%------------------------------------------------------------------------------
% File     : CSE---1.6
% Problem  : SWV611-1 : TPTP v8.1.2. Released v4.1.0.
% Transfm  : none
% Format   : tptp:raw
% Command  : java -jar /export/starexec/sandbox/solver/bin/mcs_scs.jar %s %d

% Computer : n013.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 : Thu Aug 31 21:34:39 EDT 2023

% Result   : Unsatisfiable 9.71s 9.77s
% Output   : CNFRefutation 10.00s
% Verified : 
% SZS Type : -

% Comments : 
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.04/0.12  % Problem    : SWV611-1 : TPTP v8.1.2. Released v4.1.0.
% 0.04/0.13  % Command    : java -jar /export/starexec/sandbox/solver/bin/mcs_scs.jar %s %d
% 0.13/0.34  % Computer : n013.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 Aug 29 09:28:46 EDT 2023
% 0.13/0.34  % CPUTime    : 
% 0.19/0.56  start to proof:theBenchmark
% 9.61/9.70  %-------------------------------------------
% 9.61/9.70  % File        :CSE---1.6
% 9.61/9.70  % Problem     :theBenchmark
% 9.61/9.70  % Transform   :cnf
% 9.61/9.70  % Format      :tptp:raw
% 9.61/9.70  % Command     :java -jar mcs_scs.jar %d %s
% 9.61/9.71  
% 9.61/9.71  % Result      :Theorem 8.870000s
% 9.61/9.71  % Output      :CNFRefutation 8.870000s
% 9.61/9.71  %-------------------------------------------
% 9.61/9.71  %------------------------------------------------------------------------------
% 9.61/9.71  % File     : SWV611-1 : TPTP v8.1.2. Released v4.1.0.
% 9.61/9.71  % Domain   : Software Verification
% 9.61/9.71  % Problem  : Fast Fourier Transform 174_5
% 9.61/9.71  % Version  : Especial.
% 9.61/9.71  % English  : Formalization of a functional implementation of the FFT algorithm
% 9.61/9.71  %            over the complex numbers, and its inverse. Both are shown
% 9.61/9.71  %            equivalent to the usual definitions of these operations through
% 9.61/9.71  %            Vandermonde matrices. They are also shown to be inverse to each
% 9.61/9.71  %            other, more precisely, that composition of the inverse and the
% 9.61/9.71  %            transformation yield the identity up to a scalar.
% 9.61/9.71  
% 9.61/9.71  % Refs     : [Nip10] Nipkow (2010), Email to Geoff Sutcliffe
% 9.61/9.71  %          : [BN10]  Boehme & Nipkow (2010), Sledgehammer: Judgement Day
% 9.61/9.71  % Source   : [Nip10]
% 9.61/9.71  % Names    : FFT-174_5 [Nip10]
% 9.61/9.71  
% 9.61/9.71  % Status   : Unsatisfiable
% 9.61/9.71  % Rating   : 0.24 v8.1.0, 0.21 v7.4.0, 0.18 v7.3.0, 0.25 v7.2.0, 0.17 v7.1.0, 0.08 v7.0.0, 0.20 v6.3.0, 0.09 v6.2.0, 0.30 v6.1.0, 0.50 v6.0.0, 0.40 v5.5.0, 0.75 v5.3.0, 0.78 v5.2.0, 0.69 v5.1.0, 0.71 v5.0.0, 0.79 v4.1.0
% 9.61/9.71  % Syntax   : Number of clauses     :  877 ( 212 unt; 168 nHn; 635 RR)
% 9.61/9.71  %            Number of literals    : 2751 ( 389 equ;1700 neg)
% 9.61/9.71  %            Maximal clause size   :    7 (   3 avg)
% 9.61/9.71  %            Maximal term depth    :    7 (   1 avg)
% 9.61/9.71  %            Number of predicates  :   56 (  55 usr;   0 prp; 1-3 aty)
% 9.61/9.71  %            Number of functors    :   25 (  25 usr;   8 con; 0-3 aty)
% 9.61/9.71  %            Number of variables   : 2232 (  86 sgn)
% 9.61/9.71  % SPC      : CNF_UNS_RFO_SEQ_NHN
% 9.61/9.71  
% 9.61/9.71  % Comments :
% 9.61/9.71  %------------------------------------------------------------------------------
% 9.61/9.71  cnf(cls_mult__right__le__imp__le_0,axiom,
% 9.61/9.71      ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 9.61/9.71      | c_lessequals(V_a,V_b,T_a)
% 9.61/9.71      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.61/9.71      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) ) ).
% 9.61/9.71  
% 9.61/9.71  cnf(cls_mult__strict__mono_0,axiom,
% 9.61/9.71      ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 9.61/9.71      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_d,T_a),T_a)
% 9.61/9.71      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.61/9.71      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.61/9.71      | ~ c_HOL_Oord__class_Oless(V_c,V_d,T_a)
% 9.61/9.71      | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 9.61/9.71  
% 9.61/9.71  cnf(cls_mult__left__less__imp__less_0,axiom,
% 9.61/9.71      ( ~ class_Ring__and__Field_Oordered__semiring(T_a)
% 9.61/9.71      | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 9.61/9.71      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.61/9.71      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a) ) ).
