30.06/8.57	YES
33.64/9.45	proof of /export/starexec/sandbox2/benchmark/theBenchmark.xml
33.64/9.45	# AProVE Commit ID: 48fb2092695e11cc9f56e44b17a92a5f88ffb256 marcel 20180622 unpublished dirty
33.64/9.45	
33.64/9.45	
33.64/9.45	Termination of the given RelTRS could be proven:
33.64/9.45	
33.64/9.45	(0) RelTRS
33.64/9.45	(1) RelTRS S Cleaner [EQUIVALENT, 0 ms]
33.64/9.45	(2) RelTRS
33.64/9.45	(3) SIsEmptyProof [EQUIVALENT, 0 ms]
33.64/9.45	(4) QTRS
33.64/9.45	(5) QTRS Reverse [EQUIVALENT, 6 ms]
33.64/9.45	(6) QTRS
33.64/9.45	(7) FlatCCProof [EQUIVALENT, 0 ms]
33.64/9.45	(8) QTRS
33.64/9.45	(9) RootLabelingProof [EQUIVALENT, 36 ms]
33.64/9.45	(10) QTRS
33.64/9.45	(11) QTRSRRRProof [EQUIVALENT, 922 ms]
33.64/9.45	(12) QTRS
33.64/9.45	(13) QTRSRRRProof [EQUIVALENT, 75 ms]
33.64/9.45	(14) QTRS
33.64/9.45	(15) QTRSRRRProof [EQUIVALENT, 59 ms]
33.64/9.45	(16) QTRS
33.64/9.45	(17) QTRSRRRProof [EQUIVALENT, 16 ms]
33.64/9.45	(18) QTRS
33.64/9.45	(19) QTRSRRRProof [EQUIVALENT, 16 ms]
33.64/9.45	(20) QTRS
33.64/9.45	(21) QTRSRRRProof [EQUIVALENT, 2 ms]
33.64/9.45	(22) QTRS
33.64/9.45	(23) QTRSRRRProof [EQUIVALENT, 2 ms]
33.64/9.45	(24) QTRS
33.64/9.45	(25) QTRSRRRProof [EQUIVALENT, 5 ms]
33.64/9.45	(26) QTRS
33.64/9.45	(27) RisEmptyProof [EQUIVALENT, 0 ms]
33.64/9.45	(28) YES
33.64/9.45	
33.64/9.45	
33.64/9.45	----------------------------------------
33.64/9.45	
33.64/9.45	(0)
33.64/9.45	Obligation:
33.64/9.45	Relative term rewrite system:
33.64/9.45	The relative TRS consists of the following R rules:
33.64/9.46	
33.64/9.46	   0(0(0(1(2(2(0(1(1(3(1(3(0(0(0(0(3(2(x1)))))))))))))))))) -> 0(0(0(3(0(1(1(0(3(2(2(3(0(1(1(0(0(2(x1))))))))))))))))))
33.64/9.46	   0(0(0(2(0(1(2(3(0(2(3(0(0(1(2(3(0(1(x1)))))))))))))))))) -> 0(2(3(0(0(3(2(1(2(0(0(0(2(3(0(1(0(1(x1))))))))))))))))))
33.64/9.46	   0(0(1(2(3(3(1(0(2(2(0(2(3(2(1(3(1(3(x1)))))))))))))))))) -> 0(3(0(1(3(3(1(2(2(2(2(1(0(2(0(1(3(3(x1))))))))))))))))))
33.64/9.46	   0(0(1(3(0(2(0(0(0(1(2(3(2(0(0(0(0(0(x1)))))))))))))))))) -> 0(0(0(0(2(0(0(0(3(1(2(1(0(2(3(0(0(0(x1))))))))))))))))))
33.64/9.46	   0(0(2(3(1(3(3(0(1(3(0(1(3(3(0(3(2(0(x1)))))))))))))))))) -> 0(3(0(2(1(3(0(1(3(3(0(3(0(3(3(1(2(0(x1))))))))))))))))))
33.64/9.46	   0(0(3(0(2(1(0(0(3(1(1(1(1(3(0(0(0(0(x1)))))))))))))))))) -> 0(0(0(1(2(3(1(3(1(0(1(0(1(0(3(0(0(0(x1))))))))))))))))))
33.64/9.46	   0(0(3(2(3(3(0(0(0(3(0(0(0(0(3(3(3(0(x1)))))))))))))))))) -> 0(2(3(0(0(3(3(0(3(0(0(0(3(3(0(0(3(0(x1))))))))))))))))))
33.64/9.46	   0(1(0(2(0(0(0(2(1(0(0(2(2(2(1(1(0(0(x1)))))))))))))))))) -> 0(1(1(0(2(0(2(2(0(0(2(2(0(1(0(1(0(0(x1))))))))))))))))))
33.64/9.46	   0(1(1(0(0(3(1(3(0(1(0(0(1(2(2(1(3(1(x1)))))))))))))))))) -> 0(1(2(3(3(0(2(0(1(1(0(3(1(0(1(1(0(1(x1))))))))))))))))))
33.64/9.46	   0(1(1(1(3(0(3(0(0(0(0(2(3(0(1(3(1(1(x1)))))))))))))))))) -> 0(1(3(1(3(0(0(1(0(3(0(3(0(2(0(1(1(1(x1))))))))))))))))))
33.64/9.46	   0(1(2(1(0(0(1(0(1(3(2(1(3(0(0(0(0(2(x1)))))))))))))))))) -> 0(1(0(0(1(0(3(2(1(1(0(0(2(0(1(0(3(2(x1))))))))))))))))))
33.64/9.46	   0(1(2(1(3(1(3(2(1(3(1(1(1(2(0(0(0(0(x1)))))))))))))))))) -> 0(1(1(1(0(3(3(1(0(1(0(3(1(2(2(2(1(0(x1))))))))))))))))))
33.64/9.46	   0(2(2(1(1(3(0(1(0(2(0(0(0(2(2(1(2(1(x1)))))))))))))))))) -> 0(2(0(2(0(2(0(1(2(1(0(2(0(2(3(1(1(1(x1))))))))))))))))))
33.64/9.46	   0(2(2(3(1(0(1(3(0(1(1(0(1(0(2(3(0(0(x1)))))))))))))))))) -> 0(2(3(0(2(0(2(1(0(3(0(1(1(3(1(0(1(0(x1))))))))))))))))))
33.64/9.46	   0(3(2(1(2(3(1(1(2(3(2(3(3(1(3(2(3(0(x1)))))))))))))))))) -> 0(1(3(1(2(3(3(3(1(2(1(2(2(2(3(3(3(0(x1))))))))))))))))))
33.64/9.46	   0(3(3(2(3(2(1(3(3(3(0(2(1(3(0(0(0(3(x1)))))))))))))))))) -> 0(3(3(0(3(2(0(3(3(2(1(0(0(3(1(2(3(3(x1))))))))))))))))))
33.64/9.46	   1(0(2(0(0(0(2(3(1(3(1(1(2(3(2(0(2(3(x1)))))))))))))))))) -> 1(0(3(1(0(2(0(3(2(1(3(2(2(0(1(2(3(0(x1))))))))))))))))))
33.64/9.46	   1(0(2(0(0(0(3(2(2(3(2(0(0(1(0(1(0(1(x1)))))))))))))))))) -> 1(0(2(2(0(1(0(2(0(3(2(0(0(1(0(3(0(1(x1))))))))))))))))))
33.64/9.46	   1(1(0(1(1(2(2(2(3(0(1(3(3(0(2(1(2(3(x1)))))))))))))))))) -> 1(1(1(0(0(2(3(1(1(2(3(2(2(2(3(1(0(3(x1))))))))))))))))))
33.64/9.46	   1(1(1(3(1(2(2(3(0(0(2(1(2(2(1(1(0(1(x1)))))))))))))))))) -> 1(0(1(1(2(2(3(1(0(1(1(0(2(2(1(2(3(1(x1))))))))))))))))))
33.64/9.46	   1(1(2(2(2(1(1(2(3(1(3(1(3(2(3(2(2(1(x1)))))))))))))))))) -> 1(1(1(2(3(2(2(2(1(3(3(2(2(1(3(1(2(1(x1))))))))))))))))))
33.64/9.46	   1(1(3(0(2(1(2(0(0(0(1(3(1(0(0(3(0(2(x1)))))))))))))))))) -> 1(0(2(0(3(1(1(0(1(0(3(3(0(2(1(0(0(2(x1))))))))))))))))))
33.64/9.46	   1(2(1(2(0(2(3(2(2(3(0(2(0(1(1(1(0(0(x1)))))))))))))))))) -> 1(2(1(2(2(0(0(2(3(1(0(1(2(2(0(3(1(0(x1))))))))))))))))))
33.64/9.46	   1(2(1(3(2(0(1(2(0(0(1(0(0(1(1(2(0(0(x1)))))))))))))))))) -> 1(0(1(1(2(0(1(0(2(1(0(1(0(2(0(3(2(0(x1))))))))))))))))))
33.64/9.46	   1(2(2(0(0(0(0(1(3(2(1(3(1(1(3(1(1(1(x1)))))))))))))))))) -> 1(2(0(3(1(1(1(3(2(0(0(2(1(1(3(1(0(1(x1))))))))))))))))))
33.64/9.46	   1(2(2(0(0(2(0(1(1(2(2(2(0(2(0(2(0(0(x1)))))))))))))))))) -> 1(0(2(0(2(0(2(2(0(1(2(0(2(0(1(2(2(0(x1))))))))))))))))))
33.64/9.46	   1(2(3(0(0(1(2(1(0(0(2(2(3(1(3(2(3(2(x1)))))))))))))))))) -> 1(2(2(3(0(3(1(2(1(0(0(3(2(1(3(0(2(2(x1))))))))))))))))))
33.64/9.46	   1(2(3(0(1(3(0(0(3(3(0(1(3(1(2(1(2(3(x1)))))))))))))))))) -> 1(0(3(2(3(0(2(1(3(1(0(3(0(3(1(2(1(3(x1))))))))))))))))))
33.64/9.46	   1(2(3(2(3(0(3(0(3(2(1(0(1(1(1(3(1(1(x1)))))))))))))))))) -> 1(1(1(1(3(3(3(2(0(3(0(3(2(2(1(0(1(1(x1))))))))))))))))))
33.64/9.46	   1(2(3(3(3(1(3(0(2(3(2(0(2(2(1(1(3(3(x1)))))))))))))))))) -> 1(2(1(3(3(2(2(0(1(0(3(1(3(3(2(2(3(3(x1))))))))))))))))))
33.64/9.46	   1(3(0(1(1(3(3(1(1(0(1(3(1(2(0(1(0(1(x1)))))))))))))))))) -> 1(3(1(0(1(0(3(1(1(0(3(1(0(3(2(1(1(1(x1))))))))))))))))))
33.64/9.46	   1(3(0(3(0(0(0(1(2(2(3(2(1(1(3(0(0(3(x1)))))))))))))))))) -> 1(0(1(1(3(3(2(0(0(3(2(0(3(1(2(0(0(3(x1))))))))))))))))))
33.64/9.46	   1(3(0(3(2(3(1(3(2(0(0(3(0(2(1(0(1(2(x1)))))))))))))))))) -> 1(0(0(0(3(2(0(3(0(3(2(3(1(3(2(1(1(2(x1))))))))))))))))))
33.64/9.46	   1(3(1(0(2(2(1(1(0(0(1(1(3(0(2(1(0(0(x1)))))))))))))))))) -> 1(0(1(0(1(1(0(0(2(1(2(1(0(3(2(3(1(0(x1))))))))))))))))))
33.64/9.46	   1(3(1(1(2(1(2(0(0(2(0(2(0(2(1(2(3(0(x1)))))))))))))))))) -> 1(2(2(1(2(0(2(1(2(2(0(3(0(0(3(1(1(0(x1))))))))))))))))))
33.64/9.46	   1(3(2(3(3(3(3(1(3(0(2(2(0(2(2(1(1(3(x1)))))))))))))))))) -> 1(0(3(1(1(3(3(3(0(2(2(2(2(2(1(3(3(3(x1))))))))))))))))))
33.64/9.46	   2(0(0(1(0(3(0(3(0(0(2(2(3(3(2(3(2(3(x1)))))))))))))))))) -> 2(2(2(1(3(2(0(3(0(0(3(3(0(3(0(2(0(3(x1))))))))))))))))))
33.64/9.46	   2(0(0(1(2(3(0(1(3(2(0(0(2(2(0(3(0(0(x1)))))))))))))))))) -> 2(2(0(2(0(3(1(2(0(0(2(0(3(0(3(1(0(0(x1))))))))))))))))))
33.64/9.46	   2(0(1(2(1(2(3(1(1(1(1(1(3(0(0(1(1(1(x1)))))))))))))))))) -> 3(0(0(3(2(1(2(1(1(1(1(1(2(1(0(1(1(1(x1))))))))))))))))))
33.64/9.46	   2(0(1(2(3(2(2(0(0(3(0(2(2(3(2(3(3(2(x1)))))))))))))))))) -> 3(2(2(0(3(2(0(1(2(0(3(2(2(0(3(2(3(2(x1))))))))))))))))))
33.64/9.46	   2(0(1(3(0(1(2(0(3(2(2(3(1(3(0(1(1(3(x1)))))))))))))))))) -> 2(1(1(3(1(0(3(3(0(2(3(0(3(2(1(2(1(0(x1))))))))))))))))))
33.64/9.46	   2(0(2(0(3(3(1(3(3(0(0(1(3(2(3(1(0(2(x1)))))))))))))))))) -> 2(0(3(1(1(3(0(2(1(0(3(3(2(3(0(3(0(2(x1))))))))))))))))))
33.64/9.46	   2(0(2(1(0(0(3(0(1(3(0(3(3(2(1(1(2(0(x1)))))))))))))))))) -> 3(1(0(3(3(2(0(2(0(3(1(1(0(0(2(2(1(0(x1))))))))))))))))))
33.64/9.46	   2(0(2(3(2(1(3(2(0(2(3(1(0(1(3(0(1(1(x1)))))))))))))))))) -> 3(2(1(1(1(0(1(0(3(2(3(2(0(2(2(0(3(1(x1))))))))))))))))))
33.64/9.46	   2(1(0(0(2(1(0(2(2(1(1(3(0(0(2(0(1(3(x1)))))))))))))))))) -> 2(1(1(0(2(2(0(0(1(1(0(2(0(3(0(1(2(3(x1))))))))))))))))))
33.64/9.46	   2(1(0(0(2(2(3(2(1(2(1(3(3(3(0(3(2(3(x1)))))))))))))))))) -> 2(3(0(3(1(3(3(2(0(3(2(1(2(2(2(1(0(3(x1))))))))))))))))))
33.64/9.46	   2(1(1(0(3(2(3(2(0(0(2(1(1(2(1(3(2(3(x1)))))))))))))))))) -> 2(1(3(3(2(1(1(1(1(2(0(2(3(2(0(2(0(3(x1))))))))))))))))))
33.64/9.46	   2(1(1(3(1(0(2(3(2(1(1(3(3(3(1(0(2(3(x1)))))))))))))))))) -> 2(1(1(2(1(2(1(3(0(3(3(3(1(0(1(2(3(3(x1))))))))))))))))))
33.64/9.46	   2(1(2(1(1(1(1(3(0(0(0(0(3(1(3(3(3(2(x1)))))))))))))))))) -> 3(1(1(0(1(0(2(0(1(1(3(3(3(1(0(3(2(2(x1))))))))))))))))))
33.64/9.46	   2(1(2(1(1(3(3(3(0(2(1(0(0(1(3(3(3(3(x1)))))))))))))))))) -> 1(2(0(3(2(1(0(2(0(3(3(3(1(1(1(3(3(3(x1))))))))))))))))))
33.64/9.46	   2(1(3(3(3(2(3(0(0(2(2(2(1(0(0(0(0(1(x1)))))))))))))))))) -> 0(2(0(3(2(2(0(0(1(2(2(1(0(3(3(0(3(1(x1))))))))))))))))))
33.64/9.46	   2(2(1(3(2(1(1(2(1(1(3(0(1(2(3(2(1(1(x1)))))))))))))))))) -> 2(0(1(1(3(3(2(1(2(1(2(2(1(1(3(1(2(1(x1))))))))))))))))))
33.64/9.46	   2(2(3(0(0(2(0(0(3(2(0(1(0(0(0(2(3(0(x1)))))))))))))))))) -> 0(0(2(0(2(3(0(3(2(0(2(0(2(0(0(3(1(0(x1))))))))))))))))))
33.64/9.46	   2(2(3(0(2(2(0(0(1(3(3(2(2(3(2(0(2(0(x1)))))))))))))))))) -> 2(3(0(2(3(0(1(0(2(2(2(3(2(2(0(3(2(0(x1))))))))))))))))))
33.64/9.46	   2(2(3(3(3(1(1(3(3(0(3(1(1(0(0(0(0(3(x1)))))))))))))))))) -> 0(2(3(3(3(3(0(3(0(3(1(0(1(1(2(1(0(3(x1))))))))))))))))))
33.64/9.46	   2(3(0(0(3(2(0(2(3(3(2(0(0(2(1(2(3(2(x1)))))))))))))))))) -> 2(2(1(3(2(0(2(2(3(3(0(3(2(0(3(0(0(2(x1))))))))))))))))))
33.64/9.46	   2(3(2(1(3(3(3(0(1(1(1(1(0(0(0(0(1(0(x1)))))))))))))))))) -> 0(3(0(1(0(1(1(1(2(1(3(0(2(0(3(3(1(0(x1))))))))))))))))))
