%------------------------------------------------------------------------------
% File     : Twee---2.5.0
% Problem  : BOO015-10 : TPTP v8.2.0. Released v7.5.0.
% Transfm  : none
% Format   : tptp:raw
% Command  : parallel-twee /export/starexec/sandbox/benchmark/theBenchmark.p --tstp --conditional-encoding if --smaller --drop-non-horn --give-up-on-saturation --explain-encoding

% Computer : n014.cluster.edu
% Model    : x86_64 x86_64
% CPU      : Intel(R) Xeon(R) CPU E5-2620 v4 2.10GHz
% Memory   : 8042.1875MB
% OS       : Linux 3.10.0-693.el7.x86_64
% CPULimit : 300s
% WCLimit  : 300s
% DateTime : Mon Jun 24 04:38:25 EDT 2024

% Result   : Unsatisfiable 175.48s 22.42s
% Output   : Proof 177.13s
% Verified : 
% SZS Type : -

% Comments : 
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.12/0.13  % Problem  : BOO015-10 : TPTP v8.2.0. Released v7.5.0.
% 0.12/0.13  % Command  : parallel-twee /export/starexec/sandbox/benchmark/theBenchmark.p --tstp --conditional-encoding if --smaller --drop-non-horn --give-up-on-saturation --explain-encoding
% 0.13/0.34  % Computer : n014.cluster.edu
% 0.13/0.34  % Model    : x86_64 x86_64
% 0.13/0.34  % CPU      : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.13/0.34  % Memory   : 8042.1875MB
% 0.13/0.34  % OS       : Linux 3.10.0-693.el7.x86_64
% 0.13/0.34  % CPULimit : 300
% 0.13/0.34  % WCLimit  : 300
% 0.13/0.34  % DateTime : Tue Jun 18 19:06:09 EDT 2024
% 0.13/0.34  % CPUTime  : 
% 175.48/22.42  Command-line arguments: --set-join --lhs-weight 1 --no-flatten-goal --complete-subsets --goal-heuristic
% 175.48/22.42  
% 175.48/22.42  % SZS status Unsatisfiable
% 175.48/22.42  
% 176.36/22.56  % SZS output start Proof
% 176.36/22.56  Axiom 1 (additive_identity2): sum(X, additive_identity, X) = true.
% 176.36/22.56  Axiom 2 (additive_identity1): sum(additive_identity, X, X) = true.
% 176.36/22.56  Axiom 3 (multiplicative_identity2): product(X, multiplicative_identity, X) = true.
% 176.36/22.56  Axiom 4 (x_times_y): product(x, y, x_times_y) = true.
% 176.36/22.56  Axiom 5 (multiplicative_identity1): product(multiplicative_identity, X, X) = true.
% 176.36/22.56  Axiom 6 (ifeq_axiom): ifeq2(X, X, Y, Z) = Y.
% 176.36/22.56  Axiom 7 (additive_inverse2): sum(X, inverse(X), multiplicative_identity) = true.
% 176.36/22.56  Axiom 8 (additive_inverse1): sum(inverse(X), X, multiplicative_identity) = true.
% 176.36/22.56  Axiom 9 (multiplicative_inverse2): product(X, inverse(X), additive_identity) = true.
% 176.36/22.56  Axiom 10 (multiplicative_inverse1): product(inverse(X), X, additive_identity) = true.
% 176.36/22.56  Axiom 11 (ifeq_axiom_001): ifeq(X, X, Y, Z) = Y.
% 176.36/22.56  Axiom 12 (closure_of_addition): sum(X, Y, add(X, Y)) = true.
% 176.36/22.56  Axiom 13 (x_inverse_plus_y_inverse): sum(inverse(x), inverse(y), x_inverse_plus_y_inverse) = true.
% 176.36/22.56  Axiom 14 (closure_of_multiplication): product(X, Y, multiply(X, Y)) = true.
% 176.36/22.56  Axiom 15 (commutativity_of_addition): ifeq(sum(X, Y, Z), true, sum(Y, X, Z), true) = true.
% 176.36/22.56  Axiom 16 (commutativity_of_multiplication): ifeq(product(X, Y, Z), true, product(Y, X, Z), true) = true.
% 176.36/22.56  Axiom 17 (addition_is_well_defined): ifeq2(sum(X, Y, Z), true, ifeq2(sum(X, Y, W), true, W, Z), Z) = Z.
% 176.36/22.56  Axiom 18 (multiplication_is_well_defined): ifeq2(product(X, Y, Z), true, ifeq2(product(X, Y, W), true, W, Z), Z) = Z.
% 176.36/22.56  Axiom 19 (distributivity2): ifeq(product(X, Y, Z), true, ifeq(product(X, W, V), true, ifeq(sum(V, Z, U), true, ifeq(sum(W, Y, T), true, product(X, T, U), true), true), true), true) = true.
% 176.36/22.56  Axiom 20 (distributivity4): ifeq(product(X, Y, Z), true, ifeq(product(W, Y, V), true, ifeq(sum(V, Z, U), true, ifeq(sum(W, X, T), true, product(T, Y, U), true), true), true), true) = true.
% 176.36/22.56  Axiom 21 (distributivity8): ifeq(product(X, Y, Z), true, ifeq(product(W, V, U), true, ifeq(sum(V, T, Y), true, ifeq(sum(W, T, X), true, sum(U, T, Z), true), true), true), true) = true.
% 176.36/22.56  
% 176.36/22.56  Lemma 22: ifeq2(sum(X, Y, Z), true, add(X, Y), Z) = Z.
% 176.36/22.56  Proof:
% 176.36/22.56    ifeq2(sum(X, Y, Z), true, add(X, Y), Z)
% 176.36/22.56  = { by axiom 6 (ifeq_axiom) R->L }
% 176.36/22.56    ifeq2(sum(X, Y, Z), true, ifeq2(true, true, add(X, Y), Z), Z)
% 176.36/22.56  = { by axiom 12 (closure_of_addition) R->L }
% 176.36/22.56    ifeq2(sum(X, Y, Z), true, ifeq2(sum(X, Y, add(X, Y)), true, add(X, Y), Z), Z)
% 176.36/22.56  = { by axiom 17 (addition_is_well_defined) }
% 176.36/22.56    Z
% 176.36/22.56  
% 176.36/22.56  Lemma 23: add(X, Y) = add(Y, X).
% 176.36/22.56  Proof:
% 176.36/22.56    add(X, Y)
% 176.36/22.56  = { by lemma 22 R->L }
% 176.36/22.56    ifeq2(sum(Y, X, add(X, Y)), true, add(Y, X), add(X, Y))
% 176.36/22.56  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.56    ifeq2(ifeq(true, true, sum(Y, X, add(X, Y)), true), true, add(Y, X), add(X, Y))
% 176.36/22.56  = { by axiom 12 (closure_of_addition) R->L }
% 176.36/22.56    ifeq2(ifeq(sum(X, Y, add(X, Y)), true, sum(Y, X, add(X, Y)), true), true, add(Y, X), add(X, Y))
% 176.36/22.56  = { by axiom 15 (commutativity_of_addition) }
% 176.36/22.56    ifeq2(true, true, add(Y, X), add(X, Y))
% 176.36/22.56  = { by axiom 6 (ifeq_axiom) }
% 176.36/22.56    add(Y, X)
% 176.36/22.56  
% 176.36/22.56  Lemma 24: ifeq2(product(X, Y, Z), true, multiply(X, Y), Z) = Z.
% 176.36/22.56  Proof:
% 176.36/22.56    ifeq2(product(X, Y, Z), true, multiply(X, Y), Z)
% 176.36/22.56  = { by axiom 6 (ifeq_axiom) R->L }
% 176.36/22.56    ifeq2(product(X, Y, Z), true, ifeq2(true, true, multiply(X, Y), Z), Z)
% 176.36/22.56  = { by axiom 14 (closure_of_multiplication) R->L }
% 176.36/22.56    ifeq2(product(X, Y, Z), true, ifeq2(product(X, Y, multiply(X, Y)), true, multiply(X, Y), Z), Z)
% 176.36/22.56  = { by axiom 18 (multiplication_is_well_defined) }
% 176.36/22.56    Z
% 176.36/22.56  
% 176.36/22.56  Lemma 25: multiply(X, Y) = multiply(Y, X).
% 176.36/22.56  Proof:
% 176.36/22.56    multiply(X, Y)
% 176.36/22.56  = { by lemma 24 R->L }
% 176.36/22.56    ifeq2(product(Y, X, multiply(X, Y)), true, multiply(Y, X), multiply(X, Y))
% 176.36/22.56  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.56    ifeq2(ifeq(true, true, product(Y, X, multiply(X, Y)), true), true, multiply(Y, X), multiply(X, Y))
% 176.36/22.56  = { by axiom 14 (closure_of_multiplication) R->L }
% 176.36/22.56    ifeq2(ifeq(product(X, Y, multiply(X, Y)), true, product(Y, X, multiply(X, Y)), true), true, multiply(Y, X), multiply(X, Y))
% 176.36/22.56  = { by axiom 16 (commutativity_of_multiplication) }
% 176.36/22.56    ifeq2(true, true, multiply(Y, X), multiply(X, Y))
% 176.36/22.56  = { by axiom 6 (ifeq_axiom) }
% 176.36/22.56    multiply(Y, X)
% 176.36/22.56  
% 176.36/22.56  Lemma 26: ifeq2(product(X, multiplicative_identity, Y), true, Y, X) = X.
% 176.36/22.56  Proof:
% 176.36/22.56    ifeq2(product(X, multiplicative_identity, Y), true, Y, X)
% 176.36/22.56  = { by axiom 6 (ifeq_axiom) R->L }
% 176.36/22.56    ifeq2(true, true, ifeq2(product(X, multiplicative_identity, Y), true, Y, X), X)
% 176.36/22.56  = { by axiom 3 (multiplicative_identity2) R->L }
% 176.36/22.56    ifeq2(product(X, multiplicative_identity, X), true, ifeq2(product(X, multiplicative_identity, Y), true, Y, X), X)
% 176.36/22.56  = { by axiom 18 (multiplication_is_well_defined) }
% 176.36/22.56    X
% 176.36/22.56  
% 176.36/22.56  Lemma 27: ifeq(product(X, Y, additive_identity), true, ifeq(product(X, Z, W), true, ifeq(sum(Z, Y, V), true, product(X, V, W), true), true), true) = true.
