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 0_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 0_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 0_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 0_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{5_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 0_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{4_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 3_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 3_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 3_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 3_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 3_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{5_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 3_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{4_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 2_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 2_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 2_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 2_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 2_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{5_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 2_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{4_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 5_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 5_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 5_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 5_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 5_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{5_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 5_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{4_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 1_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 0_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 3_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 3_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 3_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 3_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 3_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 3_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 2_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 2_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 2_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 2_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 2_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 2_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 4_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 4_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 4_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 4_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 4_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 4_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 5_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 5_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 5_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 5_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 5_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 5_{2_1}(2_{5_1}(5_{3_1}(3_{0_1}(0_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 3_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 3_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 3_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 3_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 3_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 3_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 2_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 2_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 2_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 2_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 2_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 2_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 4_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 4_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 4_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 4_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 4_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 4_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{4_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{4_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 3_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 3_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 3_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 3_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 3_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 3_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{4_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 2_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 2_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 2_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 2_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 2_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 2_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{4_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{4_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{3_1}(3_{4_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 3_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 3_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 3_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 3_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 3_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 3_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 2_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 2_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 2_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 2_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 2_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 2_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 4_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 0_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 0_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 0_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 0_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 0_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 0_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 5_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 5_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 5_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 5_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 5_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 5_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 0_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 0_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 0_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 0_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 0_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 0_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 2_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 2_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 2_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 2_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 2_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 2_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 5_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 5_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 5_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 5_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 5_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 5_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{1_1}(x1))))) -> 1_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{0_1}(x1))))) -> 1_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{3_1}(x1))))) -> 1_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{2_1}(x1))))) -> 1_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{5_1}(x1))))) -> 1_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{4_1}(x1))))) -> 1_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{1_1}(x1))))) -> 0_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{0_1}(x1))))) -> 0_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{3_1}(x1))))) -> 0_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{2_1}(x1))))) -> 0_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{5_1}(x1))))) -> 0_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{4_1}(x1))))) -> 0_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{1_1}(x1))))) -> 3_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{0_1}(x1))))) -> 3_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{3_1}(x1))))) -> 3_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{2_1}(x1))))) -> 3_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{5_1}(x1))))) -> 3_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{4_1}(x1))))) -> 3_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{1_1}(x1))))) -> 2_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{0_1}(x1))))) -> 2_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{3_1}(x1))))) -> 2_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{2_1}(x1))))) -> 2_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{5_1}(x1))))) -> 2_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{4_1}(x1))))) -> 2_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{1_1}(x1))))) -> 4_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{0_1}(x1))))) -> 4_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{3_1}(x1))))) -> 4_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{2_1}(x1))))) -> 4_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{5_1}(x1))))) -> 4_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{4_1}(x1))))) -> 4_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{1_1}(x1))))) -> 5_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{0_1}(x1))))) -> 