33.64/9.46	   2(3(3(1(1(3(2(0(1(3(3(2(0(2(0(2(1(1(x1)))))))))))))))))) -> 2(3(3(2(1(2(2(1(0(3(3(2(1(0(3(1(0(1(x1))))))))))))))))))
33.64/9.46	   2(3(3(3(3(0(0(0(2(1(3(0(2(3(0(0(2(3(x1)))))))))))))))))) -> 0(0(2(1(2(2(0(2(3(0(3(0(0(3(3(3(3(3(x1))))))))))))))))))
33.64/9.46	   3(0(0(0(1(1(3(3(1(2(2(3(2(3(0(2(1(3(x1)))))))))))))))))) -> 3(1(2(3(3(0(0(1(2(0(2(2(3(0(3(1(1(3(x1))))))))))))))))))
33.64/9.46	   3(0(0(0(3(0(3(2(3(3(0(2(1(2(3(2(1(3(x1)))))))))))))))))) -> 2(0(3(3(3(0(1(2(2(3(1(0(3(2(0(0(3(3(x1))))))))))))))))))
33.64/9.46	   3(0(0(1(1(2(2(3(1(1(1(2(0(1(2(0(1(1(x1)))))))))))))))))) -> 3(1(3(2(0(2(1(1(1(0(1(1(2(2(1(0(0(1(x1))))))))))))))))))
33.64/9.46	   3(0(0(1(1(2(3(3(0(0(1(1(3(0(2(2(0(0(x1)))))))))))))))))) -> 3(1(1(0(0(0(0(3(2(3(0(2(2(3(1(0(1(0(x1))))))))))))))))))
33.64/9.46	   3(0(0(1(2(0(0(0(2(3(0(0(2(0(1(3(1(3(x1)))))))))))))))))) -> 3(0(0(0(0(0(0(1(0(0(2(1(2(1(3(2(3(3(x1))))))))))))))))))
33.64/9.46	   3(0(1(3(1(3(0(1(3(0(0(1(2(1(3(3(3(3(x1)))))))))))))))))) -> 1(3(3(3(2(3(1(0(1(0(3(3(0(3(1(1(0(3(x1))))))))))))))))))
33.64/9.46	   3(0(2(0(0(3(0(3(3(2(2(1(1(1(1(3(3(3(x1)))))))))))))))))) -> 0(3(3(3(1(2(2(1(2(0(3(3(0(1(1(0(3(3(x1))))))))))))))))))
33.64/9.46	   3(0(2(1(1(3(2(2(3(0(3(1(2(3(2(1(3(1(x1)))))))))))))))))) -> 3(1(3(3(3(3(2(0(2(3(2(1(0(2(2(1(1(1(x1))))))))))))))))))
33.64/9.46	   3(0(2(3(0(0(2(3(2(3(1(1(2(3(2(3(1(3(x1)))))))))))))))))) -> 3(2(2(0(3(2(0(0(3(1(3(2(2(3(1(1(3(3(x1))))))))))))))))))
33.64/9.46	   3(1(1(2(0(2(0(2(3(1(3(3(0(0(1(3(0(0(x1)))))))))))))))))) -> 3(0(3(3(2(1(0(0(3(2(1(0(0(2(1(1(3(0(x1))))))))))))))))))
33.64/9.46	   3(1(2(0(0(1(3(1(1(2(2(2(3(0(0(3(0(1(x1)))))))))))))))))) -> 1(2(0(0(2(3(2(1(0(3(1(0(2(0(3(1(3(1(x1))))))))))))))))))
33.64/9.46	   3(1(2(3(3(0(1(3(0(0(3(3(0(3(0(2(1(3(x1)))))))))))))))))) -> 3(3(0(0(1(1(0(3(3(0(2(0(3(2(1(3(3(3(x1))))))))))))))))))
33.64/9.46	   3(1(3(1(3(3(2(2(0(2(3(1(3(2(2(0(0(3(x1)))))))))))))))))) -> 3(2(2(0(1(0(3(3(3(3(1(2(0(2(1(2(3(3(x1))))))))))))))))))
33.64/9.46	   3(1(3(2(1(1(3(2(3(2(1(3(0(0(2(3(0(3(x1)))))))))))))))))) -> 3(3(3(3(0(2(1(2(0(1(2(2(3(0(1(1(3(3(x1))))))))))))))))))
33.64/9.46	   3(1(3(3(1(3(0(0(0(0(0(2(1(2(2(3(1(0(x1)))))))))))))))))) -> 1(1(3(2(1(0(3(0(2(3(0(2(0(3(3(0(1(0(x1))))))))))))))))))
33.64/9.46	   3(2(0(1(0(2(0(0(3(1(1(2(1(3(3(2(3(3(x1)))))))))))))))))) -> 3(0(2(1(0(3(0(1(1(2(3(3(2(1(2(0(3(3(x1))))))))))))))))))
33.64/9.46	   3(2(1(1(3(0(3(0(2(3(0(0(1(1(1(3(3(0(x1)))))))))))))))))) -> 3(1(0(2(3(1(0(2(1(1(0(0(3(3(3(3(1(0(x1))))))))))))))))))
33.64/9.46	   3(2(2(3(2(1(3(2(3(1(2(0(0(3(0(0(3(2(x1)))))))))))))))))) -> 3(0(3(3(0(2(2(2(0(3(2(1(3(3(0(2(1(2(x1))))))))))))))))))
33.64/9.46	   3(2(3(0(0(3(1(0(1(1(3(0(0(3(3(2(1(1(x1)))))))))))))))))) -> 3(1(1(0(1(0(3(0(3(3(1(2(3(2(0(3(0(1(x1))))))))))))))))))
33.64/9.46	   3(2(3(3(3(3(0(1(3(2(1(0(2(3(2(3(3(3(x1)))))))))))))))))) -> 3(3(3(3(3(3(3(1(0(3(2(3(2(0(1(2(2(3(x1))))))))))))))))))
33.64/9.46	   3(3(2(2(2(3(0(2(2(3(2(3(1(3(0(2(1(3(x1)))))))))))))))))) -> 2(2(2(2(3(2(1(3(3(1(0(3(0(2(2(3(3(3(x1))))))))))))))))))
33.64/9.46	
33.64/9.46	The relative TRS consists of the following S rules:
33.64/9.46	
33.64/9.46	   0(1(2(3(x1)))) -> 0(1(2(3(x1))))
33.64/9.46	
33.64/9.46	
33.64/9.46	----------------------------------------
33.64/9.46	
33.64/9.46	(1) RelTRS S Cleaner (EQUIVALENT)
33.64/9.46	We have deleted all rules from S that have the shape t -> t:
33.64/9.46	
33.64/9.46	   0(1(2(3(x1)))) -> 0(1(2(3(x1))))
33.64/9.46	
33.64/9.46	
33.64/9.46	----------------------------------------
33.64/9.46	
33.64/9.46	(2)
33.64/9.46	Obligation:
33.64/9.46	Relative term rewrite system:
33.64/9.46	The relative TRS consists of the following R rules:
33.64/9.46	
33.64/9.46	   0(0(0(1(2(2(0(1(1(3(1(3(0(0(0(0(3(2(x1)))))))))))))))))) -> 0(0(0(3(0(1(1(0(3(2(2(3(0(1(1(0(0(2(x1))))))))))))))))))
33.64/9.46	   0(0(0(2(0(1(2(3(0(2(3(0(0(1(2(3(0(1(x1)))))))))))))))))) -> 0(2(3(0(0(3(2(1(2(0(0(0(2(3(0(1(0(1(x1))))))))))))))))))
33.64/9.46	   0(0(1(2(3(3(1(0(2(2(0(2(3(2(1(3(1(3(x1)))))))))))))))))) -> 0(3(0(1(3(3(1(2(2(2(2(1(0(2(0(1(3(3(x1))))))))))))))))))
33.64/9.46	   0(0(1(3(0(2(0(0(0(1(2(3(2(0(0(0(0(0(x1)))))))))))))))))) -> 0(0(0(0(2(0(0(0(3(1(2(1(0(2(3(0(0(0(x1))))))))))))))))))
33.64/9.46	   0(0(2(3(1(3(3(0(1(3(0(1(3(3(0(3(2(0(x1)))))))))))))))))) -> 0(3(0(2(1(3(0(1(3(3(0(3(0(3(3(1(2(0(x1))))))))))))))))))
33.64/9.46	   0(0(3(0(2(1(0(0(3(1(1(1(1(3(0(0(0(0(x1)))))))))))))))))) -> 0(0(0(1(2(3(1(3(1(0(1(0(1(0(3(0(0(0(x1))))))))))))))))))
33.64/9.46	   0(0(3(2(3(3(0(0(0(3(0(0(0(0(3(3(3(0(x1)))))))))))))))))) -> 0(2(3(0(0(3(3(0(3(0(0(0(3(3(0(0(3(0(x1))))))))))))))))))
33.64/9.46	   0(1(0(2(0(0(0(2(1(0(0(2(2(2(1(1(0(0(x1)))))))))))))))))) -> 0(1(1(0(2(0(2(2(0(0(2(2(0(1(0(1(0(0(x1))))))))))))))))))
33.64/9.46	   0(1(1(0(0(3(1(3(0(1(0(0(1(2(2(1(3(1(x1)))))))))))))))))) -> 0(1(2(3(3(0(2(0(1(1(0(3(1(0(1(1(0(1(x1))))))))))))))))))
33.64/9.46	   0(1(1(1(3(0(3(0(0(0(0(2(3(0(1(3(1(1(x1)))))))))))))))))) -> 0(1(3(1(3(0(0(1(0(3(0(3(0(2(0(1(1(1(x1))))))))))))))))))
33.64/9.46	   0(1(2(1(0(0(1(0(1(3(2(1(3(0(0(0(0(2(x1)))))))))))))))))) -> 0(1(0(0(1(0(3(2(1(1(0(0(2(0(1(0(3(2(x1))))))))))))))))))
33.64/9.46	   0(1(2(1(3(1(3(2(1(3(1(1(1(2(0(0(0(0(x1)))))))))))))))))) -> 0(1(1(1(0(3(3(1(0(1(0(3(1(2(2(2(1(0(x1))))))))))))))))))
33.64/9.46	   0(2(2(1(1(3(0(1(0(2(0(0(0(2(2(1(2(1(x1)))))))))))))))))) -> 0(2(0(2(0(2(0(1(2(1(0(2(0(2(3(1(1(1(x1))))))))))))))))))
33.64/9.46	   0(2(2(3(1(0(1(3(0(1(1(0(1(0(2(3(0(0(x1)))))))))))))))))) -> 0(2(3(0(2(0(2(1(0(3(0(1(1(3(1(0(1(0(x1))))))))))))))))))
33.64/9.46	   0(3(2(1(2(3(1(1(2(3(2(3(3(1(3(2(3(0(x1)))))))))))))))))) -> 0(1(3(1(2(3(3(3(1(2(1(2(2(2(3(3(3(0(x1))))))))))))))))))
33.64/9.46	   0(3(3(2(3(2(1(3(3(3(0(2(1(3(0(0(0(3(x1)))))))))))))))))) -> 0(3(3(0(3(2(0(3(3(2(1(0(0(3(1(2(3(3(x1))))))))))))))))))
33.64/9.46	   1(0(2(0(0(0(2(3(1(3(1(1(2(3(2(0(2(3(x1)))))))))))))))))) -> 1(0(3(1(0(2(0(3(2(1(3(2(2(0(1(2(3(0(x1))))))))))))))))))
33.64/9.46	   1(0(2(0(0(0(3(2(2(3(2(0(0(1(0(1(0(1(x1)))))))))))))))))) -> 1(0(2(2(0(1(0(2(0(3(2(0(0(1(0(3(0(1(x1))))))))))))))))))
33.64/9.46	   1(1(0(1(1(2(2(2(3(0(1(3(3(0(2(1(2(3(x1)))))))))))))))))) -> 1(1(1(0(0(2(3(1(1(2(3(2(2(2(3(1(0(3(x1))))))))))))))))))
33.64/9.46	   1(1(1(3(1(2(2(3(0(0(2(1(2(2(1(1(0(1(x1)))))))))))))))))) -> 1(0(1(1(2(2(3(1(0(1(1(0(2(2(1(2(3(1(x1))))))))))))))))))
33.64/9.46	   1(1(2(2(2(1(1(2(3(1(3(1(3(2(3(2(2(1(x1)))))))))))))))))) -> 1(1(1(2(3(2(2(2(1(3(3(2(2(1(3(1(2(1(x1))))))))))))))))))
33.64/9.46	   1(1(3(0(2(1(2(0(0(0(1(3(1(0(0(3(0(2(x1)))))))))))))))))) -> 1(0(2(0(3(1(1(0(1(0(3(3(0(2(1(0(0(2(x1))))))))))))))))))
33.64/9.46	   1(2(1(2(0(2(3(2(2(3(0(2(0(1(1(1(0(0(x1)))))))))))))))))) -> 1(2(1(2(2(0(0(2(3(1(0(1(2(2(0(3(1(0(x1))))))))))))))))))
33.64/9.46	   1(2(1(3(2(0(1(2(0(0(1(0(0(1(1(2(0(0(x1)))))))))))))))))) -> 1(0(1(1(2(0(1(0(2(1(0(1(0(2(0(3(2(0(x1))))))))))))))))))
33.64/9.46	   1(2(2(0(0(0(0(1(3(2(1(3(1(1(3(1(1(1(x1)))))))))))))))))) -> 1(2(0(3(1(1(1(3(2(0(0(2(1(1(3(1(0(1(x1))))))))))))))))))
33.64/9.46	   1(2(2(0(0(2(0(1(1(2(2(2(0(2(0(2(0(0(x1)))))))))))))))))) -> 1(0(2(0(2(0(2(2(0(1(2(0(2(0(1(2(2(0(x1))))))))))))))))))
33.64/9.46	   1(2(3(0(0(1(2(1(0(0(2(2(3(1(3(2(3(2(x1)))))))))))))))))) -> 1(2(2(3(0(3(1(2(1(0(0(3(2(1(3(0(2(2(x1))))))))))))))))))
33.64/9.46	   1(2(3(0(1(3(0(0(3(3(0(1(3(1(2(1(2(3(x1)))))))))))))))))) -> 1(0(3(2(3(0(2(1(3(1(0(3(0(3(1(2(1(3(x1))))))))))))))))))
33.64/9.46	   1(2(3(2(3(0(3(0(3(2(1(0(1(1(1(3(1(1(x1)))))))))))))))))) -> 1(1(1(1(3(3(3(2(0(3(0(3(2(2(1(0(1(1(x1))))))))))))))))))
33.64/9.46	   1(2(3(3(3(1(3(0(2(3(2(0(2(2(1(1(3(3(x1)))))))))))))))))) -> 1(2(1(3(3(2(2(0(1(0(3(1(3(3(2(2(3(3(x1))))))))))))))))))
33.64/9.46	   1(3(0(1(1(3(3(1(1(0(1(3(1(2(0(1(0(1(x1)))))))))))))))))) -> 1(3(1(0(1(0(3(1(1(0(3(1(0(3(2(1(1(1(x1))))))))))))))))))
33.64/9.46	   1(3(0(3(0(0(0(1(2(2(3(2(1(1(3(0(0(3(x1)))))))))))))))))) -> 1(0(1(1(3(3(2(0(0(3(2(0(3(1(2(0(0(3(x1))))))))))))))))))
33.64/9.46	   1(3(0(3(2(3(1(3(2(0(0(3(0(2(1(0(1(2(x1)))))))))))))))))) -> 1(0(0(0(3(2(0(3(0(3(2(3(1(3(2(1(1(2(x1))))))))))))))))))
33.64/9.46	   1(3(1(0(2(2(1(1(0(0(1(1(3(0(2(1(0(0(x1)))))))))))))))))) -> 1(0(1(0(1(1(0(0(2(1(2(1(0(3(2(3(1(0(x1))))))))))))))))))
33.64/9.46	   1(3(1(1(2(1(2(0(0(2(0(2(0(2(1(2(3(0(x1)))))))))))))))))) -> 1(2(2(1(2(0(2(1(2(2(0(3(0(0(3(1(1(0(x1))))))))))))))))))
33.64/9.46	   1(3(2(3(3(3(3(1(3(0(2(2(0(2(2(1(1(3(x1)))))))))))))))))) -> 1(0(3(1(1(3(3(3(0(2(2(2(2(2(1(3(3(3(x1))))))))))))))))))
33.64/9.46	   2(0(0(1(0(3(0(3(0(0(2(2(3(3(2(3(2(3(x1)))))))))))))))))) -> 2(2(2(1(3(2(0(3(0(0(3(3(0(3(0(2(0(3(x1))))))))))))))))))
33.64/9.46	   2(0(0(1(2(3(0(1(3(2(0(0(2(2(0(3(0(0(x1)))))))))))))))))) -> 2(2(0(2(0(3(1(2(0(0(2(0(3(0(3(1(0(0(x1))))))))))))))))))
33.64/9.46	   2(0(1(2(1(2(3(1(1(1(1(1(3(0(0(1(1(1(x1)))))))))))))))))) -> 3(0(0(3(2(1(2(1(1(1(1(1(2(1(0(1(1(1(x1))))))))))))))))))
33.64/9.46	   2(0(1(2(3(2(2(0(0(3(0(2(2(3(2(3(3(2(x1)))))))))))))))))) -> 3(2(2(0(3(2(0(1(2(0(3(2(2(0(3(2(3(2(x1))))))))))))))))))
33.64/9.46	   2(0(1(3(0(1(2(0(3(2(2(3(1(3(0(1(1(3(x1)))))))))))))))))) -> 2(1(1(3(1(0(3(3(0(2(3(0(3(2(1(2(1(0(x1))))))))))))))))))
33.64/9.46	   2(0(2(0(3(3(1(3(3(0(0(1(3(2(3(1(0(2(x1)))))))))))))))))) -> 2(0(3(1(1(3(0(2(1(0(3(3(2(3(0(3(0(2(x1))))))))))))))))))
