%------------------------------------------------------------------------------
% File     : CiME---2.01
% Problem  : BOO026-1 : TPTP v6.0.0. Released v2.2.0.
% Transfm  : none
% Format   : tptp:raw
% Command  : tptp2X_and_run_cime %s

% Computer : n147.star.cs.uiowa.edu
% Model    : x86_64 x86_64
% CPU      : Intel(R) Xeon(R) CPU E5-2609 0 2.40GHz
% Memory   : 32286.75MB
% OS       : Linux 2.6.32-431.11.2.el6.x86_64
% CPULimit : 300s
% DateTime : Tue Jun 10 00:19:14 EDT 2014

% Result   : Timeout 300.08s
% Output   : None 
% Verified : 
% SZS Type : None (Parsing solution fails)
% Syntax   : Number of formulae    : 0

% Comments : 
%------------------------------------------------------------------------------
%----NO SOLUTION OUTPUT BY SYSTEM
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% % Problem  : BOO026-1 : TPTP v6.0.0. Released v2.2.0.
% % Command  : tptp2X_and_run_cime %s
% % Computer : n147.star.cs.uiowa.edu
% % Model    : x86_64 x86_64
% % CPU      : Intel(R) Xeon(R) CPU E5-2609 0 @ 2.40GHz
% % Memory   : 32286.75MB
% % OS       : Linux 2.6.32-431.11.2.el6.x86_64
% % CPULimit : 300
% % DateTime : Thu Jun  5 18:02:38 CDT 2014
% % CPUTime  : 300.08 
% Processing problem /tmp/CiME_7696_n147.star.cs.uiowa.edu
% #verbose 1;
% let F = signature " b,a,n0,n1 : constant;  inverse : 1;  multiply : 2;  add : 2;";
% let X = vars "X Y Z";
% let Axioms = equations F X "
% multiply(X,add(Y,Z)) = add(multiply(Y,X),multiply(Z,X));
% add(X,inverse(X)) = n1;
% add(X,multiply(Y,Z)) = multiply(add(Y,X),add(Z,X));
% multiply(X,inverse(X)) = n0;
% add(multiply(X,inverse(X)),add(multiply(X,Y),multiply(inverse(X),Y))) = Y;
% add(multiply(X,inverse(Y)),add(multiply(X,Y),multiply(inverse(Y),Y))) = X;
% add(multiply(X,inverse(Y)),add(multiply(X,X),multiply(inverse(Y),X))) = X;
% multiply(add(X,inverse(X)),multiply(add(X,Y),add(inverse(X),Y))) = Y;
% multiply(add(X,inverse(Y)),multiply(add(X,Y),add(inverse(Y),Y))) = X;
% multiply(add(X,inverse(Y)),multiply(add(X,X),add(inverse(Y),X))) = X;
% ";
% 
% let s1 = status F "
% b lr_lex;
% a lr_lex;
% n0 lr_lex;
% n1 lr_lex;
% inverse lr_lex;
% multiply mul;
% add mul;
% ";
% 
% let p1 = precedence F "
% add > multiply > inverse > n1 > n0 > a > b";
% 
% let s2 = status F "
% b mul;
% a mul;
% n0 mul;
% n1 mul;
% inverse mul;
% multiply mul;
% add mul;
% ";
% 
% let p2 = precedence F "
% add > multiply > inverse > n1 = n0 = a = b";
% 
% let o_auto = AUTO Axioms;
% 
% let o = LEX o_auto (LEX (ACRPO s1 p1) (ACRPO s2 p2));
% 
% let Conjectures = equations F X " multiply(add(a,b),b) = b;"
% ;
% (*
% let Red_Axioms = normalize_equations Defining_rules Axioms;
% 
% let Red_Conjectures =  normalize_equations Defining_rules Conjectures;
% *)
% #time on;
% 
% let res = prove_conj_by_ordered_completion o Axioms Conjectures;
% 
% #time off;
% 
% 
% let status = if res then "unsatisfiable" else "satisfiable";
% #quit;
% Verbose level is now 1
% 
% F : signature = <signature>
% X : variable_set = <variable set>
% 
% Axioms : (F,X) equations = { multiply(X,add(Y,Z)) =
% add(multiply(Y,X),multiply(Z,X)),
% add(X,inverse(X)) = n1,
% add(X,multiply(Y,Z)) =
% multiply(add(Y,X),add(Z,X)),
% multiply(X,inverse(X)) = n0,
% add(multiply(X,inverse(X)),add(multiply(X,Y),
% multiply(inverse(X),Y)))
% = Y,
% add(multiply(X,inverse(Y)),add(multiply(X,Y),
% multiply(inverse(Y),Y)))
% = X,
% add(multiply(X,inverse(Y)),add(multiply(X,X),
% multiply(inverse(Y),X)))
% = X,
% multiply(add(X,inverse(X)),multiply(add(X,Y),
% add(inverse(X),Y))) =
% Y,
% multiply(add(X,inverse(Y)),multiply(add(X,Y),
% add(inverse(Y),Y))) =
% X,
% multiply(add(X,inverse(Y)),multiply(add(X,X),
% add(inverse(Y),X))) =
% X } (10 equation(s))
% s1 : F status = <status>
% p1 : F precedence = <precedence>
% s2 : F status = <status>
% p2 : F precedence = <precedence>
% o_auto : F term_ordering = <term ordering>
% o : F term_ordering = <term ordering>
% Conjectures : (F,X) equations = { multiply(add(a,b),b) = b } (1 equation(s))
% time is now on
% 
% Initializing completion ...
% New rule produced : [1] multiply(X,inverse(X)) -> n0
% Current number of equations to process: 1
% Current number of ordered equations: 8
% Current number of rules: 1
% New rule produced : [2] add(X,inverse(X)) -> n1
% Current number of equations to process: 1
% Current number of ordered equations: 7
% Current number of rules: 2
% New rule produced : [3] add(X,multiply(Y,Z)) -> multiply(add(Y,X),add(Z,X))
% Current number of equations to process: 4
% Current number of ordered equations: 3
% Current number of rules: 3
% New rule produced :
% [4]
% multiply(multiply(add(Y,Z),add(X,Z)),multiply(add(Y,X),add(X,X))) ->
% multiply(X,add(Y,Z))
% Current number of equations to process: 0
% Current number of ordered equations: 6
% Current number of rules: 4
% New rule produced :
% [5] multiply(n1,multiply(add(X,Y),add(inverse(X),Y))) -> Y
% Current number of equations to process: 0
% Current number of ordered equations: 5
% Current number of rules: 5
% New rule produced :
% [6] multiply(add(X,inverse(Y)),multiply(add(X,Y),add(inverse(Y),Y))) -> X
% Current number of equations to process: 0
% Current number of ordered equations: 4
% Current number of rules: 6
% New rule produced :
% [7] multiply(add(X,inverse(Y)),multiply(add(X,X),add(inverse(Y),X))) -> X
% Current number of equations to process: 0
% Current number of ordered equations: 3
% Current number of rules: 7
% New rule produced :
% [8]
% multiply(multiply(multiply(add(add(X,inverse(Y)),X),add(add(X,inverse(Y)),X)),
% multiply(add(add(X,inverse(Y)),inverse(Y)),add(add(X,inverse(Y)),
% inverse(Y)))),multiply(
% multiply(
% add(
% add(X,X),X),
% add(
% add(X,X),X)),
% multiply(
% add(
% add(X,X),
% inverse(Y)),
% add(
% add(X,X),
% inverse(Y)))))
% -> X
% Current number of equations to process: 0
% Current number of ordered equations: 2
% Current number of rules: 8
% New rule produced :
% [9]
% multiply(add(multiply(n1,add(Y,inverse(X))),n0),add(multiply(add(X,Y),
% add(Y,Y)),n0)) -> Y
% Current number of equations to process: 0
% Current number of ordered equations: 1
% Current number of rules: 9
% New rule produced :
% [10]
% multiply(multiply(multiply(add(add(X,inverse(Y)),X),add(n1,X)),multiply(
% add(add(X,
% inverse(Y)),
% inverse(Y)),
% add(n1,
% inverse(Y)))),
% multiply(multiply(add(add(X,Y),X),add(add(Y,Y),X)),multiply(add(add(X,Y),
% inverse(Y)),
% add(add(Y,Y),inverse(Y)))))
% -> X
% Current number of equations to process: 0
% Current number of ordered equations: 0
% Current number of rules: 10
% New rule produced : [11] multiply(add(Y,X),add(inverse(Y),X)) -> add(X,n0)
% Rule [5] multiply(n1,multiply(add(X,Y),add(inverse(X),Y))) -> Y collapsed.
% Current number of equations to process: 7
% Current number of ordered equations: 0
% Current number of rules: 10
% New rule produced : [12] multiply(n1,add(Y,n0)) -> Y
% Current number of equations to process: 6
% Current number of ordered equations: 0
% Current number of rules: 11
% New rule produced :
% [13] multiply(n1,add(inverse(X),inverse(X))) -> add(inverse(X),n0)
% Current number of equations to process: 28
% Current number of ordered equations: 0
% Current number of rules: 12
% New rule produced :
% [14] multiply(add(X,inverse(inverse(X))),n1) <-> add(inverse(inverse(X)),n0)
% Current number of equations to process: 29
% Current number of ordered equations: 1
% Current number of rules: 13
% New rule produced :
% [15] add(inverse(inverse(X)),n0) <-> multiply(add(X,inverse(inverse(X))),n1)
% Current number of equations to process: 29
% Current number of ordered equations: 0
% Current number of rules: 14
% New rule produced : [16] multiply(add(n1,X),add(add(Y,n0),X)) -> add(X,Y)
% Current number of equations to process: 30
% Current number of ordered equations: 0
% Current number of rules: 15
% New rule produced :
% [17] multiply(n1,add(add(X,n0),inverse(n1))) -> add(inverse(n1),X)
% Current number of equations to process: 46
% Current number of ordered equations: 0
% Current number of rules: 16
% New rule produced :
% [18]
% multiply(n1,multiply(add(X,inverse(inverse(X))),n1)) -> inverse(inverse(X))
% Current number of equations to process: 45
% Current number of ordered equations: 0
% Current number of rules: 17
% New rule produced :
% [19] multiply(add(n1,inverse(add(X,n0))),n1) <-> add(inverse(add(X,n0)),X)
% Current number of equations to process: 44
% Current number of ordered equations: 1
% Current number of rules: 18
% New rule produced :
% [20] add(inverse(add(X,n0)),X) <-> multiply(add(n1,inverse(add(X,n0))),n1)
% Current number of equations to process: 44
% Current number of ordered equations: 0
% Current number of rules: 19
% New rule produced :
% [21] multiply(add(X,Y),add(add(Y,n0),Y)) <-> multiply(add(Y,n0),add(n1,X))
% Current number of equations to process: 65
% Current number of ordered equations: 1
% Current number of rules: 20
% New rule produced :
% [22] multiply(add(Y,n0),add(n1,X)) <-> multiply(add(X,Y),add(add(Y,n0),Y))
% Current number of equations to process: 66
% Current number of ordered equations: 0
% Current number of rules: 21
% New rule produced : [23] add(X,X) <-> multiply(add(X,n0),add(n1,n1))
% Rule [13] multiply(n1,add(inverse(X),inverse(X))) -> add(inverse(X),n0)
% collapsed.
% Current number of equations to process: 72
% Current number of ordered equations: 1
% Current number of rules: 21
% New rule produced : [24] multiply(add(X,n0),add(n1,n1)) <-> add(X,X)
% Current number of equations to process: 72
% Current number of ordered equations: 0
% Current number of rules: 22
% New rule produced :
% [25]
% multiply(n1,multiply(add(inverse(X),n0),add(n1,n1))) -> add(inverse(X),n0)
% Current number of equations to process: 74
% Current number of ordered equations: 0
% Current number of rules: 23
% New rule produced :
% [26] multiply(add(multiply(Y,X),n0),add(n1,n1)) -> multiply(X,add(Y,Y))
% Current number of equations to process: 95
% Current number of ordered equations: 0
% Current number of rules: 24
% New rule produced : [27] multiply(inverse(X),add(X,X)) <-> add(n0,n0)
% Current number of equations to process: 99
% Current number of ordered equations: 1
% Current number of rules: 25
% Rule [27] multiply(inverse(X),add(X,X)) <-> add(n0,n0) is composed into 
% [27] multiply(inverse(X),add(X,X)) <-> multiply(inverse(b),add(b,b))
% New rule produced : [28] add(n0,n0) <-> multiply(inverse(X),add(X,X))
% Current number of equations to process: 99
% Current number of ordered equations: 0
% Current number of rules: 26
% New rule produced : [29] multiply(n1,multiply(inverse(X),add(X,X))) -> n0
% Current number of equations to process: 123
% Current number of ordered equations: 0
% Current number of rules: 27
% New rule produced :
% [30]
% multiply(inverse(n0),multiply(inverse(X),add(X,X))) <->
% multiply(inverse(b),add(b,b))
% Current number of equations to process: 144
% Current number of ordered equations: 1
% Current number of rules: 28
% New rule produced :
% [31]
% multiply(inverse(b),add(b,b)) <->
% multiply(inverse(n0),multiply(inverse(X),add(X,X)))
% Current number of equations to process: 144
% Current number of ordered equations: 0
% Current number of rules: 29
% New rule produced :
% [32] multiply(n1,multiply(inverse(multiply(X,Y)),multiply(Y,add(X,X)))) -> n0
% Current number of equations to process: 145
% Current number of ordered equations: 0
% Current number of rules: 30
% New rule produced :
% [33] multiply(n1,multiply(inverse(X),multiply(add(X,n0),add(n1,n1)))) -> n0
% Current number of equations to process: 144
% Current number of ordered equations: 0
% Current number of rules: 31
% New rule produced :
% [34] multiply(n1,multiply(inverse(n0),multiply(inverse(X),add(X,X)))) -> n0
% Current number of equations to process: 146
% Current number of ordered equations: 0
% Current number of rules: 32
% New rule produced :
% [35]
% multiply(n1,add(add(inverse(X),n0),inverse(X))) ->
% multiply(add(inverse(X),n0),add(n1,X))
% Current number of equations to process: 174
% Current number of ordered equations: 0
% Current number of rules: 33
% New rule produced :
% [36]
% multiply(inverse(b),add(b,b)) <->
% multiply(inverse(multiply(X,Y)),multiply(Y,add(X,X)))
% Current number of equations to process: 174
% Current number of ordered equations: 1
% Current number of rules: 34
% New rule produced :
% [37]
% multiply(inverse(multiply(X,Y)),multiply(Y,add(X,X))) <->
% multiply(inverse(b),add(b,b))
% Current number of equations to process: 174
% Current number of ordered equations: 0
% Current number of rules: 35
% New rule produced :
% [38]
% multiply(inverse(X),multiply(add(X,n0),add(n1,n1))) ->
% multiply(inverse(b),add(b,b))
% Rule
% [33] multiply(n1,multiply(inverse(X),multiply(add(X,n0),add(n1,n1)))) -> n0
% collapsed.
% Current number of equations to process: 173
% Current number of ordered equations: 0
% Current number of rules: 35
% New rule produced :
% [39]
% multiply(n1,add(multiply(inverse(X),add(X,X)),inverse(n1))) ->
% add(inverse(n1),n0)
% Current number of equations to process: 172
% Current number of ordered equations: 0
% Current number of rules: 36
% New rule produced :
% [40]
% multiply(inverse(X),add(X,X)) <->
% multiply(multiply(inverse(b),add(b,b)),add(n1,n1))
% Current number of equations to process: 171
% Current number of ordered equations: 1
% Current number of rules: 37
% Rule [40]
% multiply(inverse(X),add(X,X)) <->
% multiply(multiply(inverse(b),add(b,b)),add(n1,n1)) is composed into 
% [40] multiply(inverse(X),add(X,X)) <-> multiply(inverse(b),add(b,b))
% New rule produced :
% [41]
% multiply(multiply(inverse(b),add(b,b)),add(n1,n1)) <->
% multiply(inverse(X),add(X,X))
% Current number of equations to process: 171
% Current number of ordered equations: 0
% Current number of rules: 38
% New rule produced :
% [42]
% multiply(multiply(inverse(X),add(X,X)),add(n1,n1)) ->
% multiply(inverse(b),add(b,b))
% Rule
% [41]
% multiply(multiply(inverse(b),add(b,b)),add(n1,n1)) <->
% multiply(inverse(X),add(X,X)) collapsed.
% Current number of equations to process: 171
% Current number of ordered equations: 0
% Current number of rules: 38
% New rule produced :
% [43]
% multiply(add(inverse(X),n0),multiply(add(X,inverse(inverse(X))),n1)) ->
% multiply(inverse(b),add(b,b))
% Current number of equations to process: 211
% Current number of ordered equations: 0
% Current number of rules: 39
% New rule produced :
% [44] multiply(multiply(add(X,n0),add(n1,n1)),add(inverse(X),X)) -> add(X,n0)
% Current number of equations to process: 212
% Current number of ordered equations: 0
% Current number of rules: 40
% New rule produced :
% [45] add(X,add(Y,Y)) <-> multiply(add(add(Y,n0),X),add(add(n1,n1),X))
% Current number of equations to process: 216
% Current number of ordered equations: 1
% Current number of rules: 41
% New rule produced :
% [46] multiply(add(add(Y,n0),X),add(add(n1,n1),X)) <-> add(X,add(Y,Y))
% Current number of equations to process: 216
% Current number of ordered equations: 0
% Current number of rules: 42
% New rule produced :
% [47] multiply(add(n1,X),add(multiply(inverse(Y),add(Y,Y)),X)) -> add(X,n0)
% Current number of equations to process: 247
% Current number of ordered equations: 0
% Current number of rules: 43
% New rule produced :
% [48]
% multiply(add(n1,X),add(multiply(add(inverse(Y),n0),add(n1,n1)),X)) ->
% add(X,add(inverse(Y),n0))
% Current number of equations to process: 253
% Current number of ordered equations: 0
% Current number of rules: 44
% New rule produced :
% [49]
% multiply(multiply(inverse(X),add(X,X)),add(inverse(n0),n0)) ->
% multiply(inverse(b),add(b,b))
% Current number of equations to process: 260
% Current number of ordered equations: 0
% Current number of rules: 45
% New rule produced :
% [50]
% multiply(n1,add(add(n1,n1),inverse(add(X,n0)))) <->
% add(inverse(add(X,n0)),add(X,X))
% Current number of equations to process: 261
% Current number of ordered equations: 3
% Current number of rules: 46
% New rule produced :
% [51]
% add(inverse(add(X,n0)),add(X,X)) <->
% multiply(n1,add(add(n1,n1),inverse(add(X,n0))))
% Current number of equations to process: 261
% Current number of ordered equations: 2
% Current number of rules: 47
% New rule produced :
% [52]
% multiply(add(add(X,n0),inverse(add(n1,n1))),n1) <->
% add(inverse(add(n1,n1)),add(X,X))
% Current number of equations to process: 261
% Current number of ordered equations: 1
% Current number of rules: 48
% New rule produced :
% [53]
% add(inverse(add(n1,n1)),add(X,X)) <->
% multiply(add(add(X,n0),inverse(add(n1,n1))),n1)
% Current number of equations to process: 261
% Current number of ordered equations: 0
% Current number of rules: 49
% New rule produced :
% [54]
% multiply(add(X,inverse(inverse(X))),multiply(n1,add(inverse(inverse(X)),
% inverse(X)))) -> X
% Current number of equations to process: 288
% Current number of ordered equations: 0
% Current number of rules: 50
% New rule produced :
% [55] multiply(add(add(Z,Y),X),add(add(inverse(Z),Y),X)) -> add(X,add(Y,n0))
% Current number of equations to process: 289
% Current number of ordered equations: 0
% Current number of rules: 51
% New rule produced :
% [56]
% add(X,add(inverse(inverse(Y)),n0)) <->
% multiply(add(add(Y,inverse(inverse(Y))),X),add(n1,X))
% Current number of equations to process: 312
% Current number of ordered equations: 1
% Current number of rules: 52
% New rule produced :
% [57]
% multiply(add(add(Y,inverse(inverse(Y))),X),add(n1,X)) <->
% add(X,add(inverse(inverse(Y)),n0))
% Current number of equations to process: 312
% Current number of ordered equations: 0
% Current number of rules: 53
% New rule produced :
% [58]
% add(inverse(n1),add(inverse(inverse(X)),n0)) <->
% multiply(add(add(X,inverse(inverse(X))),inverse(n1)),n1)
% Current number of equations to process: 351
% Current number of ordered equations: 1
% Current number of rules: 54
% New rule produced :
% [59]
% multiply(add(add(X,inverse(inverse(X))),inverse(n1)),n1) <->
% add(inverse(n1),add(inverse(inverse(X)),n0))
% Current number of equations to process: 351
% Current number of ordered equations: 0
% Current number of rules: 55
% New rule produced :
% [60]
% multiply(inverse(multiply(Y,Z)),multiply(Z,add(Y,Y))) <->
% multiply(inverse(n0),multiply(inverse(X),add(X,X)))
% Current number of equations to process: 361
% Current number of ordered equations: 1
% Current number of rules: 56
% New rule produced :
% [61]
% multiply(inverse(n0),multiply(inverse(X),add(X,X))) <->
% multiply(inverse(multiply(Y,Z)),multiply(Z,add(Y,Y)))
% Current number of equations to process: 361
% Current number of ordered equations: 0
% Current number of rules: 57
% New rule produced :
% [62]
% multiply(inverse(n0),multiply(inverse(Y),add(Y,Y))) <->
% multiply(inverse(n0),multiply(inverse(X),add(X,X)))
% Current number of equations to process: 367
% Current number of ordered equations: 0
% Current number of rules: 58
% New rule produced :
% [63]
% multiply(add(n1,X),add(add(add(Y,n0),inverse(n1)),X)) ->
% add(X,add(inverse(n1),Y))
% Current number of equations to process: 393
% Current number of ordered equations: 0
% Current number of rules: 59
% New rule produced :
% [64]
% multiply(n1,add(add(add(X,n0),inverse(n1)),inverse(n1))) ->
% add(inverse(n1),add(inverse(n1),X))
% Current number of equations to process: 403
% Current number of ordered equations: 0
% Current number of rules: 60
% New rule produced :
% [65]
% multiply(n1,add(multiply(add(X,inverse(inverse(X))),n1),inverse(n1))) ->
% add(inverse(n1),inverse(inverse(X)))
% Current number of equations to process: 411
% Current number of ordered equations: 0
% Current number of rules: 61
% New rule produced :
% [66]
% multiply(add(add(inverse(n1),X),n0),add(n1,n1)) ->
% multiply(add(add(X,n0),inverse(n1)),add(n1,n1))
% Current number of equations to process: 413
% Current number of ordered equations: 0
% Current number of rules: 62
% New rule produced :
% [67]
% multiply(add(add(inverse(inverse(n1)),n0),inverse(n1)),add(n1,n1)) ->
% add(n1,n1)
% Current number of equations to process: 415
% Current number of ordered equations: 0
% Current number of rules: 63
% New rule produced :
% [68]
% multiply(add(inverse(Y),X),add(add(Y,Y),X)) <->
% multiply(add(inverse(b),X),add(add(b,b),X))
% Current number of equations to process: 422
% Current number of ordered equations: 1
% Current number of rules: 64
% New rule produced :
% [69]
% multiply(add(inverse(b),X),add(add(b,b),X)) <->
% multiply(add(inverse(Y),X),add(add(Y,Y),X))
% Current number of equations to process: 422
% Current number of ordered equations: 0
% Current number of rules: 65
% New rule produced :
% [70]
% multiply(inverse(n0),multiply(inverse(n0),multiply(inverse(X),add(X,X)))) <->
% multiply(inverse(b),add(b,b))
% Current number of equations to process: 448
% Current number of ordered equations: 1
% Current number of rules: 66
% New rule produced :
% [71]
% multiply(inverse(b),add(b,b)) <->
% multiply(inverse(n0),multiply(inverse(n0),multiply(inverse(X),add(X,X))))
% Current number of equations to process: 448
% Current number of ordered equations: 0
% Current number of rules: 67
% New rule produced :
% [72]
% multiply(n1,multiply(inverse(n0),multiply(inverse(n0),multiply(inverse(X),
% add(X,X))))) -> n0
% Current number of equations to process: 458
% Current number of ordered equations: 0
% Current number of rules: 68
% New rule produced :
% [73]
% multiply(n1,add(add(inverse(X),Y),inverse(add(X,Y)))) ->
% add(inverse(add(X,Y)),add(Y,n0))
% Current number of equations to process: 462
% Current number of ordered equations: 0
% Current number of rules: 69
% New rule produced :
% [74]
% multiply(multiply(n1,add(X,inverse(Y))),multiply(add(Y,X),add(X,X))) ->
% multiply(X,n1)
% Current number of equations to process: 484
% Current number of ordered equations: 0
% Current number of rules: 70
% New rule produced :
% [75]
% multiply(add(inverse(X),n0),add(inverse(X),n0)) -> multiply(inverse(X),n1)
% Current number of equations to process: 485
% Current number of ordered equations: 0
% Current number of rules: 71
% New rule produced :
% [76] multiply(multiply(n1,n1),multiply(add(X,X),add(X,X))) -> multiply(X,n1)
% Current number of equations to process: 486
% Current number of ordered equations: 0
% Current number of rules: 72
% New rule produced :
% [77]
% multiply(add(multiply(n1,n1),n0),add(multiply(add(X,X),add(X,X)),n0)) -> X
% Current number of equations to process: 503
% Current number of ordered equations: 0
% Current number of rules: 73
% New rule produced :
% [78]
% multiply(multiply(add(X,inverse(inverse(X))),n1),add(inverse(inverse(
% inverse(X))),n0))
% -> multiply(inverse(b),add(b,b))
% Current number of equations to process: 509
% Current number of ordered equations: 0
% Current number of rules: 74
% New rule produced :
% [79] multiply(add(add(n1,Y),X),add(add(add(Z,n0),Y),X)) -> add(X,add(Y,Z))
% Current number of equations to process: 510
% Current number of ordered equations: 0
% Current number of rules: 75
% New rule produced :
% [80]
% add(add(X,n0),add(n0,X)) <-> multiply(add(add(X,n0),n0),add(n1,add(n1,n0)))
% Current number of equations to process: 527
% Current number of ordered equations: 1
% Current number of rules: 76
% New rule produced :
% [81]
% multiply(add(add(X,n0),n0),add(n1,add(n1,n0))) <-> add(add(X,n0),add(n0,X))
% Current number of equations to process: 527
% Current number of ordered equations: 0
% Current number of rules: 77
% New rule produced :
% [82]
% add(add(inverse(n0),n0),n1) ->
% multiply(add(add(inverse(n0),n0),n0),add(n1,add(n1,n0)))
% Current number of equations to process: 554
% Current number of ordered equations: 0
% Current number of rules: 78
% New rule produced :
% [83]
% multiply(add(add(inverse(n1),X),n0),add(add(add(X,n0),X),n0)) -> add(X,n0)
% Current number of equations to process: 565
% Current number of ordered equations: 0
% Current number of rules: 79
% New rule produced :
% [84]
% multiply(add(n1,X),add(multiply(add(Y,inverse(inverse(Y))),n1),X)) ->
% add(X,inverse(inverse(Y)))
% Current number of equations to process: 576
% Current number of ordered equations: 0
% Current number of rules: 80
% New rule produced :
% [85]
% multiply(add(add(X,n0),X),multiply(add(n1,inverse(add(X,n0))),n1)) ->
% add(X,n0)
% Current number of equations to process: 583
% Current number of ordered equations: 0
% Current number of rules: 81
% New rule produced :
% [86]
% multiply(n1,multiply(multiply(add(X,inverse(inverse(X))),n1),add(n1,n1))) <->
% add(inverse(inverse(X)),n0)
% Current number of equations to process: 589
% Current number of ordered equations: 1
% Current number of rules: 82
% New rule produced :
% [87]
% add(inverse(inverse(X)),n0) <->
% multiply(n1,multiply(multiply(add(X,inverse(inverse(X))),n1),add(n1,n1)))
% Current number of equations to process: 589
% Current number of ordered equations: 0
% Current number of rules: 83
% New rule produced :
% [88]
% multiply(add(n1,inverse(multiply(inverse(X),add(X,X)))),n1) <->
% add(inverse(multiply(inverse(b),add(b,b))),n0)
% Current number of equations to process: 622
% Current number of ordered equations: 1
% Current number of rules: 84
% New rule produced :
% [89]
% add(inverse(multiply(inverse(b),add(b,b))),n0) <->
% multiply(add(n1,inverse(multiply(inverse(X),add(X,X)))),n1)
% Current number of equations to process: 622
% Current number of ordered equations: 0
% Current number of rules: 85
% New rule produced :
% [90]
% multiply(n1,multiply(inverse(multiply(n0,X)),multiply(X,multiply(inverse(Y),
% add(Y,Y))))) -> n0
% Current number of equations to process: 655
% Current number of ordered equations: 0
% Current number of rules: 86
% New rule produced :
% [91] multiply(n1,multiply(inverse(multiply(n0,n1)),n0)) -> n0
% Current number of equations to process: 657
% Current number of ordered equations: 0
% Current number of rules: 87
% New rule produced :
% [92]
% multiply(multiply(inverse(multiply(n0,n1)),n0),add(n1,n1)) ->
% multiply(inverse(b),add(b,b))
% Current number of equations to process: 665
% Current number of ordered equations: 0
% Current number of rules: 88
% New rule produced :
% [93]
% multiply(add(n1,X),add(multiply(inverse(multiply(n0,n1)),n0),X)) -> add(X,n0)
% Current number of equations to process: 666
% Current number of ordered equations: 0
% Current number of rules: 89
% New rule produced :
% [94]
% multiply(n1,add(multiply(inverse(multiply(n0,n1)),n0),inverse(n1))) ->
% add(inverse(n1),n0)
% Current number of equations to process: 669
% Current number of ordered equations: 0
% Current number of rules: 90
% New rule produced :
% [95]
% multiply(n1,multiply(inverse(n0),multiply(inverse(multiply(X,Y)),multiply(Y,
% add(X,X)))))
% -> n0
% Current number of equations to process: 676
% Current number of ordered equations: 0
% Current number of rules: 91
% Rule [89]
% add(inverse(multiply(inverse(b),add(b,b))),n0) <->
% multiply(add(n1,inverse(multiply(inverse(X),add(X,X)))),n1) is composed into 
% [89]
% add(inverse(multiply(inverse(b),add(b,b))),n0) <->
% add(inverse(multiply(inverse(X),add(X,X))),n0)
% New rule produced :
% [96]
% multiply(add(n1,inverse(multiply(inverse(X),add(X,X)))),n1) ->
% add(inverse(multiply(inverse(X),add(X,X))),n0)
% Rule
% [88]
% multiply(add(n1,inverse(multiply(inverse(X),add(X,X)))),n1) <->
% add(inverse(multiply(inverse(b),add(b,b))),n0) collapsed.