5_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{3_1}(x1))))) -> 5_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{2_1}(x1))))) -> 5_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{5_1}(x1))))) -> 5_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{4_1}(4_{5_1}(5_{4_1}(x1))))) -> 5_{5_1}(5_{4_1}(4_{1_1}(1_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{1_1}(x1))))) -> 1_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(x1))))) -> 1_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(x1))))) -> 1_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{2_1}(x1))))) -> 1_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{5_1}(x1))))) -> 1_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{4_1}(x1))))) -> 1_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{1_1}(x1))))) -> 0_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(x1))))) -> 0_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(x1))))) -> 0_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{2_1}(x1))))) -> 0_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{5_1}(x1))))) -> 0_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{4_1}(x1))))) -> 0_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{1_1}(x1))))) -> 3_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(x1))))) -> 3_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(x1))))) -> 3_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{2_1}(x1))))) -> 3_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{5_1}(x1))))) -> 3_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{4_1}(x1))))) -> 3_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{1_1}(x1))))) -> 2_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(x1))))) -> 2_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(x1))))) -> 2_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{2_1}(x1))))) -> 2_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{5_1}(x1))))) -> 2_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{4_1}(x1))))) -> 2_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{1_1}(x1))))) -> 4_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(x1))))) -> 4_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(x1))))) -> 4_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{2_1}(x1))))) -> 4_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{5_1}(x1))))) -> 4_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{4_1}(x1))))) -> 4_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{1_1}(x1))))) -> 5_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(x1))))) -> 5_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(x1))))) -> 5_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{2_1}(x1))))) -> 5_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{5_1}(x1))))) -> 5_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(5_{4_1}(x1))))) -> 5_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{1_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{1_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{0_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{0_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{3_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{3_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{2_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{2_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{5_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{4_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{4_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{1_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{1_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{0_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{0_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{3_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{3_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{2_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{2_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{5_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{4_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{4_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{1_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{1_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{0_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{0_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{3_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{3_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{2_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{2_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{5_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{4_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{4_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{1_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{1_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{0_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{0_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{3_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{3_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{2_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{2_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{5_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{4_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{4_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{1_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{1_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{0_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{0_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{3_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{3_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{2_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{2_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{5_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{4_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{4_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{1_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{1_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{0_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{0_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{3_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{3_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{2_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{2_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{5_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{4_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{4_1}(4_{2_1}(2_{4_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(x1)))))) -> 1_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(x1)))))) -> 1_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(x1)))))) -> 1_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(x1)))))) -> 1_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{5_1}(x1)))))) -> 1_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{5_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{4_1}(x1)))))) -> 1_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{4_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(x1)))))) -> 0_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(x1)))))) -> 0_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(x1)))))) -> 0_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(x1)))))) -> 0_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{5_1}(x1)))))) -> 0_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{5_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{4_1}(x1)))))) -> 0_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{4_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(x1)))))) -> 3_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(x1)))))) -> 3_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(x1)))))) -> 3_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(x1)))))) -> 3_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{5_1}(x1)))))) -> 3_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{5_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{4_1}(x1)))))) -> 3_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{4_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(x1)))))) -> 2_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(x1)))))) -> 2_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(x1)))))) -> 2_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(x1)))))) -> 2_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{5_1}(x1)))))) -> 2_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{5_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{4_1}(x1)))))) -> 2_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{4_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(x1)))))) -> 4_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(x1)))))) -> 4_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(x1)))))) -> 4_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(x1)))))) -> 4_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{5_1}(x1)))))) -> 4_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{5_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{4_1}(x1)))))) -> 4_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{4_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(x1)))))) -> 5_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(x1)))))) -> 5_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(x1)))))) -> 5_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(x1)))))) -> 5_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{5_1}(x1)))))) -> 5_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{5_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{4_1}(4_{2_1}(2_{2_1}(2_{2_1}(2_{4_1}(x1)))))) -> 