% 9.61/9.71  
% 9.61/9.71  cnf(cls_mult__right__less__imp__less_0,axiom,
% 9.61/9.71      ( ~ class_Ring__and__Field_Oordered__semiring(T_a)
% 9.61/9.71      | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 9.61/9.71      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.61/9.71      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) ) ).
% 9.61/9.71  
% 9.61/9.71  cnf(cls_mult__less__imp__less__left_0,axiom,
% 9.61/9.71      ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 9.61/9.71      | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 9.61/9.71      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.61/9.71      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a) ) ).
% 9.61/9.71  
% 9.61/9.71  cnf(cls_mult__less__imp__less__right_0,axiom,
% 9.61/9.71      ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 9.61/9.71      | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 9.61/9.71      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.61/9.71      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) ) ).
% 9.61/9.71  
% 9.61/9.71  cnf(cls_not__sum__squares__lt__zero_0,axiom,
% 9.61/9.71      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.61/9.71      | ~ c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,T_a),c_HOL_Otimes__class_Otimes(V_y,V_y,T_a),T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.61/9.71  
% 9.61/9.71  cnf(cls_mult__strict__mono_H_0,axiom,
% 9.61/9.71      ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 9.61/9.71      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_d,T_a),T_a)
% 9.61/9.71      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.61/9.71      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.61/9.71      | ~ c_HOL_Oord__class_Oless(V_c,V_d,T_a)
% 9.61/9.71      | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 9.61/9.71  
% 9.61/9.71  cnf(cls_sum__squares__gt__zero__iff_0,axiom,
% 9.61/9.71      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.61/9.71      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a),c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a),T_a),T_a) ) ).
% 9.61/9.71  
% 9.61/9.71  cnf(cls_less__add__iff1_0,axiom,
% 9.61/9.71      ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 9.61/9.71      | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),V_e,T_a),V_c,T_a),V_d,T_a)
% 9.64/9.71      | ~ c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),V_c,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_d,T_a),T_a) ) ).
% 9.64/9.71  
% 9.64/9.71  cnf(cls_less__add__iff1_1,axiom,
% 9.64/9.71      ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 9.64/9.71      | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),V_c,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_d,T_a),T_a)
% 9.64/9.71      | ~ c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),V_e,T_a),V_c,T_a),V_d,T_a) ) ).
% 9.64/9.71  
% 9.64/9.71  cnf(cls_less__add__iff2_0,axiom,
% 9.64/9.71      ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 9.64/9.71      | c_HOL_Oord__class_Oless(V_c,c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_b,V_a,T_a),V_e,T_a),V_d,T_a),T_a)
% 9.64/9.71      | ~ c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),V_c,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_d,T_a),T_a) ) ).
% 9.64/9.71  
% 9.64/9.71  cnf(cls_less__add__iff2_1,axiom,
% 9.64/9.71      ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 9.64/9.71      | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),V_c,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_d,T_a),T_a)
% 9.64/9.71      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_b,V_a,T_a),V_e,T_a),V_d,T_a),T_a) ) ).
% 9.64/9.71  
% 9.64/9.71  cnf(cls_mult__le__less__imp__less_0,axiom,
% 9.64/9.71      ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 9.64/9.71      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_d,T_a),T_a)
% 9.64/9.72      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.64/9.72      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.64/9.72      | ~ c_HOL_Oord__class_Oless(V_c,V_d,T_a)
% 9.64/9.72      | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult__less__le__imp__less_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 9.64/9.72      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_d,T_a),T_a)
% 9.64/9.72      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.64/9.72      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.64/9.72      | ~ c_lessequals(V_c,V_d,T_a)
% 9.64/9.72      | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_less__minus__iff_0,axiom,
% 9.64/9.72      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.64/9.72      | c_HOL_Oord__class_Oless(V_b,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 9.64/9.72      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_less__minus__iff_1,axiom,
% 9.64/9.72      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.64/9.72      | c_HOL_Oord__class_Oless(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a)
% 9.64/9.72      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult__left__le__imp__le_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 9.64/9.72      | c_lessequals(V_a,V_b,T_a)
% 9.64/9.72      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.64/9.72      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult__le__cancel__left__pos_1,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.64/9.72      | c_lessequals(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 9.64/9.72      | ~ c_lessequals(V_a,V_b,T_a)
% 9.64/9.72      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult__le__cancel__left__pos_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.64/9.72      | c_lessequals(V_a,V_b,T_a)
% 9.64/9.72      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 9.64/9.72      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult__le__cancel__left__neg_1,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.64/9.72      | c_lessequals(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 9.64/9.72      | ~ c_lessequals(V_b,V_a,T_a)