33.64/9.46	   2(0(2(1(0(0(3(0(1(3(0(3(3(2(1(1(2(0(x1)))))))))))))))))) -> 3(1(0(3(3(2(0(2(0(3(1(1(0(0(2(2(1(0(x1))))))))))))))))))
33.64/9.46	   2(0(2(3(2(1(3(2(0(2(3(1(0(1(3(0(1(1(x1)))))))))))))))))) -> 3(2(1(1(1(0(1(0(3(2(3(2(0(2(2(0(3(1(x1))))))))))))))))))
33.64/9.46	   2(1(0(0(2(1(0(2(2(1(1(3(0(0(2(0(1(3(x1)))))))))))))))))) -> 2(1(1(0(2(2(0(0(1(1(0(2(0(3(0(1(2(3(x1))))))))))))))))))
33.64/9.46	   2(1(0(0(2(2(3(2(1(2(1(3(3(3(0(3(2(3(x1)))))))))))))))))) -> 2(3(0(3(1(3(3(2(0(3(2(1(2(2(2(1(0(3(x1))))))))))))))))))
33.64/9.46	   2(1(1(0(3(2(3(2(0(0(2(1(1(2(1(3(2(3(x1)))))))))))))))))) -> 2(1(3(3(2(1(1(1(1(2(0(2(3(2(0(2(0(3(x1))))))))))))))))))
33.64/9.46	   2(1(1(3(1(0(2(3(2(1(1(3(3(3(1(0(2(3(x1)))))))))))))))))) -> 2(1(1(2(1(2(1(3(0(3(3(3(1(0(1(2(3(3(x1))))))))))))))))))
33.64/9.46	   2(1(2(1(1(1(1(3(0(0(0(0(3(1(3(3(3(2(x1)))))))))))))))))) -> 3(1(1(0(1(0(2(0(1(1(3(3(3(1(0(3(2(2(x1))))))))))))))))))
33.64/9.46	   2(1(2(1(1(3(3(3(0(2(1(0(0(1(3(3(3(3(x1)))))))))))))))))) -> 1(2(0(3(2(1(0(2(0(3(3(3(1(1(1(3(3(3(x1))))))))))))))))))
33.64/9.46	   2(1(3(3(3(2(3(0(0(2(2(2(1(0(0(0(0(1(x1)))))))))))))))))) -> 0(2(0(3(2(2(0(0(1(2(2(1(0(3(3(0(3(1(x1))))))))))))))))))
33.64/9.46	   2(2(1(3(2(1(1(2(1(1(3(0(1(2(3(2(1(1(x1)))))))))))))))))) -> 2(0(1(1(3(3(2(1(2(1(2(2(1(1(3(1(2(1(x1))))))))))))))))))
33.64/9.46	   2(2(3(0(0(2(0(0(3(2(0(1(0(0(0(2(3(0(x1)))))))))))))))))) -> 0(0(2(0(2(3(0(3(2(0(2(0(2(0(0(3(1(0(x1))))))))))))))))))
33.64/9.46	   2(2(3(0(2(2(0(0(1(3(3(2(2(3(2(0(2(0(x1)))))))))))))))))) -> 2(3(0(2(3(0(1(0(2(2(2(3(2(2(0(3(2(0(x1))))))))))))))))))
33.64/9.46	   2(2(3(3(3(1(1(3(3(0(3(1(1(0(0(0(0(3(x1)))))))))))))))))) -> 0(2(3(3(3(3(0(3(0(3(1(0(1(1(2(1(0(3(x1))))))))))))))))))
33.64/9.46	   2(3(0(0(3(2(0(2(3(3(2(0(0(2(1(2(3(2(x1)))))))))))))))))) -> 2(2(1(3(2(0(2(2(3(3(0(3(2(0(3(0(0(2(x1))))))))))))))))))
33.64/9.46	   2(3(2(1(3(3(3(0(1(1(1(1(0(0(0(0(1(0(x1)))))))))))))))))) -> 0(3(0(1(0(1(1(1(2(1(3(0(2(0(3(3(1(0(x1))))))))))))))))))
33.64/9.46	   2(3(3(1(1(3(2(0(1(3(3(2(0(2(0(2(1(1(x1)))))))))))))))))) -> 2(3(3(2(1(2(2(1(0(3(3(2(1(0(3(1(0(1(x1))))))))))))))))))
33.64/9.46	   2(3(3(3(3(0(0(0(2(1(3(0(2(3(0(0(2(3(x1)))))))))))))))))) -> 0(0(2(1(2(2(0(2(3(0(3(0(0(3(3(3(3(3(x1))))))))))))))))))
33.64/9.46	   3(0(0(0(1(1(3(3(1(2(2(3(2(3(0(2(1(3(x1)))))))))))))))))) -> 3(1(2(3(3(0(0(1(2(0(2(2(3(0(3(1(1(3(x1))))))))))))))))))
33.64/9.46	   3(0(0(0(3(0(3(2(3(3(0(2(1(2(3(2(1(3(x1)))))))))))))))))) -> 2(0(3(3(3(0(1(2(2(3(1(0(3(2(0(0(3(3(x1))))))))))))))))))
33.64/9.46	   3(0(0(1(1(2(2(3(1(1(1(2(0(1(2(0(1(1(x1)))))))))))))))))) -> 3(1(3(2(0(2(1(1(1(0(1(1(2(2(1(0(0(1(x1))))))))))))))))))
33.64/9.46	   3(0(0(1(1(2(3(3(0(0(1(1(3(0(2(2(0(0(x1)))))))))))))))))) -> 3(1(1(0(0(0(0(3(2(3(0(2(2(3(1(0(1(0(x1))))))))))))))))))
33.64/9.46	   3(0(0(1(2(0(0(0(2(3(0(0(2(0(1(3(1(3(x1)))))))))))))))))) -> 3(0(0(0(0(0(0(1(0(0(2(1(2(1(3(2(3(3(x1))))))))))))))))))
33.64/9.46	   3(0(1(3(1(3(0(1(3(0(0(1(2(1(3(3(3(3(x1)))))))))))))))))) -> 1(3(3(3(2(3(1(0(1(0(3(3(0(3(1(1(0(3(x1))))))))))))))))))
33.64/9.46	   3(0(2(0(0(3(0(3(3(2(2(1(1(1(1(3(3(3(x1)))))))))))))))))) -> 0(3(3(3(1(2(2(1(2(0(3(3(0(1(1(0(3(3(x1))))))))))))))))))
33.64/9.46	   3(0(2(1(1(3(2(2(3(0(3(1(2(3(2(1(3(1(x1)))))))))))))))))) -> 3(1(3(3(3(3(2(0(2(3(2(1(0(2(2(1(1(1(x1))))))))))))))))))
33.64/9.46	   3(0(2(3(0(0(2(3(2(3(1(1(2(3(2(3(1(3(x1)))))))))))))))))) -> 3(2(2(0(3(2(0(0(3(1(3(2(2(3(1(1(3(3(x1))))))))))))))))))
33.64/9.46	   3(1(1(2(0(2(0(2(3(1(3(3(0(0(1(3(0(0(x1)))))))))))))))))) -> 3(0(3(3(2(1(0(0(3(2(1(0(0(2(1(1(3(0(x1))))))))))))))))))
33.64/9.46	   3(1(2(0(0(1(3(1(1(2(2(2(3(0(0(3(0(1(x1)))))))))))))))))) -> 1(2(0(0(2(3(2(1(0(3(1(0(2(0(3(1(3(1(x1))))))))))))))))))
33.64/9.46	   3(1(2(3(3(0(1(3(0(0(3(3(0(3(0(2(1(3(x1)))))))))))))))))) -> 3(3(0(0(1(1(0(3(3(0(2(0(3(2(1(3(3(3(x1))))))))))))))))))
33.64/9.46	   3(1(3(1(3(3(2(2(0(2(3(1(3(2(2(0(0(3(x1)))))))))))))))))) -> 3(2(2(0(1(0(3(3(3(3(1(2(0(2(1(2(3(3(x1))))))))))))))))))
33.64/9.46	   3(1(3(2(1(1(3(2(3(2(1(3(0(0(2(3(0(3(x1)))))))))))))))))) -> 3(3(3(3(0(2(1(2(0(1(2(2(3(0(1(1(3(3(x1))))))))))))))))))
33.64/9.46	   3(1(3(3(1(3(0(0(0(0(0(2(1(2(2(3(1(0(x1)))))))))))))))))) -> 1(1(3(2(1(0(3(0(2(3(0(2(0(3(3(0(1(0(x1))))))))))))))))))
33.64/9.46	   3(2(0(1(0(2(0(0(3(1(1(2(1(3(3(2(3(3(x1)))))))))))))))))) -> 3(0(2(1(0(3(0(1(1(2(3(3(2(1(2(0(3(3(x1))))))))))))))))))
33.64/9.46	   3(2(1(1(3(0(3(0(2(3(0(0(1(1(1(3(3(0(x1)))))))))))))))))) -> 3(1(0(2(3(1(0(2(1(1(0(0(3(3(3(3(1(0(x1))))))))))))))))))
33.64/9.46	   3(2(2(3(2(1(3(2(3(1(2(0(0(3(0(0(3(2(x1)))))))))))))))))) -> 3(0(3(3(0(2(2(2(0(3(2(1(3(3(0(2(1(2(x1))))))))))))))))))
33.64/9.46	   3(2(3(0(0(3(1(0(1(1(3(0(0(3(3(2(1(1(x1)))))))))))))))))) -> 3(1(1(0(1(0(3(0(3(3(1(2(3(2(0(3(0(1(x1))))))))))))))))))
33.64/9.46	   3(2(3(3(3(3(0(1(3(2(1(0(2(3(2(3(3(3(x1)))))))))))))))))) -> 3(3(3(3(3(3(3(1(0(3(2(3(2(0(1(2(2(3(x1))))))))))))))))))
33.64/9.46	   3(3(2(2(2(3(0(2(2(3(2(3(1(3(0(2(1(3(x1)))))))))))))))))) -> 2(2(2(2(3(2(1(3(3(1(0(3(0(2(2(3(3(3(x1))))))))))))))))))
33.64/9.46	
33.64/9.46	S is empty.
33.64/9.46	
33.64/9.46	----------------------------------------
33.64/9.46	
33.64/9.46	(3) SIsEmptyProof (EQUIVALENT)
33.64/9.46	The TRS S is empty. Hence, termination of R/S is equivalent to termination of R.
33.64/9.46	----------------------------------------
33.64/9.46	
33.64/9.46	(4)
33.64/9.46	Obligation:
33.64/9.46	Q restricted rewrite system:
33.64/9.46	The TRS R consists of the following rules:
33.64/9.46	
33.64/9.46	   0(0(0(1(2(2(0(1(1(3(1(3(0(0(0(0(3(2(x1)))))))))))))))))) -> 0(0(0(3(0(1(1(0(3(2(2(3(0(1(1(0(0(2(x1))))))))))))))))))
33.64/9.46	   0(0(0(2(0(1(2(3(0(2(3(0(0(1(2(3(0(1(x1)))))))))))))))))) -> 0(2(3(0(0(3(2(1(2(0(0(0(2(3(0(1(0(1(x1))))))))))))))))))
33.64/9.46	   0(0(1(2(3(3(1(0(2(2(0(2(3(2(1(3(1(3(x1)))))))))))))))))) -> 0(3(0(1(3(3(1(2(2(2(2(1(0(2(0(1(3(3(x1))))))))))))))))))
33.64/9.46	   0(0(1(3(0(2(0(0(0(1(2(3(2(0(0(0(0(0(x1)))))))))))))))))) -> 0(0(0(0(2(0(0(0(3(1(2(1(0(2(3(0(0(0(x1))))))))))))))))))
33.64/9.46	   0(0(2(3(1(3(3(0(1(3(0(1(3(3(0(3(2(0(x1)))))))))))))))))) -> 0(3(0(2(1(3(0(1(3(3(0(3(0(3(3(1(2(0(x1))))))))))))))))))
33.64/9.46	   0(0(3(0(2(1(0(0(3(1(1(1(1(3(0(0(0(0(x1)))))))))))))))))) -> 0(0(0(1(2(3(1(3(1(0(1(0(1(0(3(0(0(0(x1))))))))))))))))))
33.64/9.46	   0(0(3(2(3(3(0(0(0(3(0(0(0(0(3(3(3(0(x1)))))))))))))))))) -> 0(2(3(0(0(3(3(0(3(0(0(0(3(3(0(0(3(0(x1))))))))))))))))))
33.64/9.46	   0(1(0(2(0(0(0(2(1(0(0(2(2(2(1(1(0(0(x1)))))))))))))))))) -> 0(1(1(0(2(0(2(2(0(0(2(2(0(1(0(1(0(0(x1))))))))))))))))))
33.64/9.46	   0(1(1(0(0(3(1(3(0(1(0(0(1(2(2(1(3(1(x1)))))))))))))))))) -> 0(1(2(3(3(0(2(0(1(1(0(3(1(0(1(1(0(1(x1))))))))))))))))))
33.64/9.46	   0(1(1(1(3(0(3(0(0(0(0(2(3(0(1(3(1(1(x1)))))))))))))))))) -> 0(1(3(1(3(0(0(1(0(3(0(3(0(2(0(1(1(1(x1))))))))))))))))))
33.64/9.46	   0(1(2(1(0(0(1(0(1(3(2(1(3(0(0(0(0(2(x1)))))))))))))))))) -> 0(1(0(0(1(0(3(2(1(1(0(0(2(0(1(0(3(2(x1))))))))))))))))))
33.64/9.46	   0(1(2(1(3(1(3(2(1(3(1(1(1(2(0(0(0(0(x1)))))))))))))))))) -> 0(1(1(1(0(3(3(1(0(1(0(3(1(2(2(2(1(0(x1))))))))))))))))))
33.64/9.46	   0(2(2(1(1(3(0(1(0(2(0(0(0(2(2(1(2(1(x1)))))))))))))))))) -> 0(2(0(2(0(2(0(1(2(1(0(2(0(2(3(1(1(1(x1))))))))))))))))))
33.64/9.46	   0(2(2(3(1(0(1(3(0(1(1(0(1(0(2(3(0(0(x1)))))))))))))))))) -> 0(2(3(0(2(0(2(1(0(3(0(1(1(3(1(0(1(0(x1))))))))))))))))))
33.64/9.46	   0(3(2(1(2(3(1(1(2(3(2(3(3(1(3(2(3(0(x1)))))))))))))))))) -> 0(1(3(1(2(3(3(3(1(2(1(2(2(2(3(3(3(0(x1))))))))))))))))))
33.64/9.46	   0(3(3(2(3(2(1(3(3(3(0(2(1(3(0(0(0(3(x1)))))))))))))))))) -> 0(3(3(0(3(2(0(3(3(2(1(0(0(3(1(2(3(3(x1))))))))))))))))))
33.64/9.46	   1(0(2(0(0(0(2(3(1(3(1(1(2(3(2(0(2(3(x1)))))))))))))))))) -> 1(0(3(1(0(2(0(3(2(1(3(2(2(0(1(2(3(0(x1))))))))))))))))))
33.64/9.46	   1(0(2(0(0(0(3(2(2(3(2(0(0(1(0(1(0(1(x1)))))))))))))))))) -> 1(0(2(2(0(1(0(2(0(3(2(0(0(1(0(3(0(1(x1))))))))))))))))))
33.64/9.46	   1(1(0(1(1(2(2(2(3(0(1(3(3(0(2(1(2(3(x1)))))))))))))))))) -> 1(1(1(0(0(2(3(1(1(2(3(2(2(2(3(1(0(3(x1))))))))))))))))))
33.64/9.46	   1(1(1(3(1(2(2(3(0(0(2(1(2(2(1(1(0(1(x1)))))))))))))))))) -> 1(0(1(1(2(2(3(1(0(1(1(0(2(2(1(2(3(1(x1))))))))))))))))))
33.64/9.46	   1(1(2(2(2(1(1(2(3(1(3(1(3(2(3(2(2(1(x1)))))))))))))))))) -> 1(1(1(2(3(2(2(2(1(3(3(2(2(1(3(1(2(1(x1))))))))))))))))))
33.64/9.46	   1(1(3(0(2(1(2(0(0(0(1(3(1(0(0(3(0(2(x1)))))))))))))))))) -> 1(0(2(0(3(1(1(0(1(0(3(3(0(2(1(0(0(2(x1))))))))))))))))))
33.64/9.46	   1(2(1(2(0(2(3(2(2(3(0(2(0(1(1(1(0(0(x1)))))))))))))))))) -> 1(2(1(2(2(0(0(2(3(1(0(1(2(2(0(3(1(0(x1))))))))))))))))))
33.64/9.46	   1(2(1(3(2(0(1(2(0(0(1(0(0(1(1(2(0(0(x1)))))))))))))))))) -> 1(0(1(1(2(0(1(0(2(1(0(1(0(2(0(3(2(0(x1))))))))))))))))))
33.64/9.46	   1(2(2(0(0(0(0(1(3(2(1(3(1(1(3(1(1(1(x1)))))))))))))))))) -> 1(2(0(3(1(1(1(3(2(0(0(2(1(1(3(1(0(1(x1))))))))))))))))))
33.64/9.46	   1(2(2(0(0(2(0(1(1(2(2(2(0(2(0(2(0(0(x1)))))))))))))))))) -> 1(0(2(0(2(0(2(2(0(1(2(0(2(0(1(2(2(0(x1))))))))))))))))))
33.64/9.46	   1(2(3(0(0(1(2(1(0(0(2(2(3(1(3(2(3(2(x1)))))))))))))))))) -> 1(2(2(3(0(3(1(2(1(0(0(3(2(1(3(0(2(2(x1))))))))))))))))))