% 176.36/22.56  Proof:
% 176.36/22.56    ifeq(product(X, Y, additive_identity), true, ifeq(product(X, Z, W), true, ifeq(sum(Z, Y, V), true, product(X, V, W), true), true), true)
% 176.36/22.56  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.56    ifeq(product(X, Y, additive_identity), true, ifeq(product(X, Z, W), true, ifeq(true, true, ifeq(sum(Z, Y, V), true, product(X, V, W), true), true), true), true)
% 176.36/22.56  = { by axiom 1 (additive_identity2) R->L }
% 176.36/22.56    ifeq(product(X, Y, additive_identity), true, ifeq(product(X, Z, W), true, ifeq(sum(W, additive_identity, W), true, ifeq(sum(Z, Y, V), true, product(X, V, W), true), true), true), true)
% 176.36/22.56  = { by axiom 19 (distributivity2) }
% 176.36/22.56    true
% 176.36/22.56  
% 176.36/22.56  Lemma 28: ifeq(product(X, inverse(Y), additive_identity), true, ifeq(product(X, Y, Z), true, product(X, multiplicative_identity, Z), true), true) = true.
% 176.36/22.56  Proof:
% 176.36/22.56    ifeq(product(X, inverse(Y), additive_identity), true, ifeq(product(X, Y, Z), true, product(X, multiplicative_identity, Z), true), true)
% 176.36/22.56  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.56    ifeq(product(X, inverse(Y), additive_identity), true, ifeq(product(X, Y, Z), true, ifeq(true, true, product(X, multiplicative_identity, Z), true), true), true)
% 176.36/22.56  = { by axiom 7 (additive_inverse2) R->L }
% 176.36/22.56    ifeq(product(X, inverse(Y), additive_identity), true, ifeq(product(X, Y, Z), true, ifeq(sum(Y, inverse(Y), multiplicative_identity), true, product(X, multiplicative_identity, Z), true), true), true)
% 176.36/22.56  = { by lemma 27 }
% 176.36/22.57    true
% 176.36/22.57  
% 176.36/22.57  Lemma 29: inverse(inverse(X)) = X.
% 176.36/22.57  Proof:
% 176.36/22.57    inverse(inverse(X))
% 176.36/22.57  = { by lemma 26 R->L }
% 176.36/22.57    ifeq2(product(inverse(inverse(X)), multiplicative_identity, X), true, X, inverse(inverse(X)))
% 176.36/22.57  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.57    ifeq2(ifeq(true, true, product(inverse(inverse(X)), multiplicative_identity, X), true), true, X, inverse(inverse(X)))
% 176.36/22.57  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.57    ifeq2(ifeq(true, true, ifeq(true, true, product(inverse(inverse(X)), multiplicative_identity, X), true), true), true, X, inverse(inverse(X)))
% 176.36/22.57  = { by axiom 10 (multiplicative_inverse1) R->L }
% 176.36/22.57    ifeq2(ifeq(product(inverse(inverse(X)), inverse(X), additive_identity), true, ifeq(true, true, product(inverse(inverse(X)), multiplicative_identity, X), true), true), true, X, inverse(inverse(X)))
% 176.36/22.57  = { by axiom 16 (commutativity_of_multiplication) R->L }
% 176.36/22.57    ifeq2(ifeq(product(inverse(inverse(X)), inverse(X), additive_identity), true, ifeq(ifeq(product(X, inverse(inverse(X)), X), true, product(inverse(inverse(X)), X, X), true), true, product(inverse(inverse(X)), multiplicative_identity, X), true), true), true, X, inverse(inverse(X)))
% 176.36/22.57  = { by lemma 26 R->L }
% 176.36/22.57    ifeq2(ifeq(product(inverse(inverse(X)), inverse(X), additive_identity), true, ifeq(ifeq(product(X, inverse(inverse(X)), ifeq2(product(X, multiplicative_identity, multiply(X, inverse(inverse(X)))), true, multiply(X, inverse(inverse(X))), X)), true, product(inverse(inverse(X)), X, X), true), true, product(inverse(inverse(X)), multiplicative_identity, X), true), true), true, X, inverse(inverse(X)))
% 176.36/22.57  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.57    ifeq2(ifeq(product(inverse(inverse(X)), inverse(X), additive_identity), true, ifeq(ifeq(product(X, inverse(inverse(X)), ifeq2(ifeq(true, true, product(X, multiplicative_identity, multiply(X, inverse(inverse(X)))), true), true, multiply(X, inverse(inverse(X))), X)), true, product(inverse(inverse(X)), X, X), true), true, product(inverse(inverse(X)), multiplicative_identity, X), true), true), true, X, inverse(inverse(X)))
% 176.36/22.57  = { by axiom 14 (closure_of_multiplication) R->L }
% 176.36/22.57    ifeq2(ifeq(product(inverse(inverse(X)), inverse(X), additive_identity), true, ifeq(ifeq(product(X, inverse(inverse(X)), ifeq2(ifeq(product(X, inverse(inverse(X)), multiply(X, inverse(inverse(X)))), true, product(X, multiplicative_identity, multiply(X, inverse(inverse(X)))), true), true, multiply(X, inverse(inverse(X))), X)), true, product(inverse(inverse(X)), X, X), true), true, product(inverse(inverse(X)), multiplicative_identity, X), true), true), true, X, inverse(inverse(X)))
% 176.36/22.57  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.57    ifeq2(ifeq(product(inverse(inverse(X)), inverse(X), additive_identity), true, ifeq(ifeq(product(X, inverse(inverse(X)), ifeq2(ifeq(true, true, ifeq(product(X, inverse(inverse(X)), multiply(X, inverse(inverse(X)))), true, product(X, multiplicative_identity, multiply(X, inverse(inverse(X)))), true), true), true, multiply(X, inverse(inverse(X))), X)), true, product(inverse(inverse(X)), X, X), true), true, product(inverse(inverse(X)), multiplicative_identity, X), true), true), true, X, inverse(inverse(X)))
% 176.36/22.57  = { by axiom 9 (multiplicative_inverse2) R->L }
% 176.36/22.57    ifeq2(ifeq(product(inverse(inverse(X)), inverse(X), additive_identity), true, ifeq(ifeq(product(X, inverse(inverse(X)), ifeq2(ifeq(product(X, inverse(X), additive_identity), true, ifeq(product(X, inverse(inverse(X)), multiply(X, inverse(inverse(X)))), true, product(X, multiplicative_identity, multiply(X, inverse(inverse(X)))), true), true), true, multiply(X, inverse(inverse(X))), X)), true, product(inverse(inverse(X)), X, X), true), true, product(inverse(inverse(X)), multiplicative_identity, X), true), true), true, X, inverse(inverse(X)))
% 176.36/22.57  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.57    ifeq2(ifeq(product(inverse(inverse(X)), inverse(X), additive_identity), true, ifeq(ifeq(product(X, inverse(inverse(X)), ifeq2(ifeq(product(X, inverse(X), additive_identity), true, ifeq(product(X, inverse(inverse(X)), multiply(X, inverse(inverse(X)))), true, ifeq(true, true, product(X, multiplicative_identity, multiply(X, inverse(inverse(X)))), true), true), true), true, multiply(X, inverse(inverse(X))), X)), true, product(inverse(inverse(X)), X, X), true), true, product(inverse(inverse(X)), multiplicative_identity, X), true), true), true, X, inverse(inverse(X)))
% 176.36/22.57  = { by axiom 8 (additive_inverse1) R->L }
% 176.36/22.57    ifeq2(ifeq(product(inverse(inverse(X)), inverse(X), additive_identity), true, ifeq(ifeq(product(X, inverse(inverse(X)), ifeq2(ifeq(product(X, inverse(X), additive_identity), true, ifeq(product(X, inverse(inverse(X)), multiply(X, inverse(inverse(X)))), true, ifeq(sum(inverse(inverse(X)), inverse(X), multiplicative_identity), true, product(X, multiplicative_identity, multiply(X, inverse(inverse(X)))), true), true), true), true, multiply(X, inverse(inverse(X))), X)), true, product(inverse(inverse(X)), X, X), true), true, product(inverse(inverse(X)), multiplicative_identity, X), true), true), true, X, inverse(inverse(X)))
% 176.36/22.57  = { by lemma 27 }
% 176.36/22.57    ifeq2(ifeq(product(inverse(inverse(X)), inverse(X), additive_identity), true, ifeq(ifeq(product(X, inverse(inverse(X)), ifeq2(true, true, multiply(X, inverse(inverse(X))), X)), true, product(inverse(inverse(X)), X, X), true), true, product(inverse(inverse(X)), multiplicative_identity, X), true), true), true, X, inverse(inverse(X)))
% 176.36/22.57  = { by axiom 6 (ifeq_axiom) }
% 176.36/22.57    ifeq2(ifeq(product(inverse(inverse(X)), inverse(X), additive_identity), true, ifeq(ifeq(product(X, inverse(inverse(X)), multiply(X, inverse(inverse(X)))), true, product(inverse(inverse(X)), X, X), true), true, product(inverse(inverse(X)), multiplicative_identity, X), true), true), true, X, inverse(inverse(X)))
% 176.36/22.57  = { by axiom 14 (closure_of_multiplication) }
% 176.36/22.57    ifeq2(ifeq(product(inverse(inverse(X)), inverse(X), additive_identity), true, ifeq(ifeq(true, true, product(inverse(inverse(X)), X, X), true), true, product(inverse(inverse(X)), multiplicative_identity, X), true), true), true, X, inverse(inverse(X)))
% 176.36/22.57  = { by axiom 11 (ifeq_axiom_001) }
% 176.36/22.57    ifeq2(ifeq(product(inverse(inverse(X)), inverse(X), additive_identity), true, ifeq(product(inverse(inverse(X)), X, X), true, product(inverse(inverse(X)), multiplicative_identity, X), true), true), true, X, inverse(inverse(X)))
% 176.36/22.57  = { by lemma 28 }
% 176.36/22.57    ifeq2(true, true, X, inverse(inverse(X)))
% 176.36/22.57  = { by axiom 6 (ifeq_axiom) }
% 176.36/22.57    X
% 176.36/22.57  
% 176.36/22.57  Lemma 30: ifeq2(sum(X, inverse(X), Y), true, multiplicative_identity, Y) = Y.
% 176.36/22.57  Proof:
% 176.36/22.57    ifeq2(sum(X, inverse(X), Y), true, multiplicative_identity, Y)
% 176.36/22.57  = { by axiom 6 (ifeq_axiom) R->L }
% 176.36/22.57    ifeq2(sum(X, inverse(X), Y), true, ifeq2(true, true, multiplicative_identity, Y), Y)
% 176.36/22.57  = { by axiom 7 (additive_inverse2) R->L }
% 176.36/22.57    ifeq2(sum(X, inverse(X), Y), true, ifeq2(sum(X, inverse(X), multiplicative_identity), true, multiplicative_identity, Y), Y)
% 176.36/22.57  = { by axiom 17 (addition_is_well_defined) }
% 176.36/22.57    Y
% 176.36/22.57  
% 176.36/22.57  Lemma 31: add(X, inverse(X)) = multiplicative_identity.