5_{2_1}(2_{4_1}(4_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{4_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{1_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{0_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{3_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{2_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{5_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{4_1}(x1)))))) -> 1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{1_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{0_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{3_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{2_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{5_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{4_1}(x1)))))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{0_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{3_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{2_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{5_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{4_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{1_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{0_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{3_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{2_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{5_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{4_1}(x1)))))) -> 2_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{1_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{0_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{3_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{2_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{5_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{4_1}(x1)))))) -> 4_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{1_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{0_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{3_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{2_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{5_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{4_1}(x1)))))) -> 5_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{1_1}(x1)))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{0_1}(x1)))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(x1)))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{2_1}(x1)))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{5_1}(x1)))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 1_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{4_1}(x1)))))) -> 1_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{1_1}(x1)))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{0_1}(x1)))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(x1)))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{2_1}(x1)))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{5_1}(x1)))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 0_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{4_1}(x1)))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{1_1}(x1)))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{0_1}(x1)))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(x1)))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{2_1}(x1)))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{5_1}(x1)))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{4_1}(x1)))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{1_1}(x1)))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{0_1}(x1)))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(x1)))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{2_1}(x1)))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{5_1}(x1)))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 2_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{4_1}(x1)))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{1_1}(x1)))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{0_1}(x1)))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(x1)))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{2_1}(x1)))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{5_1}(x1)))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{4_1}(x1)))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{1_1}(x1)))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{0_1}(x1)))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{3_1}(x1)))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{2_1}(x1)))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{5_1}(x1)))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 5_{1_1}(1_{4_1}(4_{2_1}(2_{0_1}(0_{5_1}(5_{4_1}(x1)))))) -> 5_{2_1}(2_{3_1}(3_{0_1}(0_{4_1}(4_{1_1}(1_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{1_1}(x1)))))) -> 1_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{0_1}(x1)))))) -> 1_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{3_1}(x1)))))) -> 1_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{2_1}(x1)))))) -> 1_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{5_1}(x1)))))) -> 1_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{5_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{4_1}(x1)))))) -> 1_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{4_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{1_1}(x1)))))) -> 0_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{0_1}(x1)))))) -> 0_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{3_1}(x1)))))) -> 0_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{2_1}(x1)))))) -> 0_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{5_1}(x1)))))) -> 0_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{5_1}(x1))))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{4_1}(x1)))))) -> 0_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{4_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{1_1}(x1)))))) -> 3_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{0_1}(x1)))))) -> 3_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{3_1}(x1)))))) -> 3_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{2_1}(x1)))))) -> 3_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{5_1}(x1)))))) -> 3_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{5_1}(x1))))))) 125.01/32.62 3_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{4_1}(x1)))))) -> 3_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{4_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{1_1}(x1)))))) -> 2_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{0_1}(x1)))))) -> 2_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{3_1}(x1)))))) -> 2_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{2_1}(x1)))))) -> 2_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{5_1}(x1)))))) -> 2_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{5_1}(x1))))))) 125.01/32.62 2_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{4_1}(x1)))))) -> 2_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{4_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{1_1}(x1)))))) -> 4_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{0_1}(x1)))))) -> 4_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{3_1}(x1)))))) -> 4_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{2_1}(x1)))))) -> 4_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{5_1}(x1)))))) -> 4_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{5_1}(x1))))))) 125.01/32.62 4_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{4_1}(x1)))))) -> 4_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{4_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{1_1}(x1)))))) -> 5_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{0_1}(x1)))))) -> 5_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{3_1}(x1)))))) -> 5_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{2_1}(x1)))))) -> 5_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{5_1}(x1)))))) -> 5_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{5_1}(x1))))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{4_1}(4_{2_1}(2_{5_1}(5_{4_1}(x1)))))) -> 5_{1_1}(1_{5_1}(5_{4_1}(4_{3_1}(3_{2_1}(2_{0_1}(0_{4_1}(x1))))))) 125.01/32.62 125.01/32.62 125.01/32.62 125.01/32.62 125.01/32.62 ---------------------------------------- 125.01/32.62 125.01/32.62 (8) 125.01/32.62 Obligation: 125.01/32.62 Q restricted rewrite system: 125.01/32.62 The TRS R consists of the following rules: 125.01/32.62 125.01/32.62 1_{0_1}(0_{0_1}(0_{4_1}(x1))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{4_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{1_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{0_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{3_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{2_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{5_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{4_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{3_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{3_1}(x1)))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{5_1}(x1)))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{1_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{2_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{5_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{4_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{5_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{4_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{1_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 125.01/32.62 Q is empty. 