% Current number of equations to process: 699
% Current number of ordered equations: 0
% Current number of rules: 91
% New rule produced :
% [97]
% multiply(add(add(X,Y),inverse(add(inverse(X),Y))),n1) <->
% add(inverse(add(inverse(X),Y)),add(Y,n0))
% Current number of equations to process: 703
% Current number of ordered equations: 1
% Current number of rules: 92
% New rule produced :
% [98]
% add(inverse(add(inverse(X),Y)),add(Y,n0)) <->
% multiply(add(add(X,Y),inverse(add(inverse(X),Y))),n1)
% Current number of equations to process: 703
% Current number of ordered equations: 0
% Current number of rules: 93
% New rule produced :
% [99]
% multiply(add(inverse(inverse(X)),n0),multiply(add(X,inverse(inverse(X))),n1))
% -> multiply(inverse(inverse(X)),n1)
% Current number of equations to process: 745
% Current number of ordered equations: 1
% Current number of rules: 94
% New rule produced :
% [100]
% multiply(multiply(add(X,inverse(inverse(X))),n1),add(inverse(inverse(X)),n0))
% -> multiply(inverse(inverse(X)),n1)
% Current number of equations to process: 745
% Current number of ordered equations: 0
% Current number of rules: 95
% New rule produced :
% [101]
% multiply(multiply(add(X,X),add(X,X)),multiply(n1,add(n1,n1))) ->
% multiply(n1,add(X,X))
% Current number of equations to process: 751
% Current number of ordered equations: 0
% Current number of rules: 96
% New rule produced :
% [102]
% multiply(add(n1,inverse(multiply(inverse(multiply(n0,n1)),n0))),n1) ->
% add(inverse(multiply(inverse(multiply(n0,n1)),n0)),n0)
% Current number of equations to process: 757
% Current number of ordered equations: 0
% Current number of rules: 97
% New rule produced :
% [103]
% add(X,add(inverse(add(Y,n0)),Y)) <->
% multiply(add(add(n1,inverse(add(Y,n0))),X),add(n1,X))
% Current number of equations to process: 758
% Current number of ordered equations: 1
% Current number of rules: 98
% New rule produced :
% [104]
% multiply(add(add(n1,inverse(add(Y,n0))),X),add(n1,X)) <->
% add(X,add(inverse(add(Y,n0)),Y))
% Current number of equations to process: 758
% Current number of ordered equations: 0
% Current number of rules: 99
% New rule produced :
% [105]
% add(inverse(n1),add(inverse(add(X,n0)),X)) <->
% multiply(add(add(n1,inverse(add(X,n0))),inverse(n1)),n1)
% Current number of equations to process: 834
% Current number of ordered equations: 1
% Current number of rules: 100
% New rule produced :
% [106]
% multiply(add(add(n1,inverse(add(X,n0))),inverse(n1)),n1) <->
% add(inverse(n1),add(inverse(add(X,n0)),X))
% Current number of equations to process: 834
% Current number of ordered equations: 0
% Current number of rules: 101
% New rule produced :
% [107]
% multiply(inverse(n0),multiply(inverse(multiply(X,Y)),multiply(Y,add(X,X))))
% <-> multiply(inverse(b),add(b,b))
% Current number of equations to process: 858
% Current number of ordered equations: 1
% Current number of rules: 102
% New rule produced :
% [108]
% multiply(inverse(b),add(b,b)) <->
% multiply(inverse(n0),multiply(inverse(multiply(X,Y)),multiply(Y,add(X,X))))
% Current number of equations to process: 858
% Current number of ordered equations: 0
% Current number of rules: 103
% New rule produced :
% [109]
% multiply(inverse(b),add(b,b)) <->
% multiply(inverse(multiply(n0,X)),multiply(X,multiply(inverse(Y),add(Y,Y))))
% Current number of equations to process: 891
% Current number of ordered equations: 1
% Current number of rules: 104
% New rule produced :
% [110]
% multiply(inverse(multiply(n0,X)),multiply(X,multiply(inverse(Y),add(Y,Y))))
% <-> multiply(inverse(b),add(b,b))
% Current number of equations to process: 891
% Current number of ordered equations: 0
% Current number of rules: 105
% Rule [110]
% multiply(inverse(multiply(n0,X)),multiply(X,multiply(inverse(Y),
% add(Y,Y)))) <->
% multiply(inverse(b),add(b,b)) is composed into [110]
% multiply(inverse(
% multiply(n0,X)),
% multiply(X,multiply(
% inverse(Y),
% add(Y,Y)))) ->
% multiply(inverse(
% multiply(n0,n1)),n0)
% Rule [107]
% multiply(inverse(n0),multiply(inverse(multiply(X,Y)),multiply(Y,
% add(X,X)))) <->
% multiply(inverse(b),add(b,b)) is composed into [107]
% multiply(inverse(n0),
% multiply(inverse(
% multiply(X,Y)),
% multiply(Y,add(X,X)))) ->
% multiply(inverse(
% multiply(n0,n1)),n0)
% Rule [92]
% multiply(multiply(inverse(multiply(n0,n1)),n0),add(n1,n1)) ->
% multiply(inverse(b),add(b,b)) is composed into [92]
% multiply(multiply(
% inverse(
% multiply(n0,n1)),n0),
% add(n1,n1)) ->
% multiply(inverse(
% multiply(n0,n1)),n0)
% Rule [78]
% multiply(multiply(add(X,inverse(inverse(X))),n1),add(inverse(inverse(
% inverse(X))),n0))
% -> multiply(inverse(b),add(b,b)) is composed into [78]
% multiply(multiply(
% add(X,
% inverse(
% inverse(X))),n1),
% add(inverse(inverse(
% inverse(X))),n0))
% ->
% multiply(inverse(
% multiply(n0,n1)),n0)
% Rule [70]
% multiply(inverse(n0),multiply(inverse(n0),multiply(inverse(X),add(X,X))))
% <-> multiply(inverse(b),add(b,b)) is composed into [70]
% multiply(inverse(n0),
% multiply(inverse(n0),
% multiply(inverse(X),
% add(X,X)))) ->
% multiply(inverse(
% multiply(n0,n1)),n0)
% Rule [49]
% multiply(multiply(inverse(X),add(X,X)),add(inverse(n0),n0)) ->
% multiply(inverse(b),add(b,b)) is composed into [49]
% multiply(multiply(
% inverse(X),
% add(X,X)),
% add(inverse(n0),n0)) ->
% multiply(inverse(
% multiply(n0,n1)),n0)
% Rule [43]
% multiply(add(inverse(X),n0),multiply(add(X,inverse(inverse(X))),n1)) ->
% multiply(inverse(b),add(b,b)) is composed into [43]
% multiply(add(inverse(X),n0),
% multiply(add(X,inverse(
% inverse(X))),n1))
% ->
% multiply(inverse(
% multiply(n0,n1)),n0)
% Rule [42]
% multiply(multiply(inverse(X),add(X,X)),add(n1,n1)) ->
% multiply(inverse(b),add(b,b)) is composed into [42]
% multiply(multiply(
% inverse(X),
% add(X,X)),
% add(n1,n1)) ->
% multiply(inverse(
% multiply(n0,n1)),n0)
% Rule [40] multiply(inverse(X),add(X,X)) <-> multiply(inverse(b),add(b,b)) is composed into 
% [40] multiply(inverse(X),add(X,X)) -> multiply(inverse(multiply(n0,n1)),n0)
% Rule [38]
% multiply(inverse(X),multiply(add(X,n0),add(n1,n1))) ->
% multiply(inverse(b),add(b,b)) is composed into [38]
% multiply(inverse(X),
% multiply(add(X,n0),
% add(n1,n1))) ->
% multiply(inverse(
% multiply(n0,n1)),n0)
% Rule [37]
% multiply(inverse(multiply(X,Y)),multiply(Y,add(X,X))) <->
% multiply(inverse(b),add(b,b)) is composed into [37]
% multiply(inverse(
% multiply(X,Y)),
% multiply(Y,add(X,X))) ->
% multiply(inverse(
% multiply(n0,n1)),n0)
% Rule [30]
% multiply(inverse(n0),multiply(inverse(X),add(X,X))) <->
% multiply(inverse(b),add(b,b)) is composed into [30]
% multiply(inverse(n0),
% multiply(inverse(X),
% add(X,X))) ->
% multiply(inverse(
% multiply(n0,n1)),n0)
% Rule [27] multiply(inverse(X),add(X,X)) <-> multiply(inverse(b),add(b,b)) is composed into 
% [27] multiply(inverse(X),add(X,X)) -> multiply(inverse(multiply(n0,n1)),n0)
% New rule produced :
% [111] multiply(inverse(b),add(b,b)) -> multiply(inverse(multiply(n0,n1)),n0)
% Rule
% [31]
% multiply(inverse(b),add(b,b)) <->
% multiply(inverse(n0),multiply(inverse(X),add(X,X))) collapsed.
% Rule
% [36]
% multiply(inverse(b),add(b,b)) <->
% multiply(inverse(multiply(X,Y)),multiply(Y,add(X,X))) collapsed.
% Rule
% [71]
% multiply(inverse(b),add(b,b)) <->
% multiply(inverse(n0),multiply(inverse(n0),multiply(inverse(X),add(X,X))))
% collapsed.
% Rule
% [89]
% add(inverse(multiply(inverse(b),add(b,b))),n0) <->
% add(inverse(multiply(inverse(X),add(X,X))),n0) collapsed.
% Rule
% [108]
% multiply(inverse(b),add(b,b)) <->
% multiply(inverse(n0),multiply(inverse(multiply(X,Y)),multiply(Y,add(X,X))))
% collapsed.
% Rule
% [109]
% multiply(inverse(b),add(b,b)) <->
% multiply(inverse(multiply(n0,X)),multiply(X,multiply(inverse(Y),add(Y,Y))))
% collapsed.
% Current number of equations to process: 911
% Current number of ordered equations: 0
% Current number of rules: 100
% New rule produced :
% [112]
% multiply(inverse(n0),multiply(inverse(n0),multiply(inverse(multiply(n0,n1)),n0)))
% -> multiply(inverse(multiply(n0,n1)),n0)
% Current number of equations to process: 910
% Current number of ordered equations: 0
% Current number of rules: 101
% New rule produced :
% [113]
% multiply(inverse(n0),multiply(inverse(multiply(n0,n1)),n0)) ->
% multiply(inverse(multiply(n0,n1)),n0)
% Rule
% [112]
% multiply(inverse(n0),multiply(inverse(n0),multiply(inverse(multiply(n0,n1)),n0)))
% -> multiply(inverse(multiply(n0,n1)),n0) collapsed.
% Current number of equations to process: 909
% Current number of ordered equations: 0
% Current number of rules: 101
% New rule produced :
% [114]
% multiply(inverse(multiply(n0,X)),multiply(X,multiply(inverse(multiply(n0,n1)),n0)))
% -> multiply(inverse(multiply(n0,n1)),n0)
% Current number of equations to process: 910
% Current number of ordered equations: 0
% Current number of rules: 102
% New rule produced :
% [115]
% multiply(n1,add(add(add(X,n0),Y),inverse(add(n1,Y)))) ->
% add(inverse(add(n1,Y)),add(Y,X))
% Current number of equations to process: 907
% Current number of ordered equations: 0
% Current number of rules: 103
% New rule produced :
% [116]
% multiply(add(multiply(Y,Z),X),add(add(X,n0),X)) ->
% multiply(add(X,n0),multiply(add(Y,n1),add(Z,n1)))
% Current number of equations to process: 922
% Current number of ordered equations: 0
% Current number of rules: 104
% New rule produced :
% [117]
% multiply(multiply(add(X,n0),add(n1,n1)),add(add(X,n0),X)) ->
% multiply(add(X,n0),add(n1,X))
% Current number of equations to process: 993
% Current number of ordered equations: 0
% Current number of rules: 105
% New rule produced :
% [118]
% multiply(add(n0,inverse(X)),multiply(multiply(inverse(multiply(n0,n1)),n0),
% add(inverse(X),n0))) -> n0
% Current number of equations to process: 1005
% Current number of ordered equations: 0
% Current number of rules: 106
% New rule produced :
% [119]
% multiply(n1,multiply(multiply(inverse(multiply(n0,n1)),n0),add(inverse(n0),n0)))
% -> n0
% Current number of equations to process: 1007
% Current number of ordered equations: 0
% Current number of rules: 107
% New rule produced :
% [120]
% multiply(n1,multiply(inverse(multiply(multiply(X,Y),Z)),multiply(Z,multiply(Y,
% add(X,X)))))
% -> n0
% Current number of equations to process: 1013
% Current number of ordered equations: 0
% Current number of rules: 108
% New rule produced :
% [121]
% multiply(n1,multiply(inverse(multiply(X,Y)),multiply(Y,multiply(add(X,n0),
% add(n1,n1))))) -> n0
% Current number of equations to process: 1052
% Current number of ordered equations: 0
% Current number of rules: 109
% New rule produced :
% [122]
% multiply(n1,multiply(inverse(multiply(inverse(X),n1)),add(inverse(X),n0))) ->
% n0
% Current number of equations to process: 1074
% Current number of ordered equations: 0
% Current number of rules: 110
% New rule produced :
% [123]
% multiply(n1,add(multiply(add(inverse(X),n0),add(n1,n1)),inverse(n1))) ->
% add(inverse(n1),add(inverse(X),n0))
% Current number of equations to process: 1117
% Current number of ordered equations: 0
% Current number of rules: 111
% New rule produced :
% [124]
% multiply(multiply(n1,n1),multiply(multiply(add(X,n0),add(n1,n1)),add(X,X)))
% -> multiply(X,n1)
% Current number of equations to process: 1119
% Current number of ordered equations: 1
% Current number of rules: 112
% New rule produced :
% [125]
% multiply(multiply(n1,n1),multiply(add(X,X),multiply(add(X,n0),add(n1,n1))))
% -> multiply(X,n1)
% Current number of equations to process: 1119
% Current number of ordered equations: 0
% Current number of rules: 113
% New rule produced :
% [126]
% multiply(n1,multiply(n1,multiply(multiply(add(X,inverse(inverse(X))),n1),
% add(n1,n1)))) -> inverse(inverse(X))
% Current number of equations to process: 1135
% Current number of ordered equations: 0
% Current number of rules: 114
% Rule [87]
% add(inverse(inverse(X)),n0) <->
% multiply(n1,multiply(multiply(add(X,inverse(inverse(X))),n1),add(n1,n1))) is composed into 
% [87] add(inverse(inverse(X)),n0) <-> multiply(add(X,inverse(inverse(X))),n1)
% New rule produced :
% [127]
% multiply(n1,multiply(multiply(add(X,inverse(inverse(X))),n1),add(n1,n1))) ->
% multiply(add(X,inverse(inverse(X))),n1)
% Rule
% [86]
% multiply(n1,multiply(multiply(add(X,inverse(inverse(X))),n1),add(n1,n1))) <->
% add(inverse(inverse(X)),n0) collapsed.
% Rule
% [126]
% multiply(n1,multiply(n1,multiply(multiply(add(X,inverse(inverse(X))),n1),
% add(n1,n1)))) -> inverse(inverse(X)) collapsed.
% Current number of equations to process: 1138
% Current number of ordered equations: 0
% Current number of rules: 113
% New rule produced :
% [128]
% multiply(n1,multiply(inverse(multiply(multiply(X,add(X,X)),multiply(n1,n1))),
% multiply(X,n1))) -> n0
% Current number of equations to process: 1140
% Current number of ordered equations: 0
% Current number of rules: 114
% New rule produced :
% [129]
% multiply(n1,multiply(inverse(multiply(inverse(inverse(X)),n1)),multiply(
% add(X,
% inverse(
% inverse(X))),n1)))
% -> n0
% Current number of equations to process: 1149
% Current number of ordered equations: 0
% Current number of rules: 115
% New rule produced :
% [130]
% multiply(multiply(add(X,inverse(Y)),n1),multiply(add(X,Y),add(Y,Y))) ->
% multiply(Y,add(X,inverse(Y)))
% Current number of equations to process: 1153
% Current number of ordered equations: 0
% Current number of rules: 116
% New rule produced :
% [131]
% multiply(multiply(add(X,inverse(inverse(X))),n1),add(inverse(X),n0)) ->
% multiply(inverse(X),add(X,inverse(inverse(X))))
% Current number of equations to process: 1165
% Current number of ordered equations: 0
% Current number of rules: 117
% New rule produced :
% [132]
% multiply(inverse(X),add(X,inverse(inverse(X)))) <->
% multiply(add(inverse(inverse(X)),n0),add(inverse(X),n0))
% Current number of equations to process: 1172
% Current number of ordered equations: 1
% Current number of rules: 118
% New rule produced :
% [133]
% multiply(add(inverse(inverse(X)),n0),add(inverse(X),n0)) <->
% multiply(inverse(X),add(X,inverse(inverse(X))))
% Current number of equations to process: 1172
% Current number of ordered equations: 0
% Current number of rules: 119
% New rule produced :
% [134]
% multiply(add(inverse(inverse(n0)),inverse(n0)),multiply(inverse(n0),add(n0,
% inverse(
% inverse(n0)))))
% -> inverse(inverse(n0))
% Current number of equations to process: 1179
% Current number of ordered equations: 0
% Current number of rules: 120
% New rule produced :
% [135]
% multiply(add(n1,inverse(add(inverse(inverse(X)),n0))),n1) <->
% add(inverse(multiply(add(X,inverse(inverse(X))),n1)),inverse(inverse(X)))
% Current number of equations to process: 1182
% Current number of ordered equations: 1
% Current number of rules: 121
% New rule produced :
% [136]
% add(inverse(multiply(add(X,inverse(inverse(X))),n1)),inverse(inverse(X))) <->
% multiply(add(n1,inverse(add(inverse(inverse(X)),n0))),n1)
% Current number of equations to process: 1182
% Current number of ordered equations: 0
% Current number of rules: 122
% New rule produced :
% [137]
% multiply(add(add(inverse(X),n0),n0),add(n1,n1)) ->
% multiply(multiply(add(inverse(X),n0),add(n1,n1)),add(n1,n1))
% Current number of equations to process: 1198
% Current number of ordered equations: 0
% Current number of rules: 123
% New rule produced :
% [138]
% multiply(add(X,n0),add(multiply(inverse(multiply(n0,n1)),n0),n0)) <->
% multiply(multiply(inverse(multiply(n0,n1)),n0),add(n1,X))
% Current number of equations to process: 1207
% Current number of ordered equations: 1
% Current number of rules: 124
% New rule produced :
% [139]
% multiply(multiply(inverse(multiply(n0,n1)),n0),add(n1,X)) <->
% multiply(add(X,n0),add(multiply(inverse(multiply(n0,n1)),n0),n0))
% Current number of equations to process: 1207
% Current number of ordered equations: 0
% Current number of rules: 125
% New rule produced :
% [140]
% multiply(inverse(multiply(multiply(X,Y),Z)),multiply(Z,multiply(Y,add(X,X))))
% -> multiply(inverse(multiply(n0,n1)),n0)
% Rule
% [120]
% multiply(n1,multiply(inverse(multiply(multiply(X,Y),Z)),multiply(Z,multiply(Y,
% add(X,X)))))
% -> n0 collapsed.
% Current number of equations to process: 1216
% Current number of ordered equations: 0
% Current number of rules: 125
% New rule produced :
% [141]
% multiply(inverse(multiply(X,Y)),multiply(Y,multiply(add(X,n0),add(n1,n1))))
% -> multiply(inverse(multiply(n0,n1)),n0)
% Rule
% [121]
% multiply(n1,multiply(inverse(multiply(X,Y)),multiply(Y,multiply(add(X,n0),
% add(n1,n1))))) -> n0
% collapsed.
% Current number of equations to process: 1266
% Current number of ordered equations: 0
% Current number of rules: 125
% New rule produced :
% [142]
% multiply(inverse(multiply(inverse(X),n1)),add(inverse(X),n0)) ->
% multiply(inverse(multiply(n0,n1)),n0)
% Rule
% [122]
% multiply(n1,multiply(inverse(multiply(inverse(X),n1)),add(inverse(X),n0))) ->
% n0 collapsed.
% Current number of equations to process: 1291
% Current number of ordered equations: 0
% Current number of rules: 125
% New rule produced :
% [143]
% multiply(multiply(inverse(multiply(n0,n1)),n0),add(inverse(n0),n0)) ->
% multiply(inverse(multiply(n0,n1)),n0)
% Rule
% [119]
% multiply(n1,multiply(multiply(inverse(multiply(n0,n1)),n0),add(inverse(n0),n0)))
% -> n0 collapsed.
% Current number of equations to process: 1336
% Current number of ordered equations: 0
% Current number of rules: 125
% New rule produced :
% [144]
% multiply(add(inverse(X),n0),add(n1,add(X,n0))) ->
% multiply(add(inverse(b),inverse(X)),add(add(b,b),inverse(X)))
% Current number of equations to process: 1338
% Current number of ordered equations: 0
% Current number of rules: 126
% New rule produced :
% [145]
% add(inverse(add(X,inverse(inverse(X)))),add(inverse(inverse(X)),n0)) ->
% multiply(n1,add(n1,inverse(add(X,inverse(inverse(X))))))
% Current number of equations to process: 1344
% Current number of ordered equations: 0
% Current number of rules: 127
% New rule produced :
% [146]
% multiply(add(add(inverse(X),n0),Y),add(add(inverse(X),n0),Y)) ->
% multiply(add(inverse(X),Y),add(n1,Y))
% Current number of equations to process: 1352
% Current number of ordered equations: 0
% Current number of rules: 128
% New rule produced :
% [147]
% multiply(add(inverse(X),n0),multiply(multiply(add(inverse(X),n0),add(n1,n1)),
% add(n1,n1))) -> add(inverse(X),n0)
% Current number of equations to process: 1369
% Current number of ordered equations: 0
% Current number of rules: 129
% New rule produced :
% [148]
% multiply(add(add(n1,X),inverse(add(add(Y,n0),X))),n1) <->
% add(inverse(add(add(Y,n0),X)),add(X,Y))
% Current number of equations to process: 1373
% Current number of ordered equations: 1
% Current number of rules: 130
% New rule produced :
% [149]
% add(inverse(add(add(Y,n0),X)),add(X,Y)) <->
% multiply(add(add(n1,X),inverse(add(add(Y,n0),X))),n1)
% Current number of equations to process: 1373
% Current number of ordered equations: 0
% Current number of rules: 131
% New rule produced :
% [150]
% multiply(inverse(multiply(multiply(X,add(X,X)),multiply(n1,n1))),multiply(X,n1))
% -> multiply(inverse(multiply(n0,n1)),n0)
% Rule
% [128]
% multiply(n1,multiply(inverse(multiply(multiply(X,add(X,X)),multiply(n1,n1))),
% multiply(X,n1))) -> n0 collapsed.
% Current number of equations to process: 1420
% Current number of ordered equations: 0
% Current number of rules: 131
% New rule produced :
% [151]
% multiply(inverse(multiply(inverse(inverse(X)),n1)),multiply(add(X,inverse(
% inverse(X))),n1))
% -> multiply(inverse(multiply(n0,n1)),n0)
% Rule
% [129]
% multiply(n1,multiply(inverse(multiply(inverse(inverse(X)),n1)),multiply(
% add(X,
% inverse(
% inverse(X))),n1)))
% -> n0 collapsed.
% Current number of equations to process: 1428
% Current number of ordered equations: 0
% Current number of rules: 131
% New rule produced :
% [152]
% multiply(add(inverse(inverse(X)),inverse(X)),multiply(multiply(add(inverse(
% inverse(X)),n0),
% add(n1,n1)),n1)) ->
% inverse(inverse(X))
% Current number of equations to process: 1431
% Current number of ordered equations: 0
% Current number of rules: 132
% New rule produced :
% [153]
% multiply(add(n0,inverse(inverse(X))),multiply(multiply(inverse(multiply(n0,n1)),n0),
% multiply(add(X,inverse(inverse(X))),n1)))
% -> n0
% Current number of equations to process: 1435
% Current number of ordered equations: 0
% Current number of rules: 133
% New rule produced :
% [154]
% multiply(multiply(add(n1,inverse(add(X,n0))),n1),add(inverse(inverse(
% add(X,n0))),X))
% -> add(X,n0)
% Current number of equations to process: 1438
% Current number of ordered equations: 0
% Current number of rules: 134
% New rule produced :
% [155]
% multiply(multiply(add(X,inverse(inverse(X))),n1),add(multiply(inverse(
% multiply(n0,n1)),n0),n0))
% <->
% multiply(multiply(inverse(multiply(n0,n1)),n0),add(n1,inverse(inverse(X))))
% Current number of equations to process: 1447
% Current number of ordered equations: 1
% Current number of rules: 135
% New rule produced :
% [156]
% multiply(multiply(inverse(multiply(n0,n1)),n0),add(n1,inverse(inverse(X))))
% <->
% multiply(multiply(add(X,inverse(inverse(X))),n1),add(multiply(inverse(
% multiply(n0,n1)),n0),n0))
% Current number of equations to process: 1447
% Current number of ordered equations: 0
% Current number of rules: 136
% New rule produced :
% [157]
% multiply(add(X,inverse(Y)),multiply(multiply(add(X,n0),add(n1,n1)),add(
% inverse(Y),X)))
% -> X
% Current number of equations to process: 1450
% Current number of ordered equations: 0
% Current number of rules: 137
% New rule produced :
% [158]
% add(add(X,n0),X) <->
% multiply(add(n1,add(X,n0)),multiply(add(add(X,n0),n0),add(n1,n1)))
% Rule
% [35]
% multiply(n1,add(add(inverse(X),n0),inverse(X))) ->
% multiply(add(inverse(X),n0),add(n1,X)) collapsed.
% Current number of equations to process: 1472
% Current number of ordered equations: 1
% Current number of rules: 137
% New rule produced :
% [159]
% multiply(add(n1,add(X,n0)),multiply(add(add(X,n0),n0),add(n1,n1))) <->
% add(add(X,n0),X)
% Current number of equations to process: 1472
% Current number of ordered equations: 0
% Current number of rules: 138
% New rule produced :
% [160]
% multiply(add(add(multiply(Z,X),n0),Y),add(add(n1,n1),Y)) ->
% multiply(add(X,Y),add(add(Z,Z),Y))
% Current number of equations to process: 1520
% Current number of ordered equations: 0
% Current number of rules: 139
% New rule produced :
% [161]
% multiply(add(n1,n1),multiply(add(add(X,n0),n0),add(n1,n1))) <->
% multiply(add(add(X,X),n0),add(n1,n1))
% Current number of equations to process: 1629
% Current number of ordered equations: 1
% Current number of rules: 140
% New rule produced :
% [162]
% multiply(add(add(X,X),n0),add(n1,n1)) <->
% multiply(add(n1,n1),multiply(add(add(X,n0),n0),add(n1,n1)))
% Current number of equations to process: 1629
% Current number of ordered equations: 0
% Current number of rules: 141
% New rule produced :
% [163]
% add(inverse(add(add(X,n0),inverse(n1))),add(inverse(n1),X)) ->
% multiply(add(n1,inverse(add(add(X,n0),inverse(n1)))),n1)
% Current number of equations to process: 1639
% Current number of ordered equations: 0
% Current number of rules: 142
% New rule produced :
% [164]
% multiply(n1,add(add(multiply(inverse(multiply(n0,n1)),n0),inverse(n1)),
% inverse(n1))) -> add(inverse(n1),add(inverse(n1),n0))
% Current number of equations to process: 1655
% Current number of ordered equations: 0
% Current number of rules: 143
% New rule produced :
% [165]
% multiply(multiply(n1,n1),multiply(multiply(X,add(Y,Y)),multiply(X,add(Y,Y))))
% -> multiply(multiply(Y,X),n1)
% Current number of equations to process: 1659
% Current number of ordered equations: 0
% Current number of rules: 144
% New rule produced :
% [166]
% multiply(multiply(n1,n1),multiply(X,add(Y,X))) ->
% multiply(multiply(X,add(Y,X)),n1)
% Current number of equations to process: 1660
% Current number of ordered equations: 0
% Current number of rules: 145
% New rule produced :
% [167]
% multiply(multiply(n1,n1),multiply(inverse(X),n1)) ->
% multiply(multiply(inverse(X),n1),n1)
% Current number of equations to process: 1674
% Current number of ordered equations: 0
% Current number of rules: 146
% New rule produced :
% [168]
% multiply(multiply(X,add(X,X)),n1) <->
% multiply(multiply(n1,n1),multiply(X,multiply(add(X,n0),add(n1,n1))))
% Current number of equations to process: 1702
% Current number of ordered equations: 1
% Current number of rules: 147
% New rule produced :
% [169]
% multiply(multiply(n1,n1),multiply(X,multiply(add(X,n0),add(n1,n1)))) <->
% multiply(multiply(X,add(X,X)),n1)
% Current number of equations to process: 1702
% Current number of ordered equations: 0
% Current number of rules: 148
% New rule produced :
% [170]
% multiply(multiply(n1,n1),add(inverse(X),n0)) ->
% multiply(add(inverse(X),n0),n1)
% Current number of equations to process: 1714
% Current number of ordered equations: 0
% Current number of rules: 149
% New rule produced :
% [171]
% multiply(multiply(n1,n1),multiply(add(X,inverse(inverse(X))),n1)) <->
% multiply(add(inverse(inverse(X)),n0),n1)
% Current number of equations to process: 1722
% Current number of ordered equations: 1
% Current number of rules: 150
% New rule produced :
% [172]
% multiply(add(inverse(inverse(X)),n0),n1) <->
% multiply(multiply(n1,n1),multiply(add(X,inverse(inverse(X))),n1))
% Current number of equations to process: 1722
% Current number of ordered equations: 0
% Current number of rules: 151
% Rule [172]
% multiply(add(inverse(inverse(X)),n0),n1) <->
% multiply(multiply(n1,n1),multiply(add(X,inverse(inverse(X))),n1)) is composed into 
% [172]
% multiply(add(inverse(inverse(X)),n0),n1) <->
% multiply(multiply(add(X,inverse(inverse(X))),n1),n1)
% New rule produced :
% [173]
% multiply(multiply(n1,n1),multiply(add(X,inverse(inverse(X))),n1)) ->
% multiply(multiply(add(X,inverse(inverse(X))),n1),n1)
% Rule
% [171]
% multiply(multiply(n1,n1),multiply(add(X,inverse(inverse(X))),n1)) <->
% multiply(add(inverse(inverse(X)),n0),n1) collapsed.