% 176.36/22.57  Proof:
% 176.36/22.57    add(X, inverse(X))
% 176.36/22.57  = { by lemma 30 R->L }
% 176.36/22.57    ifeq2(sum(X, inverse(X), add(X, inverse(X))), true, multiplicative_identity, add(X, inverse(X)))
% 176.36/22.57  = { by axiom 12 (closure_of_addition) }
% 176.36/22.57    ifeq2(true, true, multiplicative_identity, add(X, inverse(X)))
% 176.36/22.57  = { by axiom 6 (ifeq_axiom) }
% 176.36/22.57    multiplicative_identity
% 176.36/22.57  
% 176.36/22.57  Lemma 32: ifeq2(product(X, inverse(X), Y), true, additive_identity, Y) = Y.
% 176.36/22.57  Proof:
% 176.36/22.57    ifeq2(product(X, inverse(X), Y), true, additive_identity, Y)
% 176.36/22.57  = { by axiom 6 (ifeq_axiom) R->L }
% 176.36/22.57    ifeq2(product(X, inverse(X), Y), true, ifeq2(true, true, additive_identity, Y), Y)
% 176.36/22.57  = { by axiom 9 (multiplicative_inverse2) R->L }
% 176.36/22.57    ifeq2(product(X, inverse(X), Y), true, ifeq2(product(X, inverse(X), additive_identity), true, additive_identity, Y), Y)
% 176.36/22.57  = { by axiom 18 (multiplication_is_well_defined) }
% 176.36/22.57    Y
% 176.36/22.57  
% 176.36/22.57  Lemma 33: multiply(X, inverse(X)) = additive_identity.
% 176.36/22.57  Proof:
% 176.36/22.57    multiply(X, inverse(X))
% 176.36/22.57  = { by lemma 32 R->L }
% 176.36/22.57    ifeq2(product(X, inverse(X), multiply(X, inverse(X))), true, additive_identity, multiply(X, inverse(X)))
% 176.36/22.57  = { by axiom 14 (closure_of_multiplication) }
% 176.36/22.57    ifeq2(true, true, additive_identity, multiply(X, inverse(X)))
% 176.36/22.57  = { by axiom 6 (ifeq_axiom) }
% 176.36/22.57    additive_identity
% 176.36/22.57  
% 176.36/22.57  Lemma 34: ifeq(product(X, Y, Z), true, ifeq(sum(Y, W, multiplicative_identity), true, ifeq(sum(X, W, V), true, sum(Z, W, V), true), true), true) = true.
% 176.36/22.57  Proof:
% 176.36/22.57    ifeq(product(X, Y, Z), true, ifeq(sum(Y, W, multiplicative_identity), true, ifeq(sum(X, W, V), true, sum(Z, W, V), true), true), true)
% 176.36/22.57  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.57    ifeq(true, true, ifeq(product(X, Y, Z), true, ifeq(sum(Y, W, multiplicative_identity), true, ifeq(sum(X, W, V), true, sum(Z, W, V), true), true), true), true)
% 176.36/22.57  = { by axiom 3 (multiplicative_identity2) R->L }
% 176.36/22.57    ifeq(product(V, multiplicative_identity, V), true, ifeq(product(X, Y, Z), true, ifeq(sum(Y, W, multiplicative_identity), true, ifeq(sum(X, W, V), true, sum(Z, W, V), true), true), true), true)
% 176.36/22.57  = { by axiom 21 (distributivity8) }
% 176.36/22.57    true
% 176.36/22.57  
% 176.36/22.57  Lemma 35: product(X, add(Y, inverse(X)), multiply(X, Y)) = true.
% 176.36/22.57  Proof:
% 176.36/22.57    product(X, add(Y, inverse(X)), multiply(X, Y))
% 176.36/22.57  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.57    ifeq(true, true, product(X, add(Y, inverse(X)), multiply(X, Y)), true)
% 176.36/22.57  = { by axiom 14 (closure_of_multiplication) R->L }
% 176.36/22.57    ifeq(product(X, Y, multiply(X, Y)), true, product(X, add(Y, inverse(X)), multiply(X, Y)), true)
% 176.36/22.57  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.57    ifeq(product(X, Y, multiply(X, Y)), true, ifeq(true, true, product(X, add(Y, inverse(X)), multiply(X, Y)), true), true)
% 176.36/22.57  = { by axiom 12 (closure_of_addition) R->L }
% 176.36/22.57    ifeq(product(X, Y, multiply(X, Y)), true, ifeq(sum(Y, inverse(X), add(Y, inverse(X))), true, product(X, add(Y, inverse(X)), multiply(X, Y)), true), true)
% 176.36/22.57  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.57    ifeq(true, true, ifeq(product(X, Y, multiply(X, Y)), true, ifeq(sum(Y, inverse(X), add(Y, inverse(X))), true, product(X, add(Y, inverse(X)), multiply(X, Y)), true), true), true)
% 176.36/22.57  = { by axiom 9 (multiplicative_inverse2) R->L }
% 176.36/22.57    ifeq(product(X, inverse(X), additive_identity), true, ifeq(product(X, Y, multiply(X, Y)), true, ifeq(sum(Y, inverse(X), add(Y, inverse(X))), true, product(X, add(Y, inverse(X)), multiply(X, Y)), true), true), true)
% 176.36/22.57  = { by lemma 27 }
% 176.36/22.57    true
% 176.36/22.57  
% 176.36/22.57  Lemma 36: ifeq2(product(X, Y, Z), true, multiply(Y, X), Z) = Z.
% 176.36/22.57  Proof:
% 176.36/22.57    ifeq2(product(X, Y, Z), true, multiply(Y, X), Z)
% 176.36/22.57  = { by lemma 25 R->L }
% 176.36/22.57    ifeq2(product(X, Y, Z), true, multiply(X, Y), Z)
% 176.36/22.57  = { by lemma 24 }
% 176.36/22.57    Z
% 176.36/22.57  
% 176.36/22.57  Lemma 37: multiply(X, add(Y, inverse(X))) = multiply(X, Y).
% 176.36/22.57  Proof:
% 176.36/22.57    multiply(X, add(Y, inverse(X)))
% 176.36/22.57  = { by lemma 25 R->L }
% 176.36/22.57    multiply(add(Y, inverse(X)), X)
% 176.36/22.57  = { by axiom 6 (ifeq_axiom) R->L }
% 176.36/22.57    ifeq2(true, true, multiply(add(Y, inverse(X)), X), multiply(X, Y))
% 176.36/22.57  = { by lemma 35 R->L }
% 176.36/22.57    ifeq2(product(X, add(Y, inverse(X)), multiply(X, Y)), true, multiply(add(Y, inverse(X)), X), multiply(X, Y))
% 176.36/22.57  = { by lemma 36 }
% 176.36/22.57    multiply(X, Y)
% 176.36/22.57  
% 176.36/22.57  Lemma 38: ifeq(sum(y, X, multiplicative_identity), true, ifeq(sum(x, X, Y), true, sum(x_times_y, X, Y), true), true) = true.
% 176.36/22.57  Proof:
% 176.36/22.57    ifeq(sum(y, X, multiplicative_identity), true, ifeq(sum(x, X, Y), true, sum(x_times_y, X, Y), true), true)
% 176.36/22.57  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.57    ifeq(true, true, ifeq(sum(y, X, multiplicative_identity), true, ifeq(sum(x, X, Y), true, sum(x_times_y, X, Y), true), true), true)
% 176.36/22.57  = { by axiom 4 (x_times_y) R->L }
% 176.36/22.57    ifeq(product(x, y, x_times_y), true, ifeq(sum(y, X, multiplicative_identity), true, ifeq(sum(x, X, Y), true, sum(x_times_y, X, Y), true), true), true)
% 176.36/22.57  = { by lemma 34 }
% 176.36/22.57    true
% 176.36/22.57  
% 176.36/22.57  Lemma 39: ifeq2(sum(X, Y, Z), true, add(Y, X), Z) = Z.
% 176.36/22.57  Proof:
% 176.36/22.57    ifeq2(sum(X, Y, Z), true, add(Y, X), Z)
% 176.36/22.57  = { by lemma 23 R->L }
% 176.36/22.57    ifeq2(sum(X, Y, Z), true, add(X, Y), Z)
% 176.36/22.57  = { by lemma 22 }
% 176.36/22.57    Z
% 176.36/22.57  
% 176.36/22.57  Lemma 40: sum(y, inverse(x_times_y), multiplicative_identity) = true.