125.01/32.62 125.01/32.62 ---------------------------------------- 125.01/32.62 125.01/32.62 (9) QTRSRRRProof (EQUIVALENT) 125.01/32.62 Used ordering: 125.01/32.62 Polynomial interpretation [POLO]: 125.01/32.62 125.01/32.62 POL(0_{0_1}(x_1)) = x_1 125.01/32.62 POL(0_{1_1}(x_1)) = x_1 125.01/32.62 POL(0_{2_1}(x_1)) = x_1 125.01/32.62 POL(0_{3_1}(x_1)) = x_1 125.01/32.62 POL(0_{4_1}(x_1)) = 1 + x_1 125.01/32.62 POL(0_{5_1}(x_1)) = x_1 125.01/32.62 POL(1_{0_1}(x_1)) = x_1 125.01/32.62 POL(1_{1_1}(x_1)) = x_1 125.01/32.62 POL(1_{3_1}(x_1)) = x_1 125.01/32.62 POL(1_{4_1}(x_1)) = x_1 125.01/32.62 POL(1_{5_1}(x_1)) = x_1 125.01/32.62 POL(2_{0_1}(x_1)) = x_1 125.01/32.62 POL(2_{1_1}(x_1)) = x_1 125.01/32.62 POL(2_{2_1}(x_1)) = x_1 125.01/32.62 POL(2_{3_1}(x_1)) = x_1 125.01/32.62 POL(2_{4_1}(x_1)) = x_1 125.01/32.62 POL(2_{5_1}(x_1)) = x_1 125.01/32.62 POL(3_{0_1}(x_1)) = x_1 125.01/32.62 POL(3_{1_1}(x_1)) = x_1 125.01/32.62 POL(3_{2_1}(x_1)) = x_1 125.01/32.62 POL(3_{3_1}(x_1)) = x_1 125.01/32.62 POL(3_{5_1}(x_1)) = x_1 125.01/32.62 POL(4_{0_1}(x_1)) = x_1 125.01/32.62 POL(4_{1_1}(x_1)) = x_1 125.01/32.62 POL(4_{2_1}(x_1)) = x_1 125.01/32.62 POL(4_{4_1}(x_1)) = x_1 125.01/32.62 POL(4_{5_1}(x_1)) = x_1 125.01/32.62 POL(5_{0_1}(x_1)) = x_1 125.01/32.62 POL(5_{1_1}(x_1)) = x_1 125.01/32.62 POL(5_{2_1}(x_1)) = x_1 125.01/32.62 POL(5_{3_1}(x_1)) = x_1 125.01/32.62 POL(5_{4_1}(x_1)) = 1 + x_1 125.01/32.62 POL(5_{5_1}(x_1)) = x_1 125.01/32.62 With this ordering the following rules can be removed by the rule removal processor [LPAR04] because they are oriented strictly: 125.01/32.62 125.01/32.62 1_{0_1}(0_{0_1}(0_{4_1}(x1))) -> 1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{4_1}(x1)))))) 125.01/32.62 125.01/32.62 125.01/32.62 125.01/32.62 125.01/32.62 ---------------------------------------- 125.01/32.62 125.01/32.62 (10) 125.01/32.62 Obligation: 125.01/32.62 Q restricted rewrite system: 125.01/32.62 The TRS R consists of the following rules: 125.01/32.62 125.01/32.62 0_{5_1}(5_{0_1}(0_{1_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{0_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{3_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{2_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{5_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{4_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{3_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{3_1}(x1)))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{5_1}(x1)))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{1_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{2_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{5_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{4_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{5_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{4_1}(x1))))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{1_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 125.01/32.62 Q is empty. 125.01/32.62 125.01/32.62 ---------------------------------------- 125.01/32.62 125.01/32.62 (11) QTRSRRRProof (EQUIVALENT) 125.01/32.62 Used ordering: 125.01/32.62 Polynomial interpretation [POLO]: 125.01/32.62 125.01/32.62 POL(0_{0_1}(x_1)) = x_1 125.01/32.62 POL(0_{1_1}(x_1)) = x_1 125.01/32.62 POL(0_{2_1}(x_1)) = x_1 125.01/32.62 POL(0_{3_1}(x_1)) = x_1 125.01/32.62 POL(0_{4_1}(x_1)) = x_1 125.01/32.62 POL(0_{5_1}(x_1)) = x_1 125.01/32.62 POL(1_{0_1}(x_1)) = x_1 125.01/32.62 POL(1_{1_1}(x_1)) = x_1 125.01/32.62 POL(1_{3_1}(x_1)) = x_1 125.01/32.62 POL(1_{4_1}(x_1)) = 1 + x_1 125.01/32.62 POL(1_{5_1}(x_1)) = x_1 125.01/32.62 POL(2_{0_1}(x_1)) = x_1 125.01/32.62 POL(2_{1_1}(x_1)) = x_1 125.01/32.62 POL(2_{2_1}(x_1)) = x_1 125.01/32.62 POL(2_{3_1}(x_1)) = x_1 125.01/32.62 POL(2_{4_1}(x_1)) = x_1 125.01/32.62 POL(2_{5_1}(x_1)) = x_1 125.01/32.62 POL(3_{0_1}(x_1)) = x_1 125.01/32.62 POL(3_{1_1}(x_1)) = x_1 125.01/32.62 POL(3_{2_1}(x_1)) = x_1 125.01/32.62 POL(3_{3_1}(x_1)) = x_1 125.01/32.62 POL(3_{5_1}(x_1)) = x_1 125.01/32.62 POL(4_{0_1}(x_1)) = x_1 125.01/32.62 POL(4_{1_1}(x_1)) = x_1 125.01/32.62 POL(4_{2_1}(x_1)) = x_1 125.01/32.62 POL(4_{4_1}(x_1)) = x_1 125.01/32.62 POL(4_{5_1}(x_1)) = x_1 125.01/32.62 POL(5_{0_1}(x_1)) = x_1 125.01/32.62 POL(5_{1_1}(x_1)) = x_1 125.01/32.62 POL(5_{2_1}(x_1)) = x_1 125.01/32.62 POL(5_{3_1}(x_1)) = x_1 125.01/32.62 POL(5_{4_1}(x_1)) = x_1 125.01/32.62 POL(5_{5_1}(x_1)) = x_1 125.01/32.62 With this ordering the following rules can be removed by the rule removal processor [LPAR04] because they are oriented strictly: 125.01/32.62 125.01/32.62 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{1_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{0_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{3_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{2_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{5_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{5_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{4_1}(4_{0_1}(0_{2_1}(2_{4_1}(x1))))) -> 4_{4_1}(4_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{4_1}(x1))))))) 125.01/32.62 125.01/32.62 125.01/32.62 125.01/32.62 125.01/32.62 ---------------------------------------- 125.01/32.62 125.01/32.62 (12) 125.01/32.62 Obligation: 125.01/32.62 Q restricted rewrite system: 125.01/32.62 The TRS R consists of the following rules: 125.01/32.62 125.01/32.62 0_{5_1}(5_{0_1}(0_{1_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{0_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{3_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{2_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{5_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{4_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{3_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{3_1}(x1)))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{5_1}(x1)))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{1_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{2_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{5_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{4_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{1_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 125.01/32.62 Q is empty. 125.01/32.62 125.01/32.62 ---------------------------------------- 125.01/32.62 125.01/32.62 (13) QTRSRRRProof (EQUIVALENT) 125.01/32.62 Used ordering: 125.01/32.62 Polynomial interpretation [POLO]: 125.01/32.62 125.01/32.62 POL(0_{0_1}(x_1)) = x_1 125.01/32.62 POL(0_{1_1}(x_1)) = 1 + x_1 125.01/32.62 POL(0_{2_1}(x_1)) = x_1 125.01/32.62 POL(0_{3_1}(x_1)) = x_1 125.01/32.62 POL(0_{4_1}(x_1)) = x_1 125.01/32.62 POL(0_{5_1}(x_1)) = x_1 125.01/32.62 POL(1_{0_1}(x_1)) = x_1 125.01/32.62 POL(1_{1_1}(x_1)) = 1 + x_1 125.01/32.62 POL(1_{3_1}(x_1)) = x_1 125.01/32.62 POL(1_{4_1}(x_1)) = x_1 125.01/32.62 POL(1_{5_1}(x_1)) = x_1 125.01/32.62 POL(2_{1_1}(x_1)) = x_1 125.01/32.62 POL(2_{2_1}(x_1)) = x_1 125.01/32.62 POL(2_{3_1}(x_1)) = x_1 125.01/32.62 POL(2_{5_1}(x_1)) = 1 + x_1 125.01/32.62 POL(3_{0_1}(x_1)) = x_1 125.01/32.62 POL(3_{1_1}(x_1)) = x_1 125.01/32.62 POL(3_{2_1}(x_1)) = x_1 125.01/32.62 POL(3_{3_1}(x_1)) = x_1 125.01/32.62 POL(3_{5_1}(x_1)) = x_1 125.01/32.62 POL(4_{0_1}(x_1)) = x_1 125.01/32.62 POL(4_{1_1}(x_1)) = x_1 125.01/32.62 POL(4_{2_1}(x_1)) = x_1 125.01/32.62 POL(4_{5_1}(x_1)) = x_1 125.01/32.62 POL(5_{0_1}(x_1)) = x_1 125.01/32.62 POL(5_{1_1}(x_1)) = 1 + x_1 125.01/32.62 POL(5_{2_1}(x_1)) = x_1 125.01/32.62 POL(5_{3_1}(x_1)) = x_1 125.01/32.62 POL(5_{4_1}(x_1)) = x_1 125.01/32.62 POL(5_{5_1}(x_1)) = x_1 125.01/32.62 With this ordering the following rules can be removed by the rule removal processor [LPAR04] because they are oriented strictly: 125.01/32.62 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{1_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{0_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{3_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{2_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{5_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(5_{4_1}(x1)))) -> 1_{0_1}(0_{5_1}(5_{3_1}(3_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 125.01/32.62 125.01/32.62 125.01/32.62 125.01/32.62 ---------------------------------------- 125.01/32.62 125.01/32.62 (14) 125.01/32.62 Obligation: 125.01/32.62 Q restricted rewrite system: 125.01/32.62 The TRS R consists of the following rules: 125.01/32.62 125.01/32.62 0_{5_1}(5_{0_1}(0_{1_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{0_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{3_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{2_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{5_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{4_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{3_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{3_1}(x1)))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{5_1}(x1)))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{1_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 125.01/32.62 Q is empty. 125.01/32.62 125.01/32.62 ---------------------------------------- 125.01/32.62 125.01/32.62 (15) QTRSRRRProof (EQUIVALENT) 125.01/32.62 Used ordering: 125.01/32.62 Polynomial interpretation [POLO]: 125.01/32.62 125.01/32.62 POL(0_{0_1}(x_1)) = x_1 125.01/32.62 POL(0_{1_1}(x_1)) = x_1 125.01/32.62 POL(0_{2_1}(x_1)) = x_1 125.01/32.62 POL(0_{3_1}(x_1)) = x_1 125.01/32.62 POL(0_{4_1}(x_1)) = x_1 125.01/32.62 POL(0_{5_1}(x_1)) = x_1 125.01/32.62 POL(1_{0_1}(x_1)) = x_1 125.01/32.62 POL(1_{1_1}(x_1)) = x_1 125.01/32.62 POL(1_{3_1}(x_1)) = x_1 125.01/32.62 POL(1_{4_1}(x_1)) = x_1 125.01/32.62 POL(1_{5_1}(x_1)) = x_1 125.01/32.62 POL(2_{1_1}(x_1)) = x_1 125.01/32.62 POL(2_{2_1}(x_1)) = 1 + x_1 125.01/32.62 POL(2_{3_1}(x_1)) = x_1 125.01/32.62 POL(2_{5_1}(x_1)) = 1 + x_1 125.01/32.62 POL(3_{0_1}(x_1)) = x_1 125.01/32.62 POL(3_{1_1}(x_1)) = x_1 125.01/32.62 POL(3_{2_1}(x_1)) = x_1 125.01/32.62 POL(3_{3_1}(x_1)) = x_1 125.01/32.62 POL(3_{5_1}(x_1)) = x_1 125.01/32.62 POL(4_{0_1}(x_1)) = x_1 125.01/32.62 POL(4_{1_1}(x_1)) = x_1 125.01/32.62 POL(4_{2_1}(x_1)) = 1 + x_1 125.01/32.62 POL(4_{5_1}(x_1)) = x_1 125.01/32.62 POL(5_{0_1}(x_1)) = x_1 125.01/32.62 POL(5_{1_1}(x_1)) = x_1 125.01/32.62 POL(5_{2_1}(x_1)) = x_1 125.01/32.62 POL(5_{3_1}(x_1)) = x_1 125.01/32.62 POL(5_{4_1}(x_1)) = x_1 125.01/32.62 POL(5_{5_1}(x_1)) = x_1 125.01/32.62 With this ordering the following rules can be removed by the rule removal processor [LPAR04] because they are oriented strictly: 125.01/32.62 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 125.01/32.62 125.01/32.62 125.01/32.62 125.01/32.62 ---------------------------------------- 125.01/32.62 125.01/32.62 (16) 125.01/32.62 Obligation: 125.01/32.62 Q restricted rewrite system: 125.01/32.62 The TRS R consists of the following rules: 125.01/32.62 125.01/32.62 0_{5_1}(5_{0_1}(0_{1_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{0_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{3_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{2_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{5_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{4_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{3_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{3_1}(x1)))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{5_1}(x1)))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{1_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 125.01/32.62 Q is empty. 