% 9.64/9.72      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult__le__cancel__left__neg_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.64/9.72      | c_lessequals(V_b,V_a,T_a)
% 9.64/9.72      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 9.64/9.72      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_sum__squares__gt__zero__iff_2,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.64/9.72      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,T_a),c_HOL_Otimes__class_Otimes(V_y,V_y,T_a),T_a),T_a)
% 9.64/9.72      | V_y = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_sum__squares__gt__zero__iff_1,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.64/9.72      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,T_a),c_HOL_Otimes__class_Otimes(V_y,V_y,T_a),T_a),T_a)
% 9.64/9.72      | V_x = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_minus__mult__commute_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Oring(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a) = c_HOL_Otimes__class_Otimes(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult__eq__0__iff_2,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Oring__no__zero__divisors(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult__eq__0__iff_1,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Oring__no__zero__divisors(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult__zero__right_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Omult__zero(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult__zero__left_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Omult__zero(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_class__semiring_Omul__0_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult__right_Ozero_0,axiom,
% 9.64/9.72      ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(V_x,c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult_Ozero__right_0,axiom,
% 9.64/9.72      ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult_Ozero__left_0,axiom,
% 9.64/9.72      ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult__left_Ozero_0,axiom,
% 9.64/9.72      ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_class__semiring_Osemiring__rules_I10_J_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_class__semiring_Osemiring__rules_I9_J_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_class__ringb_Oadd__mul__solve_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Oidom(T_a)
% 9.64/9.72      | ~ class_Int_Onumber__ring(T_a)
% 9.64/9.72      | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_w,V_y,T_a),c_HOL_Otimes__class_Otimes(V_x,V_z,T_a),T_a) != c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_w,V_z,T_a),c_HOL_Otimes__class_Otimes(V_x,V_y,T_a),T_a)
% 9.64/9.72      | V_y = V_z
% 9.64/9.72      | V_w = V_x ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_class__ringb_Onoteq__reduce_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Oidom(T_a)
% 9.64/9.72      | ~ class_Int_Onumber__ring(T_a)
% 9.64/9.72      | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_d,T_a),T_a) != c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_d,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a)
% 9.64/9.72      | V_c = V_d
% 9.64/9.72      | V_a = V_b ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_power__commutes_0,axiom,
% 9.64/9.72      ( ~ class_OrderedGroup_Omonoid__mult(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(c_Power_Opower__class_Opower(V_a,V_n,T_a),V_a,T_a) = c_HOL_Otimes__class_Otimes(V_a,c_Power_Opower__class_Opower(V_a,V_n,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_minus__mult__minus_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Oring(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) = c_HOL_Otimes__class_Otimes(V_a,V_b,T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_square__eq__iff_1,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Oidom(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(c_HOL_Ouminus__class_Ouminus(V_b,T_a),c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) = c_HOL_Otimes__class_Otimes(V_b,V_b,T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult__right_Ominus_0,axiom,
% 9.64/9.72      ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(V_xa,c_HOL_Ouminus__class_Ouminus(V_x,T_a),T_a) = c_HOL_Ouminus__class_Ouminus(c_HOL_Otimes__class_Otimes(V_xa,V_x,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult_Ominus__right_0,axiom,
% 9.64/9.72      ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) = c_HOL_Ouminus__class_Ouminus(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult__left_Ominus_0,axiom,
% 9.64/9.72      ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(c_HOL_Ouminus__class_Ouminus(V_x,T_a),V_y,T_a) = c_HOL_Ouminus__class_Ouminus(c_HOL_Otimes__class_Otimes(V_x,V_y,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult_Ominus__left_0,axiom,
% 9.64/9.72      ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a) = c_HOL_Ouminus__class_Ouminus(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_class__semiring_Osemiring__rules_I1_J_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.64/9.72      | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_m,T_a),c_HOL_Otimes__class_Otimes(V_b,V_m,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),V_m,T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_comm__semiring__class_Odistrib_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Ocomm__semiring(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),V_c,T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_class__semiring_Omul__d_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(V_x,c_HOL_Oplus__class_Oplus(V_y,V_z,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_y,T_a),c_HOL_Otimes__class_Otimes(V_x,V_z,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult_Oadd__left_0,axiom,