% 176.36/22.57  Proof:
% 176.36/22.57    sum(y, inverse(x_times_y), multiplicative_identity)
% 176.36/22.57  = { by axiom 6 (ifeq_axiom) R->L }
% 176.36/22.57    sum(y, inverse(x_times_y), ifeq2(true, true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by lemma 34 R->L }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(product(y, x_times_y, x_times_y), true, ifeq(sum(x_times_y, inverse(x_times_y), multiplicative_identity), true, ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(ifeq(true, true, product(y, x_times_y, x_times_y), true), true, ifeq(sum(x_times_y, inverse(x_times_y), multiplicative_identity), true, ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by axiom 14 (closure_of_multiplication) R->L }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(ifeq(product(x_times_y, y, multiply(x_times_y, y)), true, product(y, x_times_y, x_times_y), true), true, ifeq(sum(x_times_y, inverse(x_times_y), multiplicative_identity), true, ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by lemma 25 R->L }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(ifeq(product(x_times_y, y, multiply(y, x_times_y)), true, product(y, x_times_y, x_times_y), true), true, ifeq(sum(x_times_y, inverse(x_times_y), multiplicative_identity), true, ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by lemma 37 R->L }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(ifeq(product(x_times_y, y, multiply(y, add(x_times_y, inverse(y)))), true, product(y, x_times_y, x_times_y), true), true, ifeq(sum(x_times_y, inverse(x_times_y), multiplicative_identity), true, ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by lemma 23 R->L }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(ifeq(product(x_times_y, y, multiply(y, add(inverse(y), x_times_y))), true, product(y, x_times_y, x_times_y), true), true, ifeq(sum(x_times_y, inverse(x_times_y), multiplicative_identity), true, ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by axiom 6 (ifeq_axiom) R->L }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(ifeq(product(x_times_y, y, multiply(y, ifeq2(true, true, add(inverse(y), x_times_y), add(x, inverse(y))))), true, product(y, x_times_y, x_times_y), true), true, ifeq(sum(x_times_y, inverse(x_times_y), multiplicative_identity), true, ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by lemma 38 R->L }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(ifeq(product(x_times_y, y, multiply(y, ifeq2(ifeq(sum(y, inverse(y), multiplicative_identity), true, ifeq(sum(x, inverse(y), add(x, inverse(y))), true, sum(x_times_y, inverse(y), add(x, inverse(y))), true), true), true, add(inverse(y), x_times_y), add(x, inverse(y))))), true, product(y, x_times_y, x_times_y), true), true, ifeq(sum(x_times_y, inverse(x_times_y), multiplicative_identity), true, ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by axiom 7 (additive_inverse2) }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(ifeq(product(x_times_y, y, multiply(y, ifeq2(ifeq(true, true, ifeq(sum(x, inverse(y), add(x, inverse(y))), true, sum(x_times_y, inverse(y), add(x, inverse(y))), true), true), true, add(inverse(y), x_times_y), add(x, inverse(y))))), true, product(y, x_times_y, x_times_y), true), true, ifeq(sum(x_times_y, inverse(x_times_y), multiplicative_identity), true, ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by axiom 11 (ifeq_axiom_001) }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(ifeq(product(x_times_y, y, multiply(y, ifeq2(ifeq(sum(x, inverse(y), add(x, inverse(y))), true, sum(x_times_y, inverse(y), add(x, inverse(y))), true), true, add(inverse(y), x_times_y), add(x, inverse(y))))), true, product(y, x_times_y, x_times_y), true), true, ifeq(sum(x_times_y, inverse(x_times_y), multiplicative_identity), true, ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by axiom 12 (closure_of_addition) }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(ifeq(product(x_times_y, y, multiply(y, ifeq2(ifeq(true, true, sum(x_times_y, inverse(y), add(x, inverse(y))), true), true, add(inverse(y), x_times_y), add(x, inverse(y))))), true, product(y, x_times_y, x_times_y), true), true, ifeq(sum(x_times_y, inverse(x_times_y), multiplicative_identity), true, ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by axiom 11 (ifeq_axiom_001) }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(ifeq(product(x_times_y, y, multiply(y, ifeq2(sum(x_times_y, inverse(y), add(x, inverse(y))), true, add(inverse(y), x_times_y), add(x, inverse(y))))), true, product(y, x_times_y, x_times_y), true), true, ifeq(sum(x_times_y, inverse(x_times_y), multiplicative_identity), true, ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by lemma 39 }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(ifeq(product(x_times_y, y, multiply(y, add(x, inverse(y)))), true, product(y, x_times_y, x_times_y), true), true, ifeq(sum(x_times_y, inverse(x_times_y), multiplicative_identity), true, ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by lemma 37 }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(ifeq(product(x_times_y, y, multiply(y, x)), true, product(y, x_times_y, x_times_y), true), true, ifeq(sum(x_times_y, inverse(x_times_y), multiplicative_identity), true, ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by lemma 25 }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(ifeq(product(x_times_y, y, multiply(x, y)), true, product(y, x_times_y, x_times_y), true), true, ifeq(sum(x_times_y, inverse(x_times_y), multiplicative_identity), true, ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by axiom 18 (multiplication_is_well_defined) R->L }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(ifeq(product(x_times_y, y, ifeq2(product(x, y, multiply(x, y)), true, ifeq2(product(x, y, x_times_y), true, x_times_y, multiply(x, y)), multiply(x, y))), true, product(y, x_times_y, x_times_y), true), true, ifeq(sum(x_times_y, inverse(x_times_y), multiplicative_identity), true, ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by axiom 4 (x_times_y) }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(ifeq(product(x_times_y, y, ifeq2(product(x, y, multiply(x, y)), true, ifeq2(true, true, x_times_y, multiply(x, y)), multiply(x, y))), true, product(y, x_times_y, x_times_y), true), true, ifeq(sum(x_times_y, inverse(x_times_y), multiplicative_identity), true, ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by axiom 6 (ifeq_axiom) }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(ifeq(product(x_times_y, y, ifeq2(product(x, y, multiply(x, y)), true, x_times_y, multiply(x, y))), true, product(y, x_times_y, x_times_y), true), true, ifeq(sum(x_times_y, inverse(x_times_y), multiplicative_identity), true, ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by axiom 14 (closure_of_multiplication) }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(ifeq(product(x_times_y, y, ifeq2(true, true, x_times_y, multiply(x, y))), true, product(y, x_times_y, x_times_y), true), true, ifeq(sum(x_times_y, inverse(x_times_y), multiplicative_identity), true, ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by axiom 6 (ifeq_axiom) }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(ifeq(product(x_times_y, y, x_times_y), true, product(y, x_times_y, x_times_y), true), true, ifeq(sum(x_times_y, inverse(x_times_y), multiplicative_identity), true, ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by axiom 16 (commutativity_of_multiplication) }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(true, true, ifeq(sum(x_times_y, inverse(x_times_y), multiplicative_identity), true, ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by axiom 11 (ifeq_axiom_001) }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(sum(x_times_y, inverse(x_times_y), multiplicative_identity), true, ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by axiom 7 (additive_inverse2) }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(true, true, ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by axiom 11 (ifeq_axiom_001) }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(sum(y, inverse(x_times_y), add(y, inverse(x_times_y))), true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by axiom 12 (closure_of_addition) }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(ifeq(true, true, sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by axiom 11 (ifeq_axiom_001) }
% 176.36/22.58    sum(y, inverse(x_times_y), ifeq2(sum(x_times_y, inverse(x_times_y), add(y, inverse(x_times_y))), true, multiplicative_identity, add(y, inverse(x_times_y))))
% 176.36/22.58  = { by lemma 30 }
% 176.36/22.58    sum(y, inverse(x_times_y), add(y, inverse(x_times_y)))
% 176.36/22.58  = { by axiom 12 (closure_of_addition) }
% 176.36/22.58    true
% 176.36/22.58  
% 176.36/22.58  Lemma 41: ifeq(sum(X, Y, Z), true, sum(multiply(X, inverse(Y)), Y, Z), true) = true.
% 176.36/22.58  Proof:
% 176.36/22.58    ifeq(sum(X, Y, Z), true, sum(multiply(X, inverse(Y)), Y, Z), true)
% 176.36/22.58  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.58    ifeq(true, true, ifeq(sum(X, Y, Z), true, sum(multiply(X, inverse(Y)), Y, Z), true), true)
% 176.36/22.58  = { by axiom 14 (closure_of_multiplication) R->L }
% 176.36/22.58    ifeq(product(X, inverse(Y), multiply(X, inverse(Y))), true, ifeq(sum(X, Y, Z), true, sum(multiply(X, inverse(Y)), Y, Z), true), true)
% 176.36/22.58  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.58    ifeq(product(X, inverse(Y), multiply(X, inverse(Y))), true, ifeq(true, true, ifeq(sum(X, Y, Z), true, sum(multiply(X, inverse(Y)), Y, Z), true), true), true)
% 176.36/22.58  = { by axiom 8 (additive_inverse1) R->L }
% 176.36/22.58    ifeq(product(X, inverse(Y), multiply(X, inverse(Y))), true, ifeq(sum(inverse(Y), Y, multiplicative_identity), true, ifeq(sum(X, Y, Z), true, sum(multiply(X, inverse(Y)), Y, Z), true), true), true)
% 176.36/22.58  = { by lemma 34 }
% 176.36/22.58    true
% 176.36/22.58  
% 176.36/22.58  Lemma 42: add(X, multiply(Y, inverse(X))) = add(X, Y).
% 176.36/22.58  Proof:
% 176.36/22.58    add(X, multiply(Y, inverse(X)))
% 176.36/22.58  = { by axiom 6 (ifeq_axiom) R->L }
% 176.36/22.58    ifeq2(true, true, add(X, multiply(Y, inverse(X))), add(Y, X))
% 176.36/22.58  = { by lemma 41 R->L }
% 176.36/22.58    ifeq2(ifeq(sum(Y, X, add(Y, X)), true, sum(multiply(Y, inverse(X)), X, add(Y, X)), true), true, add(X, multiply(Y, inverse(X))), add(Y, X))
% 176.36/22.58  = { by axiom 12 (closure_of_addition) }
% 176.36/22.58    ifeq2(ifeq(true, true, sum(multiply(Y, inverse(X)), X, add(Y, X)), true), true, add(X, multiply(Y, inverse(X))), add(Y, X))
% 176.36/22.58  = { by axiom 11 (ifeq_axiom_001) }
% 176.36/22.58    ifeq2(sum(multiply(Y, inverse(X)), X, add(Y, X)), true, add(X, multiply(Y, inverse(X))), add(Y, X))
% 176.36/22.58  = { by lemma 39 }
% 176.36/22.58    add(Y, X)
% 176.36/22.58  = { by lemma 23 }
% 176.36/22.58    add(X, Y)
% 176.36/22.58  
% 176.36/22.58  Lemma 43: add(inverse(X), multiply(X, Y)) = add(Y, inverse(X)).
% 176.36/22.58  Proof:
% 176.36/22.58    add(inverse(X), multiply(X, Y))
% 176.36/22.58  = { by lemma 25 R->L }
% 176.36/22.58    add(inverse(X), multiply(Y, X))
% 176.36/22.58  = { by lemma 29 R->L }
% 176.36/22.58    add(inverse(X), multiply(Y, inverse(inverse(X))))
% 176.36/22.58  = { by lemma 42 }
% 176.36/22.58    add(inverse(X), Y)
% 176.36/22.58  = { by lemma 23 }
% 176.36/22.58    add(Y, inverse(X))
% 176.36/22.58  
% 176.36/22.58  Lemma 44: sum(inverse(y), inverse(x), x_inverse_plus_y_inverse) = true.
% 176.36/22.58  Proof:
% 176.36/22.58    sum(inverse(y), inverse(x), x_inverse_plus_y_inverse)
% 176.36/22.58  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.58    ifeq(true, true, sum(inverse(y), inverse(x), x_inverse_plus_y_inverse), true)
% 176.36/22.58  = { by axiom 13 (x_inverse_plus_y_inverse) R->L }
% 176.36/22.58    ifeq(sum(inverse(x), inverse(y), x_inverse_plus_y_inverse), true, sum(inverse(y), inverse(x), x_inverse_plus_y_inverse), true)
% 176.36/22.58  = { by axiom 15 (commutativity_of_addition) }
% 176.36/22.58    true
% 176.36/22.58  
% 176.36/22.58  Lemma 45: multiply(inverse(X), add(X, Y)) = multiply(Y, inverse(X)).