33.64/9.46	   1(2(3(0(1(3(0(0(3(3(0(1(3(1(2(1(2(3(x1)))))))))))))))))) -> 1(0(3(2(3(0(2(1(3(1(0(3(0(3(1(2(1(3(x1))))))))))))))))))
33.64/9.46	   1(2(3(2(3(0(3(0(3(2(1(0(1(1(1(3(1(1(x1)))))))))))))))))) -> 1(1(1(1(3(3(3(2(0(3(0(3(2(2(1(0(1(1(x1))))))))))))))))))
33.64/9.46	   1(2(3(3(3(1(3(0(2(3(2(0(2(2(1(1(3(3(x1)))))))))))))))))) -> 1(2(1(3(3(2(2(0(1(0(3(1(3(3(2(2(3(3(x1))))))))))))))))))
33.64/9.46	   1(3(0(1(1(3(3(1(1(0(1(3(1(2(0(1(0(1(x1)))))))))))))))))) -> 1(3(1(0(1(0(3(1(1(0(3(1(0(3(2(1(1(1(x1))))))))))))))))))
33.64/9.46	   1(3(0(3(0(0(0(1(2(2(3(2(1(1(3(0(0(3(x1)))))))))))))))))) -> 1(0(1(1(3(3(2(0(0(3(2(0(3(1(2(0(0(3(x1))))))))))))))))))
33.64/9.46	   1(3(0(3(2(3(1(3(2(0(0(3(0(2(1(0(1(2(x1)))))))))))))))))) -> 1(0(0(0(3(2(0(3(0(3(2(3(1(3(2(1(1(2(x1))))))))))))))))))
33.64/9.46	   1(3(1(0(2(2(1(1(0(0(1(1(3(0(2(1(0(0(x1)))))))))))))))))) -> 1(0(1(0(1(1(0(0(2(1(2(1(0(3(2(3(1(0(x1))))))))))))))))))
33.64/9.46	   1(3(1(1(2(1(2(0(0(2(0(2(0(2(1(2(3(0(x1)))))))))))))))))) -> 1(2(2(1(2(0(2(1(2(2(0(3(0(0(3(1(1(0(x1))))))))))))))))))
33.64/9.46	   1(3(2(3(3(3(3(1(3(0(2(2(0(2(2(1(1(3(x1)))))))))))))))))) -> 1(0(3(1(1(3(3(3(0(2(2(2(2(2(1(3(3(3(x1))))))))))))))))))
33.64/9.46	   2(0(0(1(0(3(0(3(0(0(2(2(3(3(2(3(2(3(x1)))))))))))))))))) -> 2(2(2(1(3(2(0(3(0(0(3(3(0(3(0(2(0(3(x1))))))))))))))))))
33.64/9.46	   2(0(0(1(2(3(0(1(3(2(0(0(2(2(0(3(0(0(x1)))))))))))))))))) -> 2(2(0(2(0(3(1(2(0(0(2(0(3(0(3(1(0(0(x1))))))))))))))))))
33.64/9.46	   2(0(1(2(1(2(3(1(1(1(1(1(3(0(0(1(1(1(x1)))))))))))))))))) -> 3(0(0(3(2(1(2(1(1(1(1(1(2(1(0(1(1(1(x1))))))))))))))))))
33.64/9.46	   2(0(1(2(3(2(2(0(0(3(0(2(2(3(2(3(3(2(x1)))))))))))))))))) -> 3(2(2(0(3(2(0(1(2(0(3(2(2(0(3(2(3(2(x1))))))))))))))))))
33.64/9.46	   2(0(1(3(0(1(2(0(3(2(2(3(1(3(0(1(1(3(x1)))))))))))))))))) -> 2(1(1(3(1(0(3(3(0(2(3(0(3(2(1(2(1(0(x1))))))))))))))))))
33.64/9.46	   2(0(2(0(3(3(1(3(3(0(0(1(3(2(3(1(0(2(x1)))))))))))))))))) -> 2(0(3(1(1(3(0(2(1(0(3(3(2(3(0(3(0(2(x1))))))))))))))))))
33.64/9.46	   2(0(2(1(0(0(3(0(1(3(0(3(3(2(1(1(2(0(x1)))))))))))))))))) -> 3(1(0(3(3(2(0(2(0(3(1(1(0(0(2(2(1(0(x1))))))))))))))))))
33.64/9.46	   2(0(2(3(2(1(3(2(0(2(3(1(0(1(3(0(1(1(x1)))))))))))))))))) -> 3(2(1(1(1(0(1(0(3(2(3(2(0(2(2(0(3(1(x1))))))))))))))))))
33.64/9.46	   2(1(0(0(2(1(0(2(2(1(1(3(0(0(2(0(1(3(x1)))))))))))))))))) -> 2(1(1(0(2(2(0(0(1(1(0(2(0(3(0(1(2(3(x1))))))))))))))))))
33.64/9.46	   2(1(0(0(2(2(3(2(1(2(1(3(3(3(0(3(2(3(x1)))))))))))))))))) -> 2(3(0(3(1(3(3(2(0(3(2(1(2(2(2(1(0(3(x1))))))))))))))))))
33.64/9.46	   2(1(1(0(3(2(3(2(0(0(2(1(1(2(1(3(2(3(x1)))))))))))))))))) -> 2(1(3(3(2(1(1(1(1(2(0(2(3(2(0(2(0(3(x1))))))))))))))))))
33.64/9.46	   2(1(1(3(1(0(2(3(2(1(1(3(3(3(1(0(2(3(x1)))))))))))))))))) -> 2(1(1(2(1(2(1(3(0(3(3(3(1(0(1(2(3(3(x1))))))))))))))))))
33.64/9.46	   2(1(2(1(1(1(1(3(0(0(0(0(3(1(3(3(3(2(x1)))))))))))))))))) -> 3(1(1(0(1(0(2(0(1(1(3(3(3(1(0(3(2(2(x1))))))))))))))))))
33.64/9.46	   2(1(2(1(1(3(3(3(0(2(1(0(0(1(3(3(3(3(x1)))))))))))))))))) -> 1(2(0(3(2(1(0(2(0(3(3(3(1(1(1(3(3(3(x1))))))))))))))))))
33.64/9.46	   2(1(3(3(3(2(3(0(0(2(2(2(1(0(0(0(0(1(x1)))))))))))))))))) -> 0(2(0(3(2(2(0(0(1(2(2(1(0(3(3(0(3(1(x1))))))))))))))))))
33.64/9.46	   2(2(1(3(2(1(1(2(1(1(3(0(1(2(3(2(1(1(x1)))))))))))))))))) -> 2(0(1(1(3(3(2(1(2(1(2(2(1(1(3(1(2(1(x1))))))))))))))))))
33.64/9.46	   2(2(3(0(0(2(0(0(3(2(0(1(0(0(0(2(3(0(x1)))))))))))))))))) -> 0(0(2(0(2(3(0(3(2(0(2(0(2(0(0(3(1(0(x1))))))))))))))))))
33.64/9.46	   2(2(3(0(2(2(0(0(1(3(3(2(2(3(2(0(2(0(x1)))))))))))))))))) -> 2(3(0(2(3(0(1(0(2(2(2(3(2(2(0(3(2(0(x1))))))))))))))))))
33.64/9.46	   2(2(3(3(3(1(1(3(3(0(3(1(1(0(0(0(0(3(x1)))))))))))))))))) -> 0(2(3(3(3(3(0(3(0(3(1(0(1(1(2(1(0(3(x1))))))))))))))))))
33.64/9.46	   2(3(0(0(3(2(0(2(3(3(2(0(0(2(1(2(3(2(x1)))))))))))))))))) -> 2(2(1(3(2(0(2(2(3(3(0(3(2(0(3(0(0(2(x1))))))))))))))))))
33.64/9.46	   2(3(2(1(3(3(3(0(1(1(1(1(0(0(0(0(1(0(x1)))))))))))))))))) -> 0(3(0(1(0(1(1(1(2(1(3(0(2(0(3(3(1(0(x1))))))))))))))))))
33.64/9.46	   2(3(3(1(1(3(2(0(1(3(3(2(0(2(0(2(1(1(x1)))))))))))))))))) -> 2(3(3(2(1(2(2(1(0(3(3(2(1(0(3(1(0(1(x1))))))))))))))))))
33.64/9.46	   2(3(3(3(3(0(0(0(2(1(3(0(2(3(0(0(2(3(x1)))))))))))))))))) -> 0(0(2(1(2(2(0(2(3(0(3(0(0(3(3(3(3(3(x1))))))))))))))))))
33.64/9.46	   3(0(0(0(1(1(3(3(1(2(2(3(2(3(0(2(1(3(x1)))))))))))))))))) -> 3(1(2(3(3(0(0(1(2(0(2(2(3(0(3(1(1(3(x1))))))))))))))))))
33.64/9.46	   3(0(0(0(3(0(3(2(3(3(0(2(1(2(3(2(1(3(x1)))))))))))))))))) -> 2(0(3(3(3(0(1(2(2(3(1(0(3(2(0(0(3(3(x1))))))))))))))))))
33.64/9.46	   3(0(0(1(1(2(2(3(1(1(1(2(0(1(2(0(1(1(x1)))))))))))))))))) -> 3(1(3(2(0(2(1(1(1(0(1(1(2(2(1(0(0(1(x1))))))))))))))))))
33.64/9.46	   3(0(0(1(1(2(3(3(0(0(1(1(3(0(2(2(0(0(x1)))))))))))))))))) -> 3(1(1(0(0(0(0(3(2(3(0(2(2(3(1(0(1(0(x1))))))))))))))))))
33.64/9.46	   3(0(0(1(2(0(0(0(2(3(0(0(2(0(1(3(1(3(x1)))))))))))))))))) -> 3(0(0(0(0(0(0(1(0(0(2(1(2(1(3(2(3(3(x1))))))))))))))))))
33.64/9.46	   3(0(1(3(1(3(0(1(3(0(0(1(2(1(3(3(3(3(x1)))))))))))))))))) -> 1(3(3(3(2(3(1(0(1(0(3(3(0(3(1(1(0(3(x1))))))))))))))))))
33.64/9.46	   3(0(2(0(0(3(0(3(3(2(2(1(1(1(1(3(3(3(x1)))))))))))))))))) -> 0(3(3(3(1(2(2(1(2(0(3(3(0(1(1(0(3(3(x1))))))))))))))))))
33.64/9.46	   3(0(2(1(1(3(2(2(3(0(3(1(2(3(2(1(3(1(x1)))))))))))))))))) -> 3(1(3(3(3(3(2(0(2(3(2(1(0(2(2(1(1(1(x1))))))))))))))))))
33.64/9.46	   3(0(2(3(0(0(2(3(2(3(1(1(2(3(2(3(1(3(x1)))))))))))))))))) -> 3(2(2(0(3(2(0(0(3(1(3(2(2(3(1(1(3(3(x1))))))))))))))))))
33.64/9.46	   3(1(1(2(0(2(0(2(3(1(3(3(0(0(1(3(0(0(x1)))))))))))))))))) -> 3(0(3(3(2(1(0(0(3(2(1(0(0(2(1(1(3(0(x1))))))))))))))))))
33.64/9.46	   3(1(2(0(0(1(3(1(1(2(2(2(3(0(0(3(0(1(x1)))))))))))))))))) -> 1(2(0(0(2(3(2(1(0(3(1(0(2(0(3(1(3(1(x1))))))))))))))))))
33.64/9.46	   3(1(2(3(3(0(1(3(0(0(3(3(0(3(0(2(1(3(x1)))))))))))))))))) -> 3(3(0(0(1(1(0(3(3(0(2(0(3(2(1(3(3(3(x1))))))))))))))))))
33.64/9.46	   3(1(3(1(3(3(2(2(0(2(3(1(3(2(2(0(0(3(x1)))))))))))))))))) -> 3(2(2(0(1(0(3(3(3(3(1(2(0(2(1(2(3(3(x1))))))))))))))))))
33.64/9.46	   3(1(3(2(1(1(3(2(3(2(1(3(0(0(2(3(0(3(x1)))))))))))))))))) -> 3(3(3(3(0(2(1(2(0(1(2(2(3(0(1(1(3(3(x1))))))))))))))))))
33.64/9.46	   3(1(3(3(1(3(0(0(0(0(0(2(1(2(2(3(1(0(x1)))))))))))))))))) -> 1(1(3(2(1(0(3(0(2(3(0(2(0(3(3(0(1(0(x1))))))))))))))))))
33.64/9.46	   3(2(0(1(0(2(0(0(3(1(1(2(1(3(3(2(3(3(x1)))))))))))))))))) -> 3(0(2(1(0(3(0(1(1(2(3(3(2(1(2(0(3(3(x1))))))))))))))))))
33.64/9.46	   3(2(1(1(3(0(3(0(2(3(0(0(1(1(1(3(3(0(x1)))))))))))))))))) -> 3(1(0(2(3(1(0(2(1(1(0(0(3(3(3(3(1(0(x1))))))))))))))))))
33.64/9.46	   3(2(2(3(2(1(3(2(3(1(2(0(0(3(0(0(3(2(x1)))))))))))))))))) -> 3(0(3(3(0(2(2(2(0(3(2(1(3(3(0(2(1(2(x1))))))))))))))))))
33.64/9.46	   3(2(3(0(0(3(1(0(1(1(3(0(0(3(3(2(1(1(x1)))))))))))))))))) -> 3(1(1(0(1(0(3(0(3(3(1(2(3(2(0(3(0(1(x1))))))))))))))))))
33.64/9.46	   3(2(3(3(3(3(0(1(3(2(1(0(2(3(2(3(3(3(x1)))))))))))))))))) -> 3(3(3(3(3(3(3(1(0(3(2(3(2(0(1(2(2(3(x1))))))))))))))))))
33.64/9.46	   3(3(2(2(2(3(0(2(2(3(2(3(1(3(0(2(1(3(x1)))))))))))))))))) -> 2(2(2(2(3(2(1(3(3(1(0(3(0(2(2(3(3(3(x1))))))))))))))))))
33.64/9.46	
33.64/9.46	Q is empty.
33.64/9.46	
33.64/9.46	----------------------------------------
33.64/9.46	
33.64/9.46	(5) QTRS Reverse (EQUIVALENT)
33.64/9.46	We applied the QTRS Reverse Processor [REVERSE].
33.64/9.46	----------------------------------------
33.64/9.46	
33.64/9.46	(6)
33.64/9.46	Obligation:
33.64/9.46	Q restricted rewrite system:
33.64/9.46	The TRS R consists of the following rules:
33.64/9.46	
33.64/9.46	   2(3(0(0(0(0(3(1(3(1(1(0(2(2(1(0(0(0(x1)))))))))))))))))) -> 2(0(0(1(1(0(3(2(2(3(0(1(1(0(3(0(0(0(x1))))))))))))))))))
33.64/9.46	   1(0(3(2(1(0(0(3(2(0(3(2(1(0(2(0(0(0(x1)))))))))))))))))) -> 1(0(1(0(3(2(0(0(0(2(1(2(3(0(0(3(2(0(x1))))))))))))))))))
33.64/9.46	   3(1(3(1(2(3(2(0(2(2(0(1(3(3(2(1(0(0(x1)))))))))))))))))) -> 3(3(1(0(2(0(1(2(2(2(2(1(3(3(1(0(3(0(x1))))))))))))))))))
33.64/9.46	   0(0(0(0(0(2(3(2(1(0(0(0(2(0(3(1(0(0(x1)))))))))))))))))) -> 0(0(0(3(2(0(1(2(1(3(0(0(0(2(0(0(0(0(x1))))))))))))))))))
33.64/9.46	   0(2(3(0(3(3(1(0(3(1(0(3(3(1(3(2(0(0(x1)))))))))))))))))) -> 0(2(1(3(3(0(3(0(3(3(1(0(3(1(2(0(3(0(x1))))))))))))))))))
33.64/9.46	   0(0(0(0(3(1(1(1(1(3(0(0(1(2(0(3(0(0(x1)))))))))))))))))) -> 0(0(0(3(0(1(0(1(0(1(3(1(3(2(1(0(0(0(x1))))))))))))))))))
33.64/9.46	   0(3(3(3(0(0(0(0(3(0(0(0(3(3(2(3(0(0(x1)))))))))))))))))) -> 0(3(0(0(3(3(0(0(0(3(0(3(3(0(0(3(2(0(x1))))))))))))))))))
33.64/9.46	   0(0(1(1(2(2(2(0(0(1(2(0(0(0(2(0(1(0(x1)))))))))))))))))) -> 0(0(1(0(1(0(2(2(0(0(2(2(0(2(0(1(1(0(x1))))))))))))))))))
33.64/9.46	   1(3(1(2(2(1(0(0(1(0(3(1(3(0(0(1(1(0(x1)))))))))))))))))) -> 1(0(1(1(0(1(3(0(1(1(0(2(0(3(3(2(1(0(x1))))))))))))))))))
33.64/9.46	   1(1(3(1(0(3(2(0(0(0(0(3(0(3(1(1(1(0(x1)))))))))))))))))) -> 1(1(1(0(2(0(3(0(3(0(1(0(0(3(1(3(1(0(x1))))))))))))))))))
33.64/9.46	   2(0(0(0(0(3(1(2(3(1(0(1(0(0(1(2(1(0(x1)))))))))))))))))) -> 2(3(0(1(0(2(0(0(1(1(2(3(0(1(0(0(1(0(x1))))))))))))))))))
33.64/9.46	   0(0(0(0(2(1(1(1(3(1(2(3(1(3(1(2(1(0(x1)))))))))))))))))) -> 0(1(2(2(2(1(3(0(1(0(1(3(3(0(1(1(1(0(x1))))))))))))))))))
33.64/9.46	   1(2(1(2(2(0(0(0(2(0(1(0(3(1(1(2(2(0(x1)))))))))))))))))) -> 1(1(1(3(2(0(2(0(1(2(1(0(2(0(2(0(2(0(x1))))))))))))))))))