125.01/32.62 125.01/32.62 ---------------------------------------- 125.01/32.62 125.01/32.62 (17) QTRSRRRProof (EQUIVALENT) 125.01/32.62 Used ordering: 125.01/32.62 Polynomial interpretation [POLO]: 125.01/32.62 125.01/32.62 POL(0_{0_1}(x_1)) = x_1 125.01/32.62 POL(0_{1_1}(x_1)) = x_1 125.01/32.62 POL(0_{2_1}(x_1)) = x_1 125.01/32.62 POL(0_{3_1}(x_1)) = x_1 125.01/32.62 POL(0_{4_1}(x_1)) = x_1 125.01/32.62 POL(0_{5_1}(x_1)) = x_1 125.01/32.62 POL(1_{0_1}(x_1)) = x_1 125.01/32.62 POL(1_{1_1}(x_1)) = x_1 125.01/32.62 POL(1_{3_1}(x_1)) = x_1 125.01/32.62 POL(1_{4_1}(x_1)) = x_1 125.01/32.62 POL(1_{5_1}(x_1)) = x_1 125.01/32.62 POL(2_{1_1}(x_1)) = 1 + x_1 125.01/32.62 POL(2_{2_1}(x_1)) = x_1 125.01/32.62 POL(2_{3_1}(x_1)) = x_1 125.01/32.62 POL(2_{5_1}(x_1)) = x_1 125.01/32.62 POL(3_{0_1}(x_1)) = x_1 125.01/32.62 POL(3_{1_1}(x_1)) = x_1 125.01/32.62 POL(3_{3_1}(x_1)) = x_1 125.01/32.62 POL(3_{5_1}(x_1)) = x_1 125.01/32.62 POL(4_{0_1}(x_1)) = x_1 125.01/32.62 POL(4_{1_1}(x_1)) = x_1 125.01/32.62 POL(4_{2_1}(x_1)) = x_1 125.01/32.62 POL(4_{5_1}(x_1)) = x_1 125.01/32.62 POL(5_{0_1}(x_1)) = x_1 125.01/32.62 POL(5_{1_1}(x_1)) = x_1 125.01/32.62 POL(5_{2_1}(x_1)) = x_1 125.01/32.62 POL(5_{3_1}(x_1)) = x_1 125.01/32.62 POL(5_{4_1}(x_1)) = x_1 125.01/32.62 POL(5_{5_1}(x_1)) = x_1 125.01/32.62 With this ordering the following rules can be removed by the rule removal processor [LPAR04] because they are oriented strictly: 125.01/32.62 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 2_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 125.01/32.62 125.01/32.62 125.01/32.62 125.01/32.62 ---------------------------------------- 125.01/32.62 125.01/32.62 (18) 125.01/32.62 Obligation: 125.01/32.62 Q restricted rewrite system: 125.01/32.62 The TRS R consists of the following rules: 125.01/32.62 125.01/32.62 0_{5_1}(5_{0_1}(0_{1_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{0_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{3_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{2_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{5_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{4_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{3_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{3_1}(x1)))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{5_1}(x1)))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{1_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 125.01/32.62 Q is empty. 125.01/32.62 125.01/32.62 ---------------------------------------- 125.01/32.62 125.01/32.62 (19) QTRSRRRProof (EQUIVALENT) 125.01/32.62 Used ordering: 125.01/32.62 Polynomial interpretation [POLO]: 125.01/32.62 125.01/32.62 POL(0_{0_1}(x_1)) = x_1 125.01/32.62 POL(0_{1_1}(x_1)) = x_1 125.01/32.62 POL(0_{2_1}(x_1)) = x_1 125.01/32.62 POL(0_{3_1}(x_1)) = x_1 125.01/32.62 POL(0_{4_1}(x_1)) = x_1 125.01/32.62 POL(0_{5_1}(x_1)) = x_1 125.01/32.62 POL(1_{0_1}(x_1)) = x_1 125.01/32.62 POL(1_{1_1}(x_1)) = x_1 125.01/32.62 POL(1_{3_1}(x_1)) = x_1 125.01/32.62 POL(1_{4_1}(x_1)) = x_1 125.01/32.62 POL(1_{5_1}(x_1)) = x_1 125.01/32.62 POL(2_{1_1}(x_1)) = x_1 125.01/32.62 POL(2_{3_1}(x_1)) = x_1 125.01/32.62 POL(2_{5_1}(x_1)) = 1 + x_1 125.01/32.62 POL(3_{0_1}(x_1)) = x_1 125.01/32.62 POL(3_{1_1}(x_1)) = x_1 125.01/32.62 POL(3_{3_1}(x_1)) = x_1 125.01/32.62 POL(3_{5_1}(x_1)) = x_1 125.01/32.62 POL(4_{0_1}(x_1)) = x_1 125.01/32.62 POL(4_{1_1}(x_1)) = x_1 125.01/32.62 POL(4_{2_1}(x_1)) = x_1 125.01/32.62 POL(4_{5_1}(x_1)) = x_1 125.01/32.62 POL(5_{0_1}(x_1)) = x_1 125.01/32.62 POL(5_{1_1}(x_1)) = x_1 125.01/32.62 POL(5_{2_1}(x_1)) = x_1 125.01/32.62 POL(5_{3_1}(x_1)) = x_1 125.01/32.62 POL(5_{4_1}(x_1)) = x_1 125.01/32.62 POL(5_{5_1}(x_1)) = x_1 125.01/32.62 With this ordering the following rules can be removed by the rule removal processor [LPAR04] because they are oriented strictly: 125.01/32.62 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{1_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{0_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{3_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{2_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{5_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 4_{1_1}(1_{0_1}(0_{2_1}(2_{5_1}(5_{4_1}(x1))))) -> 4_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 125.01/32.62 125.01/32.62 125.01/32.62 125.01/32.62 ---------------------------------------- 125.01/32.62 125.01/32.62 (20) 125.01/32.62 Obligation: 125.01/32.62 Q restricted rewrite system: 125.01/32.62 The TRS R consists of the following rules: 125.01/32.62 125.01/32.62 0_{5_1}(5_{0_1}(0_{1_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{0_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{3_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{2_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{5_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{4_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{3_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{3_1}(x1)))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{5_1}(x1)))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.62 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.62 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{1_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.62 125.01/32.62 Q is empty. 125.01/32.62 125.01/32.62 ---------------------------------------- 125.01/32.62 125.01/32.62 (21) DependencyPairsProof (EQUIVALENT) 125.01/32.62 Using Dependency Pairs [AG00,LPAR04] we result in the following initial DP problem. 125.01/32.62 ---------------------------------------- 125.01/32.62 125.01/32.62 (22) 125.01/32.62 Obligation: 125.01/32.62 Q DP problem: 125.01/32.62 The TRS P consists of the following rules: 125.01/32.62 125.01/32.62 0_{5_1}^1(5_{0_1}(0_{1_1}(x1))) -> 3_{1_1}^1(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1))))) 125.01/32.62 0_{5_1}^1(5_{0_1}(0_{1_1}(x1))) -> 1_{0_1}^1(0_{3_1}(3_{5_1}(5_{1_1}(x1)))) 125.01/32.62 0_{5_1}^1(5_{0_1}(0_{0_1}(x1))) -> 3_{1_1}^1(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1))))) 125.01/32.62 0_{5_1}^1(5_{0_1}(0_{0_1}(x1))) -> 1_{0_1}^1(0_{3_1}(3_{5_1}(5_{0_1}(x1)))) 125.01/32.62 0_{5_1}^1(5_{0_1}(0_{0_1}(x1))) -> 5_{0_1}^1(x1) 125.01/32.62 0_{5_1}^1(5_{0_1}(0_{3_1}(x1))) -> 3_{1_1}^1(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1))))) 125.01/32.62 0_{5_1}^1(5_{0_1}(0_{3_1}(x1))) -> 1_{0_1}^1(0_{3_1}(3_{5_1}(5_{3_1}(x1)))) 125.01/32.62 0_{5_1}^1(5_{0_1}(0_{2_1}(x1))) -> 3_{1_1}^1(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1))))) 125.01/32.62 0_{5_1}^1(5_{0_1}(0_{2_1}(x1))) -> 1_{0_1}^1(0_{3_1}(3_{5_1}(5_{2_1}(x1)))) 125.01/32.62 0_{5_1}^1(5_{0_1}(0_{5_1}(x1))) -> 3_{1_1}^1(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1))))) 125.01/32.62 0_{5_1}^1(5_{0_1}(0_{5_1}(x1))) -> 1_{0_1}^1(0_{3_1}(3_{5_1}(5_{5_1}(x1)))) 125.01/32.62 0_{5_1}^1(5_{0_1}(0_{4_1}(x1))) -> 3_{1_1}^1(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1))))) 125.01/32.62 0_{5_1}^1(5_{0_1}(0_{4_1}(x1))) -> 1_{0_1}^1(0_{3_1}(3_{5_1}(5_{4_1}(x1)))) 125.01/32.62 1_{4_1}^1(4_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 1_{4_1}^1(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 1_{4_1}^1(4_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 4_{1_1}^1(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1))))) 125.01/32.62 1_{4_1}^1(4_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 1_{0_1}^1(0_{3_1}(3_{5_1}(5_{1_1}(x1)))) 125.01/32.62 1_{4_1}^1(4_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 1_{4_1}^1(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 1_{4_1}^1(4_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 4_{1_1}^1(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1))))) 125.01/32.62 1_{4_1}^1(4_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 1_{0_1}^1(0_{3_1}(3_{5_1}(5_{0_1}(x1)))) 125.01/32.62 1_{4_1}^1(4_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 1_{4_1}^1(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 1_{4_1}^1(4_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 4_{1_1}^1(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1))))) 125.01/32.62 1_{4_1}^1(4_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 1_{0_1}^1(0_{3_1}(3_{5_1}(5_{3_1}(x1)))) 125.01/32.62 1_{4_1}^1(4_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 1_{4_1}^1(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 1_{4_1}^1(4_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 4_{1_1}^1(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1))))) 125.01/32.62 1_{4_1}^1(4_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 1_{0_1}^1(0_{3_1}(3_{5_1}(5_{2_1}(x1)))) 125.01/32.62 1_{4_1}^1(4_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 1_{4_1}^1(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 1_{4_1}^1(4_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 4_{1_1}^1(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1))))) 125.01/32.62 1_{4_1}^1(4_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 1_{0_1}^1(0_{3_1}(3_{5_1}(5_{5_1}(x1)))) 125.01/32.62 1_{4_1}^1(4_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 