% 176.36/22.58  Proof:
% 176.36/22.58    multiply(inverse(X), add(X, Y))
% 176.36/22.59  = { by lemma 23 R->L }
% 176.36/22.59    multiply(inverse(X), add(Y, X))
% 176.36/22.59  = { by lemma 29 R->L }
% 176.36/22.59    multiply(inverse(X), add(Y, inverse(inverse(X))))
% 176.36/22.59  = { by lemma 37 }
% 176.36/22.59    multiply(inverse(X), Y)
% 176.36/22.59  = { by lemma 25 }
% 176.36/22.59    multiply(Y, inverse(X))
% 176.36/22.59  
% 176.36/22.59  Lemma 46: ifeq2(sum(additive_identity, X, Y), true, Y, X) = X.
% 176.36/22.59  Proof:
% 176.36/22.59    ifeq2(sum(additive_identity, X, Y), true, Y, X)
% 176.36/22.59  = { by axiom 6 (ifeq_axiom) R->L }
% 176.36/22.59    ifeq2(true, true, ifeq2(sum(additive_identity, X, Y), true, Y, X), X)
% 176.36/22.59  = { by axiom 2 (additive_identity1) R->L }
% 176.36/22.59    ifeq2(sum(additive_identity, X, X), true, ifeq2(sum(additive_identity, X, Y), true, Y, X), X)
% 176.36/22.59  = { by axiom 17 (addition_is_well_defined) }
% 176.36/22.59    X
% 176.36/22.59  
% 176.36/22.59  Lemma 47: ifeq(sum(y, X, multiplicative_identity), true, sum(x_times_y, X, add(X, x)), true) = true.
% 176.36/22.59  Proof:
% 176.36/22.59    ifeq(sum(y, X, multiplicative_identity), true, sum(x_times_y, X, add(X, x)), true)
% 176.36/22.59  = { by lemma 23 R->L }
% 176.36/22.59    ifeq(sum(y, X, multiplicative_identity), true, sum(x_times_y, X, add(x, X)), true)
% 176.36/22.59  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.59    ifeq(sum(y, X, multiplicative_identity), true, ifeq(true, true, sum(x_times_y, X, add(x, X)), true), true)
% 176.36/22.59  = { by axiom 12 (closure_of_addition) R->L }
% 176.36/22.59    ifeq(sum(y, X, multiplicative_identity), true, ifeq(sum(x, X, add(x, X)), true, sum(x_times_y, X, add(x, X)), true), true)
% 176.36/22.59  = { by lemma 38 }
% 176.36/22.59    true
% 176.36/22.59  
% 176.36/22.59  Lemma 48: ifeq(sum(inverse(X), Y, multiplicative_identity), true, sum(additive_identity, Y, add(X, Y)), true) = true.
% 176.36/22.59  Proof:
% 176.36/22.59    ifeq(sum(inverse(X), Y, multiplicative_identity), true, sum(additive_identity, Y, add(X, Y)), true)
% 176.36/22.59  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.59    ifeq(sum(inverse(X), Y, multiplicative_identity), true, ifeq(true, true, sum(additive_identity, Y, add(X, Y)), true), true)
% 176.36/22.59  = { by axiom 12 (closure_of_addition) R->L }
% 176.36/22.59    ifeq(sum(inverse(X), Y, multiplicative_identity), true, ifeq(sum(X, Y, add(X, Y)), true, sum(additive_identity, Y, add(X, Y)), true), true)
% 176.36/22.59  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.59    ifeq(true, true, ifeq(sum(inverse(X), Y, multiplicative_identity), true, ifeq(sum(X, Y, add(X, Y)), true, sum(additive_identity, Y, add(X, Y)), true), true), true)
% 176.36/22.59  = { by axiom 9 (multiplicative_inverse2) R->L }
% 176.36/22.59    ifeq(product(X, inverse(X), additive_identity), true, ifeq(sum(inverse(X), Y, multiplicative_identity), true, ifeq(sum(X, Y, add(X, Y)), true, sum(additive_identity, Y, add(X, Y)), true), true), true)
% 176.36/22.59  = { by lemma 34 }
% 176.36/22.59    true
% 176.36/22.59  
% 176.36/22.59  Lemma 49: ifeq(product(X, inverse(Y), additive_identity), true, product(X, multiplicative_identity, multiply(X, Y)), true) = true.
% 176.36/22.59  Proof:
% 176.36/22.59    ifeq(product(X, inverse(Y), additive_identity), true, product(X, multiplicative_identity, multiply(X, Y)), true)
% 176.36/22.59  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.59    ifeq(product(X, inverse(Y), additive_identity), true, ifeq(true, true, product(X, multiplicative_identity, multiply(X, Y)), true), true)
% 176.36/22.59  = { by axiom 14 (closure_of_multiplication) R->L }
% 176.36/22.59    ifeq(product(X, inverse(Y), additive_identity), true, ifeq(product(X, Y, multiply(X, Y)), true, product(X, multiplicative_identity, multiply(X, Y)), true), true)
% 176.36/22.59  = { by lemma 28 }
% 176.36/22.59    true
% 176.36/22.59  
% 176.36/22.59  Lemma 50: ifeq(product(X, inverse(y), additive_identity), true, ifeq(product(X, inverse(x), Y), true, product(X, x_inverse_plus_y_inverse, Y), true), true) = true.
% 176.36/22.59  Proof:
% 176.36/22.59    ifeq(product(X, inverse(y), additive_identity), true, ifeq(product(X, inverse(x), Y), true, product(X, x_inverse_plus_y_inverse, Y), true), true)
% 176.36/22.59  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.59    ifeq(product(X, inverse(y), additive_identity), true, ifeq(product(X, inverse(x), Y), true, ifeq(true, true, product(X, x_inverse_plus_y_inverse, Y), true), true), true)
% 176.36/22.59  = { by axiom 13 (x_inverse_plus_y_inverse) R->L }
% 176.36/22.59    ifeq(product(X, inverse(y), additive_identity), true, ifeq(product(X, inverse(x), Y), true, ifeq(sum(inverse(x), inverse(y), x_inverse_plus_y_inverse), true, product(X, x_inverse_plus_y_inverse, Y), true), true), true)
% 176.36/22.59  = { by lemma 27 }
% 176.36/22.59    true
% 176.36/22.59  
% 176.36/22.59  Goal 1 (prove_equation): inverse(x_times_y) = x_inverse_plus_y_inverse.
% 176.36/22.59  Proof:
% 176.36/22.59    inverse(x_times_y)
% 176.36/22.59  = { by lemma 26 R->L }
% 176.36/22.59    ifeq2(product(inverse(x_times_y), multiplicative_identity, multiply(inverse(x_times_y), multiplicative_identity)), true, multiply(inverse(x_times_y), multiplicative_identity), inverse(x_times_y))
% 176.36/22.59  = { by axiom 14 (closure_of_multiplication) }
% 176.36/22.59    ifeq2(true, true, multiply(inverse(x_times_y), multiplicative_identity), inverse(x_times_y))
% 176.36/22.59  = { by axiom 6 (ifeq_axiom) }
% 176.36/22.59    multiply(inverse(x_times_y), multiplicative_identity)
% 176.36/22.59  = { by lemma 31 R->L }
% 176.36/22.59    multiply(inverse(x_times_y), add(x, inverse(x)))
% 176.36/22.59  = { by lemma 26 R->L }
% 176.36/22.59    multiply(inverse(x_times_y), add(x, ifeq2(product(inverse(x), multiplicative_identity, multiply(x_inverse_plus_y_inverse, inverse(x))), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.59  = { by lemma 25 R->L }
% 176.36/22.59    multiply(inverse(x_times_y), add(x, ifeq2(product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(ifeq(true, true, product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by axiom 14 (closure_of_multiplication) R->L }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(ifeq(product(inverse(x), inverse(x_inverse_plus_y_inverse), multiply(inverse(x), inverse(x_inverse_plus_y_inverse))), true, product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by lemma 45 R->L }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(ifeq(product(inverse(x), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), add(x_inverse_plus_y_inverse, inverse(x)))), true, product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by lemma 43 R->L }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(ifeq(product(inverse(x), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), add(inverse(x), multiply(x, x_inverse_plus_y_inverse)))), true, product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by axiom 6 (ifeq_axiom) R->L }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(ifeq(product(inverse(x), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(true, true, add(inverse(x), multiply(x, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by lemma 41 R->L }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(ifeq(product(inverse(x), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(ifeq(sum(inverse(y), inverse(x), x_inverse_plus_y_inverse), true, sum(multiply(inverse(y), inverse(inverse(x))), inverse(x), x_inverse_plus_y_inverse), true), true, add(inverse(x), multiply(x, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by lemma 44 }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(ifeq(product(inverse(x), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(ifeq(true, true, sum(multiply(inverse(y), inverse(inverse(x))), inverse(x), x_inverse_plus_y_inverse), true), true, add(inverse(x), multiply(x, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by axiom 11 (ifeq_axiom_001) }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(ifeq(product(inverse(x), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(multiply(inverse(y), inverse(inverse(x))), inverse(x), x_inverse_plus_y_inverse), true, add(inverse(x), multiply(x, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by lemma 29 }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(ifeq(product(inverse(x), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(multiply(inverse(y), x), inverse(x), x_inverse_plus_y_inverse), true, add(inverse(x), multiply(x, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by lemma 25 }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(ifeq(product(inverse(x), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(multiply(x, inverse(y)), inverse(x), x_inverse_plus_y_inverse), true, add(inverse(x), multiply(x, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by lemma 36 R->L }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(ifeq(product(inverse(x), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(ifeq2(product(x, x_inverse_plus_y_inverse, multiply(x, inverse(y))), true, multiply(x_inverse_plus_y_inverse, x), multiply(x, inverse(y))), inverse(x), x_inverse_plus_y_inverse), true, add(inverse(x), multiply(x, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(ifeq(product(inverse(x), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(ifeq2(ifeq(true, true, product(x, x_inverse_plus_y_inverse, multiply(x, inverse(y))), true), true, multiply(x_inverse_plus_y_inverse, x), multiply(x, inverse(y))), inverse(x), x_inverse_plus_y_inverse), true, add(inverse(x), multiply(x, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by axiom 14 (closure_of_multiplication) R->L }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(ifeq(product(inverse(x), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(ifeq2(ifeq(product(x, inverse(y), multiply(x, inverse(y))), true, product(x, x_inverse_plus_y_inverse, multiply(x, inverse(y))), true), true, multiply(x_inverse_plus_y_inverse, x), multiply(x, inverse(y))), inverse(x), x_inverse_plus_y_inverse), true, add(inverse(x), multiply(x, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(ifeq(product(inverse(x), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(ifeq2(ifeq(true, true, ifeq(product(x, inverse(y), multiply(x, inverse(y))), true, product(x, x_inverse_plus_y_inverse, multiply(x, inverse(y))), true), true), true, multiply(x_inverse_plus_y_inverse, x), multiply(x, inverse(y))), inverse(x), x_inverse_plus_y_inverse), true, add(inverse(x), multiply(x, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by axiom 9 (multiplicative_inverse2) R->L }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(ifeq(product(inverse(x), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(ifeq2(ifeq(product(x, inverse(x), additive_identity), true, ifeq(product(x, inverse(y), multiply(x, inverse(y))), true, product(x, x_inverse_plus_y_inverse, multiply(x, inverse(y))), true), true), true, multiply(x_inverse_plus_y_inverse, x), multiply(x, inverse(y))), inverse(x), x_inverse_plus_y_inverse), true, add(inverse(x), multiply(x, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(ifeq(product(inverse(x), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(ifeq2(ifeq(product(x, inverse(x), additive_identity), true, ifeq(product(x, inverse(y), multiply(x, inverse(y))), true, ifeq(true, true, product(x, x_inverse_plus_y_inverse, multiply(x, inverse(y))), true), true), true), true, multiply(x_inverse_plus_y_inverse, x), multiply(x, inverse(y))), inverse(x), x_inverse_plus_y_inverse), true, add(inverse(x), multiply(x, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by lemma 44 R->L }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(ifeq(product(inverse(x), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(ifeq2(ifeq(product(x, inverse(x), additive_identity), true, ifeq(product(x, inverse(y), multiply(x, inverse(y))), true, ifeq(sum(inverse(y), inverse(x), x_inverse_plus_y_inverse), true, product(x, x_inverse_plus_y_inverse, multiply(x, inverse(y))), true), true), true), true, multiply(x_inverse_plus_y_inverse, x), multiply(x, inverse(y))), inverse(x), x_inverse_plus_y_inverse), true, add(inverse(x), multiply(x, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by lemma 27 }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(ifeq(product(inverse(x), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(ifeq2(true, true, multiply(x_inverse_plus_y_inverse, x), multiply(x, inverse(y))), inverse(x), x_inverse_plus_y_inverse), true, add(inverse(x), multiply(x, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by axiom 6 (ifeq_axiom) }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(ifeq(product(inverse(x), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(multiply(x_inverse_plus_y_inverse, x), inverse(x), x_inverse_plus_y_inverse), true, add(inverse(x), multiply(x, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by lemma 25 }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(ifeq(product(inverse(x), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(multiply(x, x_inverse_plus_y_inverse), inverse(x), x_inverse_plus_y_inverse), true, add(inverse(x), multiply(x, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by lemma 39 }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(ifeq(product(inverse(x), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), x_inverse_plus_y_inverse)), true, product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by lemma 25 }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(ifeq(product(inverse(x), inverse(x_inverse_plus_y_inverse), multiply(x_inverse_plus_y_inverse, inverse(x_inverse_plus_y_inverse))), true, product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by lemma 33 }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(ifeq(product(inverse(x), inverse(x_inverse_plus_y_inverse), additive_identity), true, product(inverse(x), multiplicative_identity, multiply(inverse(x), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by lemma 49 }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, ifeq2(true, true, multiply(x_inverse_plus_y_inverse, inverse(x)), inverse(x))))
% 176.36/22.60  = { by axiom 6 (ifeq_axiom) }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, multiply(x_inverse_plus_y_inverse, inverse(x))))
% 176.36/22.60  = { by lemma 42 }
% 176.36/22.60    multiply(inverse(x_times_y), add(x, x_inverse_plus_y_inverse))
% 176.36/22.60  = { by lemma 39 R->L }
% 176.36/22.60    multiply(inverse(x_times_y), ifeq2(sum(x_times_y, x_inverse_plus_y_inverse, add(x, x_inverse_plus_y_inverse)), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 176.36/22.60  = { by lemma 23 R->L }
% 176.36/22.60    multiply(inverse(x_times_y), ifeq2(sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 176.36/22.60  = { by axiom 11 (ifeq_axiom_001) R->L }
% 176.36/22.60    multiply(inverse(x_times_y), ifeq2(ifeq(true, true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 176.36/22.60  = { by axiom 12 (closure_of_addition) R->L }
% 176.36/22.60    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, x_inverse_plus_y_inverse)), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 176.36/22.60  = { by lemma 42 R->L }
% 176.36/22.60    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, multiply(x_inverse_plus_y_inverse, inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 176.36/22.61  = { by axiom 6 (ifeq_axiom) R->L }
% 176.36/22.61    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(true, true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 176.36/22.61  = { by lemma 49 R->L }
% 176.36/22.61    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(ifeq(product(inverse(y), inverse(x_inverse_plus_y_inverse), additive_identity), true, product(inverse(y), multiplicative_identity, multiply(inverse(y), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 176.36/22.61  = { by lemma 33 R->L }
% 176.36/22.61    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(ifeq(product(inverse(y), inverse(x_inverse_plus_y_inverse), multiply(x_inverse_plus_y_inverse, inverse(x_inverse_plus_y_inverse))), true, product(inverse(y), multiplicative_identity, multiply(inverse(y), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 176.36/22.61  = { by lemma 25 R->L }
% 176.36/22.61    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(ifeq(product(inverse(y), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), x_inverse_plus_y_inverse)), true, product(inverse(y), multiplicative_identity, multiply(inverse(y), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 176.36/22.61  = { by lemma 39 R->L }
% 176.36/22.61    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(ifeq(product(inverse(y), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(multiply(y, x_inverse_plus_y_inverse), inverse(y), x_inverse_plus_y_inverse), true, add(inverse(y), multiply(y, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(y), multiplicative_identity, multiply(inverse(y), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 176.36/22.61  = { by lemma 25 R->L }
% 176.36/22.61    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(ifeq(product(inverse(y), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(multiply(x_inverse_plus_y_inverse, y), inverse(y), x_inverse_plus_y_inverse), true, add(inverse(y), multiply(y, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(y), multiplicative_identity, multiply(inverse(y), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 176.36/22.61  = { by axiom 6 (ifeq_axiom) R->L }
% 176.36/22.61    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(ifeq(product(inverse(y), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(ifeq2(true, true, multiply(x_inverse_plus_y_inverse, y), multiply(y, inverse(x))), inverse(y), x_inverse_plus_y_inverse), true, add(inverse(y), multiply(y, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(y), multiplicative_identity, multiply(inverse(y), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 176.36/22.61  = { by lemma 50 R->L }
% 176.36/22.61    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(ifeq(product(inverse(y), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(ifeq2(ifeq(product(y, inverse(y), additive_identity), true, ifeq(product(y, inverse(x), multiply(y, inverse(x))), true, product(y, x_inverse_plus_y_inverse, multiply(y, inverse(x))), true), true), true, multiply(x_inverse_plus_y_inverse, y), multiply(y, inverse(x))), inverse(y), x_inverse_plus_y_inverse), true, add(inverse(y), multiply(y, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(y), multiplicative_identity, multiply(inverse(y), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 176.36/22.61  = { by axiom 9 (multiplicative_inverse2) }
% 176.36/22.61    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(ifeq(product(inverse(y), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(ifeq2(ifeq(true, true, ifeq(product(y, inverse(x), multiply(y, inverse(x))), true, product(y, x_inverse_plus_y_inverse, multiply(y, inverse(x))), true), true), true, multiply(x_inverse_plus_y_inverse, y), multiply(y, inverse(x))), inverse(y), x_inverse_plus_y_inverse), true, add(inverse(y), multiply(y, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(y), multiplicative_identity, multiply(inverse(y), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 176.36/22.61  = { by axiom 11 (ifeq_axiom_001) }
% 176.36/22.61    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(ifeq(product(inverse(y), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(ifeq2(ifeq(product(y, inverse(x), multiply(y, inverse(x))), true, product(y, x_inverse_plus_y_inverse, multiply(y, inverse(x))), true), true, multiply(x_inverse_plus_y_inverse, y), multiply(y, inverse(x))), inverse(y), x_inverse_plus_y_inverse), true, add(inverse(y), multiply(y, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(y), multiplicative_identity, multiply(inverse(y), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 176.36/22.61  = { by axiom 14 (closure_of_multiplication) }
% 176.36/22.61    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(ifeq(product(inverse(y), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(ifeq2(ifeq(true, true, product(y, x_inverse_plus_y_inverse, multiply(y, inverse(x))), true), true, multiply(x_inverse_plus_y_inverse, y), multiply(y, inverse(x))), inverse(y), x_inverse_plus_y_inverse), true, add(inverse(y), multiply(y, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(y), multiplicative_identity, multiply(inverse(y), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 176.36/22.61  = { by axiom 11 (ifeq_axiom_001) }
% 176.36/22.61    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(ifeq(product(inverse(y), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(ifeq2(product(y, x_inverse_plus_y_inverse, multiply(y, inverse(x))), true, multiply(x_inverse_plus_y_inverse, y), multiply(y, inverse(x))), inverse(y), x_inverse_plus_y_inverse), true, add(inverse(y), multiply(y, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(y), multiplicative_identity, multiply(inverse(y), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 176.36/22.61  = { by lemma 36 }
% 176.36/22.61    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(ifeq(product(inverse(y), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(multiply(y, inverse(x)), inverse(y), x_inverse_plus_y_inverse), true, add(inverse(y), multiply(y, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(y), multiplicative_identity, multiply(inverse(y), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 177.13/22.61  = { by lemma 25 R->L }
% 177.13/22.61    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(ifeq(product(inverse(y), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(multiply(inverse(x), y), inverse(y), x_inverse_plus_y_inverse), true, add(inverse(y), multiply(y, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(y), multiplicative_identity, multiply(inverse(y), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 177.13/22.61  = { by lemma 29 R->L }
% 177.13/22.61    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(ifeq(product(inverse(y), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(sum(multiply(inverse(x), inverse(inverse(y))), inverse(y), x_inverse_plus_y_inverse), true, add(inverse(y), multiply(y, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(y), multiplicative_identity, multiply(inverse(y), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 177.13/22.61  = { by axiom 11 (ifeq_axiom_001) R->L }
% 177.13/22.61    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(ifeq(product(inverse(y), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(ifeq(true, true, sum(multiply(inverse(x), inverse(inverse(y))), inverse(y), x_inverse_plus_y_inverse), true), true, add(inverse(y), multiply(y, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(y), multiplicative_identity, multiply(inverse(y), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 177.13/22.61  = { by axiom 13 (x_inverse_plus_y_inverse) R->L }
% 177.13/22.61    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(ifeq(product(inverse(y), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(ifeq(sum(inverse(x), inverse(y), x_inverse_plus_y_inverse), true, sum(multiply(inverse(x), inverse(inverse(y))), inverse(y), x_inverse_plus_y_inverse), true), true, add(inverse(y), multiply(y, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(y), multiplicative_identity, multiply(inverse(y), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 177.13/22.61  = { by lemma 41 }