33.64/9.46	   0(0(3(2(0(1(0(1(1(0(3(1(0(1(3(2(2(0(x1)))))))))))))))))) -> 0(1(0(1(3(1(1(0(3(0(1(2(0(2(0(3(2(0(x1))))))))))))))))))
33.64/9.46	   0(3(2(3(1(3(3(2(3(2(1(1(3(2(1(2(3(0(x1)))))))))))))))))) -> 0(3(3(3(2(2(2(1(2(1(3(3(3(2(1(3(1(0(x1))))))))))))))))))
33.64/9.46	   3(0(0(0(3(1(2(0(3(3(3(1(2(3(2(3(3(0(x1)))))))))))))))))) -> 3(3(2(1(3(0(0(1(2(3(3(0(2(3(0(3(3(0(x1))))))))))))))))))
33.64/9.46	   3(2(0(2(3(2(1(1(3(1(3(2(0(0(0(2(0(1(x1)))))))))))))))))) -> 0(3(2(1(0(2(2(3(1(2(3(0(2(0(1(3(0(1(x1))))))))))))))))))
33.64/9.46	   1(0(1(0(1(0(0(2(3(2(2(3(0(0(0(2(0(1(x1)))))))))))))))))) -> 1(0(3(0(1(0(0(2(3(0(2(0(1(0(2(2(0(1(x1))))))))))))))))))
33.64/9.46	   3(2(1(2(0(3(3(1(0(3(2(2(2(1(1(0(1(1(x1)))))))))))))))))) -> 3(0(1(3(2(2(2(3(2(1(1(3(2(0(0(1(1(1(x1))))))))))))))))))
33.64/9.46	   1(0(1(1(2(2(1(2(0(0(3(2(2(1(3(1(1(1(x1)))))))))))))))))) -> 1(3(2(1(2(2(0(1(1(0(1(3(2(2(1(1(0(1(x1))))))))))))))))))
33.64/9.46	   1(2(2(3(2(3(1(3(1(3(2(1(1(2(2(2(1(1(x1)))))))))))))))))) -> 1(2(1(3(1(2(2(3(3(1(2(2(2(3(2(1(1(1(x1))))))))))))))))))
33.64/9.46	   2(0(3(0(0(1(3(1(0(0(0(2(1(2(0(3(1(1(x1)))))))))))))))))) -> 2(0(0(1(2(0(3(3(0(1(0(1(1(3(0(2(0(1(x1))))))))))))))))))
33.64/9.46	   0(0(1(1(1(0(2(0(3(2(2(3(2(0(2(1(2(1(x1)))))))))))))))))) -> 0(1(3(0(2(2(1(0(1(3(2(0(0(2(2(1(2(1(x1))))))))))))))))))
33.64/9.46	   0(0(2(1(1(0(0(1(0(0(2(1(0(2(3(1(2(1(x1)))))))))))))))))) -> 0(2(3(0(2(0(1(0(1(2(0(1(0(2(1(1(0(1(x1))))))))))))))))))
33.64/9.46	   1(1(1(3(1(1(3(1(2(3(1(0(0(0(0(2(2(1(x1)))))))))))))))))) -> 1(0(1(3(1(1(2(0(0(2(3(1(1(1(3(0(2(1(x1))))))))))))))))))
33.64/9.46	   0(0(2(0(2(0(2(2(2(1(1(0(2(0(0(2(2(1(x1)))))))))))))))))) -> 0(2(2(1(0(2(0(2(1(0(2(2(0(2(0(2(0(1(x1))))))))))))))))))
33.64/9.46	   2(3(2(3(1(3(2(2(0(0(1(2(1(0(0(3(2(1(x1)))))))))))))))))) -> 2(2(0(3(1(2(3(0(0(1(2(1(3(0(3(2(2(1(x1))))))))))))))))))
33.64/9.46	   3(2(1(2(1(3(1(0(3(3(0(0(3(1(0(3(2(1(x1)))))))))))))))))) -> 3(1(2(1(3(0(3(0(1(3(1(2(0(3(2(3(0(1(x1))))))))))))))))))
33.64/9.46	   1(1(3(1(1(1(0(1(2(3(0(3(0(3(2(3(2(1(x1)))))))))))))))))) -> 1(1(0(1(2(2(3(0(3(0(2(3(3(3(1(1(1(1(x1))))))))))))))))))
33.64/9.46	   3(3(1(1(2(2(0(2(3(2(0(3(1(3(3(3(2(1(x1)))))))))))))))))) -> 3(3(2(2(3(3(1(3(0(1(0(2(2(3(3(1(2(1(x1))))))))))))))))))
33.64/9.46	   1(0(1(0(2(1(3(1(0(1(1(3(3(1(1(0(3(1(x1)))))))))))))))))) -> 1(1(1(2(3(0(1(3(0(1(1(3(0(1(0(1(3(1(x1))))))))))))))))))
33.64/9.46	   3(0(0(3(1(1(2(3(2(2(1(0(0(0(3(0(3(1(x1)))))))))))))))))) -> 3(0(0(2(1(3(0(2(3(0(0(2(3(3(1(1(0(1(x1))))))))))))))))))
33.64/9.46	   2(1(0(1(2(0(3(0(0(2(3(1(3(2(3(0(3(1(x1)))))))))))))))))) -> 2(1(1(2(3(1(3(2(3(0(3(0(2(3(0(0(0(1(x1))))))))))))))))))
33.64/9.46	   0(0(1(2(0(3(1(1(0(0(1(1(2(2(0(1(3(1(x1)))))))))))))))))) -> 0(1(3(2(3(0(1(2(1(2(0(0(1(1(0(1(0(1(x1))))))))))))))))))
33.64/9.46	   0(3(2(1(2(0(2(0(2(0(0(2(1(2(1(1(3(1(x1)))))))))))))))))) -> 0(1(1(3(0(0(3(0(2(2(1(2(0(2(1(2(2(1(x1))))))))))))))))))
33.64/9.46	   3(1(1(2(2(0(2(2(0(3(1(3(3(3(3(2(3(1(x1)))))))))))))))))) -> 3(3(3(1(2(2(2(2(2(0(3(3(3(1(1(3(0(1(x1))))))))))))))))))
33.64/9.46	   3(2(3(2(3(3(2(2(0(0(3(0(3(0(1(0(0(2(x1)))))))))))))))))) -> 3(0(2(0(3(0(3(3(0(0(3(0(2(3(1(2(2(2(x1))))))))))))))))))
33.64/9.46	   0(0(3(0(2(2(0(0(2(3(1(0(3(2(1(0(0(2(x1)))))))))))))))))) -> 0(0(1(3(0(3(0(2(0(0(2(1(3(0(2(0(2(2(x1))))))))))))))))))
33.64/9.46	   1(1(1(0(0(3(1(1(1(1(1(3(2(1(2(1(0(2(x1)))))))))))))))))) -> 1(1(1(0(1(2(1(1(1(1(1(2(1(2(3(0(0(3(x1))))))))))))))))))
33.64/9.46	   2(3(3(2(3(2(2(0(3(0(0(2(2(3(2(1(0(2(x1)))))))))))))))))) -> 2(3(2(3(0(2(2(3(0(2(1(0(2(3(0(2(2(3(x1))))))))))))))))))
33.64/9.46	   3(1(1(0(3(1(3(2(2(3(0(2(1(0(3(1(0(2(x1)))))))))))))))))) -> 0(1(2(1(2(3(0(3(2(0(3(3(0(1(3(1(1(2(x1))))))))))))))))))
33.64/9.46	   2(0(1(3(2(3(1(0(0(3(3(1(3(3(0(2(0(2(x1)))))))))))))))))) -> 2(0(3(0(3(2(3(3(0(1(2(0(3(1(1(3(0(2(x1))))))))))))))))))
33.64/9.46	   0(2(1(1(2(3(3(0(3(1(0(3(0(0(1(2(0(2(x1)))))))))))))))))) -> 0(1(2(2(0(0(1(1(3(0(2(0(2(3(3(0(1(3(x1))))))))))))))))))
33.64/9.46	   1(1(0(3(1(0(1(3(2(0(2(3(1(2(3(2(0(2(x1)))))))))))))))))) -> 1(3(0(2(2(0(2(3(2(3(0(1(0(1(1(1(2(3(x1))))))))))))))))))
33.64/9.46	   3(1(0(2(0(0(3(1(1(2(2(0(1(2(0(0(1(2(x1)))))))))))))))))) -> 3(2(1(0(3(0(2(0(1(1(0(0(2(2(0(1(1(2(x1))))))))))))))))))
33.64/9.46	   3(2(3(0(3(3(3(1(2(1(2(3(2(2(0(0(1(2(x1)))))))))))))))))) -> 3(0(1(2(2(2(1(2(3(0(2(3(3(1(3(0(3(2(x1))))))))))))))))))
33.64/9.46	   3(2(3(1(2(1(1(2(0(0(2(3(2(3(0(1(1(2(x1)))))))))))))))))) -> 3(0(2(0(2(3(2(0(2(1(1(1(1(2(3(3(1(2(x1))))))))))))))))))
33.64/9.46	   3(2(0(1(3(3(3(1(1(2(3(2(0(1(3(1(1(2(x1)))))))))))))))))) -> 3(3(2(1(0(1(3(3(3(0(3(1(2(1(2(1(1(2(x1))))))))))))))))))
33.64/9.46	   2(3(3(3(1(3(0(0(0(0(3(1(1(1(1(2(1(2(x1)))))))))))))))))) -> 2(2(3(0(1(3(3(3(1(1(0(2(0(1(0(1(1(3(x1))))))))))))))))))
33.64/9.46	   3(3(3(3(1(0(0(1(2(0(3(3(3(1(1(2(1(2(x1)))))))))))))))))) -> 3(3(3(1(1(1(3(3(3(0(2(0(1(2(3(0(2(1(x1))))))))))))))))))
33.64/9.46	   1(0(0(0(0(1(2(2(2(0(0(3(2(3(3(3(1(2(x1)))))))))))))))))) -> 1(3(0(3(3(0(1(2(2(1(0(0(2(2(3(0(2(0(x1))))))))))))))))))
33.64/9.46	   1(1(2(3(2(1(0(3(1(1(2(1(1(2(3(1(2(2(x1)))))))))))))))))) -> 1(2(1(3(1(1(2(2(1(2(1(2(3(3(1(1(0(2(x1))))))))))))))))))
33.64/9.46	   0(3(2(0(0(0(1(0(2(3(0(0(2(0(0(3(2(2(x1)))))))))))))))))) -> 0(1(3(0(0(2(0(2(0(2(3(0(3(2(0(2(0(0(x1))))))))))))))))))
33.64/9.46	   0(2(0(2(3(2(2(3(3(1(0(0(2(2(0(3(2(2(x1)))))))))))))))))) -> 0(2(3(0(2(2(3(2(2(2(0(1(0(3(2(0(3(2(x1))))))))))))))))))
33.64/9.46	   3(0(0(0(0(1(1(3(0(3(3(1(1(3(3(3(2(2(x1)))))))))))))))))) -> 3(0(1(2(1(1(0(1(3(0(3(0(3(3(3(3(2(0(x1))))))))))))))))))
33.64/9.46	   2(3(2(1(2(0(0(2(3(3(2(0(2(3(0(0(3(2(x1)))))))))))))))))) -> 2(0(0(3(0(2(3(0(3(3(2(2(0(2(3(1(2(2(x1))))))))))))))))))
33.64/9.46	   0(1(0(0(0(0(1(1(1(1(0(3(3(3(1(2(3(2(x1)))))))))))))))))) -> 0(1(3(3(0(2(0(3(1(2(1(1(1(0(1(0(3(0(x1))))))))))))))))))
33.64/9.46	   1(1(2(0(2(0(2(3(3(1(0(2(3(1(1(3(3(2(x1)))))))))))))))))) -> 1(0(1(3(0(1(2(3(3(0(1(2(2(1(2(3(3(2(x1))))))))))))))))))
33.64/9.46	   3(2(0(0(3(2(0(3(1(2(0(0(0(3(3(3(3(2(x1)))))))))))))))))) -> 3(3(3(3(3(0(0(3(0(3(2(0(2(2(1(2(0(0(x1))))))))))))))))))
33.64/9.46	   3(1(2(0(3(2(3(2(2(1(3(3(1(1(0(0(0(3(x1)))))))))))))))))) -> 3(1(1(3(0(3(2(2(0(2(1(0(0(3(3(2(1(3(x1))))))))))))))))))
33.64/9.46	   3(1(2(3(2(1(2(0(3(3(2(3(0(3(0(0(0(3(x1)))))))))))))))))) -> 3(3(0(0(2(3(0(1(3(2(2(1(0(3(3(3(0(2(x1))))))))))))))))))
33.64/9.46	   1(1(0(2(1(0(2(1(1(1(3(2(2(1(1(0(0(3(x1)))))))))))))))))) -> 1(0(0(1(2(2(1(1(0(1(1(1(2(0(2(3(1(3(x1))))))))))))))))))
33.64/9.46	   0(0(2(2(0(3(1(1(0(0(3(3(2(1(1(0(0(3(x1)))))))))))))))))) -> 0(1(0(1(3(2(2(0(3(2(3(0(0(0(0(1(1(3(x1))))))))))))))))))
33.64/9.46	   3(1(3(1(0(2(0(0(3(2(0(0(0(2(1(0(0(3(x1)))))))))))))))))) -> 3(3(2(3(1(2(1(2(0(0(1(0(0(0(0(0(0(3(x1))))))))))))))))))
33.64/9.46	   3(3(3(3(1(2(1(0(0(3(1(0(3(1(3(1(0(3(x1)))))))))))))))))) -> 3(0(1(1(3(0(3(3(0(1(0(1(3(2(3(3(3(1(x1))))))))))))))))))
33.64/9.46	   3(3(3(1(1(1(1(2(2(3(3(0(3(0(0(2(0(3(x1)))))))))))))))))) -> 3(3(0(1(1(0(3(3(0(2(1(2(2(1(3(3(3(0(x1))))))))))))))))))
33.64/9.46	   1(3(1(2(3(2(1(3(0(3(2(2(3(1(1(2(0(3(x1)))))))))))))))))) -> 1(1(1(2(2(0(1(2(3(2(0(2(3(3(3(3(1(3(x1))))))))))))))))))
33.64/9.46	   3(1(3(2(3(2(1(1(3(2(3(2(0(0(3(2(0(3(x1)))))))))))))))))) -> 3(3(1(1(3(2(2(3(1(3(0(0(2(3(0(2(2(3(x1))))))))))))))))))
33.64/9.46	   0(0(3(1(0(0(3(3(1(3(2(0(2(0(2(1(1(3(x1)))))))))))))))))) -> 0(3(1(1(2(0(0(1(2(3(0(0(1(2(3(3(0(3(x1))))))))))))))))))
33.64/9.46	   1(0(3(0(0(3(2(2(2(1(1(3(1(0(0(2(1(3(x1)))))))))))))))))) -> 1(3(1(3(0(2(0(1(3(0(1(2(3(2(0(0(2(1(x1))))))))))))))))))
33.64/9.46	   3(1(2(0(3(0(3(3(0(0(3(1(0(3(3(2(1(3(x1)))))))))))))))))) -> 3(3(3(1(2(3(0(2(0(3(3(0(1(1(0(0(3(3(x1))))))))))))))))))
33.64/9.46	   3(0(0(2(2(3(1(3(2(0(2(2(3(3(1(3(1(3(x1)))))))))))))))))) -> 3(3(2(1(2(0(2(1(3(3(3(3(0(1(0(2(2(3(x1))))))))))))))))))
33.64/9.46	   3(0(3(2(0(0(3(1(2(3(2(3(1(1(2(3(1(3(x1)))))))))))))))))) -> 3(3(1(1(0(3(2(2(1(0(2(1(2(0(3(3(3(3(x1))))))))))))))))))
33.64/9.46	   0(1(3(2(2(1(2(0(0(0(0(0(3(1(3(3(1(3(x1)))))))))))))))))) -> 0(1(0(3(3(0(2(0(3(2(0(3(0(1(2(3(1(1(x1))))))))))))))))))
33.64/9.46	   3(3(2(3(3(1(2(1(1(3(0(0(2(0(1(0(2(3(x1)))))))))))))))))) -> 3(3(0(2(1(2(3(3(2(1(1(0(3(0(1(2(0(3(x1))))))))))))))))))
33.64/9.46	   0(3(3(1(1(1(0(0(3(2(0(3(0(3(1(1(2(3(x1)))))))))))))))))) -> 0(1(3(3(3(3(0(0(1(1(2(0(1(3(2(0(1(3(x1))))))))))))))))))
33.64/9.46	   2(3(0(0(3(0(0(2(1(3(2(3(1(2(3(2(2(3(x1)))))))))))))))))) -> 2(1(2(0(3(3(1(2(3(0(2(2(2(0(3(3(0(3(x1))))))))))))))))))
33.64/9.46	   1(1(2(3(3(0(0(3(1(1(0(1(3(0(0(3(2(3(x1)))))))))))))))))) -> 1(0(3(0(2(3(2(1(3(3(0(3(0(1(0(1(1(3(x1))))))))))))))))))
33.64/9.46	   3(3(3(2(3(2(0(1(2(3(1(0(3(3(3(3(2(3(x1)))))))))))))))))) -> 3(2(2(1(0(2(3(2(3(0(1(3(3(3(3(3(3(3(x1))))))))))))))))))
33.64/9.46	   3(1(2(0(3(1(3(2(3(2(2(0(3(2(2(2(3(3(x1)))))))))))))))))) -> 3(3(3(2(2(0(3(0(1(3(3(1(2(3(2(2(2(2(x1))))))))))))))))))
33.64/9.46	
33.64/9.46	Q is empty.
33.64/9.46	
33.64/9.46	----------------------------------------
33.64/9.46	
33.64/9.46	(7) FlatCCProof (EQUIVALENT)
33.64/9.46	We used flat context closure [ROOTLAB]
33.64/9.46	As Q is empty the flat context closure was sound AND complete.