% 9.64/9.72      ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(c_HOL_Oplus__class_Oplus(V_a,V_a_H,T_a),V_b,T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Otimes__class_Otimes(V_a_H,V_b,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult__left_Oadd_0,axiom,
% 9.64/9.72      ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(c_HOL_Oplus__class_Oplus(V_x,V_y,T_a),V_ya,T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_ya,T_a),c_HOL_Otimes__class_Otimes(V_y,V_ya,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult_Oadd__right_0,axiom,
% 9.64/9.72      ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(V_a,c_HOL_Oplus__class_Oplus(V_b,V_b_H,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Otimes__class_Otimes(V_a,V_b_H,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult__right_Oadd_0,axiom,
% 9.64/9.72      ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(V_xa,c_HOL_Oplus__class_Oplus(V_x,V_y,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_xa,V_x,T_a),c_HOL_Otimes__class_Otimes(V_xa,V_y,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_class__semiring_Osemiring__rules_I8_J_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),V_c,T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_power__mult__distrib_0,axiom,
% 9.64/9.72      ( ~ class_OrderedGroup_Ocomm__monoid__mult(T_a)
% 9.64/9.72      | c_Power_Opower__class_Opower(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),V_n,T_a) = c_HOL_Otimes__class_Otimes(c_Power_Opower__class_Opower(V_a,V_n,T_a),c_Power_Opower__class_Opower(V_b,V_n,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_class__semiring_Opwr__mul_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.64/9.72      | c_Power_Opower__class_Opower(c_HOL_Otimes__class_Otimes(V_x,V_y,T_a),V_q,T_a) = c_HOL_Otimes__class_Otimes(c_Power_Opower__class_Opower(V_x,V_q,T_a),c_Power_Opower__class_Opower(V_y,V_q,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_minus__mult__right_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Oring(T_a)
% 9.64/9.72      | c_HOL_Ouminus__class_Ouminus(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) = c_HOL_Otimes__class_Otimes(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_minus__mult__left_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Oring(T_a)
% 9.64/9.72      | c_HOL_Ouminus__class_Ouminus(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult__eq__0__iff_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Oring__no__zero__divisors(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(V_a,V_b,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 9.64/9.72      | V_b = c_HOL_Ozero__class_Ozero(T_a)
% 9.64/9.72      | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_no__zero__divisors_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Ono__zero__divisors(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(V_a,V_b,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 9.64/9.72      | V_b = c_HOL_Ozero__class_Ozero(T_a)
% 9.64/9.72      | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_no__zero__divirors__neq0_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Ono__zero__divisors(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(V_a,V_b,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 9.64/9.72      | V_a = c_HOL_Ozero__class_Ozero(T_a)
% 9.64/9.72      | V_b = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_square__eq__iff_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Oidom(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(V_a,V_a,T_a) != c_HOL_Otimes__class_Otimes(V_b,V_b,T_a)
% 9.64/9.72      | V_a = c_HOL_Ouminus__class_Ouminus(V_b,T_a)
% 9.64/9.72      | V_a = V_b ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_class__ringb_Oadd__mul__solve_1,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Oidom(T_a)
% 9.64/9.72      | ~ class_Int_Onumber__ring(T_a)
% 9.64/9.72      | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_y,T_a),c_HOL_Otimes__class_Otimes(V_x,V_z,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_z,T_a),c_HOL_Otimes__class_Otimes(V_x,V_y,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_class__ringb_Onoteq__reduce_1,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Oidom(T_a)
% 9.64/9.72      | ~ class_Int_Onumber__ring(T_a)
% 9.64/9.72      | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_c,T_a),c_HOL_Otimes__class_Otimes(V_x,V_d,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_d,T_a),c_HOL_Otimes__class_Otimes(V_x,V_c,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_combine__common__factor_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Osemiring(T_a)
% 9.64/9.72      | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_c,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),V_e,T_a),V_c,T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult__right_Odiff_0,axiom,
% 9.64/9.72      ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(V_xa,c_HOL_Ominus__class_Ominus(V_x,V_y,T_a),T_a) = c_HOL_Ominus__class_Ominus(c_HOL_Otimes__class_Otimes(V_xa,V_x,T_a),c_HOL_Otimes__class_Otimes(V_xa,V_y,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult_Odiff__right_0,axiom,
% 9.64/9.72      ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(V_a,c_HOL_Ominus__class_Ominus(V_b,V_b_H,T_a),T_a) = c_HOL_Ominus__class_Ominus(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Otimes__class_Otimes(V_a,V_b_H,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult_Odiff__left_0,axiom,
% 9.64/9.72      ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_a,V_a_H,T_a),V_b,T_a) = c_HOL_Ominus__class_Ominus(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Otimes__class_Otimes(V_a_H,V_b,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_mult__left_Odiff_0,axiom,
% 9.64/9.72      ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 9.64/9.72      | c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_x,V_y,T_a),V_ya,T_a) = c_HOL_Ominus__class_Ominus(c_HOL_Otimes__class_Otimes(V_x,V_ya,T_a),c_HOL_Otimes__class_Otimes(V_y,V_ya,T_a),T_a) ) ).