% 177.13/22.61    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(ifeq(product(inverse(y), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), ifeq2(true, true, add(inverse(y), multiply(y, x_inverse_plus_y_inverse)), x_inverse_plus_y_inverse))), true, product(inverse(y), multiplicative_identity, multiply(inverse(y), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 177.13/22.61  = { by axiom 6 (ifeq_axiom) }
% 177.13/22.62    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(ifeq(product(inverse(y), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), add(inverse(y), multiply(y, x_inverse_plus_y_inverse)))), true, product(inverse(y), multiplicative_identity, multiply(inverse(y), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 177.13/22.62  = { by lemma 43 }
% 177.13/22.62    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(ifeq(product(inverse(y), inverse(x_inverse_plus_y_inverse), multiply(inverse(x_inverse_plus_y_inverse), add(x_inverse_plus_y_inverse, inverse(y)))), true, product(inverse(y), multiplicative_identity, multiply(inverse(y), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 177.13/22.62  = { by lemma 45 }
% 177.13/22.62    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(ifeq(product(inverse(y), inverse(x_inverse_plus_y_inverse), multiply(inverse(y), inverse(x_inverse_plus_y_inverse))), true, product(inverse(y), multiplicative_identity, multiply(inverse(y), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 177.13/22.62  = { by axiom 14 (closure_of_multiplication) }
% 177.13/22.62    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(ifeq(true, true, product(inverse(y), multiplicative_identity, multiply(inverse(y), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 177.13/22.62  = { by axiom 11 (ifeq_axiom_001) }
% 177.13/22.62    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(product(inverse(y), multiplicative_identity, multiply(inverse(y), x_inverse_plus_y_inverse)), true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 177.13/22.62  = { by lemma 25 }
% 177.13/22.62    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, ifeq2(product(inverse(y), multiplicative_identity, multiply(x_inverse_plus_y_inverse, inverse(y))), true, multiply(x_inverse_plus_y_inverse, inverse(y)), inverse(y)))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 177.13/22.62  = { by lemma 26 }
% 177.13/22.62    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, add(y, inverse(y))), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 177.13/22.62  = { by lemma 31 }
% 177.13/22.62    multiply(inverse(x_times_y), ifeq2(ifeq(sum(y, x_inverse_plus_y_inverse, multiplicative_identity), true, sum(x_times_y, x_inverse_plus_y_inverse, add(x_inverse_plus_y_inverse, x)), true), true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 177.13/22.62  = { by lemma 47 }
% 177.13/22.62    multiply(inverse(x_times_y), ifeq2(true, true, add(x_inverse_plus_y_inverse, x_times_y), add(x, x_inverse_plus_y_inverse)))
% 177.13/22.62  = { by axiom 6 (ifeq_axiom) }
% 177.13/22.62    multiply(inverse(x_times_y), add(x_inverse_plus_y_inverse, x_times_y))
% 177.13/22.62  = { by lemma 23 }
% 177.13/22.62    multiply(inverse(x_times_y), add(x_times_y, x_inverse_plus_y_inverse))
% 177.13/22.62  = { by lemma 45 }
% 177.13/22.62    multiply(x_inverse_plus_y_inverse, inverse(x_times_y))
% 177.13/22.62  = { by axiom 6 (ifeq_axiom) R->L }
% 177.13/22.62    ifeq2(true, true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.62  = { by axiom 20 (distributivity4) R->L }
% 177.13/22.62    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, additive_identity), true, ifeq(product(inverse(x_times_y), x_inverse_plus_y_inverse, multiply(inverse(x_times_y), x_inverse_plus_y_inverse)), true, ifeq(sum(multiply(inverse(x_times_y), x_inverse_plus_y_inverse), additive_identity, multiply(inverse(x_times_y), x_inverse_plus_y_inverse)), true, ifeq(sum(inverse(x_times_y), x_times_y, multiplicative_identity), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(inverse(x_times_y), x_inverse_plus_y_inverse)), true), true), true), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.62  = { by axiom 1 (additive_identity2) }
% 177.13/22.62    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, additive_identity), true, ifeq(product(inverse(x_times_y), x_inverse_plus_y_inverse, multiply(inverse(x_times_y), x_inverse_plus_y_inverse)), true, ifeq(true, true, ifeq(sum(inverse(x_times_y), x_times_y, multiplicative_identity), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(inverse(x_times_y), x_inverse_plus_y_inverse)), true), true), true), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.62  = { by axiom 11 (ifeq_axiom_001) }
% 177.13/22.62    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, additive_identity), true, ifeq(product(inverse(x_times_y), x_inverse_plus_y_inverse, multiply(inverse(x_times_y), x_inverse_plus_y_inverse)), true, ifeq(sum(inverse(x_times_y), x_times_y, multiplicative_identity), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(inverse(x_times_y), x_inverse_plus_y_inverse)), true), true), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.62  = { by axiom 8 (additive_inverse1) }
% 177.13/22.62    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, additive_identity), true, ifeq(product(inverse(x_times_y), x_inverse_plus_y_inverse, multiply(inverse(x_times_y), x_inverse_plus_y_inverse)), true, ifeq(true, true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(inverse(x_times_y), x_inverse_plus_y_inverse)), true), true), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by axiom 11 (ifeq_axiom_001) }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, additive_identity), true, ifeq(product(inverse(x_times_y), x_inverse_plus_y_inverse, multiply(inverse(x_times_y), x_inverse_plus_y_inverse)), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(inverse(x_times_y), x_inverse_plus_y_inverse)), true), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by axiom 14 (closure_of_multiplication) }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, additive_identity), true, ifeq(true, true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(inverse(x_times_y), x_inverse_plus_y_inverse)), true), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by axiom 11 (ifeq_axiom_001) }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, additive_identity), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(inverse(x_times_y), x_inverse_plus_y_inverse)), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by lemma 25 }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, additive_identity), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by axiom 6 (ifeq_axiom) R->L }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(true, true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by axiom 16 (commutativity_of_multiplication) R->L }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(ifeq(product(inverse(x), add(x_times_y, inverse(inverse(x))), multiply(inverse(x), x_times_y)), true, product(add(x_times_y, inverse(inverse(x))), inverse(x), multiply(inverse(x), x_times_y)), true), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by lemma 35 }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(ifeq(true, true, product(add(x_times_y, inverse(inverse(x))), inverse(x), multiply(inverse(x), x_times_y)), true), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by axiom 11 (ifeq_axiom_001) }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), multiply(inverse(x), x_times_y)), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by lemma 25 }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), multiply(x_times_y, inverse(x))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by lemma 36 R->L }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by axiom 11 (ifeq_axiom_001) R->L }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(ifeq(true, true, product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by axiom 14 (closure_of_multiplication) R->L }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(ifeq(product(x_times_y, inverse(y), multiply(x_times_y, inverse(y))), true, product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by axiom 18 (multiplication_is_well_defined) R->L }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(ifeq(product(x_times_y, inverse(y), ifeq2(product(inverse(y), y, multiply(x_times_y, inverse(y))), true, ifeq2(product(inverse(y), y, additive_identity), true, additive_identity, multiply(x_times_y, inverse(y))), multiply(x_times_y, inverse(y)))), true, product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by axiom 10 (multiplicative_inverse1) }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(ifeq(product(x_times_y, inverse(y), ifeq2(product(inverse(y), y, multiply(x_times_y, inverse(y))), true, ifeq2(true, true, additive_identity, multiply(x_times_y, inverse(y))), multiply(x_times_y, inverse(y)))), true, product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by axiom 6 (ifeq_axiom) }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(ifeq(product(x_times_y, inverse(y), ifeq2(product(inverse(y), y, multiply(x_times_y, inverse(y))), true, additive_identity, multiply(x_times_y, inverse(y)))), true, product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by axiom 11 (ifeq_axiom_001) R->L }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(ifeq(product(x_times_y, inverse(y), ifeq2(ifeq(true, true, product(inverse(y), y, multiply(x_times_y, inverse(y))), true), true, additive_identity, multiply(x_times_y, inverse(y)))), true, product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by axiom 12 (closure_of_addition) R->L }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(ifeq(product(x_times_y, inverse(y), ifeq2(ifeq(sum(x_times_y, y, add(x_times_y, y)), true, product(inverse(y), y, multiply(x_times_y, inverse(y))), true), true, additive_identity, multiply(x_times_y, inverse(y)))), true, product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by axiom 6 (ifeq_axiom) R->L }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(ifeq(product(x_times_y, inverse(y), ifeq2(ifeq(sum(x_times_y, y, ifeq2(true, true, add(x_times_y, y), y)), true, product(inverse(y), y, multiply(x_times_y, inverse(y))), true), true, additive_identity, multiply(x_times_y, inverse(y)))), true, product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by lemma 48 R->L }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(ifeq(product(x_times_y, inverse(y), ifeq2(ifeq(sum(x_times_y, y, ifeq2(ifeq(sum(inverse(x_times_y), y, multiplicative_identity), true, sum(additive_identity, y, add(x_times_y, y)), true), true, add(x_times_y, y), y)), true, product(inverse(y), y, multiply(x_times_y, inverse(y))), true), true, additive_identity, multiply(x_times_y, inverse(y)))), true, product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by axiom 11 (ifeq_axiom_001) R->L }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(ifeq(product(x_times_y, inverse(y), ifeq2(ifeq(sum(x_times_y, y, ifeq2(ifeq(ifeq(true, true, sum(inverse(x_times_y), y, multiplicative_identity), true), true, sum(additive_identity, y, add(x_times_y, y)), true), true, add(x_times_y, y), y)), true, product(inverse(y), y, multiply(x_times_y, inverse(y))), true), true, additive_identity, multiply(x_times_y, inverse(y)))), true, product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by lemma 40 R->L }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(ifeq(product(x_times_y, inverse(y), ifeq2(ifeq(sum(x_times_y, y, ifeq2(ifeq(ifeq(sum(y, inverse(x_times_y), multiplicative_identity), true, sum(inverse(x_times_y), y, multiplicative_identity), true), true, sum(additive_identity, y, add(x_times_y, y)), true), true, add(x_times_y, y), y)), true, product(inverse(y), y, multiply(x_times_y, inverse(y))), true), true, additive_identity, multiply(x_times_y, inverse(y)))), true, product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by axiom 15 (commutativity_of_addition) }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(ifeq(product(x_times_y, inverse(y), ifeq2(ifeq(sum(x_times_y, y, ifeq2(ifeq(true, true, sum(additive_identity, y, add(x_times_y, y)), true), true, add(x_times_y, y), y)), true, product(inverse(y), y, multiply(x_times_y, inverse(y))), true), true, additive_identity, multiply(x_times_y, inverse(y)))), true, product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by axiom 11 (ifeq_axiom_001) }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(ifeq(product(x_times_y, inverse(y), ifeq2(ifeq(sum(x_times_y, y, ifeq2(sum(additive_identity, y, add(x_times_y, y)), true, add(x_times_y, y), y)), true, product(inverse(y), y, multiply(x_times_y, inverse(y))), true), true, additive_identity, multiply(x_times_y, inverse(y)))), true, product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by lemma 46 }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(ifeq(product(x_times_y, inverse(y), ifeq2(ifeq(sum(x_times_y, y, y), true, product(inverse(y), y, multiply(x_times_y, inverse(y))), true), true, additive_identity, multiply(x_times_y, inverse(y)))), true, product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by lemma 25 R->L }