33.64/9.46	
33.64/9.46	----------------------------------------
33.64/9.46	
33.64/9.46	(8)
33.64/9.46	Obligation:
33.64/9.46	Q restricted rewrite system:
33.64/9.46	The TRS R consists of the following rules:
33.64/9.46	
33.64/9.46	   2(3(0(0(0(0(3(1(3(1(1(0(2(2(1(0(0(0(x1)))))))))))))))))) -> 2(0(0(1(1(0(3(2(2(3(0(1(1(0(3(0(0(0(x1))))))))))))))))))
33.64/9.46	   1(0(3(2(1(0(0(3(2(0(3(2(1(0(2(0(0(0(x1)))))))))))))))))) -> 1(0(1(0(3(2(0(0(0(2(1(2(3(0(0(3(2(0(x1))))))))))))))))))
33.64/9.48	   3(1(3(1(2(3(2(0(2(2(0(1(3(3(2(1(0(0(x1)))))))))))))))))) -> 3(3(1(0(2(0(1(2(2(2(2(1(3(3(1(0(3(0(x1))))))))))))))))))
33.64/9.48	   0(0(0(0(0(2(3(2(1(0(0(0(2(0(3(1(0(0(x1)))))))))))))))))) -> 0(0(0(3(2(0(1(2(1(3(0(0(0(2(0(0(0(0(x1))))))))))))))))))
33.64/9.48	   0(2(3(0(3(3(1(0(3(1(0(3(3(1(3(2(0(0(x1)))))))))))))))))) -> 0(2(1(3(3(0(3(0(3(3(1(0(3(1(2(0(3(0(x1))))))))))))))))))
33.64/9.48	   0(0(0(0(3(1(1(1(1(3(0(0(1(2(0(3(0(0(x1)))))))))))))))))) -> 0(0(0(3(0(1(0(1(0(1(3(1(3(2(1(0(0(0(x1))))))))))))))))))
33.64/9.48	   0(3(3(3(0(0(0(0(3(0(0(0(3(3(2(3(0(0(x1)))))))))))))))))) -> 0(3(0(0(3(3(0(0(0(3(0(3(3(0(0(3(2(0(x1))))))))))))))))))
33.64/9.48	   0(0(1(1(2(2(2(0(0(1(2(0(0(0(2(0(1(0(x1)))))))))))))))))) -> 0(0(1(0(1(0(2(2(0(0(2(2(0(2(0(1(1(0(x1))))))))))))))))))
33.64/9.48	   1(3(1(2(2(1(0(0(1(0(3(1(3(0(0(1(1(0(x1)))))))))))))))))) -> 1(0(1(1(0(1(3(0(1(1(0(2(0(3(3(2(1(0(x1))))))))))))))))))
33.64/9.48	   1(1(3(1(0(3(2(0(0(0(0(3(0(3(1(1(1(0(x1)))))))))))))))))) -> 1(1(1(0(2(0(3(0(3(0(1(0(0(3(1(3(1(0(x1))))))))))))))))))
33.64/9.48	   2(0(0(0(0(3(1(2(3(1(0(1(0(0(1(2(1(0(x1)))))))))))))))))) -> 2(3(0(1(0(2(0(0(1(1(2(3(0(1(0(0(1(0(x1))))))))))))))))))
33.64/9.48	   0(0(0(0(2(1(1(1(3(1(2(3(1(3(1(2(1(0(x1)))))))))))))))))) -> 0(1(2(2(2(1(3(0(1(0(1(3(3(0(1(1(1(0(x1))))))))))))))))))
33.64/9.48	   1(2(1(2(2(0(0(0(2(0(1(0(3(1(1(2(2(0(x1)))))))))))))))))) -> 1(1(1(3(2(0(2(0(1(2(1(0(2(0(2(0(2(0(x1))))))))))))))))))
33.64/9.48	   0(0(3(2(0(1(0(1(1(0(3(1(0(1(3(2(2(0(x1)))))))))))))))))) -> 0(1(0(1(3(1(1(0(3(0(1(2(0(2(0(3(2(0(x1))))))))))))))))))
33.64/9.48	   0(3(2(3(1(3(3(2(3(2(1(1(3(2(1(2(3(0(x1)))))))))))))))))) -> 0(3(3(3(2(2(2(1(2(1(3(3(3(2(1(3(1(0(x1))))))))))))))))))
33.64/9.48	   3(0(0(0(3(1(2(0(3(3(3(1(2(3(2(3(3(0(x1)))))))))))))))))) -> 3(3(2(1(3(0(0(1(2(3(3(0(2(3(0(3(3(0(x1))))))))))))))))))
33.64/9.48	   1(0(1(0(1(0(0(2(3(2(2(3(0(0(0(2(0(1(x1)))))))))))))))))) -> 1(0(3(0(1(0(0(2(3(0(2(0(1(0(2(2(0(1(x1))))))))))))))))))
33.64/9.48	   3(2(1(2(0(3(3(1(0(3(2(2(2(1(1(0(1(1(x1)))))))))))))))))) -> 3(0(1(3(2(2(2(3(2(1(1(3(2(0(0(1(1(1(x1))))))))))))))))))
33.64/9.48	   1(0(1(1(2(2(1(2(0(0(3(2(2(1(3(1(1(1(x1)))))))))))))))))) -> 1(3(2(1(2(2(0(1(1(0(1(3(2(2(1(1(0(1(x1))))))))))))))))))
33.64/9.48	   1(2(2(3(2(3(1(3(1(3(2(1(1(2(2(2(1(1(x1)))))))))))))))))) -> 1(2(1(3(1(2(2(3(3(1(2(2(2(3(2(1(1(1(x1))))))))))))))))))
33.64/9.48	   2(0(3(0(0(1(3(1(0(0(0(2(1(2(0(3(1(1(x1)))))))))))))))))) -> 2(0(0(1(2(0(3(3(0(1(0(1(1(3(0(2(0(1(x1))))))))))))))))))
33.64/9.48	   0(0(1(1(1(0(2(0(3(2(2(3(2(0(2(1(2(1(x1)))))))))))))))))) -> 0(1(3(0(2(2(1(0(1(3(2(0(0(2(2(1(2(1(x1))))))))))))))))))
33.64/9.48	   0(0(2(1(1(0(0(1(0(0(2(1(0(2(3(1(2(1(x1)))))))))))))))))) -> 0(2(3(0(2(0(1(0(1(2(0(1(0(2(1(1(0(1(x1))))))))))))))))))
33.64/9.48	   1(1(1(3(1(1(3(1(2(3(1(0(0(0(0(2(2(1(x1)))))))))))))))))) -> 1(0(1(3(1(1(2(0(0(2(3(1(1(1(3(0(2(1(x1))))))))))))))))))
33.64/9.48	   0(0(2(0(2(0(2(2(2(1(1(0(2(0(0(2(2(1(x1)))))))))))))))))) -> 0(2(2(1(0(2(0(2(1(0(2(2(0(2(0(2(0(1(x1))))))))))))))))))
33.64/9.48	   2(3(2(3(1(3(2(2(0(0(1(2(1(0(0(3(2(1(x1)))))))))))))))))) -> 2(2(0(3(1(2(3(0(0(1(2(1(3(0(3(2(2(1(x1))))))))))))))))))
33.64/9.48	   3(2(1(2(1(3(1(0(3(3(0(0(3(1(0(3(2(1(x1)))))))))))))))))) -> 3(1(2(1(3(0(3(0(1(3(1(2(0(3(2(3(0(1(x1))))))))))))))))))
33.64/9.48	   1(1(3(1(1(1(0(1(2(3(0(3(0(3(2(3(2(1(x1)))))))))))))))))) -> 1(1(0(1(2(2(3(0(3(0(2(3(3(3(1(1(1(1(x1))))))))))))))))))
33.64/9.48	   3(3(1(1(2(2(0(2(3(2(0(3(1(3(3(3(2(1(x1)))))))))))))))))) -> 3(3(2(2(3(3(1(3(0(1(0(2(2(3(3(1(2(1(x1))))))))))))))))))
33.64/9.48	   1(0(1(0(2(1(3(1(0(1(1(3(3(1(1(0(3(1(x1)))))))))))))))))) -> 1(1(1(2(3(0(1(3(0(1(1(3(0(1(0(1(3(1(x1))))))))))))))))))
33.64/9.48	   3(0(0(3(1(1(2(3(2(2(1(0(0(0(3(0(3(1(x1)))))))))))))))))) -> 3(0(0(2(1(3(0(2(3(0(0(2(3(3(1(1(0(1(x1))))))))))))))))))
33.64/9.48	   2(1(0(1(2(0(3(0(0(2(3(1(3(2(3(0(3(1(x1)))))))))))))))))) -> 2(1(1(2(3(1(3(2(3(0(3(0(2(3(0(0(0(1(x1))))))))))))))))))
33.64/9.48	   0(0(1(2(0(3(1(1(0(0(1(1(2(2(0(1(3(1(x1)))))))))))))))))) -> 0(1(3(2(3(0(1(2(1(2(0(0(1(1(0(1(0(1(x1))))))))))))))))))
33.64/9.48	   0(3(2(1(2(0(2(0(2(0(0(2(1(2(1(1(3(1(x1)))))))))))))))))) -> 0(1(1(3(0(0(3(0(2(2(1(2(0(2(1(2(2(1(x1))))))))))))))))))
33.64/9.48	   3(1(1(2(2(0(2(2(0(3(1(3(3(3(3(2(3(1(x1)))))))))))))))))) -> 3(3(3(1(2(2(2(2(2(0(3(3(3(1(1(3(0(1(x1))))))))))))))))))
33.64/9.48	   3(2(3(2(3(3(2(2(0(0(3(0(3(0(1(0(0(2(x1)))))))))))))))))) -> 3(0(2(0(3(0(3(3(0(0(3(0(2(3(1(2(2(2(x1))))))))))))))))))
33.64/9.48	   0(0(3(0(2(2(0(0(2(3(1(0(3(2(1(0(0(2(x1)))))))))))))))))) -> 0(0(1(3(0(3(0(2(0(0(2(1(3(0(2(0(2(2(x1))))))))))))))))))
33.64/9.48	   1(1(1(0(0(3(1(1(1(1(1(3(2(1(2(1(0(2(x1)))))))))))))))))) -> 1(1(1(0(1(2(1(1(1(1(1(2(1(2(3(0(0(3(x1))))))))))))))))))
33.64/9.48	   2(3(3(2(3(2(2(0(3(0(0(2(2(3(2(1(0(2(x1)))))))))))))))))) -> 2(3(2(3(0(2(2(3(0(2(1(0(2(3(0(2(2(3(x1))))))))))))))))))
33.64/9.48	   2(0(1(3(2(3(1(0(0(3(3(1(3(3(0(2(0(2(x1)))))))))))))))))) -> 2(0(3(0(3(2(3(3(0(1(2(0(3(1(1(3(0(2(x1))))))))))))))))))
33.64/9.48	   0(2(1(1(2(3(3(0(3(1(0(3(0(0(1(2(0(2(x1)))))))))))))))))) -> 0(1(2(2(0(0(1(1(3(0(2(0(2(3(3(0(1(3(x1))))))))))))))))))
33.64/9.48	   1(1(0(3(1(0(1(3(2(0(2(3(1(2(3(2(0(2(x1)))))))))))))))))) -> 1(3(0(2(2(0(2(3(2(3(0(1(0(1(1(1(2(3(x1))))))))))))))))))
33.64/9.48	   3(1(0(2(0(0(3(1(1(2(2(0(1(2(0(0(1(2(x1)))))))))))))))))) -> 3(2(1(0(3(0(2(0(1(1(0(0(2(2(0(1(1(2(x1))))))))))))))))))
33.64/9.48	   3(2(3(0(3(3(3(1(2(1(2(3(2(2(0(0(1(2(x1)))))))))))))))))) -> 3(0(1(2(2(2(1(2(3(0(2(3(3(1(3(0(3(2(x1))))))))))))))))))
33.64/9.48	   3(2(3(1(2(1(1(2(0(0(2(3(2(3(0(1(1(2(x1)))))))))))))))))) -> 3(0(2(0(2(3(2(0(2(1(1(1(1(2(3(3(1(2(x1))))))))))))))))))
33.64/9.48	   3(2(0(1(3(3(3(1(1(2(3(2(0(1(3(1(1(2(x1)))))))))))))))))) -> 3(3(2(1(0(1(3(3(3(0(3(1(2(1(2(1(1(2(x1))))))))))))))))))
33.64/9.48	   2(3(3(3(1(3(0(0(0(0(3(1(1(1(1(2(1(2(x1)))))))))))))))))) -> 2(2(3(0(1(3(3(3(1(1(0(2(0(1(0(1(1(3(x1))))))))))))))))))
33.64/9.48	   3(3(3(3(1(0(0(1(2(0(3(3(3(1(1(2(1(2(x1)))))))))))))))))) -> 3(3(3(1(1(1(3(3(3(0(2(0(1(2(3(0(2(1(x1))))))))))))))))))
33.64/9.48	   1(0(0(0(0(1(2(2(2(0(0(3(2(3(3(3(1(2(x1)))))))))))))))))) -> 1(3(0(3(3(0(1(2(2(1(0(0(2(2(3(0(2(0(x1))))))))))))))))))
33.64/9.48	   1(1(2(3(2(1(0(3(1(1(2(1(1(2(3(1(2(2(x1)))))))))))))))))) -> 1(2(1(3(1(1(2(2(1(2(1(2(3(3(1(1(0(2(x1))))))))))))))))))
33.64/9.48	   0(3(2(0(0(0(1(0(2(3(0(0(2(0(0(3(2(2(x1)))))))))))))))))) -> 0(1(3(0(0(2(0(2(0(2(3(0(3(2(0(2(0(0(x1))))))))))))))))))
33.64/9.48	   0(2(0(2(3(2(2(3(3(1(0(0(2(2(0(3(2(2(x1)))))))))))))))))) -> 0(2(3(0(2(2(3(2(2(2(0(1(0(3(2(0(3(2(x1))))))))))))))))))
33.64/9.48	   3(0(0(0(0(1(1(3(0(3(3(1(1(3(3(3(2(2(x1)))))))))))))))))) -> 3(0(1(2(1(1(0(1(3(0(3(0(3(3(3(3(2(0(x1))))))))))))))))))
33.64/9.48	   2(3(2(1(2(0(0(2(3(3(2(0(2(3(0(0(3(2(x1)))))))))))))))))) -> 2(0(0(3(0(2(3(0(3(3(2(2(0(2(3(1(2(2(x1))))))))))))))))))
33.64/9.48	   0(1(0(0(0(0(1(1(1(1(0(3(3(3(1(2(3(2(x1)))))))))))))))))) -> 0(1(3(3(0(2(0(3(1(2(1(1(1(0(1(0(3(0(x1))))))))))))))))))
33.64/9.48	   1(1(2(0(2(0(2(3(3(1(0(2(3(1(1(3(3(2(x1)))))))))))))))))) -> 1(0(1(3(0(1(2(3(3(0(1(2(2(1(2(3(3(2(x1))))))))))))))))))
33.64/9.48	   3(2(0(0(3(2(0(3(1(2(0(0(0(3(3(3(3(2(x1)))))))))))))))))) -> 3(3(3(3(3(0(0(3(0(3(2(0(2(2(1(2(0(0(x1))))))))))))))))))
33.64/9.48	   3(1(2(0(3(2(3(2(2(1(3(3(1(1(0(0(0(3(x1)))))))))))))))))) -> 3(1(1(3(0(3(2(2(0(2(1(0(0(3(3(2(1(3(x1))))))))))))))))))
33.64/9.48	   3(1(2(3(2(1(2(0(3(3(2(3(0(3(0(0(0(3(x1)))))))))))))))))) -> 3(3(0(0(2(3(0(1(3(2(2(1(0(3(3(3(0(2(x1))))))))))))))))))
33.64/9.48	   1(1(0(2(1(0(2(1(1(1(3(2(2(1(1(0(0(3(x1)))))))))))))))))) -> 1(0(0(1(2(2(1(1(0(1(1(1(2(0(2(3(1(3(x1))))))))))))))))))
33.64/9.48	   0(0(2(2(0(3(1(1(0(0(3(3(2(1(1(0(0(3(x1)))))))))))))))))) -> 0(1(0(1(3(2(2(0(3(2(3(0(0(0(0(1(1(3(x1))))))))))))))))))
33.64/9.48	   3(1(3(1(0(2(0(0(3(2(0(0(0(2(1(0(0(3(x1)))))))))))))))))) -> 3(3(2(3(1(2(1(2(0(0(1(0(0(0(0(0(0(3(x1))))))))))))))))))
33.64/9.48	   3(3(3(3(1(2(1(0(0(3(1(0(3(1(3(1(0(3(x1)))))))))))))))))) -> 3(0(1(1(3(0(3(3(0(1(0(1(3(2(3(3(3(1(x1))))))))))))))))))
33.64/9.48	   3(3(3(1(1(1(1(2(2(3(3(0(3(0(0(2(0(3(x1)))))))))))))))))) -> 3(3(0(1(1(0(3(3(0(2(1(2(2(1(3(3(3(0(x1))))))))))))))))))
33.64/9.48	   1(3(1(2(3(2(1(3(0(3(2(2(3(1(1(2(0(3(x1)))))))))))))))))) -> 1(1(1(2(2(0(1(2(3(2(0(2(3(3(3(3(1(3(x1))))))))))))))))))
33.64/9.48	   3(1(3(2(3(2(1(1(3(2(3(2(0(0(3(2(0(3(x1)))))))))))))))))) -> 3(3(1(1(3(2(2(3(1(3(0(0(2(3(0(2(2(3(x1))))))))))))))))))
33.64/9.48	   0(0(3(1(0(0(3(3(1(3(2(0(2(0(2(1(1(3(x1)))))))))))))))))) -> 0(3(1(1(2(0(0(1(2(3(0(0(1(2(3(3(0(3(x1))))))))))))))))))
33.64/9.48	   1(0(3(0(0(3(2(2(2(1(1(3(1(0(0(2(1(3(x1)))))))))))))))))) -> 1(3(1(3(0(2(0(1(3(0(1(2(3(2(0(0(2(1(x1))))))))))))))))))
33.64/9.48	   3(1(2(0(3(0(3(3(0(0(3(1(0(3(3(2(1(3(x1)))))))))))))))))) -> 3(3(3(1(2(3(0(2(0(3(3(0(1(1(0(0(3(3(x1))))))))))))))))))
33.64/9.48	   3(0(0(2(2(3(1(3(2(0(2(2(3(3(1(3(1(3(x1)))))))))))))))))) -> 3(3(2(1(2(0(2(1(3(3(3(3(0(1(0(2(2(3(x1))))))))))))))))))
33.64/9.48	   3(0(3(2(0(0(3(1(2(3(2(3(1(1(2(3(1(3(x1)))))))))))))))))) -> 3(3(1(1(0(3(2(2(1(0(2(1(2(0(3(3(3(3(x1))))))))))))))))))
33.64/9.48	   0(1(3(2(2(1(2(0(0(0(0(0(3(1(3(3(1(3(x1)))))))))))))))))) -> 0(1(0(3(3(0(2(0(3(2(0(3(0(1(2(3(1(1(x1))))))))))))))))))
33.64/9.48	   3(3(2(3(3(1(2(1(1(3(0(0(2(0(1(0(2(3(x1)))))))))))))))))) -> 3(3(0(2(1(2(3(3(2(1(1(0(3(0(1(2(0(3(x1))))))))))))))))))
33.64/9.48	   0(3(3(1(1(1(0(0(3(2(0(3(0(3(1(1(2(3(x1)))))))))))))))))) -> 0(1(3(3(3(3(0(0(1(1(2(0(1(3(2(0(1(3(x1))))))))))))))))))
33.64/9.48	   2(3(0(0(3(0(0(2(1(3(2(3(1(2(3(2(2(3(x1)))))))))))))))))) -> 2(1(2(0(3(3(1(2(3(0(2(2(2(0(3(3(0(3(x1))))))))))))))))))
33.64/9.48	   1(1(2(3(3(0(0(3(1(1(0(1(3(0(0(3(2(3(x1)))))))))))))))))) -> 1(0(3(0(2(3(2(1(3(3(0(3(0(1(0(1(1(3(x1))))))))))))))))))
33.64/9.48	   3(3(3(2(3(2(0(1(2(3(1(0(3(3(3(3(2(3(x1)))))))))))))))))) -> 3(2(2(1(0(2(3(2(3(0(1(3(3(3(3(3(3(3(x1))))))))))))))))))
33.64/9.48	   3(1(2(0(3(1(3(2(3(2(2(0(3(2(2(2(3(3(x1)))))))))))))))))) -> 3(3(3(2(2(0(3(0(1(3(3(1(2(3(2(2(2(2(x1))))))))))))))))))
33.64/9.48	   2(3(2(0(2(3(2(1(1(3(1(3(2(0(0(0(2(0(1(x1))))))))))))))))))) -> 2(0(3(2(1(0(2(2(3(1(2(3(0(2(0(1(3(0(1(x1)))))))))))))))))))
33.64/9.48	   3(3(2(0(2(3(2(1(1(3(1(3(2(0(0(0(2(0(1(x1))))))))))))))))))) -> 3(0(3(2(1(0(2(2(3(1(2(3(0(2(0(1(3(0(1(x1)))))))))))))))))))
33.64/9.48	   0(3(2(0(2(3(2(1(1(3(1(3(2(0(0(0(2(0(1(x1))))))))))))))))))) -> 0(0(3(2(1(0(2(2(3(1(2(3(0(2(0(1(3(0(1(x1)))))))))))))))))))
33.64/9.48	   1(3(2(0(2(3(2(1(1(3(1(3(2(0(0(0(2(0(1(x1))))))))))))))))))) -> 1(0(3(2(1(0(2(2(3(1(2(3(0(2(0(1(3(0(1(x1)))))))))))))))))))
33.64/9.48	   2(3(1(1(0(3(1(3(2(2(3(0(2(1(0(3(1(0(2(x1))))))))))))))))))) -> 2(0(1(2(1(2(3(0(3(2(0(3(3(0(1(3(1(1(2(x1)))))))))))))))))))
33.64/9.48	   3(3(1(1(0(3(1(3(2(2(3(0(2(1(0(3(1(0(2(x1))))))))))))))))))) -> 3(0(1(2(1(2(3(0(3(2(0(3(3(0(1(3(1(1(2(x1)))))))))))))))))))
33.64/9.48	   0(3(1(1(0(3(1(3(2(2(3(0(2(1(0(3(1(0(2(x1))))))))))))))))))) -> 0(0(1(2(1(2(3(0(3(2(0(3(3(0(1(3(1(1(2(x1)))))))))))))))))))
33.64/9.48	   1(3(1(1(0(3(1(3(2(2(3(0(2(1(0(3(1(0(2(x1))))))))))))))))))) -> 1(0(1(2(1(2(3(0(3(2(0(3(3(0(1(3(1(1(2(x1)))))))))))))))))))
33.64/9.48	
33.64/9.48	Q is empty.