% 9.64/9.72  
% 9.64/9.72  cnf(cls_frac__le_0,axiom,
% 9.64/9.72      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.64/9.72      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_x,V_z,T_a),c_HOL_Oinverse__class_Odivide(V_y,V_w,T_a),T_a)
% 9.64/9.72      | ~ c_lessequals(V_w,V_z,T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_w,T_a)
% 9.64/9.73      | ~ c_lessequals(V_x,V_y,T_a)
% 9.64/9.73      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_divide__nonpos__neg_0,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.64/9.73      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(V_y,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.64/9.73      | ~ c_lessequals(V_x,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_divide__nonneg__pos_0,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.64/9.73      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a)
% 9.64/9.73      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_frac__less_0,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_x,V_z,T_a),c_HOL_Oinverse__class_Odivide(V_y,V_w,T_a),T_a)
% 9.64/9.73      | ~ c_lessequals(V_w,V_z,T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_w,T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 9.64/9.73      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_divide__nonpos__pos_0,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.64/9.73      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a)
% 9.64/9.73      | ~ c_lessequals(V_x,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_divide__nonneg__neg_0,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.64/9.73      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(V_y,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.64/9.73      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_frac__less2_0,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_x,V_z,T_a),c_HOL_Oinverse__class_Odivide(V_y,V_w,T_a),T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(V_w,V_z,T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_w,T_a)
% 9.64/9.73      | ~ c_lessequals(V_x,V_y,T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_le__divide__eq_3,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.64/9.73      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.64/9.73      | c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.64/9.73      | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_le__divide__eq_2,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.64/9.73      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.64/9.73      | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.64/9.73      | ~ c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_divide__le__eq_3,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.64/9.73      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.64/9.73      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 9.64/9.73      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_divide__le__eq_2,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.64/9.73      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.64/9.73      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.64/9.73      | ~ c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_number__of__Bit0_0,axiom,
% 9.64/9.73      ( ~ class_Int_Onumber__ring(T_a)
% 9.64/9.73      | c_Int_Onumber__class_Onumber__of(c_Int_OBit0(V_w),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Oplus__class_Oplus(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_add__frac__eq_0,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.64/9.73      | c_HOL_Oplus__class_Oplus(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),c_HOL_Oinverse__class_Odivide(V_w,V_z,T_a),T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_z,T_a),c_HOL_Otimes__class_Otimes(V_w,V_y,T_a),T_a),c_HOL_Otimes__class_Otimes(V_y,V_z,T_a),T_a)
% 9.64/9.73      | V_z = c_HOL_Ozero__class_Ozero(T_a)
% 9.64/9.73      | V_y = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_DERIV__mult__lemma_0,axiom,
% 9.64/9.73      ( ~ class_RealVector_Oreal__field(T_a)
% 9.64/9.73      | c_HOL_Oinverse__class_Odivide(c_HOL_Ominus__class_Ominus(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Otimes__class_Otimes(V_c,V_d,T_a),T_a),V_h,T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,c_HOL_Oinverse__class_Odivide(c_HOL_Ominus__class_Ominus(V_b,V_d,T_a),V_h,T_a),T_a),c_HOL_Otimes__class_Otimes(c_HOL_Oinverse__class_Odivide(c_HOL_Ominus__class_Ominus(V_a,V_c,T_a),V_h,T_a),V_d,T_a),T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_add__num__frac_0,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.64/9.73      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.64/9.73      | c_HOL_Oplus__class_Oplus(V_z,c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Oplus__class_Oplus(V_x,c_HOL_Otimes__class_Otimes(V_z,V_y,T_a),T_a),V_y,T_a)
% 9.64/9.73      | V_y = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_add__frac__num_0,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.64/9.73      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.64/9.73      | c_HOL_Oplus__class_Oplus(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),V_z,T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Oplus__class_Oplus(V_x,c_HOL_Otimes__class_Otimes(V_z,V_y,T_a),T_a),V_y,T_a)
% 9.64/9.73      | V_y = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_diff__frac__eq_0,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.64/9.73      | c_HOL_Ominus__class_Ominus(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),c_HOL_Oinverse__class_Odivide(V_w,V_z,T_a),T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Ominus__class_Ominus(c_HOL_Otimes__class_Otimes(V_x,V_z,T_a),c_HOL_Otimes__class_Otimes(V_w,V_y,T_a),T_a),c_HOL_Otimes__class_Otimes(V_y,V_z,T_a),T_a)
% 9.64/9.73      | V_z = c_HOL_Ozero__class_Ozero(T_a)
% 9.64/9.73      | V_y = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_le__divide__eq_9,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.64/9.73      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.64/9.73      | c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.64/9.73      | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.64/9.73      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 9.64/9.73      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_divide__le__eq_9,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.64/9.73      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.64/9.73      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 9.64/9.73      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.64/9.73      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 9.64/9.73      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_eq__divide__eq_2,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.64/9.73      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.64/9.73      | c_HOL_Ozero__class_Ozero(T_a) = c_HOL_Oinverse__class_Odivide(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_divide__self__if_0,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.64/9.73      