1_{4_1}^1(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 1_{4_1}^1(4_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 4_{1_1}^1(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1))))) 125.01/32.62 1_{4_1}^1(4_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 1_{0_1}^1(0_{3_1}(3_{5_1}(5_{4_1}(x1)))) 125.01/32.62 3_{0_1}^1(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 3_{0_1}^1(0_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1))))) 125.01/32.62 3_{0_1}^1(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 0_{0_1}^1(0_{5_1}(5_{3_1}(3_{3_1}(x1)))) 125.01/32.62 3_{0_1}^1(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 0_{5_1}^1(5_{3_1}(3_{3_1}(x1))) 125.01/32.62 3_{0_1}^1(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 3_{0_1}^1(0_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1))))) 125.01/32.62 3_{0_1}^1(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 0_{0_1}^1(0_{5_1}(5_{3_1}(3_{5_1}(x1)))) 125.01/32.62 3_{0_1}^1(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 0_{5_1}^1(5_{3_1}(3_{5_1}(x1))) 125.01/32.62 3_{0_1}^1(0_{4_1}(4_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 3_{0_1}^1(0_{5_1}(5_{4_1}(4_{0_1}(0_{1_1}(x1))))) 125.01/32.62 3_{0_1}^1(0_{4_1}(4_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 0_{5_1}^1(5_{4_1}(4_{0_1}(0_{1_1}(x1)))) 125.01/32.62 3_{0_1}^1(0_{4_1}(4_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 3_{0_1}^1(0_{5_1}(5_{4_1}(4_{0_1}(0_{0_1}(x1))))) 125.01/32.62 3_{0_1}^1(0_{4_1}(4_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 0_{5_1}^1(5_{4_1}(4_{0_1}(0_{0_1}(x1)))) 125.01/32.62 3_{0_1}^1(0_{4_1}(4_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 3_{0_1}^1(0_{5_1}(5_{4_1}(4_{0_1}(0_{3_1}(x1))))) 125.01/32.62 3_{0_1}^1(0_{4_1}(4_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 0_{5_1}^1(5_{4_1}(4_{0_1}(0_{3_1}(x1)))) 125.01/32.62 3_{0_1}^1(0_{4_1}(4_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 3_{0_1}^1(0_{5_1}(5_{4_1}(4_{0_1}(0_{2_1}(x1))))) 125.01/32.62 3_{0_1}^1(0_{4_1}(4_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 0_{5_1}^1(5_{4_1}(4_{0_1}(0_{2_1}(x1)))) 125.01/32.62 3_{0_1}^1(0_{4_1}(4_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 3_{0_1}^1(0_{5_1}(5_{4_1}(4_{0_1}(0_{5_1}(x1))))) 125.01/32.62 3_{0_1}^1(0_{4_1}(4_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 0_{5_1}^1(5_{4_1}(4_{0_1}(0_{5_1}(x1)))) 125.01/32.62 3_{0_1}^1(0_{4_1}(4_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 3_{0_1}^1(0_{5_1}(5_{4_1}(4_{0_1}(0_{4_1}(x1))))) 125.01/32.62 3_{0_1}^1(0_{4_1}(4_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 0_{5_1}^1(5_{4_1}(4_{0_1}(0_{4_1}(x1)))) 125.01/32.62 1_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{1_1}^1(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 1_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{0_1}^1(0_{1_1}(x1)) 125.01/32.62 1_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{1_1}^1(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 1_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{0_1}^1(0_{0_1}(x1)) 125.01/32.62 1_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{0_1}^1(x1) 125.01/32.62 1_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{1_1}^1(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.62 1_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{0_1}^1(0_{3_1}(x1)) 125.01/32.62 1_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{1_1}^1(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.62 1_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{0_1}^1(0_{2_1}(x1)) 125.01/32.62 1_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{1_1}^1(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.62 1_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{0_1}^1(0_{5_1}(x1)) 125.01/32.62 1_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{5_1}^1(x1) 125.01/32.62 1_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{1_1}^1(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.62 1_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{0_1}^1(0_{4_1}(x1)) 125.01/32.62 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{0_1}^1(0_{1_1}(x1)) 125.01/32.62 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{0_1}^1(0_{0_1}(x1)) 125.01/32.62 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{0_1}^1(x1) 125.01/32.62 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{0_1}^1(0_{3_1}(x1)) 125.01/32.62 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{0_1}^1(0_{2_1}(x1)) 125.01/32.62 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{0_1}^1(0_{5_1}(x1)) 125.01/32.62 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{5_1}^1(x1) 125.01/32.62 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{0_1}^1(0_{4_1}(x1)) 125.01/32.62 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{0_1}^1(0_{1_1}(x1)) 125.01/32.62 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{0_1}^1(0_{0_1}(x1)) 125.01/32.62 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{0_1}^1(x1) 125.01/32.62 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{0_1}^1(0_{3_1}(x1)) 125.01/32.62 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{0_1}^1(0_{2_1}(x1)) 125.01/32.62 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{0_1}^1(0_{5_1}(x1)) 125.01/32.62 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{5_1}^1(x1) 125.01/32.62 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{0_1}^1(0_{4_1}(x1)) 125.01/32.62 1_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{1_1}^1(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 1_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{0_1}^1(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1))))) 125.01/32.62 1_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{5_1}^1(5_{3_1}(3_{5_1}(5_{1_1}(x1)))) 125.01/32.62 1_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{1_1}^1(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 1_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{0_1}^1(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1))))) 125.01/32.62 1_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{5_1}^1(5_{3_1}(3_{5_1}(5_{0_1}(x1)))) 125.01/32.62 1_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{1_1}^1(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 1_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{0_1}^1(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1))))) 125.01/32.62 1_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{5_1}^1(5_{3_1}(3_{5_1}(5_{3_1}(x1)))) 125.01/32.62 1_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{1_1}^1(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 1_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{0_1}^1(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1))))) 125.01/32.62 1_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{5_1}^1(5_{3_1}(3_{5_1}(5_{2_1}(x1)))) 125.01/32.62 1_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{1_1}^1(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 1_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{0_1}^1(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1))))) 125.01/32.62 1_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{5_1}^1(5_{3_1}(3_{5_1}(5_{5_1}(x1)))) 125.01/32.62 1_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{1_1}^1(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 1_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{0_1}^1(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1))))) 125.01/32.62 1_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{5_1}^1(5_{3_1}(3_{5_1}(5_{4_1}(x1)))) 125.01/32.62 0_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{0_1}^1(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1))))) 125.01/32.62 0_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{5_1}^1(5_{3_1}(3_{5_1}(5_{1_1}(x1)))) 125.01/32.62 0_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{0_1}^1(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1))))) 125.01/32.62 0_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{5_1}^1(5_{3_1}(3_{5_1}(5_{0_1}(x1)))) 125.01/32.62 0_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{0_1}^1(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1))))) 125.01/32.62 0_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{5_1}^1(5_{3_1}(3_{5_1}(5_{3_1}(x1)))) 125.01/32.62 0_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{0_1}^1(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1))))) 125.01/32.62 0_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{5_1}^1(5_{3_1}(3_{5_1}(5_{2_1}(x1)))) 125.01/32.62 0_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{0_1}^1(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1))))) 125.01/32.62 0_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{5_1}^1(5_{3_1}(3_{5_1}(5_{5_1}(x1)))) 125.01/32.62 0_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{0_1}^1(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1))))) 125.01/32.62 0_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{5_1}^1(5_{3_1}(3_{5_1}(5_{4_1}(x1)))) 125.01/32.62 5_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{0_1}^1(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1))))) 125.01/32.62 5_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{5_1}^1(5_{3_1}(3_{5_1}(5_{1_1}(x1)))) 125.01/32.62 5_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{0_1}^1(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1))))) 125.01/32.62 5_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{5_1}^1(5_{3_1}(3_{5_1}(5_{0_1}(x1)))) 125.01/32.62 5_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{0_1}^1(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1))))) 125.01/32.62 5_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{5_1}^1(5_{3_1}(3_{5_1}(5_{3_1}(x1)))) 125.01/32.62 5_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{0_1}^1(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1))))) 125.01/32.62 5_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{5_1}^1(5_{3_1}(3_{5_1}(5_{2_1}(x1)))) 