33.64/9.48	
33.64/9.48	----------------------------------------
33.64/9.48	
33.64/9.48	(9) RootLabelingProof (EQUIVALENT)
33.64/9.48	We used plain root labeling [ROOTLAB] with the following heuristic:
33.64/9.48	LabelAll: All function symbols get labeled
33.64/9.48	
33.64/9.48	As Q is empty the root labeling was sound AND complete.
33.64/9.48	
33.64/9.48	----------------------------------------
33.64/9.48	
33.64/9.48	(10)
33.64/9.48	Obligation:
33.64/9.48	Q restricted rewrite system:
33.64/9.48	The TRS R consists of the following rules:
33.64/9.48	
33.64/9.48	   2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(x1))))))))))))))))))
33.64/9.48	   2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(x1))))))))))))))))))
33.64/9.48	   2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(x1))))))))))))))))))
33.64/9.48	   2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(x1))))))))))))))))))
33.64/9.48	   0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(x1))))))))))))))))))
33.64/9.48	   0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(x1))))))))))))))))))
33.64/9.48	   0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(x1))))))))))))))))))
33.64/9.48	   0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(x1))))))))))))))))))
33.64/9.48	   0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1))))))))))))))))))
33.64/9.48	   0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1))))))))))))))))))
33.64/9.48	   0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1))))))))))))))))))
33.64/9.48	   0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1))))))))))))))))))
33.64/9.48	   1_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(x1))))))))))))))))))
33.64/9.48	   1_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(x1))))))))))))))))))
33.64/9.48	   1_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(x1))))))))))))))))))
33.64/9.48	   1_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{1_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(x1))))))))))))))))))
33.64/9.48	   2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1))))))))))))))))))
33.64/9.48	   2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1))))))))))))))))))
33.64/9.48	   2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1))))))))))))))))))
33.64/9.48	   2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1))))))))))))))))))
33.64/9.48	   1_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(x1))))))))))))))))))
33.64/9.48	   1_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(x1))))))))))))))))))
33.64/9.48	   1_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(x1))))))))))))))))))
33.64/9.48	   1_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1))))))))))))))))))
33.64/9.48	   0_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(x1))))))))))))))))))
33.64/9.48	   0_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(x1))))))))))))))))))
33.64/9.48	   0_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(x1))))))))))))))))))
33.64/9.48	   0_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))
33.64/9.48	   1_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(x1))))))))))))))))))
33.64/9.48	   1_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(x1))))))))))))))))))
33.64/9.48	   1_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(x1))))))))))))))))))
33.64/9.48	   1_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(x1))))))))))))))))))
33.64/9.48	   2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))
33.64/9.48	   2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))
33.64/9.48	   2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))
33.64/9.48	   2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))
33.64/9.48	   2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(x1))))))))))))))))))
33.64/9.48	   2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(x1))))))))))))))))))
33.64/9.48	   2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(x1))))))))))))))))))
33.64/9.48	   2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 3_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 3_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 3_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 3_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))
33.64/9.48	   2_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))
33.64/9.48	   2_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))
33.64/9.48	   2_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))
33.64/9.48	   2_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))
33.64/9.48	   0_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(x1))))))))))))))))))
33.64/9.48	   0_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(x1))))))))))))))))))
33.64/9.48	   0_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(x1))))))))))))))))))
33.64/9.48	   0_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{2_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1))))))))))))))))))
33.64/9.48	   2_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(x1))))))))))))))))))
33.64/9.48	   2_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(x1))))))))))))))))))
33.64/9.48	   2_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(x1))))))))))))))))))
33.64/9.48	   2_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(x1))))))))))))))))))
33.64/9.48	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))
33.64/9.48	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))
33.64/9.48	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))
33.64/9.48	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))
33.64/9.48	   0_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(x1))))))))))))))))))
33.64/9.48	   0_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(x1))))))))))))))))))
33.64/9.48	   0_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(x1))))))))))))))))))
33.64/9.48	   0_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 3_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 3_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 3_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 3_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1))))))))))))))))))
33.64/9.48	   2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(x1))))))))))))))))))
33.64/9.48	   2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(x1))))))))))))))))))
33.64/9.48	   2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(x1))))))))))))))))))
33.64/9.48	   2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))
33.64/9.48	   0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(x1))))))))))))))))))
33.64/9.48	   0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(x1))))))))))))))))))
33.64/9.48	   0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(x1))))))))))))))))))
33.64/9.48	   0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(x1))))))))))))))))))
33.64/9.48	   0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(x1))))))))))))))))))
33.64/9.48	   0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(x1))))))))))))))))))
33.64/9.48	   0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(x1))))))))))))))))))
33.64/9.48	   0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1))))))))))))))))))
33.64/9.48	   2_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(x1))))))))))))))))))
33.64/9.48	   2_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(x1))))))))))))))))))
33.64/9.48	   2_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(x1))))))))))))))))))
33.64/9.48	   2_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(x1))))))))))))))))))
33.64/9.48	   0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(x1))))))))))))))))))
33.64/9.48	   0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(x1))))))))))))))))))
33.64/9.48	   0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(x1))))))))))))))))))
33.64/9.48	   0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(x1))))))))))))))))))
33.64/9.48	   1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(x1))))))))))))))))))
33.64/9.48	   1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(x1))))))))))))))))))
33.64/9.48	   1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(x1))))))))))))))))))
33.64/9.48	   1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(x1))))))))))))))))))
33.64/9.48	   0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(x1))))))))))))))))))
33.64/9.48	   1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(x1))))))))))))))))))
33.64/9.48	   0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(x1))))))))))))))))))
33.64/9.48	   0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(x1))))))))))))))))))
33.64/9.48	   0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(x1))))))))))))))))))
33.64/9.48	   0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(x1))))))))))))))))))
33.64/9.48	   0_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(x1))))))))))))))))))
33.64/9.48	   0_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(x1))))))))))))))))))
33.64/9.48	   0_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(x1))))))))))))))))))
33.64/9.48	   0_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(x1))))))))))))))))))
33.64/9.48	   2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(x1))))))))))))))))))
33.64/9.48	   2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(x1))))))))))))))))))
33.64/9.48	   2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(x1))))))))))))))))))
33.64/9.48	   2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(x1))))))))))))))))))
33.64/9.48	   1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(x1))))))))))))))))))
33.64/9.48	   3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(x1))))))))))))))))))
33.64/9.48	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(x1))))))))))))))))))
33.94/9.52	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(x1))))))))))))))))))
33.94/9.52	   2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(x1)))))))))))))))))))
33.94/9.52	   2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(x1)))))))))))))))))))
33.94/9.52	   2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(x1)))))))))))))))))))
33.94/9.52	   2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(x1)))))))))))))))))))
33.94/9.52	   3_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(x1)))))))))))))))))))
33.94/9.52	   3_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(x1)))))))))))))))))))
33.94/9.52	   3_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(x1)))))))))))))))))))
33.94/9.52	   3_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(x1)))))))))))))))))))
33.94/9.52	   0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(x1)))))))))))))))))))
33.94/9.52	   0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(x1)))))))))))))))))))
33.94/9.52	   0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(x1)))))))))))))))))))
33.94/9.52	   0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(x1)))))))))))))))))))
33.94/9.52	   1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(x1)))))))))))))))))))
33.94/9.52	   1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(x1)))))))))))))))))))
33.94/9.52	   1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(x1)))))))))))))))))))
33.94/9.52	   1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(x1)))))))))))))))))))
33.94/9.52	   2_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))))
33.94/9.52	   2_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))))
33.94/9.52	   2_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))))
33.94/9.52	   2_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))))
33.94/9.52	   3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))))
33.94/9.52	   3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))))
33.94/9.52	   3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))))
33.94/9.52	   3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))))
33.94/9.52	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))))
33.94/9.52	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))))
33.94/9.52	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))))
33.94/9.52	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))))
33.94/9.52	   1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))))
33.94/9.52	   1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))))
33.94/9.52	   1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))))
33.94/9.52	   1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))))
33.94/9.52	
33.94/9.52	Q is empty.
33.94/9.52	
33.94/9.52	----------------------------------------
33.94/9.52	
33.94/9.52	(11) QTRSRRRProof (EQUIVALENT)
33.94/9.52	Used ordering:
33.94/9.52	Polynomial interpretation [POLO]:
33.94/9.52	
33.94/9.52	   POL(0_{0_1}(x_1)) = x_1
33.94/9.52	   POL(0_{1_1}(x_1)) = x_1
33.94/9.52	   POL(0_{2_1}(x_1)) = x_1
33.94/9.52	   POL(0_{3_1}(x_1)) = x_1
33.94/9.52	   POL(1_{0_1}(x_1)) = x_1
33.94/9.52	   POL(1_{1_1}(x_1)) = 2 + x_1
33.94/9.52	   POL(1_{2_1}(x_1)) = 2 + x_1
33.94/9.52	   POL(1_{3_1}(x_1)) = 1 + x_1
33.94/9.52	   POL(2_{0_1}(x_1)) = x_1
33.94/9.52	   POL(2_{1_1}(x_1)) = 2 + x_1
33.94/9.52	   POL(2_{2_1}(x_1)) = x_1
33.94/9.52	   POL(2_{3_1}(x_1)) = x_1
33.94/9.52	   POL(3_{0_1}(x_1)) = x_1
33.94/9.52	   POL(3_{1_1}(x_1)) = 3 + x_1
33.94/9.52	   POL(3_{2_1}(x_1)) = 3 + x_1
33.94/9.52	   POL(3_{3_1}(x_1)) = x_1
33.94/9.52	With this ordering the following rules can be removed by the rule removal processor [LPAR04] because they are oriented strictly:
33.94/9.52	
33.94/9.52	   2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.52	   2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.52	   2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.52	   2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.52	   1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.52	   1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.52	   1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.52	   1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.52	   3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.52	   3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.52	   3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.52	   3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.52	   0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.52	   0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.52	   0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.52	   0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.52	   1_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.52	   1_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.52	   1_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.52	   1_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.52	   1_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.52	   1_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.52	   1_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.52	   1_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.52	   2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.52	   2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.52	   2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.52	   2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.52	   1_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.52	   1_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.52	   1_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.52	   1_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.52	   0_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.52	   0_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.52	   0_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.52	   0_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.52	   3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.52	   3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.52	   3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.52	   3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.52	   1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.52	   1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.52	   1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.52	   1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.52	   1_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.52	   1_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.52	   1_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.52	   1_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.52	   1_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.52	   1_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.52	   1_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.52	   1_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.52	   2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.52	   2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.52	   2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.52	   2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.52	   1_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.52	   1_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.52	   1_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.52	   1_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.52	   2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.52	   2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.52	   2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.52	   2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.52	   3_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 3_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.52	   3_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 3_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.52	   3_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 3_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.52	   3_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 3_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.52	   1_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.52	   1_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.52	   1_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.52	   1_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.52	   3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.52	   3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.52	   3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.52	   3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.52	   1_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.52	   1_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.52	   1_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.52	   1_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.52	   3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.52	   3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.52	   3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.52	   3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.52	   2_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.52	   2_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.52	   2_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.52	   2_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.52	   0_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.52	   0_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.52	   0_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.52	   0_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.52	   3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.52	   3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.52	   3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.52	   3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.52	   3_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(x1))))))))))))))))))
33.94/9.52	   3_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(x1))))))))))))))))))
33.94/9.52	   3_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(x1))))))))))))))))))
33.94/9.52	   3_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{2_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(x1))))))))))))))))))
33.94/9.52	   0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(x1))))))))))))))))))
33.94/9.52	   1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.52	   1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.52	   1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.52	   2_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.52	   2_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.52	   2_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.52	   2_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.52	   0_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.52	   0_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.52	   0_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.52	   0_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.52	   1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.52	   1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.52	   1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.52	   1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.52	   3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 3_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1))))))))))))))))))
33.94/9.52	   3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 3_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1))))))))))))))))))
33.94/9.52	   3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 3_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1))))))))))))))))))
33.94/9.52	   3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 3_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1))))))))))))))))))
33.94/9.52	   3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(x1))))))))))))))))))
33.94/9.52	   3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(x1))))))))))))))))))
33.94/9.52	   3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(x1))))))))))))))))))
33.94/9.53	   3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(x1))))))))))))))))))
33.94/9.53	   3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(x1))))))))))))))))))
33.94/9.53	   3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(x1))))))))))))))))))
33.94/9.53	   3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(x1))))))))))))))))))
33.94/9.53	   3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(x1))))))))))))))))))
33.94/9.53	   3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1))))))))))))))))))
33.94/9.53	   3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1))))))))))))))))))
33.94/9.53	   3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1))))))))))))))))))
33.94/9.53	   3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1))))))))))))))))))
33.94/9.53	   2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.53	   2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.53	   2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.53	   2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 2_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.53	   1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.53	   1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.53	   1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.53	   1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.53	   1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))
33.94/9.53	   1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))
33.94/9.53	   1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))
33.94/9.53	   1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 1_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.53	   3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.53	   3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.53	   3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.53	   3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.53	   2_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{2_1}(x1))))))))))))))))))
33.94/9.53	   2_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(x1))))))))))))))))))
33.94/9.53	   2_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(x1))))))))))))))))))
33.94/9.53	   2_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(x1))))))))))))))))))
33.94/9.53	   0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.53	   0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.53	   0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.53	   0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.53	   1_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(x1))))))))))))))))))
33.94/9.53	   1_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(x1))))))))))))))))))
33.94/9.53	   1_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(x1))))))))))))))))))
33.94/9.53	   1_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(x1))))))))))))))))))
33.94/9.53	   3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.53	   3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.53	   3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.53	   3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))
33.94/9.53	   1_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.53	   1_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.53	   1_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.53	   1_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.53	   0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.53	   0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.53	   0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.53	   0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.53	   1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.53	   1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.53	   1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.53	   1_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.53	   0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.53	   0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.53	   0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.53	   0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.53	   1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.53	   1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.53	   1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.53	   3_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.53	   3_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.53	   3_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.53	   3_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.53	   3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.53	   3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.53	   3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.53	   3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.53	   0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.53	   0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.53	   0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.53	   0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.53	   2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.53	   2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.53	   2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.53	   2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.53	   1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.53	   1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.53	   1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.53	   1_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{2_1}(2_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(x1))))))))))))))))))
33.94/9.53	   2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(x1)))))))))))))))))))
33.94/9.53	   2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(x1)))))))))))))))))))
33.94/9.53	   2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(x1)))))))))))))))))))
33.94/9.53	   2_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(x1)))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(x1)))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(x1)))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(x1)))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(x1)))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(x1)))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(x1)))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(x1)))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(x1)))))))))))))))))))
33.94/9.53	   1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(x1))))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(x1)))))))))))))))))))
33.94/9.53	   1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(x1))))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(x1)))))))))))))))))))
33.94/9.53	   1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(x1))))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{0_1}(x1)))))))))))))))))))
33.94/9.53	   1_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{1_1}(x1))))))))))))))))))) -> 1_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{1_1}(x1)))))))))))))))))))
33.94/9.53	   1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))))
33.94/9.53	   1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))))
33.94/9.53	   1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))))
33.94/9.53	   1_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))) -> 1_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))))
33.94/9.53	
33.94/9.53	
33.94/9.53	
33.94/9.53	
33.94/9.53	----------------------------------------
33.94/9.53	
33.94/9.53	(12)
33.94/9.53	Obligation:
33.94/9.53	Q restricted rewrite system:
33.94/9.53	The TRS R consists of the following rules:
33.94/9.53	
33.94/9.53	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.53	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.53	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.53	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.53	   3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.53	   3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.53	   3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.53	   3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.53	   1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.53	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))
33.94/9.53	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))
33.94/9.53	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))
33.94/9.53	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))
33.94/9.53	   0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(x1))))))))))))))))))
33.94/9.53	   0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(x1))))))))))))))))))
33.94/9.53	   0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(x1))))))))))))))))))
33.94/9.53	   0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.53	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.53	   1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.53	   2_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))))
33.94/9.53	   2_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))))
33.94/9.53	   2_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))))
33.94/9.53	   2_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))))
33.94/9.53	   3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))))
33.94/9.53	
33.94/9.53	Q is empty.