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.64/9.73      | c_HOL_Oinverse__class_Odivide(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_minus__divide__left_0,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.64/9.73      | c_HOL_Ouminus__class_Ouminus(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_minus__divide__right_0,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.64/9.73      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.64/9.73      | c_HOL_Ouminus__class_Ouminus(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) = c_HOL_Oinverse__class_Odivide(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_power__divide_0,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.64/9.73      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.64/9.73      | c_Power_Opower__class_Opower(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),V_n,T_a) = c_HOL_Oinverse__class_Odivide(c_Power_Opower__class_Opower(V_a,V_n,T_a),c_Power_Opower__class_Opower(V_b,V_n,T_a),T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_diff__divide__distrib_0,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.64/9.73      | c_HOL_Oinverse__class_Odivide(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),V_c,T_a) = c_HOL_Ominus__class_Ominus(c_HOL_Oinverse__class_Odivide(V_a,V_c,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_divide_Odiff_0,axiom,
% 9.64/9.73      ( ~ class_RealVector_Oreal__normed__field(T_a)
% 9.64/9.73      | c_HOL_Oinverse__class_Odivide(c_HOL_Ominus__class_Ominus(V_x,V_y,T_a),V_ya,T_a) = c_HOL_Ominus__class_Ominus(c_HOL_Oinverse__class_Odivide(V_x,V_ya,T_a),c_HOL_Oinverse__class_Odivide(V_y,V_ya,T_a),T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_minus__divide__divide_0,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.64/9.73      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.64/9.73      | c_HOL_Oinverse__class_Odivide(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) = c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_divide_Ominus_0,axiom,
% 9.64/9.73      ( ~ class_RealVector_Oreal__normed__field(T_a)
% 9.64/9.73      | c_HOL_Oinverse__class_Odivide(c_HOL_Ouminus__class_Ouminus(V_x,T_a),V_y,T_a) = c_HOL_Ouminus__class_Ouminus(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_divide__zero__left_0,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.64/9.73      | c_HOL_Oinverse__class_Odivide(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_divide__eq__eq_1,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.64/9.73      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.64/9.73      | c_HOL_Oinverse__class_Odivide(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_divide__zero_0,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.64/9.73      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.64/9.73      | c_HOL_Oinverse__class_Odivide(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_divide_Ozero_0,axiom,
% 9.64/9.73      ( ~ class_RealVector_Oreal__normed__field(T_a)
% 9.64/9.73      | c_HOL_Oinverse__class_Odivide(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_add__divide__distrib_0,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.64/9.73      | c_HOL_Oinverse__class_Odivide(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),V_c,T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Oinverse__class_Odivide(V_a,V_c,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_divide_Oadd_0,axiom,
% 9.64/9.73      ( ~ class_RealVector_Oreal__normed__field(T_a)
% 9.64/9.73      | c_HOL_Oinverse__class_Odivide(c_HOL_Oplus__class_Oplus(V_x,V_y,T_a),V_ya,T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Oinverse__class_Odivide(V_x,V_ya,T_a),c_HOL_Oinverse__class_Odivide(V_y,V_ya,T_a),T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_real__less__def_0,axiom,
% 9.64/9.73      ( c_lessequals(V_x,V_y,tc_RealDef_Oreal)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(V_x,V_y,tc_RealDef_Oreal) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_arctan__monotone_0,axiom,
% 9.64/9.73      ( c_HOL_Oord__class_Oless(c_Transcendental_Oarctan(V_x),c_Transcendental_Oarctan(V_y),tc_RealDef_Oreal)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(V_x,V_y,tc_RealDef_Oreal) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_real__less__def_2,axiom,
% 9.64/9.73      ( c_HOL_Oord__class_Oless(V_x,V_y,tc_RealDef_Oreal)
% 9.64/9.73      | V_x = V_y
% 9.64/9.73      | ~ c_lessequals(V_x,V_y,tc_RealDef_Oreal) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_real__mult__le__cancel__iff2_1,axiom,
% 9.64/9.73      ( c_lessequals(c_HOL_Otimes__class_Otimes(V_z,V_x,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_z,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.64/9.73      | ~ c_lessequals(V_x,V_y,tc_RealDef_Oreal)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_z,tc_RealDef_Oreal) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_real__mult__le__cancel__iff2_0,axiom,
% 9.64/9.73      ( c_lessequals(V_x,V_y,tc_RealDef_Oreal)
% 9.64/9.73      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_z,V_x,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_z,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_z,tc_RealDef_Oreal) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_real__mult__le__cancel__iff1_1,axiom,
% 9.64/9.73      ( c_lessequals(c_HOL_Otimes__class_Otimes(V_x,V_z,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_y,V_z,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.64/9.73      | ~ c_lessequals(V_x,V_y,tc_RealDef_Oreal)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_z,tc_RealDef_Oreal) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_real__mult__le__cancel__iff1_0,axiom,
% 9.64/9.73      ( c_lessequals(V_x,V_y,tc_RealDef_Oreal)
% 9.64/9.73      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_x,V_z,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_y,V_z,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_z,tc_RealDef_Oreal) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_real__sum__square__gt__zero2_0,axiom,
% 9.64/9.73      ( c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_y,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.64/9.73      | V_y = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_real__sum__square__gt__zero_0,axiom,
% 9.64/9.73      ( c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_y,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.64/9.73      | V_x = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_real__mult__right__cancel_0,axiom,
% 9.64/9.73      ( c_HOL_Otimes__class_Otimes(V_a,V_c,tc_RealDef_Oreal) != c_HOL_Otimes__class_Otimes(V_b,V_c,tc_RealDef_Oreal)
% 9.64/9.73      | V_c = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal)
% 9.64/9.73      | V_a = V_b ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_real__mult__left__cancel_0,axiom,
% 9.64/9.73      ( c_HOL_Otimes__class_Otimes(V_c,V_a,tc_RealDef_Oreal) != c_HOL_Otimes__class_Otimes(V_c,V_b,tc_RealDef_Oreal)
% 9.64/9.73      | V_c = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal)