125.01/32.62 5_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{0_1}^1(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1))))) 125.01/32.62 5_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{5_1}^1(5_{3_1}(3_{5_1}(5_{5_1}(x1)))) 125.01/32.62 5_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{0_1}^1(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1))))) 125.01/32.62 5_{0_1}^1(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{5_1}^1(5_{3_1}(3_{5_1}(5_{4_1}(x1)))) 125.01/32.62 3_{1_1}^1(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 3_{1_1}^1(1_{3_1}(3_{5_1}(5_{1_1}(x1)))) 125.01/32.62 3_{1_1}^1(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 3_{1_1}^1(1_{3_1}(3_{5_1}(5_{0_1}(x1)))) 125.01/32.62 3_{1_1}^1(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 3_{1_1}^1(1_{3_1}(3_{5_1}(5_{3_1}(x1)))) 125.01/32.62 3_{1_1}^1(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 3_{1_1}^1(1_{3_1}(3_{5_1}(5_{2_1}(x1)))) 125.01/32.62 3_{1_1}^1(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 3_{1_1}^1(1_{3_1}(3_{5_1}(5_{5_1}(x1)))) 125.01/32.62 3_{1_1}^1(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 3_{1_1}^1(1_{3_1}(3_{5_1}(5_{4_1}(x1)))) 125.01/32.62 4_{1_1}^1(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 3_{1_1}^1(1_{3_1}(3_{5_1}(5_{1_1}(x1)))) 125.01/32.62 4_{1_1}^1(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 3_{1_1}^1(1_{3_1}(3_{5_1}(5_{0_1}(x1)))) 125.01/32.62 4_{1_1}^1(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 3_{1_1}^1(1_{3_1}(3_{5_1}(5_{3_1}(x1)))) 125.01/32.62 4_{1_1}^1(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 3_{1_1}^1(1_{3_1}(3_{5_1}(5_{2_1}(x1)))) 125.01/32.62 4_{1_1}^1(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 3_{1_1}^1(1_{3_1}(3_{5_1}(5_{5_1}(x1)))) 125.01/32.62 4_{1_1}^1(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 3_{1_1}^1(1_{3_1}(3_{5_1}(5_{4_1}(x1)))) 125.01/32.62 3_{1_1}^1(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{1_1}(x1)))))) -> 3_{1_1}^1(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 3_{1_1}^1(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{1_1}(x1)))))) -> 1_{0_1}^1(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))) 125.01/32.62 125.01/32.62 The TRS R consists of the following rules: 125.01/32.62 125.01/32.62 0_{5_1}(5_{0_1}(0_{1_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{0_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{3_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{2_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{5_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 0_{5_1}(5_{0_1}(0_{4_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{3_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{3_1}(x1)))) 125.01/32.62 1_{1_1}(1_{5_1}(5_{5_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{5_1}(x1)))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.62 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{1_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{0_1}(x1)))))) 125.01/32.62 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{3_1}(x1)))))) 125.01/32.63 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{2_1}(x1)))))) 125.01/32.63 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{5_1}(x1)))))) 125.01/32.63 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{4_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.63 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.63 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.63 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.63 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.63 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.63 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.63 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.63 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.63 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.63 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.63 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.63 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.63 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{1_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.63 125.01/32.63 Q is empty. 125.01/32.63 We have to consider all minimal (P,Q,R)-chains. 125.01/32.63 ---------------------------------------- 125.01/32.63 125.01/32.63 (23) DependencyGraphProof (EQUIVALENT) 125.01/32.63 The approximation of the Dependency Graph [LPAR04,FROCOS05,EDGSTAR] contains 1 SCC with 124 less nodes. 125.01/32.63 ---------------------------------------- 125.01/32.63 125.01/32.63 (24) 125.01/32.63 Obligation: 125.01/32.63 Q DP problem: 125.01/32.63 The TRS P consists of the following rules: 125.01/32.63 125.01/32.63 0_{5_1}^1(5_{0_1}(0_{0_1}(x1))) -> 5_{0_1}^1(x1) 125.01/32.63 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{0_1}^1(0_{1_1}(x1)) 125.01/32.63 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{0_1}^1(0_{0_1}(x1)) 125.01/32.63 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{0_1}^1(x1) 125.01/32.63 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{0_1}^1(0_{1_1}(x1)) 125.01/32.63 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{0_1}^1(0_{5_1}(x1)) 125.01/32.63 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{5_1}^1(x1) 125.01/32.63 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{0_1}^1(0_{0_1}(x1)) 125.01/32.63 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{0_1}^1(x1) 125.01/32.63 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{0_1}^1(0_{5_1}(x1)) 125.01/32.63 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{5_1}^1(x1) 125.01/32.63 125.01/32.63 The TRS R consists of the following rules: 125.01/32.63 125.01/32.63 0_{5_1}(5_{0_1}(0_{1_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.63 0_{5_1}(5_{0_1}(0_{0_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.63 0_{5_1}(5_{0_1}(0_{3_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.63 0_{5_1}(5_{0_1}(0_{2_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.63 0_{5_1}(5_{0_1}(0_{5_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.63 0_{5_1}(5_{0_1}(0_{4_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.63 1_{1_1}(1_{5_1}(5_{3_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{3_1}(x1)))) 125.01/32.63 1_{1_1}(1_{5_1}(5_{5_1}(x1))) -> 1_{5_1}(5_{1_1}(1_{3_1}(3_{5_1}(x1)))) 125.01/32.63 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.63 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.63 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.63 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.63 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.63 1_{4_1}(4_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 1_{4_1}(4_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.63 3_{0_1}(0_{5_1}(5_{0_1}(0_{3_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{3_1}(x1)))))) 125.01/32.63 3_{0_1}(0_{5_1}(5_{0_1}(0_{5_1}(x1)))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(x1)))))) 125.01/32.63 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{1_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{1_1}(x1)))))) 125.01/32.63 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{0_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{0_1}(x1)))))) 125.01/32.63 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{3_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{3_1}(x1)))))) 125.01/32.63 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{2_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{2_1}(x1)))))) 125.01/32.63 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{5_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{5_1}(x1)))))) 125.01/32.63 3_{0_1}(0_{4_1}(4_{5_1}(5_{0_1}(0_{4_1}(x1))))) -> 3_{3_1}(3_{0_1}(0_{5_1}(5_{4_1}(4_{0_1}(0_{4_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.63 1_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 1_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.63 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.63 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.63 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.63 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.63 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.63 3_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 3_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.63 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{1_1}(x1))))))) 125.01/32.63 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{0_1}(x1))))))) 125.01/32.63 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{3_1}(x1))))))) 125.01/32.63 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{2_1}(x1))))))) 125.01/32.63 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{5_1}(x1))))))) 125.01/32.63 4_{1_1}(1_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))) -> 4_{5_1}(5_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{5_1}(5_{4_1}(x1))))))) 125.01/32.63 3_{1_1}(1_{1_1}(1_{0_1}(0_{5_1}(5_{2_1}(2_{1_1}(x1)))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{5_1}(5_{1_1}(x1))))))) 125.01/32.63 125.01/32.63 Q is empty. 125.01/32.63 We have to consider all minimal (P,Q,R)-chains. 