33.94/9.53	
33.94/9.53	----------------------------------------
33.94/9.53	
33.94/9.53	(13) QTRSRRRProof (EQUIVALENT)
33.94/9.53	Used ordering:
33.94/9.53	Polynomial interpretation [POLO]:
33.94/9.53	
33.94/9.53	   POL(0_{0_1}(x_1)) = x_1
33.94/9.53	   POL(0_{1_1}(x_1)) = x_1
33.94/9.53	   POL(0_{2_1}(x_1)) = x_1
33.94/9.53	   POL(0_{3_1}(x_1)) = x_1
33.94/9.53	   POL(1_{0_1}(x_1)) = x_1
33.94/9.53	   POL(1_{1_1}(x_1)) = x_1
33.94/9.53	   POL(1_{2_1}(x_1)) = x_1
33.94/9.53	   POL(1_{3_1}(x_1)) = x_1
33.94/9.53	   POL(2_{0_1}(x_1)) = x_1
33.94/9.53	   POL(2_{1_1}(x_1)) = x_1
33.94/9.53	   POL(2_{2_1}(x_1)) = x_1
33.94/9.53	   POL(2_{3_1}(x_1)) = x_1
33.94/9.53	   POL(3_{0_1}(x_1)) = 1 + x_1
33.94/9.53	   POL(3_{1_1}(x_1)) = 1 + x_1
33.94/9.53	   POL(3_{2_1}(x_1)) = x_1
33.94/9.53	   POL(3_{3_1}(x_1)) = 1 + x_1
33.94/9.53	With this ordering the following rules can be removed by the rule removal processor [LPAR04] because they are oriented strictly:
33.94/9.53	
33.94/9.53	   3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{2_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(x1))))))))))))))))))
33.94/9.53	   3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{3_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.53	   3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{0_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{0_1}(x1))))))))))))))))))
33.94/9.53	   3_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(x1)))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(x1))))))))))))))))))
33.94/9.53	   0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(x1))))))))))))))))))
33.94/9.53	   0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(x1))))))))))))))))))
33.94/9.53	   0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(x1))))))))))))))))))
33.94/9.53	   0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 0_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(2_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(2_{1_1}(x1))))))))))))))))))
33.94/9.53	
33.94/9.53	
33.94/9.53	
33.94/9.53	
33.94/9.53	----------------------------------------
33.94/9.53	
33.94/9.53	(14)
33.94/9.53	Obligation:
33.94/9.53	Q restricted rewrite system:
33.94/9.53	The TRS R consists of the following rules:
33.94/9.53	
33.94/9.53	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.53	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.53	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.53	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.53	   0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.54	   1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.54	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))
33.94/9.54	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))
33.94/9.54	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))
33.94/9.54	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))
33.94/9.54	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.54	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.54	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.54	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.54	   1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.54	   2_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))))
33.94/9.54	   2_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))))
33.94/9.54	   2_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))))
33.94/9.54	   2_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))))
33.94/9.54	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))))
33.94/9.54	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))))
33.94/9.54	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))))
33.94/9.54	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))))
33.94/9.54	
33.94/9.54	Q is empty.
33.94/9.54	
33.94/9.54	----------------------------------------
33.94/9.54	
33.94/9.54	(15) QTRSRRRProof (EQUIVALENT)
33.94/9.54	Used ordering:
33.94/9.54	Polynomial interpretation [POLO]:
33.94/9.54	
33.94/9.54	   POL(0_{0_1}(x_1)) = x_1
33.94/9.54	   POL(0_{1_1}(x_1)) = 2 + x_1
33.94/9.54	   POL(0_{2_1}(x_1)) = 2 + x_1
33.94/9.54	   POL(0_{3_1}(x_1)) = x_1
33.94/9.54	   POL(1_{0_1}(x_1)) = x_1
33.94/9.54	   POL(1_{1_1}(x_1)) = 1 + x_1
33.94/9.54	   POL(1_{2_1}(x_1)) = x_1
33.94/9.54	   POL(1_{3_1}(x_1)) = x_1
33.94/9.54	   POL(2_{0_1}(x_1)) = x_1
33.94/9.54	   POL(2_{1_1}(x_1)) = 2 + x_1
33.94/9.54	   POL(2_{2_1}(x_1)) = 2 + x_1
33.94/9.54	   POL(2_{3_1}(x_1)) = 1 + x_1
33.94/9.54	   POL(3_{0_1}(x_1)) = 1 + x_1
33.94/9.54	   POL(3_{1_1}(x_1)) = x_1
33.94/9.54	   POL(3_{2_1}(x_1)) = x_1
33.94/9.54	   POL(3_{3_1}(x_1)) = 1 + x_1
33.94/9.54	With this ordering the following rules can be removed by the rule removal processor [LPAR04] because they are oriented strictly:
33.94/9.54	
33.94/9.54	   0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.54	   0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.54	   0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.54	   0_{3_1}(3_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.54	   2_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))))
33.94/9.54	   2_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))))
33.94/9.54	   2_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))))
33.94/9.54	   2_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))) -> 2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))))
33.94/9.54	
33.94/9.54	
33.94/9.54	
33.94/9.54	
33.94/9.54	----------------------------------------
33.94/9.54	
33.94/9.54	(16)
33.94/9.54	Obligation:
33.94/9.54	Q restricted rewrite system:
33.94/9.54	The TRS R consists of the following rules:
33.94/9.54	
33.94/9.54	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.54	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.54	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.54	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.54	   1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.54	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))
33.94/9.54	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))
33.94/9.54	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))
33.94/9.54	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))
33.94/9.54	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.54	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.54	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.54	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.54	   1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))))
33.94/9.54	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))))
33.94/9.54	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))))
33.94/9.54	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))))
33.94/9.54	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))))
33.94/9.54	
33.94/9.54	Q is empty.
33.94/9.54	
33.94/9.54	----------------------------------------
33.94/9.54	
33.94/9.54	(17) QTRSRRRProof (EQUIVALENT)
33.94/9.54	Used ordering:
33.94/9.54	Polynomial interpretation [POLO]:
33.94/9.54	
33.94/9.54	   POL(0_{0_1}(x_1)) = x_1
33.94/9.54	   POL(0_{1_1}(x_1)) = x_1
33.94/9.54	   POL(0_{2_1}(x_1)) = 3 + x_1
33.94/9.54	   POL(0_{3_1}(x_1)) = x_1
33.94/9.54	   POL(1_{0_1}(x_1)) = x_1
33.94/9.54	   POL(1_{1_1}(x_1)) = x_1
33.94/9.54	   POL(1_{2_1}(x_1)) = x_1
33.94/9.54	   POL(1_{3_1}(x_1)) = x_1
33.94/9.54	   POL(2_{0_1}(x_1)) = 1 + x_1
33.94/9.54	   POL(2_{1_1}(x_1)) = x_1
33.94/9.54	   POL(2_{2_1}(x_1)) = 4 + x_1
33.94/9.54	   POL(2_{3_1}(x_1)) = 2 + x_1
33.94/9.54	   POL(3_{0_1}(x_1)) = 4 + x_1
33.94/9.54	   POL(3_{1_1}(x_1)) = x_1
33.94/9.54	   POL(3_{2_1}(x_1)) = x_1
33.94/9.54	   POL(3_{3_1}(x_1)) = 5 + x_1
33.94/9.54	With this ordering the following rules can be removed by the rule removal processor [LPAR04] because they are oriented strictly:
33.94/9.54	
33.94/9.54	   1_{1_1}(1_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{3_1}(3_{2_1}(2_{1_1}(1_{2_1}(2_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 1_{1_1}(1_{1_1}(1_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.54	   1_{0_1}(0_{3_1}(3_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{2_1}(2_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 1_{3_1}(3_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{3_1}(x1))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{3_1}(3_{2_1}(2_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))))
33.94/9.54	   3_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))) -> 3_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))))
33.94/9.54	
33.94/9.54	
33.94/9.54	
33.94/9.54	
33.94/9.54	----------------------------------------
33.94/9.54	
33.94/9.54	(18)
33.94/9.54	Obligation:
33.94/9.54	Q restricted rewrite system:
33.94/9.54	The TRS R consists of the following rules:
33.94/9.54	
33.94/9.54	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.54	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.54	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.54	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.54	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))
33.94/9.54	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))
33.94/9.54	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))
33.94/9.54	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))
33.94/9.54	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.55	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.55	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.55	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.55	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))))
33.94/9.55	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))))
33.94/9.55	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))))
33.94/9.55	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))))
33.94/9.55	
33.94/9.55	Q is empty.
33.94/9.55	
33.94/9.55	----------------------------------------
33.94/9.55	
33.94/9.55	(19) QTRSRRRProof (EQUIVALENT)
33.94/9.55	Used ordering:
33.94/9.55	Polynomial interpretation [POLO]:
33.94/9.55	
33.94/9.55	   POL(0_{0_1}(x_1)) = x_1
33.94/9.55	   POL(0_{1_1}(x_1)) = x_1
33.94/9.55	   POL(0_{2_1}(x_1)) = x_1
33.94/9.55	   POL(0_{3_1}(x_1)) = 1 + x_1
33.94/9.55	   POL(1_{0_1}(x_1)) = x_1
33.94/9.55	   POL(1_{1_1}(x_1)) = x_1
33.94/9.55	   POL(1_{2_1}(x_1)) = x_1
33.94/9.55	   POL(1_{3_1}(x_1)) = 2 + x_1
33.94/9.55	   POL(2_{0_1}(x_1)) = 1 + x_1
33.94/9.55	   POL(2_{1_1}(x_1)) = x_1
33.94/9.55	   POL(2_{2_1}(x_1)) = x_1
33.94/9.55	   POL(2_{3_1}(x_1)) = 4 + x_1
33.94/9.55	   POL(3_{0_1}(x_1)) = x_1
33.94/9.55	   POL(3_{1_1}(x_1)) = x_1
33.94/9.55	   POL(3_{2_1}(x_1)) = x_1
33.94/9.55	   POL(3_{3_1}(x_1)) = x_1
33.94/9.55	With this ordering the following rules can be removed by the rule removal processor [LPAR04] because they are oriented strictly:
33.94/9.55	
33.94/9.55	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{2_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(x1))))))))))))))))))
33.94/9.55	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(x1))))))))))))))))))
33.94/9.55	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(x1))))))))))))))))))
33.94/9.55	   0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{3_1}(3_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{1_1}(x1)))))))))))))))))) -> 0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{3_1}(3_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{1_1}(x1))))))))))))))))))
33.94/9.55	
33.94/9.55	
33.94/9.55	
33.94/9.55	
33.94/9.55	----------------------------------------
33.94/9.55	
33.94/9.55	(20)
33.94/9.55	Obligation:
33.94/9.55	Q restricted rewrite system:
33.94/9.55	The TRS R consists of the following rules:
33.94/9.55	
33.94/9.55	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))
33.94/9.55	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))
33.94/9.55	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))
33.94/9.55	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))
33.94/9.55	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.55	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.55	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.55	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.55	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))))
33.94/9.55	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))))
33.94/9.55	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))))
33.94/9.55	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))))
33.94/9.55	
33.94/9.55	Q is empty.
33.94/9.55	
33.94/9.55	----------------------------------------
33.94/9.55	
33.94/9.55	(21) QTRSRRRProof (EQUIVALENT)
33.94/9.55	Used ordering:
33.94/9.55	Polynomial interpretation [POLO]:
33.94/9.55	
33.94/9.55	   POL(0_{0_1}(x_1)) = x_1
33.94/9.55	   POL(0_{1_1}(x_1)) = x_1
33.94/9.55	   POL(0_{2_1}(x_1)) = x_1
33.94/9.55	   POL(0_{3_1}(x_1)) = x_1
33.94/9.55	   POL(1_{0_1}(x_1)) = x_1
33.94/9.55	   POL(1_{1_1}(x_1)) = x_1
33.94/9.55	   POL(1_{2_1}(x_1)) = x_1
33.94/9.55	   POL(1_{3_1}(x_1)) = 1 + x_1
33.94/9.55	   POL(2_{0_1}(x_1)) = x_1
33.94/9.55	   POL(2_{1_1}(x_1)) = x_1
33.94/9.55	   POL(2_{2_1}(x_1)) = x_1
33.94/9.55	   POL(2_{3_1}(x_1)) = 1 + x_1
33.94/9.55	   POL(3_{0_1}(x_1)) = x_1
33.94/9.55	   POL(3_{1_1}(x_1)) = x_1
33.94/9.55	   POL(3_{2_1}(x_1)) = x_1
33.94/9.55	   POL(3_{3_1}(x_1)) = x_1
33.94/9.55	With this ordering the following rules can be removed by the rule removal processor [LPAR04] because they are oriented strictly:
33.94/9.55	
33.94/9.55	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{2_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))
33.94/9.55	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{3_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))
33.94/9.55	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{0_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))
33.94/9.55	   2_{0_1}(0_{1_1}(1_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(3_{1_1}(1_{3_1}(3_{3_1}(3_{0_1}(0_{2_1}(2_{0_1}(0_{2_1}(2_{1_1}(x1)))))))))))))))))) -> 2_{0_1}(0_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{2_1}(2_{0_1}(0_{3_1}(3_{1_1}(1_{1_1}(1_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))
33.94/9.55	
33.94/9.55	
33.94/9.55	
33.94/9.55	
33.94/9.55	----------------------------------------
33.94/9.55	
33.94/9.55	(22)
33.94/9.55	Obligation:
33.94/9.55	Q restricted rewrite system:
33.94/9.55	The TRS R consists of the following rules:
33.94/9.55	
33.94/9.55	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.55	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.55	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.55	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.55	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))))
33.94/9.55	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))))
33.94/9.55	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))))
33.94/9.55	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))))
33.94/9.55	
33.94/9.55	Q is empty.
33.94/9.55	
33.94/9.55	----------------------------------------
33.94/9.55	
33.94/9.55	(23) QTRSRRRProof (EQUIVALENT)
33.94/9.55	Used ordering:
33.94/9.55	Polynomial interpretation [POLO]:
33.94/9.55	
33.94/9.55	   POL(0_{0_1}(x_1)) = x_1
33.94/9.55	   POL(0_{1_1}(x_1)) = x_1
33.94/9.55	   POL(0_{2_1}(x_1)) = x_1
33.94/9.55	   POL(0_{3_1}(x_1)) = x_1
33.94/9.55	   POL(1_{0_1}(x_1)) = x_1
33.94/9.55	   POL(1_{1_1}(x_1)) = x_1
33.94/9.55	   POL(1_{2_1}(x_1)) = x_1
33.94/9.55	   POL(1_{3_1}(x_1)) = 1 + x_1
33.94/9.55	   POL(2_{0_1}(x_1)) = x_1
33.94/9.55	   POL(2_{1_1}(x_1)) = x_1
33.94/9.55	   POL(2_{2_1}(x_1)) = x_1
33.94/9.55	   POL(2_{3_1}(x_1)) = x_1
33.94/9.55	   POL(3_{0_1}(x_1)) = x_1
33.94/9.55	   POL(3_{1_1}(x_1)) = x_1
33.94/9.55	   POL(3_{2_1}(x_1)) = x_1
33.94/9.55	   POL(3_{3_1}(x_1)) = x_1
33.94/9.55	With this ordering the following rules can be removed by the rule removal processor [LPAR04] because they are oriented strictly:
33.94/9.55	
33.94/9.55	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(x1))))))))))))))))))
33.94/9.55	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{3_1}(x1))))))))))))))))))
33.94/9.55	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{0_1}(x1))))))))))))))))))
33.94/9.55	   3_{1_1}(1_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(0_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{0_1}(0_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1)))))))))))))))))) -> 3_{3_1}(3_{2_1}(2_{3_1}(3_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{0_1}(0_{0_1}(0_{1_1}(1_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{0_1}(0_{3_1}(3_{1_1}(x1))))))))))))))))))
33.94/9.55	
33.94/9.55	
33.94/9.55	
33.94/9.55	
33.94/9.55	----------------------------------------
33.94/9.55	
33.94/9.55	(24)
33.94/9.55	Obligation:
33.94/9.55	Q restricted rewrite system:
33.94/9.55	The TRS R consists of the following rules:
33.94/9.55	
33.94/9.55	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))))
33.94/9.55	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))))
33.94/9.55	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))))
33.94/9.55	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))))
33.94/9.55	
33.94/9.55	Q is empty.
33.94/9.55	
33.94/9.55	----------------------------------------
33.94/9.55	
33.94/9.55	(25) QTRSRRRProof (EQUIVALENT)
33.94/9.55	Used ordering:
33.94/9.55	Polynomial interpretation [POLO]:
33.94/9.55	
33.94/9.55	   POL(0_{0_1}(x_1)) = x_1
33.94/9.55	   POL(0_{1_1}(x_1)) = x_1
33.94/9.55	   POL(0_{2_1}(x_1)) = x_1
33.94/9.55	   POL(0_{3_1}(x_1)) = x_1
33.94/9.55	   POL(1_{0_1}(x_1)) = x_1
33.94/9.55	   POL(1_{1_1}(x_1)) = x_1
33.94/9.55	   POL(1_{2_1}(x_1)) = x_1
33.94/9.55	   POL(1_{3_1}(x_1)) = x_1
33.94/9.55	   POL(2_{0_1}(x_1)) = x_1
33.94/9.55	   POL(2_{1_1}(x_1)) = x_1
33.94/9.55	   POL(2_{2_1}(x_1)) = 1 + x_1
33.94/9.55	   POL(2_{3_1}(x_1)) = x_1
33.94/9.55	   POL(3_{0_1}(x_1)) = x_1
33.94/9.55	   POL(3_{1_1}(x_1)) = x_1
33.94/9.55	   POL(3_{2_1}(x_1)) = x_1
33.94/9.55	   POL(3_{3_1}(x_1)) = x_1
33.94/9.55	With this ordering the following rules can be removed by the rule removal processor [LPAR04] because they are oriented strictly:
33.94/9.55	
33.94/9.55	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{2_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{2_1}(x1)))))))))))))))))))
33.94/9.55	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{3_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{3_1}(x1)))))))))))))))))))
33.94/9.55	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{0_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{0_1}(x1)))))))))))))))))))
33.94/9.55	   0_{3_1}(3_{1_1}(1_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{3_1}(3_{2_1}(2_{2_1}(2_{3_1}(3_{0_1}(0_{2_1}(2_{1_1}(1_{0_1}(0_{3_1}(3_{1_1}(1_{0_1}(0_{2_1}(2_{1_1}(x1))))))))))))))))))) -> 0_{0_1}(0_{1_1}(1_{2_1}(2_{1_1}(1_{2_1}(2_{3_1}(3_{0_1}(0_{3_1}(3_{2_1}(2_{0_1}(0_{3_1}(3_{3_1}(3_{0_1}(0_{1_1}(1_{3_1}(3_{1_1}(1_{1_1}(1_{2_1}(2_{1_1}(x1)))))))))))))))))))
33.94/9.55	
33.94/9.55	
33.94/9.55	
33.94/9.55	
33.94/9.55	----------------------------------------
33.94/9.55	
33.94/9.55	(26)
33.94/9.55	Obligation:
33.94/9.55	Q restricted rewrite system:
33.94/9.55	R is empty.
33.94/9.55	Q is empty.
33.94/9.55	
33.94/9.55	----------------------------------------
33.94/9.55	
33.94/9.55	(27) RisEmptyProof (EQUIVALENT)
33.94/9.55	The TRS R is empty. Hence, termination is trivially proven.
33.94/9.55	----------------------------------------
33.94/9.55	
33.94/9.55	(28)
33.94/9.55	YES
34.24/9.64	EOF