% Current number of equations to process: 1728
% Current number of ordered equations: 0
% Current number of rules: 151
% New rule produced :
% [174]
% multiply(multiply(n1,n1),multiply(n0,multiply(inverse(multiply(n0,n1)),n0)))
% -> multiply(multiply(n0,multiply(inverse(multiply(n0,n1)),n0)),n1)
% Current number of equations to process: 1733
% Current number of ordered equations: 0
% Current number of rules: 152
% New rule produced :
% [175]
% multiply(add(multiply(n1,n1),Y),add(multiply(inverse(X),n1),Y)) ->
% multiply(add(multiply(inverse(X),n1),Y),add(n1,Y))
% Current number of equations to process: 1736
% Current number of ordered equations: 0
% Current number of rules: 153
% New rule produced :
% [176]
% multiply(add(multiply(n1,n1),Y),add(add(inverse(X),n0),Y)) ->
% multiply(add(add(inverse(X),n0),Y),add(n1,Y))
% Current number of equations to process: 1734
% Current number of ordered equations: 0
% Current number of rules: 154
% New rule produced :
% [177]
% multiply(add(multiply(n1,n1),inverse(multiply(inverse(X),n1))),n1) ->
% multiply(n1,add(n1,inverse(multiply(inverse(X),n1))))
% Current number of equations to process: 1741
% Current number of ordered equations: 0
% Current number of rules: 155
% New rule produced :
% [178]
% multiply(add(multiply(n1,n1),inverse(add(inverse(X),n0))),n1) ->
% multiply(n1,add(n1,inverse(add(inverse(X),n0))))
% Current number of equations to process: 1755
% Current number of ordered equations: 0
% Current number of rules: 156
% New rule produced :
% [179]
% multiply(add(n1,n0),add(multiply(add(n1,add(inverse(inverse(n1)),n0)),
% multiply(multiply(add(inverse(inverse(n1)),n0),
% add(n1,n1)),add(n1,n1))),n0)) ->
% add(inverse(inverse(n1)),n0)
% Current number of equations to process: 1775
% Current number of ordered equations: 0
% Current number of rules: 157
% New rule produced :
% [180]
% multiply(multiply(add(X,inverse(inverse(X))),n1),multiply(add(X,inverse(
% inverse(X))),n1))
% -> multiply(inverse(inverse(X)),n1)
% Current number of equations to process: 1778
% Current number of ordered equations: 0
% Current number of rules: 158
% New rule produced :
% [181]
% multiply(add(inverse(X),inverse(add(inverse(X),n0))),add(n1,inverse(add(
% inverse(X),n0))))
% -> multiply(n1,n1)
% Current number of equations to process: 1777
% Current number of ordered equations: 0
% Current number of rules: 159
% New rule produced :
% [182]
% multiply(n1,add(inverse(X),inverse(add(inverse(X),n0)))) ->
% multiply(multiply(n1,n1),multiply(add(inverse(X),n1),add(n1,n1)))
% Current number of equations to process: 1782
% Current number of ordered equations: 0
% Current number of rules: 160
% New rule produced :
% [183]
% multiply(add(add(n1,X),inverse(add(add(inverse(X),n0),X))),n1) ->
% add(inverse(add(add(inverse(X),n0),X)),n1)
% Current number of equations to process: 1789
% Current number of ordered equations: 0
% Current number of rules: 161
% New rule produced :
% [184]
% multiply(multiply(n1,n1),multiply(n0,multiply(add(X,inverse(inverse(X))),n1)))
% <-> multiply(multiply(n0,add(inverse(inverse(X)),n0)),n1)
% Current number of equations to process: 1802
% Current number of ordered equations: 1
% Current number of rules: 162
% New rule produced :
% [185]
% multiply(multiply(n0,add(inverse(inverse(X)),n0)),n1) <->
% multiply(multiply(n1,n1),multiply(n0,multiply(add(X,inverse(inverse(X))),n1)))
% Current number of equations to process: 1802
% Current number of ordered equations: 0
% Current number of rules: 163
% New rule produced :
% [186]
% multiply(add(X,X),multiply(add(inverse(X),n0),add(n1,n1))) <->
% multiply(add(b,b),multiply(add(inverse(b),n0),add(n1,n1)))
% Current number of equations to process: 1809
% Current number of ordered equations: 1
% Current number of rules: 164
% New rule produced :
% [187]
% multiply(add(b,b),multiply(add(inverse(b),n0),add(n1,n1))) <->
% multiply(add(X,X),multiply(add(inverse(X),n0),add(n1,n1)))
% Current number of equations to process: 1809
% Current number of ordered equations: 0
% Current number of rules: 165
% Rule [144]
% multiply(add(inverse(X),n0),add(n1,add(X,n0))) ->
% multiply(add(inverse(b),inverse(X)),add(add(b,b),inverse(X))) is composed into 
% [144]
% multiply(add(inverse(X),n0),add(n1,add(X,n0))) ->
% multiply(add(inverse(n0),inverse(X)),add(multiply(inverse(multiply(n0,n1)),n0),
% inverse(X)))
% Rule [68]
% multiply(add(inverse(Y),X),add(add(Y,Y),X)) <->
% multiply(add(inverse(b),X),add(add(b,b),X)) is composed into [68]
% multiply(
% add(
% inverse(Y),X),
% add(
% add(Y,Y),X))
% ->
% multiply(
% add(
% inverse(n0),X),
% add(
% multiply(
% inverse(
% multiply(n0,n1)),n0),X))
% New rule produced :
% [188]
% multiply(add(inverse(b),X),add(add(b,b),X)) ->
% multiply(add(inverse(n0),X),add(multiply(inverse(multiply(n0,n1)),n0),X))
% Rule
% [69]
% multiply(add(inverse(b),X),add(add(b,b),X)) <->
% multiply(add(inverse(Y),X),add(add(Y,Y),X)) collapsed.
% Current number of equations to process: 1822
% Current number of ordered equations: 0
% Current number of rules: 165
% New rule produced :
% [189]
% multiply(n1,add(multiply(add(X,inverse(inverse(X))),n1),inverse(inverse(X))))
% -> multiply(add(inverse(inverse(X)),n0),add(n1,inverse(X)))
% Current number of equations to process: 1832
% Current number of ordered equations: 0
% Current number of rules: 166
% New rule produced :
% [190]
% multiply(add(n1,X),add(add(multiply(inverse(multiply(n0,n1)),n0),inverse(n1)),X))
% -> add(X,add(inverse(n1),n0))
% Current number of equations to process: 1838
% Current number of ordered equations: 0
% Current number of rules: 167
% New rule produced :
% [191]
% multiply(add(n1,n1),multiply(add(add(inverse(n0),n0),n0),add(n1,add(n1,n0))))
% -> add(n1,inverse(n0))
% Current number of equations to process: 1843
% Current number of ordered equations: 0
% Current number of rules: 168
% Rule [135]
% multiply(add(n1,inverse(add(inverse(inverse(X)),n0))),n1) <->
% add(inverse(multiply(add(X,inverse(inverse(X))),n1)),inverse(inverse(X))) is composed into 
% [135]
% multiply(add(n1,inverse(add(inverse(inverse(X)),n0))),n1) <->
% multiply(add(n1,inverse(multiply(add(X,inverse(inverse(X))),n1))),n1)
% New rule produced :
% [192]
% add(inverse(multiply(add(X,inverse(inverse(X))),n1)),inverse(inverse(X))) ->
% multiply(add(n1,inverse(multiply(add(X,inverse(inverse(X))),n1))),n1)
% Rule
% [136]
% add(inverse(multiply(add(X,inverse(inverse(X))),n1)),inverse(inverse(X))) <->
% multiply(add(n1,inverse(add(inverse(inverse(X)),n0))),n1) collapsed.
% Current number of equations to process: 1847
% Current number of ordered equations: 0
% Current number of rules: 168
% Rule [188]
% multiply(add(inverse(b),X),add(add(b,b),X)) ->
% multiply(add(inverse(n0),X),add(multiply(inverse(multiply(n0,n1)),n0),X)) is composed into 
% [188]
% multiply(add(inverse(b),X),add(add(b,b),X)) ->
% multiply(add(inverse(multiply(n0,n1)),X),add(n0,X))
% Rule [144]
% multiply(add(inverse(X),n0),add(n1,add(X,n0))) ->
% multiply(add(inverse(n0),inverse(X)),add(multiply(inverse(multiply(n0,n1)),n0),
% inverse(X))) is composed into 
% [144]
% multiply(add(inverse(X),n0),add(n1,add(X,n0))) ->
% multiply(add(inverse(multiply(n0,n1)),inverse(X)),add(n0,inverse(X)))
% Rule [68]
% multiply(add(inverse(Y),X),add(add(Y,Y),X)) ->
% multiply(add(inverse(n0),X),add(multiply(inverse(multiply(n0,n1)),n0),X)) is composed into 
% [68]
% multiply(add(inverse(Y),X),add(add(Y,Y),X)) ->
% multiply(add(inverse(multiply(n0,n1)),X),add(n0,X))
% New rule produced :
% [193]
% multiply(add(inverse(n0),X),add(multiply(inverse(multiply(n0,n1)),n0),X)) ->
% multiply(add(inverse(multiply(n0,n1)),X),add(n0,X))
% Current number of equations to process: 1858
% Current number of ordered equations: 0
% Current number of rules: 169
% New rule produced :
% [194]
% multiply(add(add(Y,inverse(Z)),X),add(multiply(add(Y,Z),add(inverse(Z),Z)),X))
% -> add(X,Y)
% Current number of equations to process: 1870
% Current number of ordered equations: 0
% Current number of rules: 170
% New rule produced :
% [195]
% multiply(add(add(Y,inverse(Z)),X),add(multiply(add(Y,Y),add(inverse(Z),Y)),X))
% -> add(X,Y)
% Current number of equations to process: 1912
% Current number of ordered equations: 0
% Current number of rules: 171
% New rule produced :
% [196]
% multiply(add(add(Z,X),Y),add(add(add(X,n0),X),Y)) <->
% multiply(add(add(X,n0),Y),add(add(n1,Z),Y))
% Rule
% [83]
% multiply(add(add(inverse(n1),X),n0),add(add(add(X,n0),X),n0)) -> add(X,n0)
% collapsed.
% Current number of equations to process: 1935
% Current number of ordered equations: 1
% Current number of rules: 171
% New rule produced : [197] multiply(add(add(X,n0),n0),add(n1,n0)) -> add(X,n0)
% Current number of equations to process: 1934
% Current number of ordered equations: 1
% Current number of rules: 172
% New rule produced :
% [198]
% multiply(add(add(X,n0),Y),add(add(n1,Z),Y)) <->
% multiply(add(add(Z,X),Y),add(add(add(X,n0),X),Y))
% Current number of equations to process: 1934
% Current number of ordered equations: 0
% Current number of rules: 173
% New rule produced :
% [199] multiply(add(X,n0),multiply(add(add(X,n0),n1),add(n1,n1))) -> add(X,n0)
% Current number of equations to process: 1977
% Current number of ordered equations: 0
% Current number of rules: 174
% New rule produced :
% [200]
% multiply(add(multiply(inverse(multiply(n0,n1)),n0),n0),add(n1,n0)) ->
% multiply(inverse(multiply(n0,n1)),n0)
% Current number of equations to process: 1982
% Current number of ordered equations: 0
% Current number of rules: 175
% New rule produced :
% [201]
% multiply(add(multiply(add(X,inverse(inverse(X))),n1),n0),add(n1,n0)) ->
% add(inverse(inverse(X)),n0)
% Current number of equations to process: 1983
% Current number of ordered equations: 0
% Current number of rules: 176
% New rule produced :
% [202]
% multiply(add(add(add(Y,n0),n0),X),add(add(n1,n0),X)) -> add(X,add(Y,n0))
% Current number of equations to process: 1982
% Current number of ordered equations: 0
% Current number of rules: 177
% New rule produced :
% [203] multiply(add(n1,n0),add(n1,add(add(X,n0),n0))) -> add(n1,add(X,n0))
% Current number of equations to process: 2037
% Current number of ordered equations: 0
% Current number of rules: 178
% New rule produced :
% [204]
% multiply(add(add(add(X,n0),n0),inverse(add(n1,n0))),n1) ->
% add(inverse(add(n1,n0)),add(X,n0))
% Current number of equations to process: 2048
% Current number of ordered equations: 0
% Current number of rules: 179
% New rule produced :
% [205]
% multiply(n1,add(add(n1,n0),inverse(add(add(X,n0),n0)))) ->
% multiply(add(n1,inverse(add(add(X,n0),n0))),n1)
% Current number of equations to process: 2067
% Current number of ordered equations: 0
% Current number of rules: 180
% New rule produced :
% [206]
% multiply(add(n1,n1),multiply(add(add(multiply(X,Y),n0),n0),add(n1,n1))) ->
% multiply(add(X,X),add(Y,Y))
% Current number of equations to process: 2073
% Current number of ordered equations: 0
% Current number of rules: 181
% New rule produced :
% [207]
% multiply(add(inverse(Y),X),multiply(add(add(Y,X),n0),add(n1,n1))) <->
% multiply(add(add(X,n0),n0),add(n1,n1))
% Current number of equations to process: 2206
% Current number of ordered equations: 1
% Current number of rules: 182
% Rule [207]
% multiply(add(inverse(Y),X),multiply(add(add(Y,X),n0),add(n1,n1))) <->
% multiply(add(add(X,n0),n0),add(n1,n1)) is composed into [207]
% multiply(
% add(inverse(Y),X),
% multiply(
% add(add(Y,X),n0),
% add(n1,n1))) <->
% multiply(
% add(inverse(b),X),
% multiply(
% add(add(b,X),n0),
% add(n1,n1)))
% Rule [162]
% multiply(add(add(X,X),n0),add(n1,n1)) <->
% multiply(add(n1,n1),multiply(add(add(X,n0),n0),add(n1,n1))) is composed into 
% [162]
% multiply(add(add(X,X),n0),add(n1,n1)) <->
% multiply(add(n1,n1),multiply(add(inverse(b),X),multiply(add(add(b,X),n0),
% add(n1,n1))))
% Rule [158]
% add(add(X,n0),X) <->
% multiply(add(n1,add(X,n0)),multiply(add(add(X,n0),n0),add(n1,n1))) is composed into 
% [158]
% add(add(X,n0),X) <->
% multiply(add(n1,add(X,n0)),multiply(add(inverse(b),X),multiply(add(add(b,X),n0),
% add(n1,n1))))
% New rule produced :
% [208]
% multiply(add(add(X,n0),n0),add(n1,n1)) <->
% multiply(add(inverse(Y),X),multiply(add(add(Y,X),n0),add(n1,n1)))
% Rule
% [137]
% multiply(add(add(inverse(X),n0),n0),add(n1,n1)) ->
% multiply(multiply(add(inverse(X),n0),add(n1,n1)),add(n1,n1)) collapsed.
% Rule
% [159]
% multiply(add(n1,add(X,n0)),multiply(add(add(X,n0),n0),add(n1,n1))) <->
% add(add(X,n0),X) collapsed.
% Rule
% [161]
% multiply(add(n1,n1),multiply(add(add(X,n0),n0),add(n1,n1))) <->
% multiply(add(add(X,X),n0),add(n1,n1)) collapsed.
% Rule
% [206]
% multiply(add(n1,n1),multiply(add(add(multiply(X,Y),n0),n0),add(n1,n1))) ->
% multiply(add(X,X),add(Y,Y)) collapsed.
% Current number of equations to process: 2210
% Current number of ordered equations: 0
% Current number of rules: 179
% New rule produced :
% [209]
% multiply(n1,multiply(add(add(X,inverse(inverse(X))),n0),add(n1,n1))) <->
% multiply(add(inverse(b),inverse(inverse(X))),multiply(add(add(b,inverse(
% inverse(X))),n0),
% add(n1,n1)))
% Current number of equations to process: 2269
% Current number of ordered equations: 1
% Current number of rules: 180
% New rule produced :
% [210]
% multiply(add(inverse(b),inverse(inverse(X))),multiply(add(add(b,inverse(
% inverse(X))),n0),
% add(n1,n1))) <->
% multiply(n1,multiply(add(add(X,inverse(inverse(X))),n0),add(n1,n1)))
% Current number of equations to process: 2269
% Current number of ordered equations: 0
% Current number of rules: 181
% New rule produced :
% [211]
% multiply(n1,multiply(inverse(add(inverse(n1),X)),multiply(add(add(X,n0),
% inverse(n1)),
% add(n1,n1)))) -> n0
% Current number of equations to process: 2280
% Current number of ordered equations: 0
% Current number of rules: 182
% New rule produced :
% [212]
% multiply(n1,multiply(inverse(inverse(inverse(X))),multiply(multiply(add(X,
% inverse(
% inverse(X))),n1),
% add(n1,n1)))) -> n0
% Current number of equations to process: 2292
% Current number of ordered equations: 0
% Current number of rules: 183
% New rule produced :
% [213]
% multiply(add(multiply(add(Y,n0),add(n1,n1)),X),add(add(inverse(Y),Y),X)) ->
% add(X,add(Y,n0))
% Current number of equations to process: 2296
% Current number of ordered equations: 0
% Current number of rules: 184
% New rule produced :
% [214]
% add(X,add(Y,add(Z,Z))) <->
% multiply(add(add(add(Z,n0),Y),X),add(add(add(n1,n1),Y),X))
% Current number of equations to process: 2322
% Current number of ordered equations: 1
% Current number of rules: 185
% New rule produced :
% [215]
% multiply(add(add(add(Z,n0),Y),X),add(add(add(n1,n1),Y),X)) <->
% add(X,add(Y,add(Z,Z)))
% Current number of equations to process: 2322
% Current number of ordered equations: 0
% Current number of rules: 186
% New rule produced :
% [216]
% multiply(add(add(n1,Y),X),add(add(multiply(inverse(multiply(n0,n1)),n0),Y),X))
% -> add(X,add(Y,n0))
% Current number of equations to process: 2462
% Current number of ordered equations: 0
% Current number of rules: 187
% New rule produced :
% [217]
% multiply(add(add(add(inverse(inverse(n1)),n0),inverse(n1)),X),add(add(n1,n1),X))
% -> add(X,add(n1,n1))
% Current number of equations to process: 2489
% Current number of ordered equations: 0
% Current number of rules: 188
% New rule produced :
% [218]
% multiply(n1,add(add(X,X),inverse(inverse(X)))) ->
% multiply(add(inverse(multiply(n0,n1)),inverse(inverse(X))),add(n0,inverse(
% inverse(X))))
% Current number of equations to process: 2506
% Current number of ordered equations: 0
% Current number of rules: 189
% New rule produced :
% [219]
% multiply(multiply(n1,add(n0,inverse(X))),multiply(add(X,n0),multiply(
% inverse(multiply(n0,n1)),n0)))
% -> multiply(n0,n1)
% Current number of equations to process: 2513
% Current number of ordered equations: 0
% Current number of rules: 190
% New rule produced :
% [220]
% multiply(add(multiply(n1,n1),Y),add(multiply(add(X,X),add(X,X)),Y)) ->
% multiply(add(X,Y),add(n1,Y))
% Rule
% [77]
% multiply(add(multiply(n1,n1),n0),add(multiply(add(X,X),add(X,X)),n0)) -> X
% collapsed.
% Current number of equations to process: 2521
% Current number of ordered equations: 0
% Current number of rules: 190
% New rule produced : [221] multiply(add(X,n0),add(n1,n0)) -> X
% Rule [197] multiply(add(add(X,n0),n0),add(n1,n0)) -> add(X,n0) collapsed.
% Rule
% [200]
% multiply(add(multiply(inverse(multiply(n0,n1)),n0),n0),add(n1,n0)) ->
% multiply(inverse(multiply(n0,n1)),n0) collapsed.
% Rule
% [201]
% multiply(add(multiply(add(X,inverse(inverse(X))),n1),n0),add(n1,n0)) ->
% add(inverse(inverse(X)),n0) collapsed.
% Current number of equations to process: 2520
% Current number of ordered equations: 0
% Current number of rules: 188
% New rule produced : [222] multiply(X,multiply(add(X,n1),add(n1,n1))) -> X
% Rule
% [199] multiply(add(X,n0),multiply(add(add(X,n0),n1),add(n1,n1))) -> add(X,n0)
% collapsed.
% Current number of equations to process: 2542
% Current number of ordered equations: 0
% Current number of rules: 188
% New rule produced :
% [223] multiply(multiply(inverse(multiply(n0,n1)),n0),add(n1,n0)) -> n0
% Current number of equations to process: 2546
% Current number of ordered equations: 0
% Current number of rules: 189
% New rule produced :
% [224] add(n0,add(inverse(inverse(X)),n0)) -> add(X,inverse(inverse(X)))
% Current number of equations to process: 2546
% Current number of ordered equations: 0
% Current number of rules: 190
% New rule produced :
% [225] add(n0,add(inverse(add(X,n0)),X)) -> add(n1,inverse(add(X,n0)))
% Current number of equations to process: 2546
% Current number of ordered equations: 0
% Current number of rules: 191
% New rule produced :
% [226]
% multiply(multiply(add(X,inverse(inverse(X))),n1),add(n1,n0)) ->
% inverse(inverse(X))
% Current number of equations to process: 2546
% Current number of ordered equations: 0
% Current number of rules: 192
% New rule produced :
% [227] multiply(add(add(Y,n0),X),add(add(n1,n0),X)) -> add(X,Y)
% Rule
% [202]
% multiply(add(add(add(Y,n0),n0),X),add(add(n1,n0),X)) -> add(X,add(Y,n0))
% collapsed.
% Current number of equations to process: 2545
% Current number of ordered equations: 0
% Current number of rules: 192
% New rule produced :
% [228]
% multiply(inverse(multiply(multiply(n1,add(X,n1)),X)),X) ->
% multiply(inverse(multiply(n0,n1)),n0)
% Current number of equations to process: 2556
% Current number of ordered equations: 0
% Current number of rules: 193
% New rule produced :
% [229] multiply(add(Y,X),add(multiply(add(Y,n1),add(n1,n1)),X)) -> add(X,Y)
% Current number of equations to process: 2572
% Current number of ordered equations: 0
% Current number of rules: 194
% New rule produced :
% [230]
% multiply(multiply(add(X,n1),add(n1,n1)),add(X,X)) ->
% multiply(add(X,n0),add(n1,n1))
% Current number of equations to process: 2571
% Current number of ordered equations: 0
% Current number of rules: 195
% New rule produced : [231] multiply(add(n1,n0),add(n1,add(X,n0))) -> add(n1,X)
% Rule
% [203] multiply(add(n1,n0),add(n1,add(add(X,n0),n0))) -> add(n1,add(X,n0))
% collapsed.
% Current number of equations to process: 2598
% Current number of ordered equations: 0
% Current number of rules: 195
% New rule produced :
% [232]
% multiply(n1,add(add(n1,n0),inverse(add(X,n0)))) <-> add(inverse(add(X,n0)),X)
% Current number of equations to process: 2602
% Current number of ordered equations: 2
% Current number of rules: 196
% New rule produced :
% [233]
% add(inverse(add(X,n0)),X) <-> multiply(n1,add(add(n1,n0),inverse(add(X,n0))))
% Current number of equations to process: 2602
% Current number of ordered equations: 1
% Current number of rules: 197
% New rule produced :
% [234]
% multiply(add(add(X,n0),inverse(add(n1,n0))),n1) -> add(inverse(add(n1,n0)),X)
% Rule
% [204]
% multiply(add(add(add(X,n0),n0),inverse(add(n1,n0))),n1) ->
% add(inverse(add(n1,n0)),add(X,n0)) collapsed.
% Current number of equations to process: 2602
% Current number of ordered equations: 0
% Current number of rules: 197
% New rule produced :
% [235]
% multiply(add(X,inverse(inverse(X))),add(n1,add(inverse(inverse(X)),n0))) ->
% add(X,inverse(inverse(X)))
% Current number of equations to process: 2611
% Current number of ordered equations: 0
% Current number of rules: 198
% New rule produced :
% [236]
% multiply(add(multiply(inverse(multiply(n0,n1)),n0),X),add(add(n1,n0),X)) ->
% add(X,n0)
% Current number of equations to process: 2610
% Current number of ordered equations: 0
% Current number of rules: 199
% New rule produced :
% [237]
% multiply(multiply(inverse(multiply(n0,n1)),n0),add(multiply(inverse(multiply(n0,n1)),n0),n0))
% -> n0
% Current number of equations to process: 2609
% Current number of ordered equations: 0
% Current number of rules: 200
% New rule produced :
% [238]
% add(n0,add(inverse(multiply(inverse(multiply(n0,n1)),n0)),n0)) ->
% add(n1,inverse(multiply(inverse(multiply(n0,n1)),n0)))
% Current number of equations to process: 2608
% Current number of ordered equations: 0
% Current number of rules: 201
% New rule produced :
% [239]
% multiply(multiply(n1,n1),multiply(inverse(multiply(n0,n1)),n0)) ->
% multiply(multiply(inverse(multiply(n0,n1)),n0),n1)
% Current number of equations to process: 2621
% Current number of ordered equations: 0
% Current number of rules: 202
% New rule produced :
% [240]
% multiply(n1,add(multiply(add(X,n1),add(n1,n1)),inverse(X))) ->
% add(inverse(X),X)
% Current number of equations to process: 2638
% Current number of ordered equations: 0
% Current number of rules: 203
% New rule produced :
% [241] multiply(multiply(n1,n1),add(n1,n1)) -> multiply(add(n1,n1),n1)
% Current number of equations to process: 2676
% Current number of ordered equations: 0
% Current number of rules: 204
% New rule produced :
% [242]
% multiply(add(add(n1,n0),X),add(add(n1,add(Y,n0)),X)) -> add(X,add(n1,Y))
% Current number of equations to process: 2675
% Current number of ordered equations: 0
% Current number of rules: 205
% New rule produced :
% [243]
% multiply(add(n1,n0),multiply(add(inverse(multiply(n0,n1)),n1),add(n0,n1))) ->
% add(n1,n0)
% Current number of equations to process: 2674
% Current number of ordered equations: 0
% Current number of rules: 206
% New rule produced : [244] add(inverse(add(n1,n0)),n1) -> multiply(n1,n1)
% Current number of equations to process: 2676
% Current number of ordered equations: 0
% Current number of rules: 207
% Rule [233]
% add(inverse(add(X,n0)),X) <->
% multiply(n1,add(add(n1,n0),inverse(add(X,n0)))) is composed into 
% [233] add(inverse(add(X,n0)),X) <-> multiply(add(n1,inverse(add(X,n0))),n1)
% New rule produced :
% [245]
% multiply(n1,add(add(n1,n0),inverse(add(X,n0)))) ->
% multiply(add(n1,inverse(add(X,n0))),n1)
% Rule
% [205]
% multiply(n1,add(add(n1,n0),inverse(add(add(X,n0),n0)))) ->
% multiply(add(n1,inverse(add(add(X,n0),n0))),n1) collapsed.
% Rule
% [232]
% multiply(n1,add(add(n1,n0),inverse(add(X,n0)))) <-> add(inverse(add(X,n0)),X)
% collapsed.