% 177.13/22.63    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(ifeq(product(x_times_y, inverse(y), ifeq2(ifeq(sum(x_times_y, y, y), true, product(inverse(y), y, multiply(inverse(y), x_times_y)), true), true, additive_identity, multiply(x_times_y, inverse(y)))), true, product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.63  = { by axiom 11 (ifeq_axiom_001) R->L }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(ifeq(product(x_times_y, inverse(y), ifeq2(ifeq(true, true, ifeq(sum(x_times_y, y, y), true, product(inverse(y), y, multiply(inverse(y), x_times_y)), true), true), true, additive_identity, multiply(x_times_y, inverse(y)))), true, product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by axiom 14 (closure_of_multiplication) R->L }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(ifeq(product(x_times_y, inverse(y), ifeq2(ifeq(product(inverse(y), x_times_y, multiply(inverse(y), x_times_y)), true, ifeq(sum(x_times_y, y, y), true, product(inverse(y), y, multiply(inverse(y), x_times_y)), true), true), true, additive_identity, multiply(x_times_y, inverse(y)))), true, product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by axiom 11 (ifeq_axiom_001) R->L }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(ifeq(product(x_times_y, inverse(y), ifeq2(ifeq(true, true, ifeq(product(inverse(y), x_times_y, multiply(inverse(y), x_times_y)), true, ifeq(sum(x_times_y, y, y), true, product(inverse(y), y, multiply(inverse(y), x_times_y)), true), true), true), true, additive_identity, multiply(x_times_y, inverse(y)))), true, product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by axiom 10 (multiplicative_inverse1) R->L }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(ifeq(product(x_times_y, inverse(y), ifeq2(ifeq(product(inverse(y), y, additive_identity), true, ifeq(product(inverse(y), x_times_y, multiply(inverse(y), x_times_y)), true, ifeq(sum(x_times_y, y, y), true, product(inverse(y), y, multiply(inverse(y), x_times_y)), true), true), true), true, additive_identity, multiply(x_times_y, inverse(y)))), true, product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by lemma 27 }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(ifeq(product(x_times_y, inverse(y), ifeq2(true, true, additive_identity, multiply(x_times_y, inverse(y)))), true, product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by axiom 6 (ifeq_axiom) }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(ifeq(product(x_times_y, inverse(y), additive_identity), true, product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by axiom 11 (ifeq_axiom_001) R->L }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(ifeq(product(x_times_y, inverse(y), additive_identity), true, ifeq(true, true, product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true), true), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by axiom 14 (closure_of_multiplication) R->L }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(ifeq(product(x_times_y, inverse(y), additive_identity), true, ifeq(product(x_times_y, inverse(x), multiply(x_times_y, inverse(x))), true, product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, inverse(x))), true), true), true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by lemma 50 }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), ifeq2(true, true, multiply(x_inverse_plus_y_inverse, x_times_y), multiply(x_times_y, inverse(x)))), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by axiom 6 (ifeq_axiom) }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), multiply(x_inverse_plus_y_inverse, x_times_y)), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by lemma 25 }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, inverse(inverse(x))), inverse(x), multiply(x_times_y, x_inverse_plus_y_inverse)), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by lemma 29 }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(add(x_times_y, x), inverse(x), multiply(x_times_y, x_inverse_plus_y_inverse)), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by axiom 6 (ifeq_axiom) R->L }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(ifeq2(true, true, add(x_times_y, x), x), inverse(x), multiply(x_times_y, x_inverse_plus_y_inverse)), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by lemma 48 R->L }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(ifeq2(ifeq(sum(inverse(x_times_y), x, multiplicative_identity), true, sum(additive_identity, x, add(x_times_y, x)), true), true, add(x_times_y, x), x), inverse(x), multiply(x_times_y, x_inverse_plus_y_inverse)), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by axiom 11 (ifeq_axiom_001) R->L }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(ifeq2(ifeq(ifeq(true, true, sum(inverse(x_times_y), x, multiplicative_identity), true), true, sum(additive_identity, x, add(x_times_y, x)), true), true, add(x_times_y, x), x), inverse(x), multiply(x_times_y, x_inverse_plus_y_inverse)), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by axiom 12 (closure_of_addition) R->L }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(ifeq2(ifeq(ifeq(sum(x, inverse(x_times_y), add(x, inverse(x_times_y))), true, sum(inverse(x_times_y), x, multiplicative_identity), true), true, sum(additive_identity, x, add(x_times_y, x)), true), true, add(x_times_y, x), x), inverse(x), multiply(x_times_y, x_inverse_plus_y_inverse)), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by lemma 30 R->L }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(ifeq2(ifeq(ifeq(sum(x, inverse(x_times_y), ifeq2(sum(x_times_y, inverse(x_times_y), add(x, inverse(x_times_y))), true, multiplicative_identity, add(x, inverse(x_times_y)))), true, sum(inverse(x_times_y), x, multiplicative_identity), true), true, sum(additive_identity, x, add(x_times_y, x)), true), true, add(x_times_y, x), x), inverse(x), multiply(x_times_y, x_inverse_plus_y_inverse)), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by lemma 23 R->L }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(ifeq2(ifeq(ifeq(sum(x, inverse(x_times_y), ifeq2(sum(x_times_y, inverse(x_times_y), add(inverse(x_times_y), x)), true, multiplicative_identity, add(x, inverse(x_times_y)))), true, sum(inverse(x_times_y), x, multiplicative_identity), true), true, sum(additive_identity, x, add(x_times_y, x)), true), true, add(x_times_y, x), x), inverse(x), multiply(x_times_y, x_inverse_plus_y_inverse)), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by axiom 11 (ifeq_axiom_001) R->L }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(ifeq2(ifeq(ifeq(sum(x, inverse(x_times_y), ifeq2(ifeq(true, true, sum(x_times_y, inverse(x_times_y), add(inverse(x_times_y), x)), true), true, multiplicative_identity, add(x, inverse(x_times_y)))), true, sum(inverse(x_times_y), x, multiplicative_identity), true), true, sum(additive_identity, x, add(x_times_y, x)), true), true, add(x_times_y, x), x), inverse(x), multiply(x_times_y, x_inverse_plus_y_inverse)), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by lemma 40 R->L }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(ifeq2(ifeq(ifeq(sum(x, inverse(x_times_y), ifeq2(ifeq(sum(y, inverse(x_times_y), multiplicative_identity), true, sum(x_times_y, inverse(x_times_y), add(inverse(x_times_y), x)), true), true, multiplicative_identity, add(x, inverse(x_times_y)))), true, sum(inverse(x_times_y), x, multiplicative_identity), true), true, sum(additive_identity, x, add(x_times_y, x)), true), true, add(x_times_y, x), x), inverse(x), multiply(x_times_y, x_inverse_plus_y_inverse)), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by lemma 47 }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(ifeq2(ifeq(ifeq(sum(x, inverse(x_times_y), ifeq2(true, true, multiplicative_identity, add(x, inverse(x_times_y)))), true, sum(inverse(x_times_y), x, multiplicative_identity), true), true, sum(additive_identity, x, add(x_times_y, x)), true), true, add(x_times_y, x), x), inverse(x), multiply(x_times_y, x_inverse_plus_y_inverse)), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by axiom 6 (ifeq_axiom) }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(ifeq2(ifeq(ifeq(sum(x, inverse(x_times_y), multiplicative_identity), true, sum(inverse(x_times_y), x, multiplicative_identity), true), true, sum(additive_identity, x, add(x_times_y, x)), true), true, add(x_times_y, x), x), inverse(x), multiply(x_times_y, x_inverse_plus_y_inverse)), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by axiom 15 (commutativity_of_addition) }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(ifeq2(ifeq(true, true, sum(additive_identity, x, add(x_times_y, x)), true), true, add(x_times_y, x), x), inverse(x), multiply(x_times_y, x_inverse_plus_y_inverse)), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by axiom 11 (ifeq_axiom_001) }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(ifeq2(sum(additive_identity, x, add(x_times_y, x)), true, add(x_times_y, x), x), inverse(x), multiply(x_times_y, x_inverse_plus_y_inverse)), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by lemma 46 }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, ifeq2(product(x, inverse(x), multiply(x_times_y, x_inverse_plus_y_inverse)), true, additive_identity, multiply(x_times_y, x_inverse_plus_y_inverse))), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by lemma 32 }
% 177.13/22.64    ifeq2(ifeq(product(x_times_y, x_inverse_plus_y_inverse, multiply(x_times_y, x_inverse_plus_y_inverse)), true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by axiom 14 (closure_of_multiplication) }
% 177.13/22.64    ifeq2(ifeq(true, true, product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by axiom 11 (ifeq_axiom_001) }
% 177.13/22.64    ifeq2(product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by axiom 6 (ifeq_axiom) R->L }
% 177.13/22.64    ifeq2(true, true, ifeq2(product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by axiom 5 (multiplicative_identity1) R->L }
% 177.13/22.64    ifeq2(product(multiplicative_identity, x_inverse_plus_y_inverse, x_inverse_plus_y_inverse), true, ifeq2(product(multiplicative_identity, x_inverse_plus_y_inverse, multiply(x_inverse_plus_y_inverse, inverse(x_times_y))), true, multiply(x_inverse_plus_y_inverse, inverse(x_times_y)), x_inverse_plus_y_inverse), x_inverse_plus_y_inverse)
% 177.13/22.64  = { by axiom 18 (multiplication_is_well_defined) }
% 177.13/22.64    x_inverse_plus_y_inverse
% 177.13/22.64  % SZS output end Proof
% 177.13/22.64  
% 177.13/22.64  RESULT: Unsatisfiable (the axioms are contradictory).
%------------------------------------------------------------------------------