% 9.64/9.73      | V_a = V_b ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_real__add__mult__distrib_0,axiom,
% 9.64/9.73      c_HOL_Otimes__class_Otimes(c_HOL_Oplus__class_Oplus(V_z1,V_z2,tc_RealDef_Oreal),V_w,tc_RealDef_Oreal) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_z1,V_w,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_z2,V_w,tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_pi__neq__zero_0,axiom,
% 9.64/9.73      c_Transcendental_Opi != c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_le__divide__eq_4,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.64/9.73      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.64/9.73      | c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.64/9.73      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_le__divide__eq_1,axiom,
% 9.64/9.73      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.64/9.73      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.64/9.73      | c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.64/9.73      | ~ c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_minus__less__iff_0,axiom,
% 9.64/9.73      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_b,T_a),V_a,T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_minus__less__iff_1,axiom,
% 9.64/9.73      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_b,T_a),V_a,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_linorder__not__le_1,axiom,
% 9.64/9.73      ( ~ class_Orderings_Olinorder(T_a)
% 9.64/9.73      | ~ c_lessequals(V_x,V_y,T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(V_y,V_x,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_linorder__not__le_0,axiom,
% 9.64/9.73      ( ~ class_Orderings_Olinorder(T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(V_y,V_x,T_a)
% 9.64/9.73      | c_lessequals(V_x,V_y,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_linorder__not__less_0,axiom,
% 9.64/9.73      ( ~ class_Orderings_Olinorder(T_a)
% 9.64/9.73      | c_lessequals(V_y,V_x,T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_linorder__not__less_1,axiom,
% 9.64/9.73      ( ~ class_Orderings_Olinorder(T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 9.64/9.73      | ~ c_lessequals(V_y,V_x,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_linorder__antisym__conv1_1,axiom,
% 9.64/9.73      ( ~ class_Orderings_Olinorder(T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(V_x,V_x,T_a)
% 9.64/9.73      | c_lessequals(V_x,V_x,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_linorder__antisym__conv2_1,axiom,
% 9.64/9.73      ( ~ class_Orderings_Olinorder(T_a)
% 9.64/9.73      | ~ c_lessequals(V_x,V_x,T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(V_x,V_x,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_not__leE_0,axiom,
% 9.64/9.73      ( ~ class_Orderings_Olinorder(T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 9.64/9.73      | c_lessequals(V_y,V_x,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_less__le__not__le_1,axiom,
% 9.64/9.73      ( ~ class_Orderings_Opreorder(T_a)
% 9.64/9.73      | ~ c_lessequals(V_y,V_x,T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_neg__less__iff__less_0,axiom,
% 9.64/9.73      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_b,T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_neg__less__iff__less_1,axiom,
% 9.64/9.73      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_b,T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_less__eqI_1,axiom,
% 9.64/9.73      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.64/9.73      | c_HOL_Ominus__class_Ominus(V_x,V_y,T_a) != c_HOL_Ominus__class_Ominus(V_x_H,V_y_H,T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(V_x_H,V_y_H,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_less__eqI_0,axiom,
% 9.64/9.73      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.64/9.73      | c_HOL_Ominus__class_Ominus(V_x,V_y,T_a) != c_HOL_Ominus__class_Ominus(V_x_H,V_y_H,T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(V_x_H,V_y_H,T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_order__less__le_2,axiom,
% 9.64/9.73      ( ~ class_Orderings_Oorder(T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 9.64/9.73      | V_x = V_y
% 9.64/9.73      | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_order__le__less_0,axiom,
% 9.64/9.73      ( ~ class_Orderings_Oorder(T_a)
% 9.64/9.73      | V_x = V_y
% 9.64/9.73      | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 9.64/9.73      | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_order__le__neq__trans_0,axiom,
% 9.64/9.73      ( ~ class_Orderings_Oorder(T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 9.64/9.73      | V_a = V_b
% 9.64/9.73      | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_order__neq__le__trans_0,axiom,
% 9.64/9.73      ( ~ class_Orderings_Oorder(T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 9.64/9.73      | ~ c_lessequals(V_a,V_b,T_a)
% 9.64/9.73      | V_a = V_b ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_linorder__antisym__conv1_0,axiom,
% 9.64/9.73      ( ~ class_Orderings_Olinorder(T_a)
% 9.64/9.73      | V_x = V_y
% 9.64/9.73      | ~ c_lessequals(V_x,V_y,T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_linorder__antisym__conv2_0,axiom,
% 9.64/9.73      ( ~ class_Orderings_Olinorder(T_a)
% 9.64/9.73      | V_x = V_y
% 9.64/9.73      | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 9.64/9.73      | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_xt1_I12_J_0,axiom,
% 9.64/9.73      ( ~ class_Orderings_Oorder(T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 9.64/9.73      | ~ c_lessequals(V_b,V_a,T_a)
% 9.64/9.73      | V_a = V_b ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_xt1_I11_J_0,axiom,
% 9.64/9.73      ( ~ class_Orderings_Oorder(T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 9.64/9.73      | V_a = V_b
% 9.64/9.73      | ~ c_lessequals(V_b,V_a,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_less__le__not__le_2,axiom,
% 9.64/9.73      ( ~ class_Orderings_Opreorder(T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 9.64/9.73      | c_lessequals(V_y,V_x,T_a)
% 9.64/9.73      | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_add__strict__mono_0,axiom,
% 9.64/9.73      ( ~ class_OrderedGroup_Opordered__cancel__ab__semigroup__add(T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_d,T_a),T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(V_c,V_d,T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_order__le__less_1,axiom,
% 9.64/9.73      ( ~ class_Orderings_Oorder(T_a)
% 9.64/9.73      | c_lessequals(V_x,V_y,T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_order__less__imp__le_0,axiom,
% 9.64/9.73      ( ~ class_Orderings_Opreorder(T_a)
% 9.64/9.73      | c_lessequals(V_x,V_y,T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_add__less__cancel__left_0,axiom,
% 9.64/9.73      ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 9.64/9.73      | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 9.64/9.73      | ~ c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_c,V_a,T_a),c_HOL_Oplus__class_Oplus(V_c,V_b,T_a),T_a) ) ).