125.01/32.63 ---------------------------------------- 125.01/32.63 125.01/32.63 (25) UsableRulesProof (EQUIVALENT) 125.01/32.63 We can use the usable rules and reduction pair processor [LPAR04] with the Ce-compatible extension of the polynomial order that maps every function symbol to the sum of its arguments. Then, we can delete all non-usable rules [FROCOS05] from R. 125.01/32.63 ---------------------------------------- 125.01/32.63 125.01/32.63 (26) 125.01/32.63 Obligation: 125.01/32.63 Q DP problem: 125.01/32.63 The TRS P consists of the following rules: 125.01/32.63 125.01/32.63 0_{5_1}^1(5_{0_1}(0_{0_1}(x1))) -> 5_{0_1}^1(x1) 125.01/32.63 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{0_1}^1(0_{1_1}(x1)) 125.01/32.63 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{0_1}^1(0_{0_1}(x1)) 125.01/32.63 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{0_1}^1(x1) 125.01/32.63 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{0_1}^1(0_{1_1}(x1)) 125.01/32.63 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{0_1}^1(0_{5_1}(x1)) 125.01/32.63 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{5_1}^1(x1) 125.01/32.63 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{0_1}^1(0_{0_1}(x1)) 125.01/32.63 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{0_1}^1(x1) 125.01/32.63 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{0_1}^1(0_{5_1}(x1)) 125.01/32.63 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{5_1}^1(x1) 125.01/32.63 125.01/32.63 The TRS R consists of the following rules: 125.01/32.63 125.01/32.63 0_{5_1}(5_{0_1}(0_{1_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.63 0_{5_1}(5_{0_1}(0_{0_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.63 0_{5_1}(5_{0_1}(0_{3_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.63 0_{5_1}(5_{0_1}(0_{2_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.63 0_{5_1}(5_{0_1}(0_{5_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.63 0_{5_1}(5_{0_1}(0_{4_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.63 125.01/32.63 Q is empty. 125.01/32.63 We have to consider all minimal (P,Q,R)-chains. 125.01/32.63 ---------------------------------------- 125.01/32.63 125.01/32.63 (27) DependencyGraphProof (EQUIVALENT) 125.01/32.63 The approximation of the Dependency Graph [LPAR04,FROCOS05,EDGSTAR] contains 1 SCC with 4 less nodes. 125.01/32.63 ---------------------------------------- 125.01/32.63 125.01/32.63 (28) 125.01/32.63 Obligation: 125.01/32.63 Q DP problem: 125.01/32.63 The TRS P consists of the following rules: 125.01/32.63 125.01/32.63 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{0_1}^1(0_{1_1}(x1)) 125.01/32.63 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{0_1}^1(x1) 125.01/32.63 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{0_1}^1(0_{1_1}(x1)) 125.01/32.63 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{5_1}^1(x1) 125.01/32.63 0_{5_1}^1(5_{0_1}(0_{0_1}(x1))) -> 5_{0_1}^1(x1) 125.01/32.63 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{0_1}^1(x1) 125.01/32.63 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{5_1}^1(x1) 125.01/32.63 125.01/32.63 The TRS R consists of the following rules: 125.01/32.63 125.01/32.63 0_{5_1}(5_{0_1}(0_{1_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.63 0_{5_1}(5_{0_1}(0_{0_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.63 0_{5_1}(5_{0_1}(0_{3_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.63 0_{5_1}(5_{0_1}(0_{2_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.63 0_{5_1}(5_{0_1}(0_{5_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.63 0_{5_1}(5_{0_1}(0_{4_1}(x1))) -> 0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.63 5_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 5_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{1_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{0_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{3_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{2_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{5_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{1_1}(1_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(0_{4_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{1_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{0_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{3_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{3_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{2_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{2_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{5_1}(x1)))))) 125.01/32.63 0_{0_1}(0_{5_1}(5_{1_1}(1_{5_1}(5_{4_1}(x1))))) -> 0_{1_1}(1_{0_1}(0_{5_1}(5_{3_1}(3_{5_1}(5_{4_1}(x1)))))) 125.01/32.63 125.01/32.63 Q is empty. 125.01/32.63 We have to consider all minimal (P,Q,R)-chains. 125.01/32.63 ---------------------------------------- 125.01/32.63 125.01/32.63 (29) UsableRulesProof (EQUIVALENT) 125.01/32.63 We can use the usable rules and reduction pair processor [LPAR04] with the Ce-compatible extension of the polynomial order that maps every function symbol to the sum of its arguments. Then, we can delete all non-usable rules [FROCOS05] from R. 125.01/32.63 ---------------------------------------- 125.01/32.63 125.01/32.63 (30) 125.01/32.63 Obligation: 125.01/32.63 Q DP problem: 125.01/32.63 The TRS P consists of the following rules: 125.01/32.63 125.01/32.63 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{0_1}^1(0_{1_1}(x1)) 125.01/32.63 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{0_1}^1(x1) 125.01/32.63 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{0_1}^1(0_{1_1}(x1)) 125.01/32.63 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{5_1}^1(x1) 125.01/32.63 0_{5_1}^1(5_{0_1}(0_{0_1}(x1))) -> 5_{0_1}^1(x1) 125.01/32.63 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{0_1}^1(x1) 125.01/32.63 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{5_1}^1(x1) 125.01/32.63 125.01/32.63 R is empty. 125.01/32.63 Q is empty. 125.01/32.63 We have to consider all minimal (P,Q,R)-chains. 125.01/32.63 ---------------------------------------- 125.01/32.63 125.01/32.63 (31) QDPOrderProof (EQUIVALENT) 125.01/32.63 We use the reduction pair processor [LPAR04,JAR06]. 125.01/32.63 125.01/32.63 125.01/32.63 The following pairs can be oriented strictly and are deleted. 125.01/32.63 125.01/32.63 0_{5_1}^1(5_{0_1}(0_{0_1}(x1))) -> 5_{0_1}^1(x1) 125.01/32.63 The remaining pairs can at least be oriented weakly. 125.01/32.63 Used ordering: Polynomial interpretation [POLO]: 125.01/32.63 125.01/32.63 POL(0_{0_1}(x_1)) = 1 + x_1 125.01/32.63 POL(0_{0_1}^1(x_1)) = x_1 125.01/32.63 POL(0_{1_1}(x_1)) = x_1 125.01/32.63 POL(0_{5_1}^1(x_1)) = x_1 125.01/32.63 POL(1_{1_1}(x_1)) = x_1 125.01/32.63 POL(1_{5_1}(x_1)) = x_1 125.01/32.63 POL(5_{0_1}(x_1)) = x_1 125.01/32.63 POL(5_{0_1}^1(x_1)) = x_1 125.01/32.63 POL(5_{1_1}(x_1)) = x_1 125.01/32.63 POL(5_{5_1}(x_1)) = x_1 125.01/32.63 125.01/32.63 The following usable rules [FROCOS05] with respect to the argument filtering of the ordering [JAR06] were oriented: 125.01/32.63 none 125.01/32.63 125.01/32.63 125.01/32.63 ---------------------------------------- 125.01/32.63 125.01/32.63 (32) 125.01/32.63 Obligation: 125.01/32.63 Q DP problem: 125.01/32.63 The TRS P consists of the following rules: 125.01/32.63 125.01/32.63 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{0_1}^1(0_{1_1}(x1)) 125.01/32.63 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{0_1}^1(x1) 125.01/32.63 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{0_1}^1(0_{1_1}(x1)) 125.01/32.63 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{5_1}^1(x1) 125.01/32.63 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{0_1}^1(x1) 125.01/32.63 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{5_1}(x1))))) -> 0_{5_1}^1(x1) 125.01/32.63 125.01/32.63 R is empty. 125.01/32.63 Q is empty. 125.01/32.63 We have to consider all minimal (P,Q,R)-chains. 125.01/32.63 ---------------------------------------- 125.01/32.63 125.01/32.63 (33) DependencyGraphProof (EQUIVALENT) 125.01/32.63 The approximation of the Dependency Graph [LPAR04,FROCOS05,EDGSTAR] contains 1 SCC with 2 less nodes. 125.01/32.63 ---------------------------------------- 125.01/32.63 125.01/32.63 (34) 125.01/32.63 Obligation: 125.01/32.63 Q DP problem: 125.01/32.63 The TRS P consists of the following rules: 125.01/32.63 125.01/32.63 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{0_1}^1(x1) 125.01/32.63 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{0_1}^1(0_{1_1}(x1)) 125.01/32.63 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{0_1}^1(0_{1_1}(x1)) 125.01/32.63 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{0_1}^1(x1) 125.01/32.63 125.01/32.63 R is empty. 125.01/32.63 Q is empty. 125.01/32.63 We have to consider all minimal (P,Q,R)-chains. 125.01/32.63 ---------------------------------------- 125.01/32.63 125.01/32.63 (35) QDPOrderProof (EQUIVALENT) 125.01/32.63 We use the reduction pair processor [LPAR04,JAR06]. 125.01/32.63 125.01/32.63 125.01/32.63 The following pairs can be oriented strictly and are deleted. 125.01/32.63 125.01/32.63 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{0_1}^1(x1) 125.01/32.63 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{0_1}^1(0_{1_1}(x1)) 125.01/32.63 5_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{1_1}(x1))))) -> 5_{0_1}^1(0_{1_1}(x1)) 125.01/32.63 0_{0_1}^1(0_{1_1}(1_{1_1}(1_{5_1}(5_{0_1}(x1))))) -> 0_{0_1}^1(x1) 125.01/32.63 The remaining pairs can at least be oriented weakly. 125.01/32.63 Used ordering: Polynomial Order [NEGPOLO,POLO] with Interpretation: 125.01/32.63 125.01/32.63 POL( 5_{0_1}^1_1(x_1) ) = max{0, 2x_1 - 2} 125.01/32.63 POL( 0_{1_1}_1(x_1) ) = x_1 125.01/32.63 POL( 1_{1_1}_1(x_1) ) = 2x_1 125.01/32.63 POL( 1_{5_1}_1(x_1) ) = x_1 125.01/32.63 POL( 5_{0_1}_1(x_1) ) = x_1 + 1 125.01/32.63 POL( 0_{0_1}^1_1(x_1) ) = 2x_1 + 1 125.01/32.63 POL( 5_{1_1}_1(x_1) ) = 2x_1 + 1 125.01/32.63 125.01/32.63 The following usable rules [FROCOS05] with respect to the argument filtering of the ordering [JAR06] were oriented: 125.01/32.63 none 125.01/32.63 125.01/32.63 125.01/32.63 ---------------------------------------- 125.01/32.63 125.01/32.63 (36) 125.01/32.63 Obligation: 125.01/32.63 Q DP problem: 125.01/32.63 P is empty. 125.01/32.63 R is empty. 125.01/32.63 Q is empty. 125.01/32.63 We have to consider all minimal (P,Q,R)-chains. 125.01/32.63 ---------------------------------------- 125.01/32.63 125.01/32.63 (37) PisEmptyProof (EQUIVALENT) 125.01/32.63 The TRS P is empty. Hence, there is no (P,Q,R) chain. 125.01/32.63 ---------------------------------------- 125.01/32.63 125.01/32.63 (38) 125.01/32.63 YES 125.29/32.71 EOF