% Current number of equations to process: 2702
% Current number of ordered equations: 0
% Current number of rules: 206
% New rule produced :
% [246]
% multiply(inverse(add(n1,n0)),multiply(add(n1,n1),n1)) -> inverse(add(n1,n0))
% Current number of equations to process: 2714
% Current number of ordered equations: 0
% Current number of rules: 207
% New rule produced :
% [247]
% multiply(add(multiply(inverse(multiply(n0,n1)),n0),inverse(add(n1,n0))),n1)
% -> add(inverse(add(n1,n0)),n0)
% Current number of equations to process: 2725
% Current number of ordered equations: 0
% Current number of rules: 208
% New rule produced :
% [248]
% multiply(inverse(multiply(n1,multiply(n1,n1))),multiply(add(n1,n1),n1)) ->
% multiply(inverse(multiply(n0,n1)),n0)
% Current number of equations to process: 2786
% Current number of ordered equations: 0
% Current number of rules: 209
% New rule produced :
% [249]
% multiply(add(multiply(n1,n1),X),add(add(n1,n1),X)) ->
% multiply(add(add(n1,n1),X),add(n1,X))
% Current number of equations to process: 2785
% Current number of ordered equations: 0
% Current number of rules: 210
% New rule produced :
% [250]
% multiply(n1,add(add(n1,add(X,n0)),inverse(add(n1,n0)))) ->
% add(inverse(add(n1,n0)),add(n1,X))
% Current number of equations to process: 2803
% Current number of ordered equations: 0
% Current number of rules: 211
% New rule produced :
% [251] multiply(add(add(n1,n0),n1),multiply(n1,n1)) -> add(n1,n0)
% Current number of equations to process: 2817
% Current number of ordered equations: 0
% Current number of rules: 212
% New rule produced :
% [252]
% multiply(multiply(n1,n1),add(inverse(inverse(add(n1,n0))),n1)) -> add(n1,n0)
% Current number of equations to process: 2825
% Current number of ordered equations: 0
% Current number of rules: 213
% New rule produced :
% [253]
% multiply(multiply(n1,n1),multiply(n1,multiply(n1,n1))) ->
% multiply(multiply(n1,multiply(n1,n1)),n1)
% Current number of equations to process: 2824
% Current number of ordered equations: 0
% Current number of rules: 214
% New rule produced : [254] add(n1,inverse(add(n1,n0))) -> n1
% Current number of equations to process: 2828
% Current number of ordered equations: 0
% Current number of rules: 215
% New rule produced :
% [255] multiply(multiply(n1,n1),add(multiply(add(n1,n1),n1),n1)) -> n1
% Current number of equations to process: 2831
% Current number of ordered equations: 0
% Current number of rules: 216
% New rule produced :
% [256] multiply(n1,multiply(add(n1,n1),multiply(n1,n1))) -> n1
% Current number of equations to process: 2830
% Current number of ordered equations: 0
% Current number of rules: 217
% New rule produced :
% [257] multiply(multiply(n1,n1),add(add(n1,n0),n1)) -> multiply(add(n1,n0),n1)
% Current number of equations to process: 2829
% Current number of ordered equations: 0
% Current number of rules: 218
% New rule produced :
% [258]
% multiply(add(add(add(n1,n0),n1),X),add(multiply(n1,n1),X)) ->
% add(X,add(n1,n0))
% Current number of equations to process: 2828
% Current number of ordered equations: 0
% Current number of rules: 219
% New rule produced :
% [259]
% multiply(add(add(add(n1,n0),n1),inverse(multiply(n1,n1))),n1) ->
% add(inverse(multiply(n1,n1)),add(n1,n0))
% Current number of equations to process: 2827
% Current number of ordered equations: 0
% Current number of rules: 220
% New rule produced :
% [260]
% multiply(add(inverse(add(n1,n0)),X),add(add(X,n0),X)) ->
% multiply(add(X,n0),n1)
% Current number of equations to process: 2838
% Current number of ordered equations: 0
% Current number of rules: 221
% New rule produced :
% [261]
% multiply(multiply(n1,add(n1,inverse(inverse(add(n1,n0))))),multiply(add(n1,n1),n1))
% -> multiply(n1,n1)
% Current number of equations to process: 2837
% Current number of ordered equations: 0
% Current number of rules: 222
% New rule produced :
% [262]
% multiply(add(X,inverse(multiply(add(X,n1),add(n1,n1)))),n1) ->
% add(inverse(multiply(add(X,n1),add(n1,n1))),X)
% Current number of equations to process: 2835
% Current number of ordered equations: 0
% Current number of rules: 223
% New rule produced :
% [263]
% multiply(multiply(add(n0,n1),add(n1,n1)),multiply(inverse(multiply(n0,n1)),n0))
% -> multiply(inverse(multiply(n0,n1)),n0)
% Current number of equations to process: 2834
% Current number of ordered equations: 0
% Current number of rules: 224
% New rule produced :
% [264]
% multiply(add(inverse(add(n1,n0)),X),add(multiply(add(n1,n1),n1),X)) ->
% add(X,inverse(add(n1,n0)))
% Current number of equations to process: 2833
% Current number of ordered equations: 0
% Current number of rules: 225
% New rule produced :
% [265]
% multiply(add(add(n1,n0),inverse(add(n1,add(X,n0)))),n1) <->
% add(inverse(add(n1,add(X,n0))),add(n1,X))
% Current number of equations to process: 2832
% Current number of ordered equations: 1
% Current number of rules: 226
% New rule produced :
% [266]
% add(inverse(add(n1,add(X,n0))),add(n1,X)) <->
% multiply(add(add(n1,n0),inverse(add(n1,add(X,n0)))),n1)
% Current number of equations to process: 2832
% Current number of ordered equations: 0
% Current number of rules: 227
% New rule produced :
% [267]
% add(inverse(add(add(n1,n0),n1)),add(n1,n0)) ->
% multiply(n1,add(multiply(n1,n1),inverse(add(add(n1,n0),n1))))
% Current number of equations to process: 2831
% Current number of ordered equations: 0
% Current number of rules: 228
% New rule produced :
% [268]
% multiply(add(multiply(n1,n1),inverse(add(n1,n1))),n1) ->
% multiply(n1,add(n1,inverse(add(n1,n1))))
% Current number of equations to process: 2844
% Current number of ordered equations: 0
% Current number of rules: 229
% New rule produced :
% [269]
% multiply(n1,add(inverse(n1),inverse(add(n1,n0)))) ->
% add(inverse(add(n1,n0)),n0)
% Current number of equations to process: 2902
% Current number of ordered equations: 0
% Current number of rules: 230
% New rule produced :
% [270]
% multiply(n1,add(add(X,n0),inverse(add(n1,n0)))) -> add(inverse(add(n1,n0)),X)
% Current number of equations to process: 2907
% Current number of ordered equations: 0
% Current number of rules: 231
% New rule produced :
% [271]
% multiply(multiply(n1,n1),multiply(add(add(n1,n0),n1),add(n1,n1))) ->
% multiply(n1,n1)
% Current number of equations to process: 2906
% Current number of ordered equations: 0
% Current number of rules: 232
% New rule produced :
% [272]
% multiply(add(multiply(add(n1,n1),n1),n1),multiply(n1,add(n1,n1))) ->
% add(n1,n1)
% Current number of equations to process: 2910
% Current number of ordered equations: 0
% Current number of rules: 233
% New rule produced :
% [273]
% multiply(n1,add(multiply(add(n1,n1),add(n1,n1)),inverse(add(n1,n0)))) ->
% multiply(n1,n1)
% Current number of equations to process: 2909
% Current number of ordered equations: 0
% Current number of rules: 234
% New rule produced :
% [274]
% multiply(n1,add(multiply(inverse(multiply(n0,n1)),n0),inverse(add(n1,n0))))
% -> add(inverse(add(n1,n0)),n0)
% Current number of equations to process: 2908
% Current number of ordered equations: 0
% Current number of rules: 235
% New rule produced :
% [275] multiply(multiply(add(n1,n1),multiply(n1,n1)),add(n1,n1)) -> add(n1,n1)
% Current number of equations to process: 2910
% Current number of ordered equations: 0
% Current number of rules: 236
% New rule produced :
% [276]
% multiply(add(n1,X),add(multiply(add(n1,n1),multiply(n1,n1)),X)) -> add(X,n1)
% Current number of equations to process: 2909
% Current number of ordered equations: 0
% Current number of rules: 237
% New rule produced :
% [277]
% multiply(n1,multiply(add(n1,add(n1,n0)),add(inverse(add(n1,n0)),add(n1,n0))))
% -> n1
% Current number of equations to process: 2914
% Current number of ordered equations: 0
% Current number of rules: 238
% New rule produced :
% [278]
% multiply(n1,add(add(inverse(n1),inverse(add(n1,n0))),inverse(n1))) ->
% add(inverse(n1),add(inverse(add(n1,n0)),n0))
% Current number of equations to process: 2913
% Current number of ordered equations: 0
% Current number of rules: 239
% New rule produced :
% [279]
% multiply(add(multiply(n1,n1),X),add(add(multiply(add(n1,n1),n1),n1),X)) ->
% add(X,n1)
% Current number of equations to process: 2912
% Current number of ordered equations: 0
% Current number of rules: 240
% New rule produced :
% [280]
% multiply(add(n1,X),add(add(inverse(n1),inverse(add(n1,n0))),X)) ->
% add(X,add(inverse(add(n1,n0)),n0))
% Current number of equations to process: 2927
% Current number of ordered equations: 0
% Current number of rules: 241
% New rule produced :
% [281]
% add(inverse(add(n1,n0)),add(inverse(inverse(X)),n0)) <->
% multiply(add(add(X,inverse(inverse(X))),inverse(add(n1,n0))),n1)
% Current number of equations to process: 2926
% Current number of ordered equations: 1
% Current number of rules: 242
% New rule produced :
% [282]
% multiply(add(add(X,inverse(inverse(X))),inverse(add(n1,n0))),n1) <->
% add(inverse(add(n1,n0)),add(inverse(inverse(X)),n0))
% Current number of equations to process: 2926
% Current number of ordered equations: 0
% Current number of rules: 243
% New rule produced :
% [283]
% multiply(add(X,inverse(inverse(X))),add(inverse(n0),add(inverse(inverse(X)),n0)))
% -> add(add(inverse(inverse(X)),n0),n0)
% Current number of equations to process: 2942
% Current number of ordered equations: 0
% Current number of rules: 244
% New rule produced :
% [284]
% multiply(add(multiply(add(Y,inverse(inverse(Y))),n1),X),add(add(n1,n0),X)) ->
% add(X,inverse(inverse(Y)))
% Current number of equations to process: 2941
% Current number of ordered equations: 0
% Current number of rules: 245
% New rule produced :
% [285]
% multiply(add(add(add(Z,n0),Y),X),add(add(add(n1,n0),Y),X)) -> add(X,add(Y,Z))
% Current number of equations to process: 2939
% Current number of ordered equations: 0
% Current number of rules: 246
% New rule produced :
% [286]
% multiply(multiply(add(multiply(X,Y),n1),add(n1,n1)),multiply(Y,add(X,X))) ->
% multiply(Y,add(X,X))
% Current number of equations to process: 2937
% Current number of ordered equations: 0
% Current number of rules: 247
% New rule produced :
% [287]
% multiply(add(n1,n0),multiply(add(add(X,inverse(inverse(X))),n1),add(n1,n1)))
% -> add(n1,inverse(inverse(X)))
% Current number of equations to process: 2936
% Current number of ordered equations: 0
% Current number of rules: 248
% New rule produced :
% [288]
% multiply(n1,add(add(n1,n0),inverse(multiply(inverse(multiply(n0,n1)),n0))))
% -> add(inverse(multiply(inverse(multiply(n0,n1)),n0)),n0)
% Current number of equations to process: 2935
% Current number of ordered equations: 0
% Current number of rules: 249
% New rule produced :
% [289]
% multiply(add(multiply(n1,n1),X),add(add(inverse(inverse(add(n1,n0))),n1),X))
% -> add(X,add(n1,n0))
% Current number of equations to process: 2932
% Current number of ordered equations: 0
% Current number of rules: 250
% New rule produced :
% [290]
% multiply(multiply(n1,add(X,inverse(add(n1,n0)))),multiply(add(n1,X),add(X,X)))
% -> multiply(X,n1)
% Current number of equations to process: 2929
% Current number of ordered equations: 0
% Current number of rules: 251
% New rule produced :
% [291]
% multiply(add(multiply(n1,n1),n0),add(multiply(add(add(n1,n0),n1),add(n1,n1)),n0))
% -> n1
% Current number of equations to process: 2928
% Current number of ordered equations: 0
% Current number of rules: 252
% New rule produced :
% [292]
% multiply(n1,add(add(add(X,n0),inverse(n1)),inverse(add(n1,n0)))) ->
% add(inverse(add(n1,n0)),add(inverse(n1),X))
% Current number of equations to process: 2927
% Current number of ordered equations: 0
% Current number of rules: 253
% New rule produced :
% [293]
% multiply(n1,add(add(add(X,n0),inverse(add(n1,n0))),inverse(n1))) ->
% add(inverse(n1),add(inverse(add(n1,n0)),X))
% Current number of equations to process: 2926
% Current number of ordered equations: 0
% Current number of rules: 254
% New rule produced :
% [294]
% multiply(add(multiply(add(n1,n1),multiply(n1,n1)),X),add(add(n1,n1),X)) ->
% add(X,add(n1,n1))
% Current number of equations to process: 2925
% Current number of ordered equations: 0
% Current number of rules: 255
% New rule produced :
% [295]
% multiply(add(multiply(n1,n1),X),add(add(add(n1,n0),n1),X)) ->
% multiply(add(add(n1,n0),X),add(n1,X))
% Current number of equations to process: 2924
% Current number of ordered equations: 0
% Current number of rules: 256
% New rule produced :
% [296]
% multiply(add(add(n1,n0),inverse(add(n1,add(inverse(n1),n0)))),n1) ->
% add(inverse(add(n1,add(inverse(n1),n0))),n1)
% Current number of equations to process: 2979
% Current number of ordered equations: 0
% Current number of rules: 257
% New rule produced :
% [297]
% add(inverse(add(n1,n0)),add(X,n0)) <-> add(inverse(add(n1,n0)),add(n0,X))
% Current number of equations to process: 3020
% Current number of ordered equations: 1
% Current number of rules: 258
% New rule produced :
% [298]
% add(inverse(add(n1,n0)),add(n0,X)) <-> add(inverse(add(n1,n0)),add(X,n0))
% Current number of equations to process: 3020
% Current number of ordered equations: 0
% Current number of rules: 259
% New rule produced :
% [299]
% multiply(n1,add(multiply(add(n1,n1),multiply(n1,n1)),inverse(n1))) ->
% add(inverse(n1),n1)
% Current number of equations to process: 3055
% Current number of ordered equations: 0
% Current number of rules: 260
% New rule produced :
% [300]
% multiply(n1,add(multiply(add(n1,n1),multiply(n1,n1)),inverse(add(n1,n0)))) ->
% multiply(n1,n1)
% Current number of equations to process: 3063
% Current number of ordered equations: 0
% Current number of rules: 261
% New rule produced :
% [301]
% multiply(add(n1,inverse(multiply(add(n1,n1),multiply(n1,n1)))),n1) ->
% add(inverse(multiply(add(n1,n1),multiply(n1,n1))),n1)
% Current number of equations to process: 3062
% Current number of ordered equations: 0
% Current number of rules: 262
% New rule produced :
% [302]
% multiply(n1,add(add(multiply(add(n1,n1),n1),n1),inverse(multiply(n1,n1)))) ->
% add(inverse(multiply(n1,n1)),n1)
% Current number of equations to process: 3088
% Current number of ordered equations: 0
% Current number of rules: 263
% New rule produced :
% [303]
% multiply(multiply(add(add(n1,n0),n1),add(n1,n1)),multiply(n1,add(n1,n1))) ->
% multiply(n1,add(n1,n1))
% Current number of equations to process: 3089
% Current number of ordered equations: 0
% Current number of rules: 264
% New rule produced :
% [304]
% multiply(add(inverse(add(n1,n0)),n0),add(inverse(n1),n0)) ->
% multiply(inverse(n1),n1)
% Current number of equations to process: 3290
% Current number of ordered equations: 0
% Current number of rules: 265
% New rule produced :
% [305] add(inverse(add(n1,n0)),add(inverse(n0),n0)) -> multiply(n1,n1)
% Current number of equations to process: 3387
% Current number of ordered equations: 0
% Current number of rules: 266
% New rule produced :
% [306]
% multiply(n1,multiply(add(n1,add(n1,n0)),add(inverse(add(n1,n0)),add(n0,n1))))
% -> n1
% Current number of equations to process: 3416
% Current number of ordered equations: 0
% Current number of rules: 267
% New rule produced :
% [307]
% add(inverse(add(n1,n0)),add(n0,inverse(inverse(X)))) <->
% multiply(add(add(X,inverse(inverse(X))),inverse(add(n1,n0))),n1)
% Current number of equations to process: 3422
% Current number of ordered equations: 1
% Current number of rules: 268
% New rule produced :
% [308]
% multiply(add(add(X,inverse(inverse(X))),inverse(add(n1,n0))),n1) <->
% add(inverse(add(n1,n0)),add(n0,inverse(inverse(X))))
% Current number of equations to process: 3422
% Current number of ordered equations: 0
% Current number of rules: 269
% New rule produced :
% [309]
% add(inverse(add(n1,n0)),add(add(inverse(inverse(X)),n0),n0)) ->
% add(inverse(add(n1,n0)),add(X,inverse(inverse(X))))
% Current number of equations to process: 3421
% Current number of ordered equations: 0
% Current number of rules: 270
% New rule produced :
% [310]
% multiply(add(add(n1,n0),add(inverse(n0),n0)),multiply(n1,n1)) ->
% add(add(inverse(n0),n0),n0)
% Current number of equations to process: 3457
% Current number of ordered equations: 0
% Current number of rules: 271
% New rule produced :
% [311]
% multiply(multiply(n1,n1),add(inverse(inverse(add(n1,n0))),add(inverse(n0),n0)))
% -> add(add(inverse(n0),n0),n0)
% Current number of equations to process: 3456
% Current number of ordered equations: 0
% Current number of rules: 272
% New rule produced :
% [312]
% multiply(multiply(n1,n1),multiply(add(inverse(n0),n0),multiply(n1,n1))) ->
% multiply(multiply(add(inverse(n0),n0),multiply(n1,n1)),n1)
% Current number of equations to process: 3455
% Current number of ordered equations: 0
% Current number of rules: 273
% New rule produced :
% [313]
% multiply(add(n1,inverse(add(X,n0))),add(n1,add(inverse(add(X,n0)),X))) ->
% add(n1,inverse(add(X,n0)))
% Current number of equations to process: 3514
% Current number of ordered equations: 0
% Current number of rules: 274
% New rule produced :
% [314]
% add(X,add(inverse(add(Y,n0)),Y)) <->
% multiply(add(n1,X),add(add(add(n1,n0),inverse(add(Y,n0))),X))
% Current number of equations to process: 3513
% Current number of ordered equations: 1
% Current number of rules: 275
% New rule produced :
% [315]
% multiply(add(n1,X),add(add(add(n1,n0),inverse(add(Y,n0))),X)) <->
% add(X,add(inverse(add(Y,n0)),Y))
% Current number of equations to process: 3513
% Current number of ordered equations: 0
% Current number of rules: 276
% New rule produced :
% [316]
% multiply(add(add(inverse(add(X,n0)),X),n0),add(n1,n1)) ->
% multiply(add(add(n1,n0),inverse(add(X,n0))),add(n1,n1))
% Current number of equations to process: 3512
% Current number of ordered equations: 0
% Current number of rules: 277
% New rule produced :
% [317]
% multiply(add(multiply(add(X,inverse(inverse(X))),n1),inverse(add(n1,n0))),n1)
% -> add(inverse(add(n1,n0)),inverse(inverse(X)))
% Current number of equations to process: 3510
% Current number of ordered equations: 0
% Current number of rules: 278
% New rule produced :
% [318]
% multiply(add(add(add(Y,n0),inverse(add(n1,n0))),X),add(n1,X)) ->
% add(X,add(inverse(add(n1,n0)),Y))
% Current number of equations to process: 3509
% Current number of ordered equations: 0
% Current number of rules: 279
% New rule produced :
% [319]
% multiply(inverse(multiply(n0,multiply(n1,n1))),multiply(multiply(inverse(
% multiply(n0,n1)),n0),n1))
% -> multiply(inverse(multiply(n0,n1)),n0)
% Current number of equations to process: 3507
% Current number of ordered equations: 0
% Current number of rules: 280
% New rule produced :
% [320]
% multiply(n1,add(multiply(add(n1,n1),n1),inverse(inverse(add(n1,n0))))) ->
% add(inverse(inverse(add(n1,n0))),inverse(add(n1,n0)))
% Current number of equations to process: 3506
% Current number of ordered equations: 0
% Current number of rules: 281
% New rule produced :
% [321]
% multiply(add(inverse(add(n1,n0)),inverse(n1)),multiply(multiply(n1,n1),
% add(inverse(n1),n1))) ->
% inverse(add(n1,n0))
% Current number of equations to process: 3505
% Current number of ordered equations: 0
% Current number of rules: 282
% New rule produced :
% [322]
% multiply(n1,add(add(inverse(inverse(add(n1,n0))),n1),inverse(multiply(n1,n1))))
% -> add(inverse(multiply(n1,n1)),add(n1,n0))
% Current number of equations to process: 3504
% Current number of ordered equations: 0
% Current number of rules: 283
% New rule produced :
% [323]
% multiply(add(n1,X),add(add(add(Y,n0),inverse(add(n1,n0))),X)) ->
% add(X,add(inverse(add(n1,n0)),Y))
% Current number of equations to process: 3502
% Current number of ordered equations: 0
% Current number of rules: 284
% New rule produced :
% [324]
% multiply(n1,add(multiply(add(X,inverse(inverse(X))),n1),inverse(add(n1,n0))))
% -> add(inverse(add(n1,n0)),inverse(inverse(X)))
% Current number of equations to process: 3501
% Current number of ordered equations: 0
% Current number of rules: 285
% New rule produced :
% [325]
% multiply(add(add(inverse(add(n1,n0)),X),n0),add(n1,n1)) ->
% multiply(add(add(X,n0),inverse(add(n1,n0))),add(n1,n1))
% Current number of equations to process: 3496
% Current number of ordered equations: 0
% Current number of rules: 286
% New rule produced :
% [326]
% multiply(add(n1,n0),add(add(add(n1,n0),inverse(add(X,n0))),n0)) ->
% add(n1,inverse(add(X,n0)))
% Current number of equations to process: 3625
% Current number of ordered equations: 0
% Current number of rules: 287
% New rule produced :
% [327]
% multiply(n1,add(add(add(n1,n0),inverse(add(X,n0))),inverse(n1))) <->
% add(inverse(n1),add(inverse(add(X,n0)),X))
% Current number of equations to process: 3663
% Current number of ordered equations: 1
% Current number of rules: 288
% New rule produced :
% [328]
% add(inverse(n1),add(inverse(add(X,n0)),X)) <->
% multiply(n1,add(add(add(n1,n0),inverse(add(X,n0))),inverse(n1)))
% Current number of equations to process: 3663
% Current number of ordered equations: 0
% Current number of rules: 289
% New rule produced :
% [329]
% multiply(add(add(add(X,n0),inverse(add(n1,n0))),inverse(n1)),n1) ->
% add(inverse(n1),add(inverse(add(n1,n0)),X))
% Current number of equations to process: 3714
% Current number of ordered equations: 0
% Current number of rules: 290
% New rule produced :
% [330]
% add(n0,add(inverse(add(n1,n0)),X)) -> add(add(X,n0),inverse(add(n1,n0)))
% Current number of equations to process: 3716
% Current number of ordered equations: 0
% Current number of rules: 291
% New rule produced :
% [331]
% multiply(add(add(inverse(inverse(add(n1,n0))),n0),inverse(add(n1,n0))),
% add(n1,n1)) -> add(n1,n1)
% Current number of equations to process: 3789
% Current number of ordered equations: 0
% Current number of rules: 292
% New rule produced :
% [332]
% multiply(add(add(add(inverse(n0),n0),n0),inverse(add(n1,n0))),add(n1,n1)) ->
% multiply(n1,add(n1,n1))
% Current number of equations to process: 3799
% Current number of ordered equations: 0
% Current number of rules: 293
% New rule produced :
% [333]
% add(add(inverse(inverse(add(n1,n0))),n0),inverse(add(n1,n0))) -> add(n0,n1)
% Rule
% [331]
% multiply(add(add(inverse(inverse(add(n1,n0))),n0),inverse(add(n1,n0))),
% add(n1,n1)) -> add(n1,n1) collapsed.
% Current number of equations to process: 3855
% Current number of ordered equations: 0
% Current number of rules: 293
% New rule produced : [334] multiply(add(n0,n1),add(n1,n1)) -> add(n1,n1)
% Rule
% [263]
% multiply(multiply(add(n0,n1),add(n1,n1)),multiply(inverse(multiply(n0,n1)),n0))
% -> multiply(inverse(multiply(n0,n1)),n0) collapsed.
% Current number of equations to process: 3855
% Current number of ordered equations: 0
% Current number of rules: 293
% New rule produced :
% [335]
% multiply(add(n1,n1),multiply(inverse(multiply(n0,n1)),n0)) ->
% multiply(inverse(multiply(n0,n1)),n0)
% Current number of equations to process: 3854
% Current number of ordered equations: 0
% Current number of rules: 294
% New rule produced :
% [336] add(add(add(inverse(n0),n0),n0),inverse(add(n1,n0))) -> n1
% Rule
% [332]
% multiply(add(add(add(inverse(n0),n0),n0),inverse(add(n1,n0))),add(n1,n1)) ->
% multiply(n1,add(n1,n1)) collapsed.
% Current number of equations to process: 3865
% Current number of ordered equations: 0
% Current number of rules: 294
% New rule produced :
% [337]
% add(add(add(n0,X),n0),inverse(add(n1,n0))) <->
% add(add(add(X,n0),n0),inverse(add(n1,n0)))
% Current number of equations to process: 3867
% Current number of ordered equations: 1
% Current number of rules: 295
% New rule produced :
% [338]
% add(add(add(X,n0),n0),inverse(add(n1,n0))) <->
% add(add(add(n0,X),n0),inverse(add(n1,n0)))
% Current number of equations to process: 3867
% Current number of ordered equations: 0
% Current number of rules: 296
% New rule produced :
% [339]
% multiply(add(multiply(n1,n1),inverse(add(n1,n0))),add(n0,n1)) ->
% multiply(add(n0,n1),n1)
% Current number of equations to process: 3878
% Current number of ordered equations: 0
% Current number of rules: 297
% New rule produced :
% [340]
% multiply(add(inverse(inverse(add(n1,n0))),inverse(add(n1,n0))),n1) ->
% multiply(add(n0,n1),add(n0,n1))
% Current number of equations to process: 3877
% Current number of ordered equations: 0
% Current number of rules: 298
% Rule [339]
% multiply(add(multiply(n1,n1),inverse(add(n1,n0))),add(n0,n1)) ->
% multiply(add(n0,n1),n1) is composed into [339]
% multiply(add(multiply(n1,n1),
% inverse(add(n1,n0))),
% add(n0,n1)) -> n1
% New rule produced : [341] multiply(add(n0,n1),n1) -> n1
% Current number of equations to process: 3880
% Current number of ordered equations: 0
% Current number of rules: 299
% New rule produced : [342] multiply(n1,add(n0,n1)) -> n1
% Current number of equations to process: 3880
% Current number of ordered equations: 0
% Current number of rules: 300
% New rule produced :
% [343] multiply(n1,add(add(n0,n1),inverse(n1))) -> add(inverse(n1),n1)
% Current number of equations to process: 3880
% Current number of ordered equations: 0
% Current number of rules: 301
% New rule produced : [344] multiply(add(add(n0,n1),X),add(n1,X)) -> add(X,n1)
% Current number of equations to process: 3880
% Current number of ordered equations: 0
% Current number of rules: 302
% New rule produced : [345] multiply(add(n1,X),add(add(n0,n1),X)) -> add(X,n1)
% Current number of equations to process: 3880
% Current number of ordered equations: 0
% Current number of rules: 303
% New rule produced :
% [346] multiply(add(add(n0,n1),inverse(n1)),n1) -> add(inverse(n1),n1)
% Current number of equations to process: 3880
% Current number of ordered equations: 0
% Current number of rules: 304
% New rule produced :
% [347] multiply(add(n0,inverse(add(n1,n1))),n1) -> add(inverse(add(n1,n1)),n0)
% Current number of equations to process: 3880
% Current number of ordered equations: 0
% Current number of rules: 305
% New rule produced : [348] multiply(add(n1,n1),add(n1,n1)) -> n1
% Rule
% [273]
% multiply(n1,add(multiply(add(n1,n1),add(n1,n1)),inverse(add(n1,n0)))) ->
% multiply(n1,n1) collapsed.
% Current number of equations to process: 3882
% Current number of ordered equations: 0
% Current number of rules: 305
% New rule produced :
% [349]
% multiply(multiply(n1,add(n1,inverse(n0))),add(n1,n1)) -> multiply(n1,n1)
% Current number of equations to process: 3885
% Current number of ordered equations: 0
% Current number of rules: 306
% New rule produced :
% [350]
% multiply(multiply(add(n0,inverse(n1)),n1),add(n1,n1)) ->
% multiply(n1,add(n0,inverse(n1)))
% Current number of equations to process: 3887
% Current number of ordered equations: 0
% Current number of rules: 307
% New rule produced : [351] multiply(n0,add(n1,n1)) -> n0
% Current number of equations to process: 3887
% Current number of ordered equations: 0
% Current number of rules: 308
% New rule produced : [352] multiply(add(n0,X),add(add(n1,n1),X)) -> add(X,n0)
% Current number of equations to process: 3887
% Current number of ordered equations: 0
% Current number of rules: 309
% New rule produced :
% [353] multiply(n1,add(add(n1,n1),inverse(n0))) -> add(inverse(n0),n0)
% Current number of equations to process: 3887
% Current number of ordered equations: 0
% Current number of rules: 310
% New rule produced : [354] multiply(n1,add(n1,n1)) -> add(n1,n1)
% Rule
% [101]
% multiply(multiply(add(X,X),add(X,X)),multiply(n1,add(n1,n1))) ->
% multiply(n1,add(X,X)) collapsed.
% Rule
% [272]
% multiply(add(multiply(add(n1,n1),n1),n1),multiply(n1,add(n1,n1))) ->
% add(n1,n1) collapsed.
% Rule
% [303]
% multiply(multiply(add(add(n1,n0),n1),add(n1,n1)),multiply(n1,add(n1,n1))) ->
% multiply(n1,add(n1,n1)) collapsed.
% Current number of equations to process: 3890
% Current number of ordered equations: 0
% Current number of rules: 308
% New rule produced :
% [355] multiply(add(multiply(add(n1,n1),n1),n1),add(n1,n1)) -> add(n1,n1)
% Current number of equations to process: 3889
% Current number of ordered equations: 0
% Current number of rules: 309
% New rule produced :
% [356]
% multiply(multiply(add(X,X),add(X,X)),add(n1,n1)) -> multiply(n1,add(X,X))
% Current number of equations to process: 3888
% Current number of ordered equations: 0
% Current number of rules: 310
% New rule produced :
% [357]
% multiply(multiply(add(n0,X),add(n1,X)),add(n1,n1)) -> multiply(n1,add(n0,X))
% Current number of equations to process: 3887
% Current number of ordered equations: 0
% Current number of rules: 311
% New rule produced :
% [358] multiply(add(add(n0,n1),X),add(add(n1,n1),X)) -> add(X,add(n1,n1))
% Current number of equations to process: 3886
% Current number of ordered equations: 0
% Current number of rules: 312
% New rule produced :
% [359]
% multiply(multiply(add(add(n1,n0),n1),add(n1,n1)),add(n1,n1)) -> add(n1,n1)
% Current number of equations to process: 3885
% Current number of ordered equations: 0
% Current number of rules: 313
% New rule produced :
% [360]
% multiply(add(multiply(n1,add(n1,inverse(n0))),n0),add(add(n1,n1),n0)) -> n1
% Current number of equations to process: 3884
% Current number of ordered equations: 0
% Current number of rules: 314
% New rule produced :
% [361] add(inverse(add(n1,n0)),add(n1,n0)) -> multiply(n1,n1)
% Rule
% [277]
% multiply(n1,multiply(add(n1,add(n1,n0)),add(inverse(add(n1,n0)),add(n1,n0))))
% -> n1 collapsed.
% Current number of equations to process: 3905
% Current number of ordered equations: 0
% Current number of rules: 314
% New rule produced :
% [362] multiply(n1,multiply(add(n1,add(n1,n0)),multiply(n1,n1))) -> n1
% Current number of equations to process: 3904
% Current number of ordered equations: 0
% Current number of rules: 315
% New rule produced : [363] multiply(multiply(n1,n1),n1) -> multiply(n1,n1)
% Current number of equations to process: 3960
% Current number of ordered equations: 0
% Current number of rules: 316
% New rule produced :
% [364]
% multiply(inverse(multiply(n1,n0)),n0) <->
% multiply(inverse(multiply(n0,n1)),n0)
% Current number of equations to process: 3960
% Current number of ordered equations: 1
% Current number of rules: 317
% New rule produced :
% [365]
% multiply(inverse(multiply(n0,n1)),n0) <->
% multiply(inverse(multiply(n1,n0)),n0)
% Current number of equations to process: 3960
% Current number of ordered equations: 0
% Current number of rules: 318
% New rule produced :
% [366] multiply(n1,multiply(add(add(n0,n1),n0),add(n1,n1))) -> add(n1,n1)
% Current number of equations to process: 3959
% Current number of ordered equations: 0
% Current number of rules: 319
% New rule produced :
% [367]
% multiply(add(add(n0,n1),inverse(add(n1,n1))),n1) ->
% add(inverse(add(n1,n1)),add(n0,n1))
% Current number of equations to process: 3966
% Current number of ordered equations: 0
% Current number of rules: 320
% New rule produced :
% [368] multiply(n1,add(add(n0,n1),X)) -> multiply(add(X,n1),add(n1,n1))
% Rule [343] multiply(n1,add(add(n0,n1),inverse(n1))) -> add(inverse(n1),n1)
% collapsed.
% Current number of equations to process: 3968
% Current number of ordered equations: 0
% Current number of rules: 320
% New rule produced :
% [369] multiply(add(inverse(n1),n1),add(n1,n1)) -> add(inverse(n1),n1)
% Current number of equations to process: 3967
% Current number of ordered equations: 0
% Current number of rules: 321
% New rule produced :
% [370] multiply(n1,add(n1,inverse(add(n0,n1)))) -> add(inverse(add(n0,n1)),n1)
% Current number of equations to process: 3969
% Current number of ordered equations: 0
% Current number of rules: 322
% New rule produced :
% [371] multiply(add(inverse(add(n0,n1)),n1),add(n1,n1)) -> multiply(n1,n1)
% Current number of equations to process: 3977
% Current number of ordered equations: 0
% Current number of rules: 323
% Rule [368] multiply(n1,add(add(n0,n1),X)) -> multiply(add(X,n1),add(n1,n1)) is composed into 
% [368] multiply(n1,add(add(n0,n1),X)) -> multiply(add(X,n1),add(n0,n1))
% Rule [214]
% add(X,add(Y,add(Z,Z))) <->
% multiply(add(add(add(Z,n0),Y),X),add(add(add(n1,n1),Y),X)) is composed into 
% [214]
% add(X,add(Y,add(Z,Z))) <->
% multiply(add(add(add(Z,n0),Y),X),add(add(add(n0,n1),Y),X))
% Rule [182]
% multiply(n1,add(inverse(X),inverse(add(inverse(X),n0)))) ->
% multiply(multiply(n1,n1),multiply(add(inverse(X),n1),add(n1,n1))) is composed into 
% [182]
% multiply(n1,add(inverse(X),inverse(add(inverse(X),n0)))) ->
% multiply(multiply(n1,n1),multiply(add(inverse(X),n1),add(n0,n1)))
% Rule [168]
% multiply(multiply(X,add(X,X)),n1) <->
% multiply(multiply(n1,n1),multiply(X,multiply(add(X,n0),add(n1,n1)))) is composed into 
% [168]
% multiply(multiply(X,add(X,X)),n1) <->
% multiply(multiply(n1,n1),multiply(X,multiply(add(X,n0),add(n0,n1))))
% Rule [158]
% add(add(X,n0),X) <->
% multiply(add(n1,add(X,n0)),multiply(add(inverse(b),X),multiply(add(
% add(b,X),n0),
% add(n1,n1)))) is composed into 
% [158]
% add(add(X,n0),X) <->
% multiply(add(n1,add(X,n0)),multiply(add(inverse(b),X),multiply(add(add(b,X),n0),
% add(n0,n1))))
% Rule [51]
% add(inverse(add(X,n0)),add(X,X)) <->
% multiply(n1,add(add(n1,n1),inverse(add(X,n0)))) is composed into 
% [51]
% add(inverse(add(X,n0)),add(X,X)) <->
% multiply(n1,add(add(n0,n1),inverse(add(X,n0))))
% Rule [45] add(X,add(Y,Y)) <-> multiply(add(add(Y,n0),X),add(add(n1,n1),X)) is composed into 
% [45] add(X,add(Y,Y)) <-> multiply(add(add(Y,n0),X),add(add(n0,n1),X))
% Rule [23] add(X,X) <-> multiply(add(X,n0),add(n1,n1)) is composed into 
% [23] add(X,X) <-> multiply(add(X,n0),add(n0,n1))
% New rule produced : [372] add(n1,n1) -> add(n0,n1)
% Rule [24] multiply(add(X,n0),add(n1,n1)) <-> add(X,X) collapsed.
% Rule
% [25]
% multiply(n1,multiply(add(inverse(X),n0),add(n1,n1))) -> add(inverse(X),n0)
% collapsed.
% Rule [26] multiply(add(multiply(Y,X),n0),add(n1,n1)) -> multiply(X,add(Y,Y))
% collapsed.
% Rule
% [38]
% multiply(inverse(X),multiply(add(X,n0),add(n1,n1))) ->
% multiply(inverse(multiply(n0,n1)),n0) collapsed.
% Rule
% [42]
% multiply(multiply(inverse(X),add(X,X)),add(n1,n1)) ->
% multiply(inverse(multiply(n0,n1)),n0) collapsed.
% Rule
% [44] multiply(multiply(add(X,n0),add(n1,n1)),add(inverse(X),X)) -> add(X,n0)
% collapsed.
% Rule [46] multiply(add(add(Y,n0),X),add(add(n1,n1),X)) <-> add(X,add(Y,Y))
% collapsed.
% Rule
% [48]
% multiply(add(n1,X),add(multiply(add(inverse(Y),n0),add(n1,n1)),X)) ->
% add(X,add(inverse(Y),n0)) collapsed.
% Rule
% [50]
% multiply(n1,add(add(n1,n1),inverse(add(X,n0)))) <->
% add(inverse(add(X,n0)),add(X,X)) collapsed.
% Rule
% [52]
% multiply(add(add(X,n0),inverse(add(n1,n1))),n1) <->
% add(inverse(add(n1,n1)),add(X,X)) collapsed.
% Rule
% [53]
% add(inverse(add(n1,n1)),add(X,X)) <->
% multiply(add(add(X,n0),inverse(add(n1,n1))),n1) collapsed.
% Rule
% [66]
% multiply(add(add(inverse(n1),X),n0),add(n1,n1)) ->
% multiply(add(add(X,n0),inverse(n1)),add(n1,n1)) collapsed.
% Rule
% [67]
% multiply(add(add(inverse(inverse(n1)),n0),inverse(n1)),add(n1,n1)) ->
% add(n1,n1) collapsed.
% Rule
% [92]
% multiply(multiply(inverse(multiply(n0,n1)),n0),add(n1,n1)) ->
% multiply(inverse(multiply(n0,n1)),n0) collapsed.
% Rule
% [117]
% multiply(multiply(add(X,n0),add(n1,n1)),add(add(X,n0),X)) ->
% multiply(add(X,n0),add(n1,X)) collapsed.
% Rule
% [123]
% multiply(n1,add(multiply(add(inverse(X),n0),add(n1,n1)),inverse(n1))) ->
% add(inverse(n1),add(inverse(X),n0)) collapsed.
% Rule
% [124]
% multiply(multiply(n1,n1),multiply(multiply(add(X,n0),add(n1,n1)),add(X,X)))
% -> multiply(X,n1) collapsed.
% Rule
% [125]
% multiply(multiply(n1,n1),multiply(add(X,X),multiply(add(X,n0),add(n1,n1))))
% -> multiply(X,n1) collapsed.
% Rule
% [127]
% multiply(n1,multiply(multiply(add(X,inverse(inverse(X))),n1),add(n1,n1))) ->
% multiply(add(X,inverse(inverse(X))),n1) collapsed.
% Rule
% [141]
% multiply(inverse(multiply(X,Y)),multiply(Y,multiply(add(X,n0),add(n1,n1))))
% -> multiply(inverse(multiply(n0,n1)),n0) collapsed.
% Rule
% [147]
% multiply(add(inverse(X),n0),multiply(multiply(add(inverse(X),n0),add(n1,n1)),
% add(n1,n1))) -> add(inverse(X),n0) collapsed.
% Rule
% [152]
% multiply(add(inverse(inverse(X)),inverse(X)),multiply(multiply(add(inverse(
% inverse(X)),n0),
% add(n1,n1)),n1)) ->
% inverse(inverse(X)) collapsed.
% Rule
% [157]
% multiply(add(X,inverse(Y)),multiply(multiply(add(X,n0),add(n1,n1)),add(
% inverse(Y),X)))
% -> X collapsed.
% Rule
% [160]
% multiply(add(add(multiply(Z,X),n0),Y),add(add(n1,n1),Y)) ->
% multiply(add(X,Y),add(add(Z,Z),Y)) collapsed.
% Rule
% [162]
% multiply(add(add(X,X),n0),add(n1,n1)) <->
% multiply(add(n1,n1),multiply(add(inverse(b),X),multiply(add(add(b,X),n0),
% add(n1,n1)))) collapsed.
% Rule
% [169]
% multiply(multiply(n1,n1),multiply(X,multiply(add(X,n0),add(n1,n1)))) <->
% multiply(multiply(X,add(X,X)),n1) collapsed.
% Rule
% [179]
% multiply(add(n1,n0),add(multiply(add(n1,add(inverse(inverse(n1)),n0)),
% multiply(multiply(add(inverse(inverse(n1)),n0),
% add(n1,n1)),add(n1,n1))),n0)) ->
% add(inverse(inverse(n1)),n0) collapsed.
% Rule
% [186]
% multiply(add(X,X),multiply(add(inverse(X),n0),add(n1,n1))) <->
% multiply(add(b,b),multiply(add(inverse(b),n0),add(n1,n1))) collapsed.
% Rule
% [187]
% multiply(add(b,b),multiply(add(inverse(b),n0),add(n1,n1))) <->
% multiply(add(X,X),multiply(add(inverse(X),n0),add(n1,n1))) collapsed.
% Rule
% [191]
% multiply(add(n1,n1),multiply(add(add(inverse(n0),n0),n0),add(n1,add(n1,n0))))
% -> add(n1,inverse(n0)) collapsed.
% Rule
% [207]
% multiply(add(inverse(Y),X),multiply(add(add(Y,X),n0),add(n1,n1))) <->
% multiply(add(inverse(b),X),multiply(add(add(b,X),n0),add(n1,n1))) collapsed.
% Rule
% [208]
% multiply(add(add(X,n0),n0),add(n1,n1)) <->
% multiply(add(inverse(Y),X),multiply(add(add(Y,X),n0),add(n1,n1))) collapsed.
% Rule
% [209]
% multiply(n1,multiply(add(add(X,inverse(inverse(X))),n0),add(n1,n1))) <->
% multiply(add(inverse(b),inverse(inverse(X))),multiply(add(add(b,inverse(
% inverse(X))),n0),
% add(n1,n1))) collapsed.
% Rule
% [210]
% multiply(add(inverse(b),inverse(inverse(X))),multiply(add(add(b,inverse(
% inverse(X))),n0),
% add(n1,n1))) <->
% multiply(n1,multiply(add(add(X,inverse(inverse(X))),n0),add(n1,n1)))
% collapsed.
% Rule
% [211]
% multiply(n1,multiply(inverse(add(inverse(n1),X)),multiply(add(add(X,n0),
% inverse(n1)),
% add(n1,n1)))) -> n0
% collapsed.
% Rule
% [212]
% multiply(n1,multiply(inverse(inverse(inverse(X))),multiply(multiply(add(X,
% inverse(
% inverse(X))),n1),
% add(n1,n1)))) -> n0
% collapsed.
% Rule
% [213]
% multiply(add(multiply(add(Y,n0),add(n1,n1)),X),add(add(inverse(Y),Y),X)) ->
% add(X,add(Y,n0)) collapsed.
% Rule
% [215]
% multiply(add(add(add(Z,n0),Y),X),add(add(add(n1,n1),Y),X)) <->
% add(X,add(Y,add(Z,Z))) collapsed.
% Rule
% [217]
% multiply(add(add(add(inverse(inverse(n1)),n0),inverse(n1)),X),add(add(n1,n1),X))
% -> add(X,add(n1,n1)) collapsed.
% Rule [222] multiply(X,multiply(add(X,n1),add(n1,n1))) -> X collapsed.
% Rule
% [229] multiply(add(Y,X),add(multiply(add(Y,n1),add(n1,n1)),X)) -> add(X,Y)
% collapsed.
% Rule
% [230]
% multiply(multiply(add(X,n1),add(n1,n1)),add(X,X)) ->
% multiply(add(X,n0),add(n1,n1)) collapsed.
% Rule
% [240]
% multiply(n1,add(multiply(add(X,n1),add(n1,n1)),inverse(X))) ->
% add(inverse(X),X) collapsed.
% Rule [241] multiply(multiply(n1,n1),add(n1,n1)) -> multiply(add(n1,n1),n1)
% collapsed.
% Rule
% [246]
% multiply(inverse(add(n1,n0)),multiply(add(n1,n1),n1)) -> inverse(add(n1,n0))
% collapsed.
% Rule
% [248]
% multiply(inverse(multiply(n1,multiply(n1,n1))),multiply(add(n1,n1),n1)) ->
% multiply(inverse(multiply(n0,n1)),n0) collapsed.
% Rule
% [249]
% multiply(add(multiply(n1,n1),X),add(add(n1,n1),X)) ->
% multiply(add(add(n1,n1),X),add(n1,X)) collapsed.
% Rule [255] multiply(multiply(n1,n1),add(multiply(add(n1,n1),n1),n1)) -> n1
% collapsed.
% Rule [256] multiply(n1,multiply(add(n1,n1),multiply(n1,n1))) -> n1 collapsed.
% Rule
% [261]
% multiply(multiply(n1,add(n1,inverse(inverse(add(n1,n0))))),multiply(add(n1,n1),n1))
% -> multiply(n1,n1) collapsed.
% Rule
% [262]
% multiply(add(X,inverse(multiply(add(X,n1),add(n1,n1)))),n1) ->
% add(inverse(multiply(add(X,n1),add(n1,n1))),X) collapsed.
% Rule
% [264]
% multiply(add(inverse(add(n1,n0)),X),add(multiply(add(n1,n1),n1),X)) ->
% add(X,inverse(add(n1,n0))) collapsed.
% Rule
% [268]
% multiply(add(multiply(n1,n1),inverse(add(n1,n1))),n1) ->
% multiply(n1,add(n1,inverse(add(n1,n1)))) collapsed.
% Rule
% [271]
% multiply(multiply(n1,n1),multiply(add(add(n1,n0),n1),add(n1,n1))) ->
% multiply(n1,n1) collapsed.
% Rule
% [275] multiply(multiply(add(n1,n1),multiply(n1,n1)),add(n1,n1)) -> add(n1,n1)
% collapsed.
% Rule
% [276]
% multiply(add(n1,X),add(multiply(add(n1,n1),multiply(n1,n1)),X)) -> add(X,n1)
% collapsed.
% Rule
% [279]
% multiply(add(multiply(n1,n1),X),add(add(multiply(add(n1,n1),n1),n1),X)) ->
% add(X,n1) collapsed.
% Rule
% [286]
% multiply(multiply(add(multiply(X,Y),n1),add(n1,n1)),multiply(Y,add(X,X))) ->
% multiply(Y,add(X,X)) collapsed.
% Rule
% [287]
% multiply(add(n1,n0),multiply(add(add(X,inverse(inverse(X))),n1),add(n1,n1)))
% -> add(n1,inverse(inverse(X))) collapsed.
% Rule
% [291]
% multiply(add(multiply(n1,n1),n0),add(multiply(add(add(n1,n0),n1),add(n1,n1)),n0))
% -> n1 collapsed.
% Rule
% [294]
% multiply(add(multiply(add(n1,n1),multiply(n1,n1)),X),add(add(n1,n1),X)) ->
% add(X,add(n1,n1)) collapsed.
% Rule
% [299]
% multiply(n1,add(multiply(add(n1,n1),multiply(n1,n1)),inverse(n1))) ->
% add(inverse(n1),n1) collapsed.
% Rule
% [300]
% multiply(n1,add(multiply(add(n1,n1),multiply(n1,n1)),inverse(add(n1,n0)))) ->
% multiply(n1,n1) collapsed.
% Rule
% [301]
% multiply(add(n1,inverse(multiply(add(n1,n1),multiply(n1,n1)))),n1) ->
% add(inverse(multiply(add(n1,n1),multiply(n1,n1))),n1) collapsed.
% Rule
% [302]
% multiply(n1,add(add(multiply(add(n1,n1),n1),n1),inverse(multiply(n1,n1)))) ->
% add(inverse(multiply(n1,n1)),n1) collapsed.
% Rule
% [316]
% multiply(add(add(inverse(add(X,n0)),X),n0),add(n1,n1)) ->
% multiply(add(add(n1,n0),inverse(add(X,n0))),add(n1,n1)) collapsed.
% Rule
% [320]
% multiply(n1,add(multiply(add(n1,n1),n1),inverse(inverse(add(n1,n0))))) ->
% add(inverse(inverse(add(n1,n0))),inverse(add(n1,n0))) collapsed.
% Rule
% [325]
% multiply(add(add(inverse(add(n1,n0)),X),n0),add(n1,n1)) ->
% multiply(add(add(X,n0),inverse(add(n1,n0))),add(n1,n1)) collapsed.
% Rule [334] multiply(add(n0,n1),add(n1,n1)) -> add(n1,n1) collapsed.
% Rule
% [335]
% multiply(add(n1,n1),multiply(inverse(multiply(n0,n1)),n0)) ->
% multiply(inverse(multiply(n0,n1)),n0) collapsed.
% Rule
% [347] multiply(add(n0,inverse(add(n1,n1))),n1) -> add(inverse(add(n1,n1)),n0)
% collapsed.
% Rule [348] multiply(add(n1,n1),add(n1,n1)) -> n1 collapsed.
% Rule
% [349]
% multiply(multiply(n1,add(n1,inverse(n0))),add(n1,n1)) -> multiply(n1,n1)
% collapsed.
% Rule
% [350]
% multiply(multiply(add(n0,inverse(n1)),n1),add(n1,n1)) ->
% multiply(n1,add(n0,inverse(n1))) collapsed.
% Rule [351] multiply(n0,add(n1,n1)) -> n0 collapsed.
% Rule [352] multiply(add(n0,X),add(add(n1,n1),X)) -> add(X,n0) collapsed.
% Rule [353] multiply(n1,add(add(n1,n1),inverse(n0))) -> add(inverse(n0),n0)
% collapsed.
% Rule [354] multiply(n1,add(n1,n1)) -> add(n1,n1) collapsed.
% Rule [355] multiply(add(multiply(add(n1,n1),n1),n1),add(n1,n1)) -> add(n1,n1)
% collapsed.
% Rule
% [356]
% multiply(multiply(add(X,X),add(X,X)),add(n1,n1)) -> multiply(n1,add(X,X))
% collapsed.
% Rule
% [357]
% multiply(multiply(add(n0,X),add(n1,X)),add(n1,n1)) -> multiply(n1,add(n0,X))
% collapsed.
% Rule [358] multiply(add(add(n0,n1),X),add(add(n1,n1),X)) -> add(X,add(n1,n1))
% collapsed.
% Rule
% [359]
% multiply(multiply(add(add(n1,n0),n1),add(n1,n1)),add(n1,n1)) -> add(n1,n1)
% collapsed.
% Rule
% [360]
% multiply(add(multiply(n1,add(n1,inverse(n0))),n0),add(add(n1,n1),n0)) -> n1
% collapsed.
% Rule [366] multiply(n1,multiply(add(add(n0,n1),n0),add(n1,n1))) -> add(n1,n1)
% collapsed.
% Rule
% [367]
% multiply(add(add(n0,n1),inverse(add(n1,n1))),n1) ->
% add(inverse(add(n1,n1)),add(n0,n1)) collapsed.
% Rule [369] multiply(add(inverse(n1),n1),add(n1,n1)) -> add(inverse(n1),n1)
% collapsed.
% Rule
% [371] multiply(add(inverse(add(n0,n1)),n1),add(n1,n1)) -> multiply(n1,n1)
% collapsed.
% Current number of equations to process: 4067
% Current number of ordered equations: 0
% Current number of rules: 236
% New rule produced : [373] multiply(n0,add(n0,n1)) -> n0
% Current number of equations to process: 4066
% Current number of ordered equations: 0
% Current number of rules: 237
% Rule [372] add(n1,n1) -> add(n0,n1) is composed into [372] add(n1,n1) -> n1
% Rule [340]
% multiply(add(inverse(inverse(add(n1,n0))),inverse(add(n1,n0))),n1) ->
% multiply(add(n0,n1),add(n0,n1)) is composed into [340]
% multiply(add(inverse(
% inverse(
% add(n1,n0))),
% inverse(
% add(n1,n0))),n1)
% -> multiply(n1,n1)
% Rule [333]
% add(add(inverse(inverse(add(n1,n0))),n0),inverse(add(n1,n0))) ->
% add(n0,n1) is composed into [333]
% add(add(inverse(inverse(add(n1,n0))),n0),
% inverse(add(n1,n0))) -> n1
% Rule [214]
% add(X,add(Y,add(Z,Z))) <->
% multiply(add(add(add(Z,n0),Y),X),add(add(add(n0,n1),Y),X)) is composed into 
% [214]
% add(X,add(Y,add(Z,Z))) <-> multiply(add(add(add(Z,n0),Y),X),add(add(n1,Y),X))
% Rule [182]
% multiply(n1,add(inverse(X),inverse(add(inverse(X),n0)))) ->
% multiply(multiply(n1,n1),multiply(add(inverse(X),n1),add(n0,n1))) is composed into 
% [182]
% multiply(n1,add(inverse(X),inverse(add(inverse(X),n0)))) ->
% multiply(multiply(n1,n1),multiply(add(inverse(X),n1),n1))
% Rule [168]
% multiply(multiply(X,add(X,X)),n1) <->
% multiply(multiply(n1,n1),multiply(X,multiply(add(X,n0),add(n0,n1)))) is composed into 
% [168]
% multiply(multiply(X,add(X,X)),n1) <->
% multiply(multiply(n1,n1),multiply(X,multiply(add(X,n0),n1)))
% Rule [158]
% add(add(X,n0),X) <->
% multiply(add(n1,add(X,n0)),multiply(add(inverse(b),X),multiply(add(
% add(b,X),n0),
% add(n0,n1)))) is composed into 
% [158]
% add(add(X,n0),X) <->
% multiply(add(n1,add(X,n0)),multiply(add(inverse(b),X),multiply(add(add(b,X),n0),n1)))
% Rule [51]
% add(inverse(add(X,n0)),add(X,X)) <->
% multiply(n1,add(add(n0,n1),inverse(add(X,n0)))) is composed into 
% [51]
% add(inverse(add(X,n0)),add(X,X)) -> multiply(n1,add(n1,inverse(add(X,n0))))
% Rule [45] add(X,add(Y,Y)) <-> multiply(add(add(Y,n0),X),add(add(n0,n1),X)) is composed into 
% [45] add(X,add(Y,Y)) <-> multiply(add(add(Y,n0),X),add(n1,X))
% Rule [23] add(X,X) <-> multiply(add(X,n0),add(n0,n1)) is composed into 
% [23] add(X,X) <-> multiply(add(X,n0),n1)
% New rule produced : [374] add(n0,n1) -> n1
% Rule
% [243]
% multiply(add(n1,n0),multiply(add(inverse(multiply(n0,n1)),n1),add(n0,n1))) ->
% add(n1,n0) collapsed.
% Rule
% [306]
% multiply(n1,multiply(add(n1,add(n1,n0)),add(inverse(add(n1,n0)),add(n0,n1))))
% -> n1 collapsed.
% Rule
% [339] multiply(add(multiply(n1,n1),inverse(add(n1,n0))),add(n0,n1)) -> n1
% collapsed.
% Rule [341] multiply(add(n0,n1),n1) -> n1 collapsed.
% Rule [342] multiply(n1,add(n0,n1)) -> n1 collapsed.
% Rule [344] multiply(add(add(n0,n1),X),add(n1,X)) -> add(X,n1) collapsed.
% Rule [345] multiply(add(n1,X),add(add(n0,n1),X)) -> add(X,n1) collapsed.
% Rule [346] multiply(add(add(n0,n1),inverse(n1)),n1) -> add(inverse(n1),n1)
% collapsed.
% Rule [368] multiply(n1,add(add(n0,n1),X)) -> multiply(add(X,n1),add(n0,n1))
% collapsed.
% Rule
% [370] multiply(n1,add(n1,inverse(add(n0,n1)))) -> add(inverse(add(n0,n1)),n1)
% collapsed.
% Rule [373] multiply(n0,add(n0,n1)) -> n0 collapsed.
% Current number of equations to process: 4072
% Current number of ordered equations: 0
% Current number of rules: 227
% Rule [361] add(inverse(add(n1,n0)),add(n1,n0)) -> multiply(n1,n1) is composed into 
% [361] add(inverse(add(n1,n0)),add(n1,n0)) -> n1
% Rule [340]
% multiply(add(inverse(inverse(add(n1,n0))),inverse(add(n1,n0))),n1) ->
% multiply(n1,n1) is composed into [340]
% multiply(add(inverse(inverse(add(n1,n0))),
% inverse(add(n1,n0))),n1) -> n1
% Rule [305] add(inverse(add(n1,n0)),add(inverse(n0),n0)) -> multiply(n1,n1) is composed into 
% [305] add(inverse(add(n1,n0)),add(inverse(n0),n0)) -> n1
% Rule [267]
% add(inverse(add(add(n1,n0),n1)),add(n1,n0)) ->
% multiply(n1,add(multiply(n1,n1),inverse(add(add(n1,n0),n1)))) is composed into 
% [267]
% add(inverse(add(add(n1,n0),n1)),add(n1,n0)) ->
% multiply(n1,add(n1,inverse(add(add(n1,n0),n1))))
% Rule [244] add(inverse(add(n1,n0)),n1) -> multiply(n1,n1) is composed into 
% [244] add(inverse(add(n1,n0)),n1) -> n1
% Rule [185]
% multiply(multiply(n0,add(inverse(inverse(X)),n0)),n1) <->
% multiply(multiply(n1,n1),multiply(n0,multiply(add(X,inverse(inverse(X))),n1))) is composed into 
% [185]
% multiply(multiply(n0,add(inverse(inverse(X)),n0)),n1) <->
% multiply(n1,multiply(n0,multiply(add(X,inverse(inverse(X))),n1)))
% Rule [182]
% multiply(n1,add(inverse(X),inverse(add(inverse(X),n0)))) ->
% multiply(multiply(n1,n1),multiply(add(inverse(X),n1),n1)) is composed into 
% [182]
% multiply(n1,add(inverse(X),inverse(add(inverse(X),n0)))) ->
% multiply(n1,multiply(add(inverse(X),n1),n1))
% Rule [181]
% multiply(add(inverse(X),inverse(add(inverse(X),n0))),add(n1,inverse(
% add(
% inverse(X),n0))))
% -> multiply(n1,n1) is composed into [181]
% multiply(add(inverse(X),inverse(
% add(
% inverse(X),n0))),
% add(n1,inverse(add(inverse(X),n0))))
% -> n1
% Rule [168]
% multiply(multiply(X,add(X,X)),n1) <->
% multiply(multiply(n1,n1),multiply(X,multiply(add(X,n0),n1))) is composed into 
% [168]
% multiply(multiply(X,add(X,X)),n1) <->
% multiply(n1,multiply(X,multiply(add(X,n0),n1)))
% New rule produced : [375] multiply(n1,n1) -> n1
% Rule
% [76] multiply(multiply(n1,n1),multiply(add(X,X),add(X,X))) -> multiply(X,n1)
% collapsed.
% Rule
% [150]
% multiply(inverse(multiply(multiply(X,add(X,X)),multiply(n1,n1))),multiply(X,n1))
% -> multiply(inverse(multiply(n0,n1)),n0) collapsed.
% Rule
% [165]
% multiply(multiply(n1,n1),multiply(multiply(X,add(Y,Y)),multiply(X,add(Y,Y))))
% -> multiply(multiply(Y,X),n1) collapsed.
% Rule
% [166]
% multiply(multiply(n1,n1),multiply(X,add(Y,X))) ->
% multiply(multiply(X,add(Y,X)),n1) collapsed.
% Rule
% [167]
% multiply(multiply(n1,n1),multiply(inverse(X),n1)) ->
% multiply(multiply(inverse(X),n1),n1) collapsed.
% Rule
% [170]
% multiply(multiply(n1,n1),add(inverse(X),n0)) ->
% multiply(add(inverse(X),n0),n1) collapsed.
% Rule
% [173]
% multiply(multiply(n1,n1),multiply(add(X,inverse(inverse(X))),n1)) ->
% multiply(multiply(add(X,inverse(inverse(X))),n1),n1) collapsed.
% Rule
% [174]
% multiply(multiply(n1,n1),multiply(n0,multiply(inverse(multiply(n0,n1)),n0)))
% -> multiply(multiply(n0,multiply(inverse(multiply(n0,n1)),n0)),n1) collapsed.
% Rule
% [175]
% multiply(add(multiply(n1,n1),Y),add(multiply(inverse(X),n1),Y)) ->
% multiply(add(multiply(inverse(X),n1),Y),add(n1,Y)) collapsed.
% Rule
% [176]
% multiply(add(multiply(n1,n1),Y),add(add(inverse(X),n0),Y)) ->
% multiply(add(add(inverse(X),n0),Y),add(n1,Y)) collapsed.
% Rule
% [177]
% multiply(add(multiply(n1,n1),inverse(multiply(inverse(X),n1))),n1) ->
% multiply(n1,add(n1,inverse(multiply(inverse(X),n1)))) collapsed.
% Rule
% [178]
% multiply(add(multiply(n1,n1),inverse(add(inverse(X),n0))),n1) ->
% multiply(n1,add(n1,inverse(add(inverse(X),n0)))) collapsed.
% Rule
% [184]
% multiply(multiply(n1,n1),multiply(n0,multiply(add(X,inverse(inverse(X))),n1)))
% <-> multiply(multiply(n0,add(inverse(inverse(X)),n0)),n1) collapsed.
% Rule
% [220]
% multiply(add(multiply(n1,n1),Y),add(multiply(add(X,X),add(X,X)),Y)) ->
% multiply(add(X,Y),add(n1,Y)) collapsed.
% Rule
% [239]
% multiply(multiply(n1,n1),multiply(inverse(multiply(n0,n1)),n0)) ->
% multiply(multiply(inverse(multiply(n0,n1)),n0),n1) collapsed.
% Rule [251] multiply(add(add(n1,n0),n1),multiply(n1,n1)) -> add(n1,n0)
% collapsed.
% Rule
% [252]
% multiply(multiply(n1,n1),add(inverse(inverse(add(n1,n0))),n1)) -> add(n1,n0)
% collapsed.
% Rule
% [253]
% multiply(multiply(n1,n1),multiply(n1,multiply(n1,n1))) ->
% multiply(multiply(n1,multiply(n1,n1)),n1) collapsed.
% Rule
% [257] multiply(multiply(n1,n1),add(add(n1,n0),n1)) -> multiply(add(n1,n0),n1)
% collapsed.
% Rule
% [258]
% multiply(add(add(add(n1,n0),n1),X),add(multiply(n1,n1),X)) ->
% add(X,add(n1,n0)) collapsed.
% Rule
% [259]
% multiply(add(add(add(n1,n0),n1),inverse(multiply(n1,n1))),n1) ->
% add(inverse(multiply(n1,n1)),add(n1,n0)) collapsed.
% Rule
% [289]
% multiply(add(multiply(n1,n1),X),add(add(inverse(inverse(add(n1,n0))),n1),X))
% -> add(X,add(n1,n0)) collapsed.
% Rule
% [295]
% multiply(add(multiply(n1,n1),X),add(add(add(n1,n0),n1),X)) ->
% multiply(add(add(n1,n0),X),add(n1,X)) collapsed.
% Rule
% [310]
% multiply(add(add(n1,n0),add(inverse(n0),n0)),multiply(n1,n1)) ->
% add(add(inverse(n0),n0),n0) collapsed.
% Rule
% [311]
% multiply(multiply(n1,n1),add(inverse(inverse(add(n1,n0))),add(inverse(n0),n0)))
% -> add(add(inverse(n0),n0),n0) collapsed.
% Rule
% [312]
% multiply(multiply(n1,n1),multiply(add(inverse(n0),n0),multiply(n1,n1))) ->
% multiply(multiply(add(inverse(n0),n0),multiply(n1,n1)),n1) collapsed.
% Rule
% [319]
% multiply(inverse(multiply(n0,multiply(n1,n1))),multiply(multiply(inverse(
% multiply(n0,n1)),n0),n1))
% -> multiply(inverse(multiply(n0,n1)),n0) collapsed.
% Rule
% [321]
% multiply(add(inverse(add(n1,n0)),inverse(n1)),multiply(multiply(n1,n1),
% add(inverse(n1),n1))) ->
% inverse(add(n1,n0)) collapsed.
% Rule
% [322]
% multiply(n1,add(add(inverse(inverse(add(n1,n0))),n1),inverse(multiply(n1,n1))))
% -> add(inverse(multiply(n1,n1)),add(n1,n0)) collapsed.
% Rule [362] multiply(n1,multiply(add(n1,add(n1,n0)),multiply(n1,n1))) -> n1
% collapsed.
% Rule [363] multiply(multiply(n1,n1),n1) -> multiply(n1,n1) collapsed.
% Current number of equations to process: 4100
% Current number of ordered equations: 0
% Current number of rules: 197
% Rule [364]
% multiply(inverse(multiply(n1,n0)),n0) <->
% multiply(inverse(multiply(n0,n1)),n0) is composed into [364]
% multiply(
% inverse(multiply(n1,n0)),n0)
% ->
% multiply(
% inverse(n0),n0)
% Rule [228]
% multiply(inverse(multiply(multiply(n1,add(X,n1)),X)),X) ->
% multiply(inverse(multiply(n0,n1)),n0) is composed into [228]
% multiply(
% inverse(multiply(
% multiply(n1,
% add(X,n1)),X)),X)
% ->
% multiply(
% inverse(n0),n0)
% Rule [218]
% multiply(n1,add(add(X,X),inverse(inverse(X)))) ->
% multiply(add(inverse(multiply(n0,n1)),inverse(inverse(X))),add(n0,
% inverse(
% inverse(X)))) is composed into 
% [218]
% multiply(n1,add(add(X,X),inverse(inverse(X)))) ->
% multiply(add(inverse(n0),inverse(inverse(X))),add(n0,inverse(inverse(X))))
% Rule [188]
% multiply(add(inverse(b),X),add(add(b,b),X)) ->
% multiply(add(inverse(multiply(n0,n1)),X),add(n0,X)) is composed into 
% [188]
% multiply(add(inverse(b),X),add(add(b,b),X)) ->
% multiply(add(inverse(n0),X),add(n0,X))
% Rule [151]
% multiply(inverse(multiply(inverse(inverse(X)),n1)),multiply(add(X,
% inverse(
% inverse(X))),n1))
% -> multiply(inverse(multiply(n0,n1)),n0) is composed into [151]
% multiply(
% inverse(
% multiply(
% inverse(
% inverse(X)),n1)),
% multiply(
% add(X,
% inverse(
% inverse(X))),n1))
% ->
% multiply(
% inverse(n0),n0)
% Rule [144]
% multiply(add(inverse(X),n0),add(n1,add(X,n0))) ->
% multiply(add(inverse(multiply(n0,n1)),inverse(X)),add(n0,inverse(X))) is composed into 
% [144]
% multiply(add(inverse(X),n0),add(n1,add(X,n0))) ->
% multiply(add(inverse(n0),inverse(X)),add(n0,inverse(X)))
% Rule [142]
% multiply(inverse(multiply(inverse(X),n1)),add(inverse(X),n0)) ->
% multiply(inverse(multiply(n0,n1)),n0) is composed into [142]
% multiply(
% inverse(multiply(
% inverse(X),n1)),
% add(inverse(X),n0))
% ->
% multiply(
% inverse(n0),n0)
% Rule [140]
% multiply(inverse(multiply(multiply(X,Y),Z)),multiply(Z,multiply(Y,
% add(X,X)))) ->
% multiply(inverse(multiply(n0,n1)),n0) is composed into [140]
% multiply(
% inverse(multiply(
% multiply(X,Y),Z)),
% multiply(Z,
% multiply(Y,
% add(X,X)))) ->
% multiply(
% inverse(n0),n0)
% Rule [111]
% multiply(inverse(b),add(b,b)) -> multiply(inverse(multiply(n0,n1)),n0) is composed into 
% [111] multiply(inverse(b),add(b,b)) -> multiply(inverse(n0),n0)
% Rule [110]
% multiply(inverse(multiply(n0,X)),multiply(X,multiply(inverse(Y),
% add(Y,Y)))) ->
% multiply(inverse(multiply(n0,n1)),n0) is composed into [110]
% multiply(
% inverse(multiply(n0,X)),
% multiply(X,
% multiply(
% inverse(Y),
% add(Y,Y)))) ->
% multiply(
% inverse(n0),n0)
% Rule [107]
% multiply(inverse(n0),multiply(inverse(multiply(X,Y)),multiply(Y,
% add(X,X)))) ->
% multiply(inverse(multiply(n0,n1)),n0) is composed into [107]
% multiply(
% inverse(n0),
% multiply(
% inverse(multiply(X,Y)),
% multiply(Y,
% add(X,X)))) ->
% multiply(
% inverse(n0),n0)
% Rule [78]
% multiply(multiply(add(X,inverse(inverse(X))),n1),add(inverse(inverse(
% inverse(X))),n0))
% -> multiply(inverse(multiply(n0,n1)),n0) is composed into [78]
% multiply(
% multiply(
% add(X,
% inverse(
% inverse(X))),n1),
% add(inverse(
% inverse(
% inverse(X))),n0))
% ->
% multiply(
% inverse(n0),n0)
% Rule [70]
% multiply(inverse(n0),multiply(inverse(n0),multiply(inverse(X),add(X,X))))
% -> multiply(inverse(multiply(n0,n1)),n0) is composed into [70]
% multiply(
% inverse(n0),
% multiply(
% inverse(n0),
% multiply(
% inverse(X),
% add(X,X)))) ->
% multiply(
% inverse(n0),n0)
% Rule [68]
% multiply(add(inverse(Y),X),add(add(Y,Y),X)) ->
% multiply(add(inverse(multiply(n0,n1)),X),add(n0,X)) is composed into 
% [68]
% multiply(add(inverse(Y),X),add(add(Y,Y),X)) ->
% multiply(add(inverse(n0),X),add(n0,X))
% Rule [49]
% multiply(multiply(inverse(X),add(X,X)),add(inverse(n0),n0)) ->
% multiply(inverse(multiply(n0,n1)),n0) is composed into [49]
% multiply(
% multiply(
% inverse(X),
% add(X,X)),
% add(inverse(n0),n0))
% ->
% multiply(
% inverse(n0),n0)
% Rule [43]
% multiply(add(inverse(X),n0),multiply(add(X,inverse(inverse(X))),n1)) ->
% multiply(inverse(multiply(n0,n1)),n0) is composed into [43]
% multiply(
% add(inverse(X),n0),
% multiply(
% add(X,inverse(
% inverse(X))),n1))
% ->
% multiply(
% inverse(n0),n0)
% Rule [40]
% multiply(inverse(X),add(X,X)) -> multiply(inverse(multiply(n0,n1)),n0) is composed into 
% [40] multiply(inverse(X),add(X,X)) -> multiply(inverse(n0),n0)
% Rule [37]
% multiply(inverse(multiply(X,Y)),multiply(Y,add(X,X))) ->
% multiply(inverse(multiply(n0,n1)),n0) is composed into [37]
% multiply(
% inverse(multiply(X,Y)),
% multiply(Y,
% add(X,X))) ->
% multiply(
% inverse(n0),n0)
% Rule [30]
% multiply(inverse(n0),multiply(inverse(X),add(X,X))) ->
% multiply(inverse(multiply(n0,n1)),n0) is composed into [30]
% multiply(
% inverse(n0),
% multiply(
% inverse(X),
% add(X,X))) ->
% multiply(
% inverse(n0),n0)
% Rule [27]
% multiply(inverse(X),add(X,X)) -> multiply(inverse(multiply(n0,n1)),n0) is composed into 
% [27] multiply(inverse(X),add(X,X)) -> multiply(inverse(n0),n0)
% New rule produced : [376] multiply(n0,n1) -> n0
% Rule [91] multiply(n1,multiply(inverse(multiply(n0,n1)),n0)) -> n0 collapsed.
% Rule
% [93]
% multiply(add(n1,X),add(multiply(inverse(multiply(n0,n1)),n0),X)) -> add(X,n0)
% collapsed.
% Rule
% [94]
% multiply(n1,add(multiply(inverse(multiply(n0,n1)),n0),inverse(n1))) ->
% add(inverse(n1),n0) collapsed.
% Rule
% [102]
% multiply(add(n1,inverse(multiply(inverse(multiply(n0,n1)),n0))),n1) ->
% add(inverse(multiply(inverse(multiply(n0,n1)),n0)),n0) collapsed.
% Rule
% [113]
% multiply(inverse(n0),multiply(inverse(multiply(n0,n1)),n0)) ->
% multiply(inverse(multiply(n0,n1)),n0) collapsed.
% Rule
% [114]
% multiply(inverse(multiply(n0,X)),multiply(X,multiply(inverse(multiply(n0,n1)),n0)))
% -> multiply(inverse(multiply(n0,n1)),n0) collapsed.
% Rule
% [118]
% multiply(add(n0,inverse(X)),multiply(multiply(inverse(multiply(n0,n1)),n0),
% add(inverse(X),n0))) -> n0 collapsed.
% Rule
% [138]
% multiply(add(X,n0),add(multiply(inverse(multiply(n0,n1)),n0),n0)) <->
% multiply(multiply(inverse(multiply(n0,n1)),n0),add(n1,X)) collapsed.
% Rule
% [139]
% multiply(multiply(inverse(multiply(n0,n1)),n0),add(n1,X)) <->
% multiply(add(X,n0),add(multiply(inverse(multiply(n0,n1)),n0),n0)) collapsed.
% Rule
% [143]
% multiply(multiply(inverse(multiply(n0,n1)),n0),add(inverse(n0),n0)) ->
% multiply(inverse(multiply(n0,n1)),n0) collapsed.
% Rule
% [153]
% multiply(add(n0,inverse(inverse(X))),multiply(multiply(inverse(multiply(n0,n1)),n0),
% multiply(add(X,inverse(inverse(X))),n1)))
% -> n0 collapsed.
% Rule
% [155]
% multiply(multiply(add(X,inverse(inverse(X))),n1),add(multiply(inverse(
% multiply(n0,n1)),n0),n0))
% <->
% multiply(multiply(inverse(multiply(n0,n1)),n0),add(n1,inverse(inverse(X))))
% collapsed.
% Rule
% [156]
% multiply(multiply(inverse(multiply(n0,n1)),n0),add(n1,inverse(inverse(X))))
% <->
% multiply(multiply(add(X,inverse(inverse(X))),n1),add(multiply(inverse(
% multiply(n0,n1)),n0),n0))
% collapsed.
% Rule
% [164]
% multiply(n1,add(add(multiply(inverse(multiply(n0,n1)),n0),inverse(n1)),
% inverse(n1))) -> add(inverse(n1),add(inverse(n1),n0)) collapsed.
% Rule
% [190]
% multiply(add(n1,X),add(add(multiply(inverse(multiply(n0,n1)),n0),inverse(n1)),X))
% -> add(X,add(inverse(n1),n0)) collapsed.
% Rule
% [193]
% multiply(add(inverse(n0),X),add(multiply(inverse(multiply(n0,n1)),n0),X)) ->
% multiply(add(inverse(multiply(n0,n1)),X),add(n0,X)) collapsed.
% Rule
% [216]
% multiply(add(add(n1,Y),X),add(add(multiply(inverse(multiply(n0,n1)),n0),Y),X))
% -> add(X,add(Y,n0)) collapsed.
% Rule
% [219]
% multiply(multiply(n1,add(n0,inverse(X))),multiply(add(X,n0),multiply(
% inverse(multiply(n0,n1)),n0)))
% -> multiply(n0,n1) collapsed.
% Rule [223] multiply(multiply(inverse(multiply(n0,n1)),n0),add(n1,n0)) -> n0
% collapsed.
% Rule
% [236]
% multiply(add(multiply(inverse(multiply(n0,n1)),n0),X),add(add(n1,n0),X)) ->
% add(X,n0) collapsed.
% Rule
% [237]
% multiply(multiply(inverse(multiply(n0,n1)),n0),add(multiply(inverse(multiply(n0,n1)),n0),n0))
% -> n0 collapsed.
% Rule
% [238]
% add(n0,add(inverse(multiply(inverse(multiply(n0,n1)),n0)),n0)) ->
% add(n1,inverse(multiply(inverse(multiply(n0,n1)),n0))) collapsed.
% Rule
% [247]
% multiply(add(multiply(inverse(multiply(n0,n1)),n0),inverse(add(n1,n0))),n1)
% -> add(inverse(add(n1,n0)),n0) collapsed.
% Rule
% [274]
% multiply(n1,add(multiply(inverse(multiply(n0,n1)),n0),inverse(add(n1,n0))))
% -> add(inverse(add(n1,n0)),n0) collapsed.
% Rule
% [288]
% multiply(n1,add(add(n1,n0),inverse(multiply(inverse(multiply(n0,n1)),n0))))
% -> add(inverse(multiply(inverse(multiply(n0,n1)),n0)),n0) collapsed.
% Rule
% [365]
% multiply(inverse(multiply(n0,n1)),n0) <->
% multiply(inverse(multiply(n1,n0)),n0) collapsed.
% Current number of equations to process: 4122
% Current number of ordered equations: 0
% Current number of rules: 172
% New rule produced : [377] multiply(n1,multiply(inverse(n0),n0)) -> n0
% Current number of equations to process: 4121
% Current number of ordered equations: 0
% Current number of rules: 173
% New rule produced : [378] multiply(n1,add(n1,X)) <-> multiply(add(X,n1),n1)
% Current number of equations to process: 4119
% Current number of ordered equations: 1
% Current number of rules: 174
% New rule produced : [379] multiply(add(X,n1),n1) <-> multiply(n1,add(n1,X))
% Current number of equations to process: 4119
% Current number of ordered equations: 0
% Current number of rules: 175
% New rule produced : [380] add(inverse(n1),n1) -> n1
% Current number of equations to process: 4118
% Current number of ordered equations: 0
% Current number of rules: 176
% New rule produced : [381] multiply(multiply(inverse(n0),n0),add(n1,n0)) -> n0
% Current number of equations to process: 4116
% Current number of ordered equations: 0
% Current number of rules: 177
% New rule produced : [382] multiply(add(add(n1,n0),n1),n1) -> add(n1,n0)
% Current number of equations to process: 4115
% Current number of ordered equations: 0
% Current number of rules: 178
% New rule produced : [383] multiply(add(n1,X),add(n1,X)) -> add(X,n1)
% Current number of equations to process: 4113
% Current number of ordered equations: 0
% Current number of rules: 179
% New rule produced :
% [384]
% multiply(inverse(n0),multiply(inverse(n0),n0)) -> multiply(inverse(n0),n0)
% Current number of equations to process: 4112
% Current number of ordered equations: 0
% Current number of rules: 180
% New rule produced :
% [385]
% multiply(n1,multiply(inverse(X),n1)) <-> multiply(multiply(inverse(X),n1),n1)
% Current number of equations to process: 4111
% Current number of ordered equations: 1
% Current number of rules: 181
% New rule produced :
% [386]
% multiply(multiply(inverse(X),n1),n1) <-> multiply(n1,multiply(inverse(X),n1))
% Current number of equations to process: 4111
% Current number of ordered equations: 0
% Current number of rules: 182
% New rule produced : [387] multiply(add(inverse(X),n0),n1) -> inverse(X)
% Rule
% [172]
% multiply(add(inverse(inverse(X)),n0),n1) <->
% multiply(multiply(add(X,inverse(inverse(X))),n1),n1) collapsed.
% Current number of equations to process: 4111
% Current number of ordered equations: 0
% Current number of rules: 182
% New rule produced : [388] multiply(X,multiply(add(X,n1),n1)) -> X
% Current number of equations to process: 4110
% Current number of ordered equations: 0
% Current number of rules: 183
% New rule produced :
% [389] multiply(n1,add(add(n1,n0),n1)) -> multiply(add(n1,n0),n1)
% Current number of equations to process: 4107
% Current number of ordered equations: 0
% Current number of rules: 184
% New rule produced : [390] multiply(n1,multiply(add(n1,add(n1,n0)),n1)) -> n1
% Current number of equations to process: 4106
% Current number of ordered equations: 0
% Current number of rules: 185
% New rule produced :
% [391] multiply(add(inverse(n0),n1),n1) -> add(inverse(n0),n0)
% Current number of equations to process: 4104
% Current number of ordered equations: 0
% Current number of rules: 186
% New rule produced :
% [392] multiply(n1,multiply(add(X,X),add(X,X))) -> multiply(X,n1)
% Current number of equations to process: 4103
% Current number of ordered equations: 0
% Current number of rules: 187
% New rule produced :
% [393] multiply(multiply(X,add(Y,X)),n1) <-> multiply(n1,multiply(X,add(Y,X)))
% Current number of equations to process: 4102
% Current number of ordered equations: 1
% Current number of rules: 188
% New rule produced :
% [394] multiply(n1,multiply(X,add(Y,X))) <-> multiply(multiply(X,add(Y,X)),n1)
% Current number of equations to process: 4102
% Current number of ordered equations: 0
% Current number of rules: 189
% New rule produced :
% [395]
% multiply(multiply(add(X,inverse(inverse(X))),n1),n1) -> inverse(inverse(X))
% Current number of equations to process: 4101
% Current number of ordered equations: 0
% Current number of rules: 190
% New rule produced :
% [396] multiply(n1,add(inverse(inverse(add(n1,n0))),n1)) -> add(n1,n0)
% Current number of equations to process: 4100
% Current number of ordered equations: 0
% Current number of rules: 191
% New rule produced : [397] multiply(add(n0,X),add(n1,X)) -> add(X,n0)
% Current number of equations to process: 4098
% Current number of ordered equations: 0
% Current number of rules: 192
% New rule produced :
% [398]
% multiply(multiply(inverse(n0),n0),add(inverse(n0),n0)) ->
% multiply(inverse(n0),n0)
% Current number of equations to process: 4097
% Current number of ordered equations: 0
% Current number of rules: 193
% New rule produced :
% [399]
% multiply(n1,add(multiply(inverse(n0),n0),inverse(n1))) -> add(inverse(n1),n0)
% Current number of equations to process: 4096
% Current number of ordered equations: 0
% Current number of rules: 194
% New rule produced :
% [400] multiply(add(n0,inverse(n1)),n1) -> add(inverse(n1),n0)
% Current number of equations to process: 4095
% Current number of ordered equations: 0
% Current number of rules: 195
% New rule produced :
% [401] multiply(add(multiply(Y,X),n0),n1) -> multiply(X,add(Y,Y))
% Current number of equations to process: 4094
% Current number of ordered equations: 0
% Current number of rules: 196
% New rule produced :
% [402] multiply(add(n1,X),add(multiply(inverse(n0),n0),X)) -> add(X,n0)
% Current number of equations to process: 4093
% Current number of ordered equations: 0
% Current number of rules: 197
% New rule produced :
% [403]
% multiply(multiply(inverse(n0),n0),add(multiply(inverse(n0),n0),n0)) -> n0
% Current number of equations to process: 4092
% Current number of ordered equations: 0
% Current number of rules: 198
% New rule produced : [404] multiply(multiply(n1,add(n1,inverse(n0))),n1) -> n1
% Current number of equations to process: 4090
% Current number of ordered equations: 0
% Current number of rules: 199
% Rule [400] multiply(add(n0,inverse(n1)),n1) -> add(inverse(n1),n0) is composed into 
% [400] multiply(add(n0,inverse(n1)),n1) -> multiply(n1,inverse(n1))
% Rule [399]
% multiply(n1,add(multiply(inverse(n0),n0),inverse(n1))) ->
% add(inverse(n1),n0) is composed into [399]
% multiply(n1,add(multiply(inverse(n0),n0),
% inverse(n1))) ->
% multiply(n1,inverse(n1))
% Rule [391] multiply(add(inverse(n0),n1),n1) -> add(inverse(n0),n0) is composed into 
% [391] multiply(add(inverse(n0),n1),n1) -> multiply(n1,inverse(n0))
% Rule [282]
% multiply(add(add(X,inverse(inverse(X))),inverse(add(n1,n0))),n1) <->
% add(inverse(add(n1,n0)),add(inverse(inverse(X)),n0)) is composed into 
% [282]
% multiply(add(add(X,inverse(inverse(X))),inverse(add(n1,n0))),n1) ->
% add(inverse(add(n1,n0)),multiply(n1,inverse(inverse(X))))
% Rule [280]
% multiply(add(n1,X),add(add(inverse(n1),inverse(add(n1,n0))),X)) ->
% add(X,add(inverse(add(n1,n0)),n0)) is composed into [280]
% multiply(add(n1,X),
% add(add(inverse(n1),
% inverse(
% add(n1,n0))),X))
% ->
% add(X,multiply(n1,
% inverse(
% add(n1,n0))))
% Rule [278]
% multiply(n1,add(add(inverse(n1),inverse(add(n1,n0))),inverse(n1))) ->
% add(inverse(n1),add(inverse(add(n1,n0)),n0)) is composed into [278]
% multiply(n1,
% add(
% add(
% inverse(n1),
% inverse(
% add(n1,n0))),
% inverse(n1)))
% ->
% add(
% inverse(n1),
% multiply(n1,
% inverse(
% add(n1,n0))))
% Rule [269]
% multiply(n1,add(inverse(n1),inverse(add(n1,n0)))) ->
% add(inverse(add(n1,n0)),n0) is composed into [269]
% multiply(n1,add(inverse(n1),
% inverse(
% add(n1,n0))))
% ->
% multiply(n1,inverse(
% add(n1,n0)))
% Rule [189]
% multiply(n1,add(multiply(add(X,inverse(inverse(X))),n1),inverse(
% inverse(X)))) ->
% multiply(add(inverse(inverse(X)),n0),add(n1,inverse(X))) is composed into 
% [189]
% multiply(n1,add(multiply(add(X,inverse(inverse(X))),n1),inverse(inverse(X))))
% -> multiply(multiply(n1,inverse(inverse(X))),add(n1,inverse(X)))
% Rule [132]
% multiply(inverse(X),add(X,inverse(inverse(X)))) <->
% multiply(add(inverse(inverse(X)),n0),add(inverse(X),n0)) is composed into 
% [132]
% multiply(inverse(X),add(X,inverse(inverse(X)))) ->
% multiply(multiply(n1,inverse(inverse(X))),multiply(n1,inverse(X)))
% Rule [96]
% multiply(add(n1,inverse(multiply(inverse(X),add(X,X)))),n1) ->
% add(inverse(multiply(inverse(X),add(X,X))),n0) is composed into 
% [96]
% multiply(add(n1,inverse(multiply(inverse(X),add(X,X)))),n1) ->
% multiply(n1,inverse(multiply(inverse(X),add(X,X))))
% Rule [59]
% multiply(add(add(X,inverse(inverse(X))),inverse(n1)),n1) <->
% add(inverse(n1),add(inverse(inverse(X)),n0)) is composed into [59]
% multiply(
% add(
% add(X,
% inverse(
% inverse(X))),
% inverse(n1)),n1)
% ->
% add(
% inverse(n1),
% multiply(n1,
% inverse(
% inverse(X))))
% Rule [57]
% multiply(add(add(Y,inverse(inverse(Y))),X),add(n1,X)) <->
% add(X,add(inverse(inverse(Y)),n0)) is composed into [57]
% multiply(add(
% add(Y,
% inverse(
% inverse(Y))),X),
% add(n1,X)) ->
% add(X,multiply(n1,
% inverse(
% inverse(Y))))
% Rule [39]
% multiply(n1,add(multiply(inverse(X),add(X,X)),inverse(n1))) ->
% add(inverse(n1),n0) is composed into [39]
% multiply(n1,add(multiply(inverse(X),
% add(X,X)),inverse(n1)))
% -> multiply(n1,inverse(n1))
% Rule [14]
% multiply(add(X,inverse(inverse(X))),n1) <-> add(inverse(inverse(X)),n0) is composed into 
% [14]
% multiply(add(X,inverse(inverse(X))),n1) -> multiply(n1,inverse(inverse(X)))
% New rule produced : [405] add(inverse(X),n0) -> multiply(n1,inverse(X))
% Rule
% [15] add(inverse(inverse(X)),n0) <-> multiply(add(X,inverse(inverse(X))),n1)
% collapsed.
% Rule
% [43]
% multiply(add(inverse(X),n0),multiply(add(X,inverse(inverse(X))),n1)) ->
% multiply(inverse(n0),n0) collapsed.
% Rule
% [49]
% multiply(multiply(inverse(X),add(X,X)),add(inverse(n0),n0)) ->
% multiply(inverse(n0),n0) collapsed.
% Rule
% [56]
% add(X,add(inverse(inverse(Y)),n0)) <->
% multiply(add(add(Y,inverse(inverse(Y))),X),add(n1,X)) collapsed.
% Rule
% [58]
% add(inverse(n1),add(inverse(inverse(X)),n0)) <->
% multiply(add(add(X,inverse(inverse(X))),inverse(n1)),n1) collapsed.
% Rule
% [75]
% multiply(add(inverse(X),n0),add(inverse(X),n0)) -> multiply(inverse(X),n1)
% collapsed.
% Rule
% [78]
% multiply(multiply(add(X,inverse(inverse(X))),n1),add(inverse(inverse(
% inverse(X))),n0))
% -> multiply(inverse(n0),n0) collapsed.
% Rule
% [82]
% add(add(inverse(n0),n0),n1) ->
% multiply(add(add(inverse(n0),n0),n0),add(n1,add(n1,n0))) collapsed.
% Rule
% [87] add(inverse(inverse(X)),n0) <-> multiply(add(X,inverse(inverse(X))),n1)
% collapsed.
% Rule
% [99]
% multiply(add(inverse(inverse(X)),n0),multiply(add(X,inverse(inverse(X))),n1))
% -> multiply(inverse(inverse(X)),n1) collapsed.
% Rule
% [100]
% multiply(multiply(add(X,inverse(inverse(X))),n1),add(inverse(inverse(X)),n0))
% -> multiply(inverse(inverse(X)),n1) collapsed.
% Rule
% [131]
% multiply(multiply(add(X,inverse(inverse(X))),n1),add(inverse(X),n0)) ->
% multiply(inverse(X),add(X,inverse(inverse(X)))) collapsed.
% Rule
% [133]
% multiply(add(inverse(inverse(X)),n0),add(inverse(X),n0)) <->
% multiply(inverse(X),add(X,inverse(inverse(X)))) collapsed.
% Rule
% [135]
% multiply(add(n1,inverse(add(inverse(inverse(X)),n0))),n1) <->
% multiply(add(n1,inverse(multiply(add(X,inverse(inverse(X))),n1))),n1)
% collapsed.
% Rule
% [142]
% multiply(inverse(multiply(inverse(X),n1)),add(inverse(X),n0)) ->
% multiply(inverse(n0),n0) collapsed.
% Rule
% [144]
% multiply(add(inverse(X),n0),add(n1,add(X,n0))) ->
% multiply(add(inverse(n0),inverse(X)),add(n0,inverse(X))) collapsed.
% Rule
% [145]
% add(inverse(add(X,inverse(inverse(X)))),add(inverse(inverse(X)),n0)) ->
% multiply(n1,add(n1,inverse(add(X,inverse(inverse(X)))))) collapsed.
% Rule
% [146]
% multiply(add(add(inverse(X),n0),Y),add(add(inverse(X),n0),Y)) ->
% multiply(add(inverse(X),Y),add(n1,Y)) collapsed.
% Rule
% [181]
% multiply(add(inverse(X),inverse(add(inverse(X),n0))),add(n1,inverse(add(
% inverse(X),n0))))
% -> n1 collapsed.
% Rule
% [182]
% multiply(n1,add(inverse(X),inverse(add(inverse(X),n0)))) ->
% multiply(n1,multiply(add(inverse(X),n1),n1)) collapsed.
% Rule
% [183]
% multiply(add(add(n1,X),inverse(add(add(inverse(X),n0),X))),n1) ->
% add(inverse(add(add(inverse(X),n0),X)),n1) collapsed.
% Rule
% [185]
% multiply(multiply(n0,add(inverse(inverse(X)),n0)),n1) <->
% multiply(n1,multiply(n0,multiply(add(X,inverse(inverse(X))),n1))) collapsed.
% Rule [224] add(n0,add(inverse(inverse(X)),n0)) -> add(X,inverse(inverse(X)))
% collapsed.
% Rule
% [235]
% multiply(add(X,inverse(inverse(X))),add(n1,add(inverse(inverse(X)),n0))) ->
% add(X,inverse(inverse(X))) collapsed.
% Rule
% [281]
% add(inverse(add(n1,n0)),add(inverse(inverse(X)),n0)) <->
% multiply(add(add(X,inverse(inverse(X))),inverse(add(n1,n0))),n1) collapsed.
% Rule
% [283]
% multiply(add(X,inverse(inverse(X))),add(inverse(n0),add(inverse(inverse(X)),n0)))
% -> add(add(inverse(inverse(X)),n0),n0) collapsed.
% Rule
% [296]
% multiply(add(add(n1,n0),inverse(add(n1,add(inverse(n1),n0)))),n1) ->
% add(inverse(add(n1,add(inverse(n1),n0))),n1) collapsed.
% Rule
% [304]
% multiply(add(inverse(add(n1,n0)),n0),add(inverse(n1),n0)) ->
% multiply(inverse(n1),n1) collapsed.
% Rule [305] add(inverse(add(n1,n0)),add(inverse(n0),n0)) -> n1 collapsed.
% Rule
% [309]
% add(inverse(add(n1,n0)),add(add(inverse(inverse(X)),n0),n0)) ->
% add(inverse(add(n1,n0)),add(X,inverse(inverse(X)))) collapsed.
% Rule
% [333] add(add(inverse(inverse(add(n1,n0))),n0),inverse(add(n1,n0))) -> n1
% collapsed.
% Rule [336] add(add(add(inverse(n0),n0),n0),inverse(add(n1,n0))) -> n1
% collapsed.
% Rule [387] multiply(add(inverse(X),n0),n1) -> inverse(X) collapsed.
% Rule
% [398]
% multiply(multiply(inverse(n0),n0),add(inverse(n0),n0)) ->
% multiply(inverse(n0),n0) collapsed.
% Current number of equations to process: 4111
% Current number of ordered equations: 0
% Current number of rules: 166
% New rule produced : [406] multiply(multiply(n1,inverse(X)),n1) -> inverse(X)
% Current number of equations to process: 4110
% Current number of ordered equations: 0
% Current number of rules: 167
% Rule [307]
% add(inverse(add(n1,n0)),add(n0,inverse(inverse(X)))) <->
% multiply(add(add(X,inverse(inverse(X))),inverse(add(n1,n0))),n1) is composed into 
% [307]
% add(inverse(add(n1,n0)),add(n0,inverse(inverse(X)))) ->
% multiply(add(multiply(add(n1,n0),multiply(n1,inverse(inverse(X)))),inverse(
% add(n1,n0))),n1)
% New rule produced :
% [407]
% add(X,inverse(inverse(X))) ->
% multiply(add(n1,n0),multiply(n1,inverse(inverse(X))))
% Rule
% [14]
% multiply(add(X,inverse(inverse(X))),n1) -> multiply(n1,inverse(inverse(X)))
% collapsed.
% Rule
% [18]
% multiply(n1,multiply(add(X,inverse(inverse(X))),n1)) -> inverse(inverse(X))
% collapsed.
% Rule
% [54]
% multiply(add(X,inverse(inverse(X))),multiply(n1,add(inverse(inverse(X)),
% inverse(X)))) -> X collapsed.
% Rule
% [57]
% multiply(add(add(Y,inverse(inverse(Y))),X),add(n1,X)) ->
% add(X,multiply(n1,inverse(inverse(Y)))) collapsed.
% Rule
% [59]
% multiply(add(add(X,inverse(inverse(X))),inverse(n1)),n1) ->
% add(inverse(n1),multiply(n1,inverse(inverse(X)))) collapsed.
% Rule
% [65]
% multiply(n1,add(multiply(add(X,inverse(inverse(X))),n1),inverse(n1))) ->
% add(inverse(n1),inverse(inverse(X))) collapsed.
% Rule
% [84]
% multiply(add(n1,X),add(multiply(add(Y,inverse(inverse(Y))),n1),X)) ->
% add(X,inverse(inverse(Y))) collapsed.
% Rule
% [132]
% multiply(inverse(X),add(X,inverse(inverse(X)))) ->
% multiply(multiply(n1,inverse(inverse(X))),multiply(n1,inverse(X))) collapsed.
% Rule
% [134]
% multiply(add(inverse(inverse(n0)),inverse(n0)),multiply(inverse(n0),add(n0,
% inverse(
% inverse(n0)))))
% -> inverse(inverse(n0)) collapsed.
% Rule
% [151]
% multiply(inverse(multiply(inverse(inverse(X)),n1)),multiply(add(X,inverse(
% inverse(X))),n1))
% -> multiply(inverse(n0),n0) collapsed.
% Rule
% [180]
% multiply(multiply(add(X,inverse(inverse(X))),n1),multiply(add(X,inverse(
% inverse(X))),n1))
% -> multiply(inverse(inverse(X)),n1) collapsed.
% Rule
% [189]
% multiply(n1,add(multiply(add(X,inverse(inverse(X))),n1),inverse(inverse(X))))
% -> multiply(multiply(n1,inverse(inverse(X))),add(n1,inverse(X))) collapsed.
% Rule
% [192]
% add(inverse(multiply(add(X,inverse(inverse(X))),n1)),inverse(inverse(X))) ->
% multiply(add(n1,inverse(multiply(add(X,inverse(inverse(X))),n1))),n1)
% collapsed.
% Rule
% [226]
% multiply(multiply(add(X,inverse(inverse(X))),n1),add(n1,n0)) ->
% inverse(inverse(X)) collapsed.
% Rule
% [282]
% multiply(add(add(X,inverse(inverse(X))),inverse(add(n1,n0))),n1) ->
% add(inverse(add(n1,n0)),multiply(n1,inverse(inverse(X)))) collapsed.
% Rule
% [284]
% multiply(add(multiply(add(Y,inverse(inverse(Y))),n1),X),add(add(n1,n0),X)) ->
% add(X,inverse(inverse(Y))) collapsed.
% Rule
% [308]
% multiply(add(add(X,inverse(inverse(X))),inverse(add(n1,n0))),n1) <->
% add(inverse(add(n1,n0)),add(n0,inverse(inverse(X)))) collapsed.
% Rule
% [317]
% multiply(add(multiply(add(X,inverse(inverse(X))),n1),inverse(add(n1,n0))),n1)
% -> add(inverse(add(n1,n0)),inverse(inverse(X))) collapsed.
% Rule
% [324]
% multiply(n1,add(multiply(add(X,inverse(inverse(X))),n1),inverse(add(n1,n0))))
% -> add(inverse(add(n1,n0)),inverse(inverse(X))) collapsed.
% Rule
% [395]
% multiply(multiply(add(X,inverse(inverse(X))),n1),n1) -> inverse(inverse(X))
% collapsed.
% Current number of equations to process: 4128
% Current number of ordered equations: 0
% Current number of rules: 148
% New rule produced :
% [408] multiply(n1,add(inverse(n0),inverse(add(n1,n0)))) -> n1
% Current number of equations to process: 4127
% Current number of ordered equations: 0
% Current number of rules: 149
% New rule produced :
% [409]
% multiply(multiply(n1,inverse(X)),multiply(n1,inverse(X))) ->
% multiply(inverse(X),n1)
% Current number of equations to process: 4126
% Current number of ordered equations: 0
% Current number of rules: 150
% New rule produced :
% [410] add(add(multiply(n1,inverse(n0)),n0),inverse(add(n1,n0))) -> n1
% Current number of equations to process: 4125
% Current number of ordered equations: 0
% Current number of rules: 151
% New rule produced :
% [411]
% multiply(inverse(multiply(inverse(X),n1)),multiply(n1,inverse(X))) ->
% multiply(inverse(n0),n0)
% Current number of equations to process: 4124
% Current number of ordered equations: 0
% Current number of rules: 152
% New rule produced : [412] multiply(multiply(inverse(n0),n0),n1) -> n0
% Current number of equations to process: 4123
% Current number of ordered equations: 0
% Current number of rules: 153
% New rule produced :
% [413] multiply(inverse(add(n1,n0)),n1) -> inverse(add(n1,n0))
% Current number of equations to process: 4122
% Current number of ordered equations: 0
% Current number of rules: 154
% New rule produced :
% [414] multiply(n1,inverse(n0)) <-> multiply(inverse(n0),n1)
% Current number of equations to process: 4121
% Current number of ordered equations: 1
% Current number of rules: 155
% New rule produced :
% [415] multiply(inverse(n0),n1) <-> multiply(n1,inverse(n0))
% Current number of equations to process: 4121
% Current number of ordered equations: 0
% Current number of rules: 156
% New rule produced :
% [416]
% multiply(add(n1,inverse(multiply(inverse(n0),n0))),n1) ->
% multiply(n1,inverse(multiply(inverse(n0),n0)))
% Current number of equations to process: 4120
% Current number of ordered equations: 0
% Current number of rules: 157
% New rule produced :
% [417]
% add(n1,inverse(multiply(inverse(n0),n0))) ->
% multiply(add(n1,n0),multiply(n1,inverse(multiply(inverse(n0),n0))))
% Rule
% [416]
% multiply(add(n1,inverse(multiply(inverse(n0),n0))),n1) ->
% multiply(n1,inverse(multiply(inverse(n0),n0))) collapsed.
% Current number of equations to process: 4120
% Current number of ordered equations: 0
% Current number of rules: 157
% New rule produced :
% [418]
% add(multiply(n1,inverse(inverse(add(n1,n0)))),inverse(add(n1,n0))) -> n1
% Current number of equations to process: 4117
% Current number of ordered equations: 0
% Current number of rules: 158
% New rule produced : [419] multiply(n1,multiply(add(n1,n0),n1)) -> n1
% Current number of equations to process: 4116
% Current number of ordered equations: 0
% Current number of rules: 159
% New rule produced :
% [420] multiply(inverse(X),multiply(add(X,n0),n1)) -> multiply(inverse(n0),n0)
% Current number of equations to process: 4115
% Current number of ordered equations: 0
% Current number of rules: 160
% New rule produced :
% [421]
% multiply(multiply(inverse(n0),n0),multiply(n1,inverse(n0))) ->
% multiply(inverse(n0),n0)
% Current number of equations to process: 4114
% Current number of ordered equations: 0
% Current number of rules: 161
% New rule produced :
% [422]
% multiply(inverse(multiply(n0,X)),multiply(X,multiply(inverse(n0),n0))) ->
% multiply(inverse(n0),n0)
% Current number of equations to process: 4113
% Current number of ordered equations: 0
% Current number of rules: 162
% Rule [420]
% multiply(inverse(X),multiply(add(X,n0),n1)) -> multiply(inverse(n0),n0) is composed into 
% [420] multiply(inverse(X),multiply(add(X,n0),n1)) -> n0
% Rule [411]
% multiply(inverse(multiply(inverse(X),n1)),multiply(n1,inverse(X))) ->
% multiply(inverse(n0),n0) is composed into [411]
% multiply(inverse(multiply(
% inverse(X),n1)),
% multiply(n1,inverse(X))) -> n0
% Rule [364] multiply(inverse(multiply(n1,n0)),n0) -> multiply(inverse(n0),n0) is composed into 
% [364] multiply(inverse(multiply(n1,n0)),n0) -> n0
% Rule [228]
% multiply(inverse(multiply(multiply(n1,add(X,n1)),X)),X) ->
% multiply(inverse(n0),n0) is composed into [228]
% multiply(inverse(multiply(
% multiply(n1,
% add(X,n1)),X)),X)
% -> n0
% Rule [140]
% multiply(inverse(multiply(multiply(X,Y),Z)),multiply(Z,multiply(Y,
% add(X,X)))) ->
% multiply(inverse(n0),n0) is composed into [140]
% multiply(inverse(multiply(
% multiply(X,Y),Z)),
% multiply(Z,multiply(Y,
% add(X,X)))) -> n0
% Rule [111] multiply(inverse(b),add(b,b)) -> multiply(inverse(n0),n0) is composed into 
% [111] multiply(inverse(b),add(b,b)) -> n0
% Rule [110]
% multiply(inverse(multiply(n0,X)),multiply(X,multiply(inverse(Y),
% add(Y,Y)))) ->
% multiply(inverse(n0),n0) is composed into [110]
% multiply(inverse(multiply(n0,X)),
% multiply(X,multiply(inverse(Y),
% add(Y,Y)))) -> n0
% Rule [107]
% multiply(inverse(n0),multiply(inverse(multiply(X,Y)),multiply(Y,
% add(X,X)))) ->
% multiply(inverse(n0),n0) is composed into [107]
% multiply(inverse(n0),multiply(
% inverse(
% multiply(X,Y)),
% multiply(Y,
% add(X,X))))
% -> n0
% Rule [70]
% multiply(inverse(n0),multiply(inverse(n0),multiply(inverse(X),add(X,X))))
% -> multiply(inverse(n0),n0) is composed into [70]
% multiply(inverse(n0),
% multiply(inverse(n0),
% multiply(inverse(X),
% add(X,X)))) -> n0
% Rule [40] multiply(inverse(X),add(X,X)) -> multiply(inverse(n0),n0) is composed into 
% [40] multiply(inverse(X),add(X,X)) -> n0
% Rule [37]
% multiply(inverse(multiply(X,Y)),multiply(Y,add(X,X))) ->
% multiply(inverse(n0),n0) is composed into [37]
% multiply(inverse(multiply(X,Y)),
% multiply(Y,add(X,X))) -> n0
% Rule [30]
% multiply(inverse(n0),multiply(inverse(X),add(X,X))) ->
% multiply(inverse(n0),n0) is composed into [30]
% multiply(inverse(n0),multiply(
% inverse(X),
% add(X,X)))
% -> n0
% Rule [27] multiply(inverse(X),add(X,X)) -> multiply(inverse(n0),n0) is composed into 
% [27] multiply(inverse(X),add(X,X)) -> n0
% New rule produced : [423] multiply(inverse(n0),n0) -> n0
% Rule [377] multiply(n1,multiply(inverse(n0),n0)) -> n0 collapsed.
% Rule [381] multiply(multiply(inverse(n0),n0),add(n1,n0)) -> n0 collapsed.
% Rule
% [384]
% multiply(inverse(n0),multiply(inverse(n0),n0)) -> multiply(inverse(n0),n0)
% collapsed.
% Rule
% [399]
% multiply(n1,add(multiply(inverse(n0),n0),inverse(n1))) ->
% multiply(n1,inverse(n1)) collapsed.
% Rule [402] multiply(add(n1,X),add(multiply(inverse(n0),n0),X)) -> add(X,n0)
% collapsed.
% Rule
% [403]
% multiply(multiply(inverse(n0),n0),add(multiply(inverse(n0),n0),n0)) -> n0
% collapsed.
% Rule [412] multiply(multiply(inverse(n0),n0),n1) -> n0 collapsed.
% Rule
% [417]
% add(n1,inverse(multiply(inverse(n0),n0))) ->
% multiply(add(n1,n0),multiply(n1,inverse(multiply(inverse(n0),n0))))
% collapsed.
% Rule
% [421]
% multiply(multiply(inverse(n0),n0),multiply(n1,inverse(n0))) ->
% multiply(inverse(n0),n0) collapsed.
% Rule
% [422]
% multiply(inverse(multiply(n0,X)),multiply(X,multiply(inverse(n0),n0))) ->
% multiply(inverse(n0),n0) collapsed.
% Current number of equations to process: 4120
% Current number of ordered equations: 0
% Current number of rules: 153
% New rule produced : [424] multiply(n1,n0) -> n0
% Rule [364] multiply(inverse(multiply(n1,n0)),n0) -> n0 collapsed.
% Current number of equations to process: 4119
% Current number of ordered equations: 0
% Current number of rules: 153
% New rule produced : [425] multiply(n0,add(n1,n0)) -> n0
% Current number of equations to process: 4118
% Current number of ordered equations: 0
% Current number of rules: 154
% New rule produced : [426] multiply(n0,n0) -> n0
% Current number of equations to process: 4117
% Current number of ordered equations: 0
% Current number of rules: 155
% New rule produced : [427] multiply(n0,multiply(n1,inverse(n0))) -> n0
% Current number of equations to process: 4116
% Current number of ordered equations: 0
% Current number of rules: 156
% New rule produced : [428] multiply(n1,add(n0,inverse(n1))) -> n0
% Current number of equations to process: 4115
% Current number of ordered equations: 0
% Current number of rules: 157
% New rule produced :
% [429] multiply(inverse(multiply(n0,X)),multiply(X,n0)) -> n0
% Current number of equations to process: 4114
% Current number of ordered equations: 0
% Current number of rules: 158
% New rule produced : [430] multiply(add(n1,X),add(n0,X)) -> add(X,n0)
% Current number of equations to process: 4113
% Current number of ordered equations: 0
% Current number of rules: 159
% New rule produced :
% [431] add(n1,inverse(n0)) -> multiply(add(n1,n0),multiply(n1,inverse(n0)))
% Rule [404] multiply(multiply(n1,add(n1,inverse(n0))),n1) -> n1 collapsed.
% Current number of equations to process: 4113
% Current number of ordered equations: 0
% Current number of rules: 159
% New rule produced :
% [432]
% multiply(multiply(n1,multiply(add(n1,n0),multiply(n1,inverse(n0)))),n1) -> n1
% Current number of equations to process: 4112
% Current number of ordered equations: 0
% Current number of rules: 160
% New rule produced :
% [433]
% multiply(add(add(add(n1,n0),n1),inverse(n1)),n1) ->
% add(inverse(n1),add(n1,n0))
% Current number of equations to process: 4110
% Current number of ordered equations: 0
% Current number of rules: 161
% New rule produced :
% [434]
% multiply(multiply(n1,inverse(add(n1,n0))),n0) -> multiply(inverse(n1),n1)
% Current number of equations to process: 4109
% Current number of ordered equations: 0
% Current number of rules: 162
% New rule produced :
% [435]
% multiply(multiply(add(n1,add(n1,n0)),add(inverse(n0),add(n1,n0))),n1) ->
% add(multiply(n1,inverse(n0)),n0)
% Current number of equations to process: 4108
% Current number of ordered equations: 0
% Current number of rules: 163
% New rule produced :
% [436]
% multiply(multiply(add(n1,n0),multiply(n1,inverse(inverse(X)))),n1) ->
% multiply(n1,inverse(inverse(X)))
% Current number of equations to process: 4106
% Current number of ordered equations: 0
% Current number of rules: 164
% New rule produced :
% [437] multiply(multiply(add(X,n0),n1),add(inverse(X),X)) -> add(X,n0)
% Current number of equations to process: 4105
% Current number of ordered equations: 0
% Current number of rules: 165
% New rule produced :
% [438] multiply(add(multiply(n1,inverse(inverse(n1))),inverse(n1)),n1) -> n1
% Current number of equations to process: 4103
% Current number of ordered equations: 0
% Current number of rules: 166
% New rule produced :
% [439] multiply(multiply(add(X,X),add(X,X)),n1) -> multiply(n1,add(X,X))
% Current number of equations to process: 4102
% Current number of ordered equations: 0
% Current number of rules: 167
% New rule produced :
% [440]
% multiply(add(n1,inverse(multiply(inverse(X),n1))),n1) <->
% multiply(n1,add(n1,inverse(multiply(inverse(X),n1))))
% Current number of equations to process: 4100
% Current number of ordered equations: 1
% Current number of rules: 168
% New rule produced :
% [441]
% multiply(n1,add(n1,inverse(multiply(inverse(X),n1)))) <->
% multiply(add(n1,inverse(multiply(inverse(X),n1))),n1)
% Current number of equations to process: 4100
% Current number of ordered equations: 0
% Current number of rules: 169
% New rule produced :
% [442]
% multiply(n1,add(n1,inverse(multiply(n1,inverse(X))))) <->
% multiply(add(n1,inverse(multiply(n1,inverse(X)))),n1)
% Current number of equations to process: 4099
% Current number of ordered equations: 1
% Current number of rules: 170
% New rule produced :
% [443]
% multiply(add(n1,inverse(multiply(n1,inverse(X)))),n1) <->
% multiply(n1,add(n1,inverse(multiply(n1,inverse(X)))))
% Current number of equations to process: 4099
% Current number of ordered equations: 0
% Current number of rules: 171
% New rule produced : [444] multiply(add(n0,X),add(add(n1,n0),X)) -> add(X,n0)
% Current number of equations to process: 4098
% Current number of ordered equations: 0
% Current number of rules: 172
% Rule [431]
% add(n1,inverse(n0)) -> multiply(add(n1,n0),multiply(n1,inverse(n0))) is composed into 
% [431] add(n1,inverse(n0)) -> add(n1,n0)
% New rule produced :
% [445] multiply(add(n1,n0),multiply(n1,inverse(n0))) -> add(n1,n0)
% Rule
% [432]
% multiply(multiply(n1,multiply(add(n1,n0),multiply(n1,inverse(n0)))),n1) -> n1
% collapsed.
% Current number of equations to process: 4097
% Current number of ordered equations: 0
% Current number of rules: 172
% New rule produced :
% [446] multiply(add(add(add(n1,n0),n1),X),add(n1,X)) -> add(X,add(n1,n0))
% Current number of equations to process: 4096
% Current number of ordered equations: 0
% Current number of rules: 173
% New rule produced : [447] multiply(n1,add(n0,X)) <-> multiply(add(X,n0),n1)
% Current number of equations to process: 4095
% Current number of ordered equations: 1
% Current number of rules: 174
% New rule produced : [448] multiply(add(X,n0),n1) <-> multiply(n1,add(n0,X))
% Current number of equations to process: 4095
% Current number of ordered equations: 0
% Current number of rules: 175
% New rule produced :
% [449]
% multiply(multiply(n1,inverse(X)),multiply(n1,inverse(inverse(X)))) -> n0
% Current number of equations to process: 4093
% Current number of ordered equations: 0
% Current number of rules: 176
% New rule produced : [450] multiply(n0,add(n1,X)) -> multiply(add(X,n0),n0)
% Rule [425] multiply(n0,add(n1,n0)) -> n0 collapsed.
% Current number of equations to process: 4092
% Current number of ordered equations: 0
% Current number of rules: 176
% New rule produced :
% [451] add(inverse(n1),add(X,X)) <-> multiply(add(add(X,n0),inverse(n1)),n1)
% Current number of equations to process: 4090
% Current number of ordered equations: 1
% Current number of rules: 177
% New rule produced :
% [452] multiply(add(add(X,n0),inverse(n1)),n1) <-> add(inverse(n1),add(X,X))
% Current number of equations to process: 4090
% Current number of ordered equations: 0
% Current number of rules: 178
% New rule produced :
% [453]
% multiply(n1,add(inverse(X),inverse(multiply(n1,inverse(X))))) ->
% multiply(n1,multiply(add(inverse(X),n1),n1))
% Current number of equations to process: 4089
% Current number of ordered equations: 0
% Current number of rules: 179
% New rule produced :
% [454]
% multiply(n1,add(multiply(add(X,n1),n1),inverse(X))) -> add(inverse(X),X)
% Current number of equations to process: 4088
% Current number of ordered equations: 0
% Current number of rules: 180
% New rule produced :
% [455]
% multiply(add(n0,inverse(add(n1,n0))),n1) -> multiply(n1,inverse(add(n1,n0)))
% Current number of equations to process: 4087
% Current number of ordered equations: 0
% Current number of rules: 181
% New rule produced :
% [456]
% multiply(n1,add(inverse(inverse(add(n1,n0))),add(n1,n0))) ->
% add(add(n1,n0),n0)
% Current number of equations to process: 4094
% Current number of ordered equations: 0
% Current number of rules: 182
% New rule produced : [457] add(add(add(n1,n0),n0),inverse(add(n1,n0))) -> n1
% Current number of equations to process: 4095
% Current number of ordered equations: 0
% Current number of rules: 183
% Rule [389] multiply(n1,add(add(n1,n0),n1)) -> multiply(add(n1,n0),n1) is composed into 
% [389] multiply(n1,add(add(n1,n0),n1)) -> n1
% New rule produced : [458] multiply(add(n1,n0),n1) -> n1
% Rule [419] multiply(n1,multiply(add(n1,n0),n1)) -> n1 collapsed.
% Current number of equations to process: 4095
% Current number of ordered equations: 0
% Current number of rules: 183
% New rule produced : [459] multiply(n1,add(inverse(n0),n1)) -> add(n1,n0)
% Current number of equations to process: 4096
% Current number of ordered equations: 0
% Current number of rules: 184
% New rule produced :
% [460]
% multiply(n1,add(add(inverse(n0),n1),inverse(n1))) ->
% add(inverse(n1),add(n1,n0))
% Current number of equations to process: 4099
% Current number of ordered equations: 0
% Current number of rules: 185
% New rule produced :
% [461] multiply(add(add(n0,inverse(n1)),X),add(n1,X)) -> add(X,n0)
% Current number of equations to process: 4099
% Current number of ordered equations: 0
% Current number of rules: 186
% Rule [447] multiply(n1,add(n0,X)) <-> multiply(add(X,n0),n1) is composed into 
% [447] multiply(n1,add(n0,X)) -> X
% Rule [260]
% multiply(add(inverse(add(n1,n0)),X),add(add(X,n0),X)) ->
% multiply(add(X,n0),n1) is composed into [260]
% multiply(add(inverse(add(n1,n0)),X),
% add(add(X,n0),X)) -> X
% Rule [168]
% multiply(multiply(X,add(X,X)),n1) <->
% multiply(n1,multiply(X,multiply(add(X,n0),n1))) is composed into 
% [168] multiply(multiply(X,add(X,X)),n1) -> multiply(n1,multiply(X,X))
% Rule [158]
% add(add(X,n0),X) <->
% multiply(add(n1,add(X,n0)),multiply(add(inverse(b),X),multiply(add(
% add(b,X),n0),n1))) is composed into 
% [158]
% add(add(X,n0),X) <->
% multiply(add(n1,add(X,n0)),multiply(add(inverse(b),X),add(b,X)))
% Rule [23] add(X,X) <-> multiply(add(X,n0),n1) is composed into [23]
% add(X,X) -> X
% New rule produced : [462] multiply(add(X,n0),n1) -> X
% Rule [401] multiply(add(multiply(Y,X),n0),n1) -> multiply(X,add(Y,Y))
% collapsed.
% Rule [420] multiply(inverse(X),multiply(add(X,n0),n1)) -> n0 collapsed.
% Rule [437] multiply(multiply(add(X,n0),n1),add(inverse(X),X)) -> add(X,n0)
% collapsed.
% Rule [448] multiply(add(X,n0),n1) <-> multiply(n1,add(n0,X)) collapsed.
% Rule [458] multiply(add(n1,n0),n1) -> n1 collapsed.
% Current number of equations to process: 4103
% Current number of ordered equations: 0
% Current number of rules: 182
% Rule [434]
% multiply(multiply(n1,inverse(add(n1,n0))),n0) ->
% multiply(inverse(n1),n1) is composed into [434]
% multiply(multiply(n1,inverse(
% add(n1,n0))),n0)
% -> n0
% New rule produced : [463] multiply(inverse(X),X) -> n0
% Rule [423] multiply(inverse(n0),n0) -> n0 collapsed.
% Current number of equations to process: 4102
% Current number of ordered equations: 0
% Current number of rules: 182
% multiply(Y,X) = multiply(X,Y) (birth = 287, lhs_size = 3, rhs_size = 5,trace = Cp of 23 and 3)
% Initializing completion ...
% New rule produced : [1] X <-> add(X,X)
% Current number of equations to process: 3909
% Current number of ordered equations: 319
% Current number of rules: 1
% New rule produced : [2] n0 <-> n0 multiply n1
% Current number of equations to process: 3909
% Current number of ordered equations: 318
% Current number of rules: 2
% New rule produced : [3] n0 <-> n0 multiply n0
% Current number of equations to process: 3909
% Current number of ordered equations: 317
% Current number of rules: 3
% New rule produced : [4] n1 <-> n1 multiply n1
% Current number of equations to process: 3909
% Current number of ordered equations: 316
% Current number of rules: 4
% New rule produced : [5] n1 <-> add(n0,n1)
% Current number of equations to process: 3909
% Current number of ordered equations: 315
% Current number of rules: 5
% New rule produced : [6] n1 multiply n1 <-> n1
% Current number of equations to process: 3909
% Current number of ordered equations: 314
% Current number of rules: 6
% New rule produced : [7] n0 multiply n1 <-> n0
% Current number of equations to process: 3909
% Current number of ordered equations: 313
% Current number of rules: 7
% New rule produced : [8] n0 multiply n0 <-> n0
% Current number of equations to process: 3909
% Current number of ordered equations: 312
% Current number of rules: 8
% New rule produced : [9] add(X,X) <-> X
% Current number of equations to process: 3909
% Current number of ordered equations: 309
% Current number of rules: 9
% New rule produced : [10] add(n0,n1) <-> n1
% Current number of equations to process: 3909
% Current number of ordered equations: 308
% Current number of rules: 10
% New rule produced : [11] n0 <-> inverse(X) multiply X
% Current number of equations to process: 3938
% Current number of ordered equations: 305
% Current number of rules: 11
% New rule produced : [12] n1 <-> add(X,inverse(X))
% Current number of equations to process: 3938
% Current number of ordered equations: 304
% Current number of rules: 12
% New rule produced : [13] n1 <-> add(inverse(n1),n1)
% Current number of equations to process: 3938
% Current number of ordered equations: 303
% Current number of rules: 13
% New rule produced : [14] inverse(X) multiply X <-> n0
% Current number of equations to process: 3938
% Current number of ordered equations: 300
% Current number of rules: 14
% New rule produced : [15] add(X,inverse(X)) <-> n1
% Current number of equations to process: 3938
% Current number of ordered equations: 299
% Current number of rules: 15
% New rule produced : [16] add(inverse(n1),n1) <-> n1
% Current number of equations to process: 3938
% Current number of ordered equations: 298
% Current number of rules: 16
% New rule produced : [17] X <-> n1 multiply add(X,n0)
% Current number of equations to process: 3969
% Current number of ordered equations: 308
% Current number of rules: 17
% New rule produced : [18] X <-> n1 multiply add(n0,X)
% Current number of equations to process: 3969
% Current number of ordered equations: 307
% Current number of rules: 18
% New rule produced : [19] n1 multiply add(X,n0) <-> X
% Current number of equations to process: 3969
% Current number of ordered equations: 305
% Current number of rules: 19
% New rule produced : [20] n1 multiply add(n0,X) <-> X
% Current number of equations to process: 3969
% Current number of ordered equations: 304
% Current number of rules: 20
% New rule produced : [21] add(n1,n0) <-> add(n1,inverse(n0))
% Current number of equations to process: 3969
% Current number of ordered equations: 303
% Current number of rules: 21
% New rule produced : [22] add(n1,inverse(n0)) <-> add(n1,n0)
% Current number of equations to process: 3969
% Current number of ordered equations: 302
% Current number of rules: 22
% New rule produced : [23] n1 multiply inverse(X) <-> add(inverse(X),n0)
% Current number of equations to process: 4068
% Current number of ordered equations: 353
% Current number of rules: 23
% New rule produced : [24] add(inverse(X),n0) <-> n1 multiply inverse(X)
% Current number of equations to process: 4068
% Current number of ordered equations: 352
% Current number of rules: 24
% New rule produced : [25] n0 <-> n1 multiply add(n0,inverse(n1))
% Current number of equations to process: 4091
% Current number of ordered equations: 359
% Current number of rules: 25
% New rule produced : [26] n0 <-> inverse(X) multiply add(X,X)
% Current number of equations to process: 4091
% Current number of ordered equations: 357
% Current number of rules: 26
% New rule produced : [27] n0 <-> n0 multiply (n1 multiply inverse(n0))
% Current number of equations to process: 4091
% Current number of ordered equations: 356
% Current number of rules: 27
% New rule produced : [28] n1 <-> add(n1,inverse(add(n1,n0)))
% Current number of equations to process: 4091
% Current number of ordered equations: 355
% Current number of rules: 28
% New rule produced : [29] n1 <-> add(inverse(add(n1,n0)),n1)
% Current number of equations to process: 4091
% Current number of ordered equations: 354
% Current number of rules: 29
% New rule produced : [30] n1 multiply add(n0,inverse(n1)) <-> n0
% Current number of equations to process: 4091
% Current number of ordered equations: 353
% Current number of rules: 30
% New rule produced : [31] inverse(X) multiply add(X,X) <-> n0
% Current number of equations to process: 4091
% Current number of ordered equations: 351
% Current number of rules: 31
% New rule produced : [32] n0 multiply (n1 multiply inverse(n0)) <-> n0
% Current number of equations to process: 4091
% Current number of ordered equations: 350
% Current number of rules: 32
% New rule produced : [33] add(n1,inverse(add(n1,n0))) <-> n1
% Current number of equations to process: 4091
% Current number of ordered equations: 349
% Current number of rules: 33
% New rule produced : [34] add(inverse(add(n1,n0)),n1) <-> n1
% Current number of equations to process: 4091
% Current number of ordered equations: 348
% Current number of rules: 34
% New rule produced : [35] inverse(X) <-> n1 multiply (n1 multiply inverse(X))
% Current number of equations to process: 4299
% Current number of ordered equations: 397
% Current number of rules: 35
% New rule produced : [36] n1 multiply (n1 multiply inverse(X)) <-> inverse(X)
% Current number of equations to process: 4299
% Current number of ordered equations: 396
% Current number of rules: 36
% New rule produced : [37] X <-> add(n1,n0) multiply add(X,n0)
% Current number of equations to process: 4327
% Current number of ordered equations: 421
% Current number of rules: 37
% New rule produced : [38] X <-> (n1 multiply add(X,n1)) multiply X
% Current number of equations to process: 4327
% Current number of ordered equations: 420
% Current number of rules: 38
% New rule produced : [39] n1 <-> n1 multiply add(add(n1,n0),n1)
% Current number of equations to process: 4327
% Current number of ordered equations: 419
% Current number of rules: 39
% New rule produced : [40] n1 multiply add(n1,X) <-> n1 multiply add(X,n1)
% Current number of equations to process: 4327
% Current number of ordered equations: 418
% Current number of rules: 40
% New rule produced : [41] n1 multiply add(X,n1) <-> n1 multiply add(n1,X)
% Current number of equations to process: 4327
% Current number of ordered equations: 417
% Current number of rules: 41
% New rule produced : [42] n1 multiply add(add(n1,n0),n1) <-> n1
% Current number of equations to process: 4327
% Current number of ordered equations: 416
% Current number of rules: 42
% New rule produced : [43] n1 multiply add(inverse(n0),n1) <-> add(n1,n0)
% Current number of equations to process: 4327
% Current number of ordered equations: 415
% Current number of rules: 43
% New rule produced : [44] inverse(X) multiply add(X,X) <-> add(n0,n0)
% Current number of equations to process: 4327
% Current number of ordered equations: 414
% Current number of rules: 44
% New rule produced : [45] n0 multiply add(n1,X) <-> n0 multiply add(X,n0)
% Current number of equations to process: 4327
% Current number of ordered equations: 413
% Current number of rules: 45
% New rule produced : [46] n0 multiply add(X,n0) <-> n0 multiply add(n1,X)
% Current number of equations to process: 4327
% Current number of ordered equations: 412
% Current number of rules: 46
% New rule produced : [47] add(n1,n0) <-> n1 multiply add(inverse(n0),n1)
% Current number of equations to process: 4327
% Current number of ordered equations: 411
% Current number of rules: 47
% New rule produced : [48] add(n0,n0) <-> inverse(X) multiply add(X,X)
% Current number of equations to process: 4327
% Current number of ordered equations: 410
% Current number of rules: 48
% New rule produced : [49] add(n1,n0) multiply add(X,n0) <-> X
% Current number of equations to process: 4327
% Current number of ordered equations: 409
% Current number of rules: 49
% New rule produced : [50] (n1 multiply add(X,n1)) multiply X <-> X
% Current number of equations to process: 4327
% Current number of ordered equations: 408
% Current number of rules: 50
% New rule produced :
% [51] inverse(add(n1,n0)) <-> n1 multiply inverse(add(n1,n0))
% Current number of equations to process: 4867
% Current number of ordered equations: 575
% Current number of rules: 51
% New rule produced :
% [52] n1 multiply inverse(n1) <-> n1 multiply add(n0,inverse(n1))
% Current number of equations to process: 4867
% Current number of ordered equations: 574
% Current number of rules: 52
% New rule produced :
% [53] n1 multiply inverse(n0) <-> n1 multiply add(inverse(n0),n1)
% Current number of equations to process: 4867
% Current number of ordered equations: 573
% Current number of rules: 53
% New rule produced :
% [54] n1 multiply add(inverse(n0),n1) <-> n1 multiply inverse(n0)
% Current number of equations to process: 4867
% Current number of ordered equations: 572
% Current number of rules: 54
% New rule produced :
% [55] n1 multiply inverse(add(n1,n0)) <-> inverse(add(n1,n0))
% Current number of equations to process: 4867
% Current number of ordered equations: 571
% Current number of rules: 55
% New rule produced :
% [56] n1 multiply add(n0,inverse(n1)) <-> n1 multiply inverse(n1)
% Current number of equations to process: 4867
% Current number of ordered equations: 570
% Current number of rules: 56
% New rule produced : [57] n0 <-> n1 multiply (inverse(X) multiply add(X,X))
% Current number of equations to process: 740
% Current number of ordered equations: 617
% Current number of rules: 57
% New rule produced : [58] n0 <-> n0 multiply (n1 multiply inverse(add(n1,n0)))
% Current number of equations to process: 740
% Current number of ordered equations: 616
% Current number of rules: 58
% New rule produced : [59] n1 <-> add(inverse(add(n1,n0)),add(n1,n0))
% Current number of equations to process: 740
% Current number of ordered equations: 615
% Current number of rules: 59
% New rule produced : [60] n1 multiply (inverse(X) multiply add(X,X)) <-> n0
% Current number of equations to process: 740
% Current number of ordered equations: 614
% Current number of rules: 60
% New rule produced : [61] n1 multiply add(add(n1,n0),n1) <-> add(n1,n0)
% Current number of equations to process: 740
% Current number of ordered equations: 613
% Current number of rules: 61
% New rule produced : [62] n0 multiply (n1 multiply inverse(add(n1,n0))) <-> n0
% Current number of equations to process: 740
% Current number of ordered equations: 612
% Current number of rules: 62
% New rule produced : [63] add(X,n1) <-> add(n1,X) multiply add(n1,X)
% Current number of equations to process: 740
% Current number of ordered equations: 611
% Current number of rules: 63
% New rule produced : [64] add(X,n0) <-> add(n0,X) multiply add(n1,X)
% Current number of equations to process: 740
% Current number of ordered equations: 610
% Current number of rules: 64
% New rule produced : [65] add(n1,X) multiply add(n1,X) <-> add(X,n1)
% Current number of equations to process: 740
% Current number of ordered equations: 609
% Current number of rules: 65
% New rule produced : [66] add(n1,n0) <-> n1 multiply add(add(n1,n0),n1)
% Current number of equations to process: 740
% Current number of ordered equations: 608
% Current number of rules: 66
% New rule produced : [67] add(n0,X) multiply add(n1,X) <-> add(X,n0)
% Current number of equations to process: 740
% Current number of ordered equations: 607
% Current number of rules: 67
% New rule produced : [68] add(inverse(add(n1,n0)),add(n1,n0)) <-> n1
% Current number of equations to process: 740
% Current number of ordered equations: 606
% Current number of rules: 68
% New rule produced :
% [69] n0 <-> inverse(n0) multiply (inverse(X) multiply add(X,X))
% Current number of equations to process: 1140
% Current number of ordered equations: 1005
% Current number of rules: 69
% New rule produced : [70] n1 <-> n1 multiply (n1 multiply add(n1,add(n1,n0)))
% Current number of equations to process: 1140
% Current number of ordered equations: 1004
% Current number of rules: 70
% New rule produced :
% [71] n1 <-> n1 multiply add(inverse(n0),inverse(add(n1,n0)))
% Current number of equations to process: 1140
% Current number of ordered equations: 1003
% Current number of rules: 71
% New rule produced :
% [72] add(Y,Z) multiply X <-> add(X multiply Y,X multiply Z)
% Current number of equations to process: 1140
% Current number of ordered equations: 1002
% Current number of rules: 72
% New rule produced : [73] n1 multiply (n1 multiply add(n1,add(n1,n0))) <-> n1
% Current number of equations to process: 1140
% Current number of ordered equations: 1001
% Current number of rules: 73
% New rule produced :
% [74] n1 multiply add(inverse(n0),inverse(add(n1,n0))) <-> n1
% Current number of equations to process: 1140
% Current number of ordered equations: 1000
% Current number of rules: 74
% New rule produced : [75] add(Y,X) multiply add(Z,X) <-> add(X,Y multiply Z)
% Current number of equations to process: 1140
% Current number of ordered equations: 999
% Current number of rules: 75
% New rule produced : [76] add(inverse(Y),X) multiply add(Y,X) <-> add(X,n0)
% Current number of equations to process: 1140
% Current number of ordered equations: 998
% Current number of rules: 76
% New rule produced : [77] add(X,Y multiply Z) <-> add(Y,X) multiply add(Z,X)
% Current number of equations to process: 1140
% Current number of ordered equations: 997
% Current number of rules: 77
% New rule produced : [78] add(X,n0) <-> add(inverse(Y),X) multiply add(Y,X)
% Current number of equations to process: 1140
% Current number of ordered equations: 996
% Current number of rules: 78
% New rule produced :
% [79] add(n1,n0) <-> (n1 multiply inverse(n0)) multiply add(n1,n0)
% Current number of equations to process: 1140
% Current number of ordered equations: 995
% Current number of rules: 79
% New rule produced :
% [80] add(X multiply Y,X multiply Z) <-> add(Y,Z) multiply X
% Current number of equations to process: 1140
% Current number of ordered equations: 994
% Current number of rules: 80
% New rule produced :
% [81] inverse(n0) multiply (inverse(X) multiply add(X,X)) <-> n0
% Current number of equations to process: 1140
% Current number of ordered equations: 993
% Current number of rules: 81
% New rule produced :
% [82] (n1 multiply inverse(n0)) multiply add(n1,n0) <-> add(n1,n0)
% Current number of equations to process: 1140
% Current number of ordered equations: 992
% Current number of rules: 82
% New rule produced :
% [83] n1 multiply add(add(X,n0),inverse(n1)) <-> add(inverse(n1),X)
% Current number of equations to process: 1888
% Current number of ordered equations: 1425
% Current number of rules: 83
% New rule produced :
% [84] add(inverse(n1),X) <-> n1 multiply add(add(X,n0),inverse(n1))
% Current number of equations to process: 1888
% Current number of ordered equations: 1424
% Current number of rules: 84
% New rule produced :
% [85]
% n0 <-> (n1 multiply inverse(inverse(X))) multiply (n1 multiply inverse(X))
% Current number of equations to process: 1900
% Current number of ordered equations: 1653
% Current number of rules: 85
% New rule produced :
% [86] n0 <-> inverse((n1 multiply add(X,n1)) multiply X) multiply X
% Current number of equations to process: 1900
% Current number of ordered equations: 1652
% Current number of rules: 86
% New rule produced :
% [87] n0 <-> inverse(X multiply Y) multiply (add(X,X) multiply Y)
% Current number of equations to process: 1900
% Current number of ordered equations: 1651
% Current number of rules: 87
% New rule produced :
% [88] n1 <-> n1 multiply add(n1 multiply inverse(inverse(n1)),inverse(n1))
% Current number of equations to process: 1900
% Current number of ordered equations: 1650
% Current number of rules: 88
% New rule produced : [89] n1 <-> add(add(add(n1,n0),n0),inverse(add(n1,n0)))
% Current number of equations to process: 1900
% Current number of ordered equations: 1649
% Current number of rules: 89
% New rule produced :
% [90] n1 multiply X <-> n1 multiply (add(X,X) multiply add(X,X))
% Current number of equations to process: 1900
% Current number of ordered equations: 1648
% Current number of rules: 90
% New rule produced :
% [91] n1 multiply (add(X,X) multiply add(X,X)) <-> n1 multiply X
% Current number of equations to process: 1900
% Current number of ordered equations: 1647
% Current number of rules: 91
% New rule produced :
% [92] n1 multiply add(inverse(inverse(add(n1,n0))),n1) <-> add(n1,n0)
% Current number of equations to process: 1900
% Current number of ordered equations: 1646
% Current number of rules: 92
% New rule produced :
% [93] n1 multiply add(n1 multiply inverse(inverse(n1)),inverse(n1)) <-> n1
% Current number of equations to process: 1900
% Current number of ordered equations: 1645
% Current number of rules: 93
% New rule produced : [94] add(X,Y) <-> add(n1,X) multiply add(add(Y,n0),X)
% Current number of equations to process: 1900
% Current number of ordered equations: 1644
% Current number of rules: 94
% New rule produced : [95] add(X,n0) <-> add(n0,X) multiply add(add(n1,n0),X)
% Current number of equations to process: 1900
% Current number of ordered equations: 1643
% Current number of rules: 95
% New rule produced : [96] add(n1,X) multiply add(add(Y,n0),X) <-> add(X,Y)
% Current number of equations to process: 1900
% Current number of ordered equations: 1642
% Current number of rules: 96
% New rule produced : [97] add(n1,X) <-> add(n1,n0) multiply add(n1,add(X,n0))
% Current number of equations to process: 1900
% Current number of ordered equations: 1641
% Current number of rules: 97
% New rule produced :
% [98] add(n1,n0) <-> n1 multiply add(inverse(inverse(add(n1,n0))),n1)
% Current number of equations to process: 1900
% Current number of ordered equations: 1640
% Current number of rules: 98
% New rule produced : [99] add(n1,n0) multiply add(n1,add(X,n0)) <-> add(n1,X)
% Current number of equations to process: 1900
% Current number of ordered equations: 1639
% Current number of rules: 99
% New rule produced : [100] add(n0,X) multiply add(add(n1,n0),X) <-> add(X,n0)
% Current number of equations to process: 1900
% Current number of ordered equations: 1638
% Current number of rules: 100
% New rule produced :
% [101]
% (n1 multiply inverse(inverse(X))) multiply (n1 multiply inverse(X)) <-> n0
% Current number of equations to process: 1900
% Current number of ordered equations: 1637
% Current number of rules: 101
% New rule produced :
% [102] inverse((n1 multiply add(X,n1)) multiply X) multiply X <-> n0
% Current number of equations to process: 1900
% Current number of ordered equations: 1636
% Current number of rules: 102
% New rule produced :
% [103] inverse(X multiply Y) multiply (add(X,X) multiply Y) <-> n0
% Current number of equations to process: 1900
% Current number of ordered equations: 1635
% Current number of rules: 103
% New rule produced : [104] add(add(add(n1,n0),n0),inverse(add(n1,n0))) <-> n1
% Current number of equations to process: 1900
% Current number of ordered equations: 1634
% Current number of rules: 104
% New rule produced :
% [105]
% n1 multiply inverse(X) <->
% (n1 multiply inverse(X)) multiply (n1 multiply inverse(X))
% Current number of equations to process: 3320
% Current number of ordered equations: 2245
% Current number of rules: 105
% New rule produced :
% [106] n1 multiply add(add(X,n0),inverse(n1)) <-> add(inverse(n1),add(X,X))
% Current number of equations to process: 3320
% Current number of ordered equations: 2243
% Current number of rules: 106
% New rule produced :
% [107] n1 multiply add(n1,inverse(add(X,n0))) <-> add(inverse(add(X,n0)),X)
% Current number of equations to process: 3320
% Current number of ordered equations: 2242
% Current number of rules: 107
% New rule produced :
% [108]
% n1 multiply inverse(add(n1,n0)) <-> n1 multiply add(n0,inverse(add(n1,n0)))
% Current number of equations to process: 3320
% Current number of ordered equations: 2241
% Current number of rules: 108
% New rule produced :
% [109]
% n1 multiply add(n0,inverse(add(n1,n0))) <-> n1 multiply inverse(add(n1,n0))
% Current number of equations to process: 3320
% Current number of ordered equations: 2240
% Current number of rules: 109
% New rule produced :
% [110] add(n1,inverse(add(X,n0))) <-> add(n0,add(inverse(add(X,n0)),X))
% Current number of equations to process: 3320
% Current number of ordered equations: 2239
% Current number of rules: 110
% New rule produced :
% [111] add(n0,add(inverse(add(X,n0)),X)) <-> add(n1,inverse(add(X,n0)))
% Current number of equations to process: 3320
% Current number of ordered equations: 2238
% Current number of rules: 111
% New rule produced :
% [112] add(inverse(n1),add(X,X)) <-> n1 multiply add(add(X,n0),inverse(n1))
% Current number of equations to process: 3320
% Current number of ordered equations: 2236
% Current number of rules: 112
% New rule produced :
% [113] add(inverse(add(X,n0)),X) <-> n1 multiply add(n1,inverse(add(X,n0)))
% Current number of equations to process: 3320
% Current number of ordered equations: 2235
% Current number of rules: 113
% New rule produced :
% [114]
% (n1 multiply inverse(X)) multiply (n1 multiply inverse(X)) <->
% n1 multiply inverse(X)
% Current number of equations to process: 3320
% Current number of ordered equations: 2234
% Current number of rules: 114
% New rule produced :
% [115]
% n0 <-> n1 multiply (inverse(n0) multiply (inverse(X) multiply add(X,X)))
% Current number of equations to process: 3936
% Current number of ordered equations: 2523
% Current number of rules: 115
% New rule produced :
% [116] n1 <-> add(add(n1 multiply inverse(n0),n0),inverse(add(n1,n0)))
% Current number of equations to process: 3936
% Current number of ordered equations: 2522
% Current number of rules: 116
% New rule produced :
% [117] n1 multiply add(X,X) <-> n1 multiply (add(X,X) multiply add(X,X))
% Current number of equations to process: 3936
% Current number of ordered equations: 2521
% Current number of rules: 117
% New rule produced :
% [118] n1 multiply (add(X,X) multiply add(X,X)) <-> n1 multiply add(X,X)
% Current number of equations to process: 3936
% Current number of ordered equations: 2520
% Current number of rules: 118
% New rule produced :
% [119]
% n1 multiply (inverse(n0) multiply (inverse(X) multiply add(X,X))) <-> n0
% Current number of equations to process: 3936
% Current number of ordered equations: 2519
% Current number of rules: 119
% New rule produced :
% [120] add(X,n0) <-> add(n1,X) multiply add(add(n0,inverse(n1)),X)
% Current number of equations to process: 3936
% Current number of ordered equations: 2518
% Current number of rules: 120
% New rule produced :
% [121] add(X,add(Y,Y)) <-> add(n1,X) multiply add(add(Y,n0),X)
% Current number of equations to process: 3936
% Current number of ordered equations: 2517
% Current number of rules: 121
% New rule produced :
% [122]
% add(X,inverse(inverse(X))) <->
% (n1 multiply inverse(inverse(X))) multiply add(n1,n0)
% Current number of equations to process: 3936
% Current number of ordered equations: 2516
% Current number of rules: 122
% New rule produced :
% [123] add(n1,X) multiply add(add(Y,n0),X) <-> add(X,add(Y,Y))
% Current number of equations to process: 3936
% Current number of ordered equations: 2515
% Current number of rules: 123
% New rule produced :
% [124] add(n1,X) multiply add(add(n0,inverse(n1)),X) <-> add(X,n0)
% Current number of equations to process: 3936
% Current number of ordered equations: 2514
% Current number of rules: 124
% New rule produced :
% [125]
% (n1 multiply inverse(inverse(X))) multiply add(n1,n0) <->
% add(X,inverse(inverse(X)))
% Current number of equations to process: 3936
% Current number of ordered equations: 2513
% Current number of rules: 125
% New rule produced :
% [126] add(add(n1 multiply inverse(n0),n0),inverse(add(n1,n0))) <-> n1
% Current number of equations to process: 3936
% Current number of ordered equations: 2512
% Current number of rules: 126
% New rule produced :
% [127]
% n1 multiply add(n1,inverse(add(X,n0))) <-> add(inverse(add(X,n0)),add(X,X))
% Current number of equations to process: 4746
% Current number of ordered equations: 3005
% Current number of rules: 127
% New rule produced :
% [128]
% n1 multiply inverse(add(n1,n0)) <->
% n1 multiply add(inverse(n1),inverse(add(n1,n0)))
% Current number of equations to process: 4746
% Current number of ordered equations: 3004
% Current number of rules: 128
% New rule produced :
% [129]
% n1 multiply add(inverse(n1),inverse(add(n1,n0))) <->
% n1 multiply inverse(add(n1,n0))
% Current number of equations to process: 4746
% Current number of ordered equations: 3003
% Current number of rules: 129
% New rule produced :
% [130]
% n1 multiply add(add(inverse(n0),n1),inverse(n1)) <->
% add(inverse(n1),add(n1,n0))
% Current number of equations to process: 4746
% Current number of ordered equations: 3002
% Current number of rules: 130
% New rule produced :
% [131] n1 multiply add(n1 multiply add(X,n1),inverse(X)) <-> add(inverse(X),X)
% Current number of equations to process: 4746
% Current number of ordered equations: 3001
% Current number of rules: 131
% New rule produced :
% [132] add(inverse(X),X) <-> n1 multiply add(n1 multiply add(X,n1),inverse(X))
% Current number of equations to process: 4746
% Current number of ordered equations: 3000
% Current number of rules: 132
% New rule produced :
% [133]
% add(n0,add(inverse(add(n1,n0)),X)) <-> add(add(X,n0),inverse(add(n1,n0)))
% Current number of equations to process: 4746
% Current number of ordered equations: 2999
% Current number of rules: 133
% New rule produced :
% [134]
% add(add(X,n0),inverse(add(n1,n0))) <-> add(n0,add(inverse(add(n1,n0)),X))
% Current number of equations to process: 4746
% Current number of ordered equations: 2998
% Current number of rules: 134
% New rule produced :
% [135]
% add(inverse(n1),add(n1,n0)) <->
% n1 multiply add(add(inverse(n0),n1),inverse(n1))
% Current number of equations to process: 4746
% Current number of ordered equations: 2997
% Current number of rules: 135
% New rule produced :
% [136]
% add(inverse(add(X,n0)),add(X,X)) <-> n1 multiply add(n1,inverse(add(X,n0)))
% Current number of equations to process: 4746
% Current number of ordered equations: 2996
% Current number of rules: 136
% New rule produced :
% [137]
% add(inverse(add(n1,n0)),add(X,n0)) <-> add(inverse(add(n1,n0)),add(n0,X))
% Current number of equations to process: 4746
% Current number of ordered equations: 2995
% Current number of rules: 137
% New rule produced :
% [138]
% add(inverse(add(n1,n0)),add(n0,X)) <-> add(inverse(add(n1,n0)),add(X,n0))
% Current number of equations to process: 4746
% Current number of ordered equations: 2994
% Current number of rules: 138
% New rule produced :
% [139] X <-> add(inverse(add(n1,n0)),X) multiply add(add(X,n0),X)
% Current number of equations to process: 3777
% Current number of ordered equations: 3373
% Current number of rules: 139
% New rule produced :
% [140]
% n0 <-> n1 multiply (inverse(X multiply Y) multiply (add(X,X) multiply Y))
% Current number of equations to process: 3777
% Current number of ordered equations: 3372
% Current number of rules: 140
% New rule produced :
% [141]
% n0 <->
% inverse(n0) multiply (inverse(n0) multiply (inverse(X) multiply add(X,X)))
% Current number of equations to process: 3777
% Current number of ordered equations: 3371
% Current number of rules: 141
% New rule produced :
% [142]
% n1 <-> n1 multiply add(inverse(inverse(add(n1,n0))),inverse(add(n1,n0)))
% Current number of equations to process: 3777
% Current number of ordered equations: 3370
% Current number of rules: 142
% New rule produced :
% [143]
% n1 <-> add(n1 multiply inverse(inverse(add(n1,n0))),inverse(add(n1,n0)))
% Current number of equations to process: 3777
% Current number of ordered equations: 3369
% Current number of rules: 143
% New rule produced :
% [144]
% n1 multiply add(inverse(inverse(add(n1,n0))),inverse(add(n1,n0))) <-> n1
% Current number of equations to process: 3777
% Current number of ordered equations: 3368
% Current number of rules: 144
% New rule produced :
% [145]
% n1 multiply (inverse(X multiply Y) multiply (add(X,X) multiply Y)) <-> n0
% Current number of equations to process: 3777
% Current number of ordered equations: 3367
% Current number of rules: 145
% New rule produced :
% [146] add(X,Y) <-> add(add(n1,n0),X) multiply add(add(Y,n0),X)
% Current number of equations to process: 3777
% Current number of ordered equations: 3366
% Current number of rules: 146
% New rule produced :
% [147] add(n1,X) multiply add(Y,n0) <-> add(add(Y,n0),Y) multiply add(X,Y)
% Current number of equations to process: 3777
% Current number of ordered equations: 3365
% Current number of rules: 147
% New rule produced :
% [148]
% inverse(n0) multiply (inverse(n0) multiply (inverse(X) multiply add(X,X)))
% <-> n0
% Current number of equations to process: 3777
% Current number of ordered equations: 3364
% Current number of rules: 148
% New rule produced :
% [149] add(add(Y,n0),Y) multiply add(X,Y) <-> add(n1,X) multiply add(Y,n0)
% Current number of equations to process: 3777
% Current number of ordered equations: 3363
% Current number of rules: 149
% New rule produced :
% [150]
% add(n1 multiply inverse(inverse(add(n1,n0))),inverse(add(n1,n0))) <-> n1
% Current number of equations to process: 3777
% Current number of ordered equations: 3362
% Current number of rules: 150
% New rule produced :
% [151] add(inverse(add(n1,n0)),X) multiply add(add(X,n0),X) <-> X
% Current number of equations to process: 3777
% Current number of ordered equations: 3361
% Current number of rules: 151
% New rule produced :
% [152] add(add(n1,n0),X) multiply add(add(Y,n0),X) <-> add(X,Y)
% Current number of equations to process: 3777
% Current number of ordered equations: 3360
% Current number of rules: 152
% New rule produced :
% [153]
% n1 multiply inverse(n1) <->
% n1 multiply add(inverse(X) multiply add(X,X),inverse(n1))
% Current number of equations to process: 2950
% Current number of ordered equations: 4309
% Current number of rules: 153
% New rule produced :
% [154]
% n1 multiply add(inverse(X) multiply add(X,X),inverse(n1)) <->
% n1 multiply inverse(n1)
% Current number of equations to process: 2950
% Current number of ordered equations: 4308
% Current number of rules: 154
% New rule produced :
% [155]
% n1 multiply add(add(X,n0),inverse(add(n1,n0))) <-> add(inverse(add(n1,n0)),X)
% Current number of equations to process: 2950
% Current number of ordered equations: 4307
% Current number of rules: 155
% New rule produced :
% [156]
% n1 multiply add(add(add(n1,n0),n1),inverse(n1)) <->
% add(inverse(n1),add(n1,n0))
% Current number of equations to process: 2950
% Current number of ordered equations: 4306
% Current number of rules: 156
% New rule produced :
% [157]
% add(inverse(n1),add(n1,n0)) <->
% n1 multiply add(add(add(n1,n0),n1),inverse(n1))
% Current number of equations to process: 2950
% Current number of ordered equations: 4305
% Current number of rules: 157
% New rule produced :
% [158]
% add(inverse(add(n1,n0)),X) <-> n1 multiply add(add(X,n0),inverse(add(n1,n0)))
% Current number of equations to process: 2950
% Current number of ordered equations: 4304
% Current number of rules: 158
% New rule produced :
% [159]
% X <-> add(inverse(Y) multiply X,add(X multiply Y,inverse(Y) multiply Y))
% Current number of equations to process: 3438
% Current number of ordered equations: 4811
% Current number of rules: 159
% New rule produced :
% [160]
% X <-> add(inverse(Y) multiply X,add(X multiply X,inverse(Y) multiply X))
% Current number of equations to process: 3438
% Current number of ordered equations: 4810
% Current number of rules: 160
% New rule produced :
% [161] X <-> (add(inverse(Y),Y) multiply add(X,Y)) multiply add(X,inverse(Y))
% Current number of equations to process: 3438
% Current number of ordered equations: 4809
% Current number of rules: 161
% New rule produced :
% [162] X <-> (add(inverse(Y),X) multiply add(X,X)) multiply add(X,inverse(Y))
% Current number of equations to process: 3438
% Current number of ordered equations: 4808
% Current number of rules: 162
% New rule produced :
% [163] Y <-> (add(inverse(X),Y) multiply add(X,Y)) multiply add(X,inverse(X))
% Current number of equations to process: 3438
% Current number of ordered equations: 4807
% Current number of rules: 163
% New rule produced :
% [164]
% Y <-> add(inverse(X) multiply X,add(X multiply Y,inverse(X) multiply Y))
% Current number of equations to process: 3438
% Current number of ordered equations: 4806
% Current number of rules: 164
% New rule produced :
% [165]
% n0 <->
% inverse(n0) multiply (inverse(X multiply Y) multiply (add(X,X) multiply Y))
% Current number of equations to process: 3438
% Current number of ordered equations: 4805
% Current number of rules: 165
% New rule produced :
% [166]
% n0 <->
% inverse(n0 multiply X) multiply ((inverse(Y) multiply add(Y,Y)) multiply X)
% Current number of equations to process: 3438
% Current number of ordered equations: 4804
% Current number of rules: 166
% New rule produced :
% [167]
% n1 multiply inverse(inverse(X)) <->
% n1 multiply ((n1 multiply inverse(inverse(X))) multiply add(n1,n0))
% Current number of equations to process: 3438
% Current number of ordered equations: 4803
% Current number of rules: 167
% New rule produced :
% [168]
% n1 multiply add(inverse(inverse(add(n1,n0))),add(n1,n0)) <->
% add(add(n1,n0),n0)
% Current number of equations to process: 3438
% Current number of ordered equations: 4802
% Current number of rules: 168
% New rule produced :
% [169]
% n1 multiply ((n1 multiply inverse(inverse(X))) multiply add(n1,n0)) <->
% n1 multiply inverse(inverse(X))
% Current number of equations to process: 3438
% Current number of ordered equations: 4801
% Current number of rules: 169
% New rule produced :
% [170] add(X,n0) <-> add(n1,X) multiply add(inverse(Y) multiply add(Y,Y),X)
% Current number of equations to process: 3438
% Current number of ordered equations: 4800
% Current number of rules: 170
% New rule produced :
% [171] add(X,add(n1,n0)) <-> add(n1,X) multiply add(add(add(n1,n0),n1),X)
% Current number of equations to process: 3438
% Current number of ordered equations: 4799
% Current number of rules: 171
% New rule produced :
% [172] add(n1,X) multiply add(inverse(Y) multiply add(Y,Y),X) <-> add(X,n0)
% Current number of equations to process: 3438
% Current number of ordered equations: 4798
% Current number of rules: 172
% New rule produced :
% [173] add(n1,X) multiply add(add(add(n1,n0),n1),X) <-> add(X,add(n1,n0))
% Current number of equations to process: 3438
% Current number of ordered equations: 4797
% Current number of rules: 173
% New rule produced :
% [174]
% add(inverse(Y) multiply X,add(X multiply Y,inverse(Y) multiply Y)) <-> X
% Current number of equations to process: 3438
% Current number of ordered equations: 4796
% Current number of rules: 174
% New rule produced :
% [175]
% add(inverse(Y) multiply X,add(X multiply X,inverse(Y) multiply X)) <-> X
% Current number of equations to process: 3438
% Current number of ordered equations: 4795
% Current number of rules: 175
% New rule produced :
% [176]
% inverse(n0) multiply (inverse(Y) multiply add(Y,Y)) <->
% inverse(n0) multiply (inverse(X) multiply add(X,X))
% Current number of equations to process: 3438
% Current number of ordered equations: 4793
% Current number of rules: 176
% New rule produced :
% [177]
% inverse(n0) multiply (inverse(X multiply Y) multiply (add(X,X) multiply Y))
% <-> n0
% Current number of equations to process: 3438
% Current number of ordered equations: 4792
% Current number of rules: 177
% New rule produced :
% [178]
% add(add(n1,n0),n0) <->
% n1 multiply add(inverse(inverse(add(n1,n0))),add(n1,n0))
% Current number of equations to process: 3438
% Current number of ordered equations: 4791
% Current number of rules: 178
% New rule produced :
% [179] (add(inverse(X),Y) multiply add(X,Y)) multiply add(X,inverse(X)) <-> Y
% Current number of equations to process: 3438
% Current number of ordered equations: 4790
% Current number of rules: 179
% New rule produced :
% [180] (add(inverse(Y),Y) multiply add(X,Y)) multiply add(X,inverse(Y)) <-> X
% Current number of equations to process: 3438
% Current number of ordered equations: 4789
% Current number of rules: 180
% New rule produced :
% [181] (add(inverse(Y),X) multiply add(X,X)) multiply add(X,inverse(Y)) <-> X
% Current number of equations to process: 3438
% Current number of ordered equations: 4788
% Current number of rules: 181
% New rule produced :
% [182]
% add(inverse(X) multiply X,add(X multiply Y,inverse(X) multiply Y)) <-> Y
% Current number of equations to process: 3438
% Current number of ordered equations: 4787
% Current number of rules: 182
% New rule produced :
% [183]
% inverse(n0 multiply X) multiply ((inverse(Y) multiply add(Y,Y)) multiply X)
% <-> n0
% Current number of equations to process: 3438
% Current number of ordered equations: 4786
% Current number of rules: 183
% New rule produced :
% [184]
% n1 multiply add(n1,inverse(add(X,n0))) <->
% n1 multiply add(add(n1,n0),inverse(add(X,n0)))
% Current number of equations to process: 2318
% Current number of ordered equations: 6045
% Current number of rules: 184
% New rule produced :
% [185]
% n1 multiply add(add(n1,n0),inverse(add(X,n0))) <->
% n1 multiply add(n1,inverse(add(X,n0)))
% Current number of equations to process: 2318
% Current number of ordered equations: 6044
% Current number of rules: 185
% New rule produced :
% [186]
% n1 multiply add(inverse(X),inverse(n1 multiply inverse(X))) <->
% n1 multiply (n1 multiply add(inverse(X),n1))
% Current number of equations to process: 2318
% Current number of ordered equations: 6043
% Current number of rules: 186
% New rule produced :
% [187]
% n1 multiply (n1 multiply add(inverse(X),n1)) <->
% n1 multiply add(inverse(X),inverse(n1 multiply inverse(X)))
% Current number of equations to process: 2318
% Current number of ordered equations: 6042
% Current number of rules: 187
% New rule produced :
% [188]
% add(inverse(Y),X) multiply add(add(Y,Y),X) <->
% add(n0,X) multiply add(inverse(n0),X)
% Current number of equations to process: 2318
% Current number of ordered equations: 6040
% Current number of rules: 188
% New rule produced :
% [189]
% add(n0,X) multiply add(inverse(n0),X) <->
% add(inverse(Y),X) multiply add(add(Y,Y),X)
% Current number of equations to process: 2318
% Current number of ordered equations: 6038
% Current number of rules: 189
% New rule produced :
% [190]
% n0 <->
% n1 multiply (inverse(n0) multiply (inverse(n0) multiply (inverse(X) multiply 
% add(X,X))))
% Current number of equations to process: 2991
% Current number of ordered equations: 6775
% Current number of rules: 190
% New rule produced :
% [191]
% n0 <->
% inverse((X multiply Y) multiply Z) multiply ((add(X,X) multiply Y) multiply Z)
% Current number of equations to process: 2991
% Current number of ordered equations: 6774
% Current number of rules: 191
% New rule produced :
% [192]
% n1 multiply (inverse(n0) multiply (inverse(n0) multiply (inverse(X) multiply 
% add(X,X)))) <-> n0
% Current number of equations to process: 2991
% Current number of ordered equations: 6773
% Current number of rules: 192
% New rule produced :
% [193]
% n1 multiply add(add(add(X,n0),inverse(n1)),inverse(n1)) <->
% add(inverse(n1),add(inverse(n1),X))
% Current number of equations to process: 2991
% Current number of ordered equations: 6772
% Current number of rules: 193
% New rule produced :
% [194] add(X,add(Y,n0)) <-> add(add(inverse(Z),Y),X) multiply add(add(Z,Y),X)
% Current number of equations to process: 2991
% Current number of ordered equations: 6771
% Current number of rules: 194
% New rule produced :
% [195]
% add(add(X,n0),add(n0,X)) <-> add(n1,add(n1,n0)) muCputime limit exceeded (core dumped)
% 
% EOF
%------------------------------------------------------------------------------