% 9.64/9.73  
% 9.64/9.73  cnf(cls_add__less__cancel__left_1,axiom,
% 9.64/9.74      ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 9.64/9.74      | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_c,V_a,T_a),c_HOL_Oplus__class_Oplus(V_c,V_b,T_a),T_a)
% 9.64/9.74      | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 9.64/9.74  
% 9.64/9.74  cnf(cls_add__strict__left__mono_0,axiom,
% 9.64/9.74      ( ~ class_OrderedGroup_Opordered__cancel__ab__semigroup__add(T_a)
% 9.64/9.74      | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_c,V_a,T_a),c_HOL_Oplus__class_Oplus(V_c,V_b,T_a),T_a)
% 9.64/9.74      | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 9.64/9.74  
% 9.64/9.74  cnf(cls_add__less__cancel__right_0,axiom,
% 9.64/9.74      ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 9.64/9.74      | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 9.64/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a) ) ).
% 9.64/9.74  
% 9.64/9.74  cnf(cls_add__less__cancel__right_1,axiom,
% 9.64/9.74      ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 9.64/9.74      | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a)
% 9.64/9.74      | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 9.64/9.74  
% 9.64/9.74  cnf(cls_add__strict__right__mono_0,axiom,
% 9.64/9.74      ( ~ class_OrderedGroup_Opordered__cancel__ab__semigroup__add(T_a)
% 9.64/9.74      | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a)
% 9.64/9.74      | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 9.64/9.74  
% 9.64/9.74  cnf(cls_order__le__less__trans_0,axiom,
% 9.64/9.74      ( ~ class_Orderings_Opreorder(T_a)
% 9.64/9.74      | c_HOL_Oord__class_Oless(V_x,V_z,T_a)
% 9.64/9.74      | ~ c_HOL_Oord__class_Oless(V_y,V_z,T_a)
% 9.64/9.74      | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 9.64/9.74  
% 9.64/9.74  cnf(cls_order__less__le__trans_0,axiom,
% 9.64/9.74      ( ~ class_Orderings_Opreorder(T_a)
% 9.64/9.74      | c_HOL_Oord__class_Oless(V_x,V_z,T_a)
% 9.64/9.74      | ~ c_lessequals(V_y,V_z,T_a)
% 9.64/9.74      | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 9.64/9.74  
% 9.64/9.74  cnf(cls_xt1_I8_J_0,axiom,
% 9.64/9.74      ( ~ class_Orderings_Oorder(T_a)
% 9.64/9.74      | c_HOL_Oord__class_Oless(V_z,V_x,T_a)
% 9.64/9.74      | ~ c_HOL_Oord__class_Oless(V_z,V_y,T_a)
% 9.64/9.74      | ~ c_lessequals(V_y,V_x,T_a) ) ).
% 9.64/9.74  
% 9.64/9.74  cnf(cls_xt1_I7_J_0,axiom,
% 9.64/9.74      ( ~ class_Orderings_Oorder(T_a)
% 9.64/9.74      | c_HOL_Oord__class_Oless(V_z,V_x,T_a)
% 9.64/9.74      | ~ c_lessequals(V_z,V_y,T_a)
% 9.64/9.74      | ~ c_HOL_Oord__class_Oless(V_y,V_x,T_a) ) ).
% 9.64/9.74  
% 9.64/9.74  cnf(cls_le__minus__iff_0,axiom,
% 9.64/9.74      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.64/9.74      | c_lessequals(V_b,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 9.64/9.74      | ~ c_lessequals(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) ) ).
% 9.64/9.74  
% 9.64/9.74  cnf(cls_le__minus__iff_1,axiom,
% 9.64/9.74      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.64/9.74      | c_lessequals(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a)
% 9.64/9.74      | ~ c_lessequals(V_b,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 9.64/9.74  
% 9.64/9.74  cnf(cls_minus__le__iff_0,axiom,
% 9.64/9.74      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.64/9.74      | c_lessequals(c_HOL_Ouminus__class_Ouminus(V_b,T_a),V_a,T_a)
% 9.64/9.74      | ~ c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a) ) ).
% 9.64/9.74  
% 9.64/9.74  cnf(cls_minus__le__iff_1,axiom,
% 9.64/9.74      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.64/9.74      | c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a)
% 9.64/9.74      | ~ c_lessequals(c_HOL_Ouminus__class_Ouminus(V_b,T_a),V_a,T_a) ) ).
% 9.64/9.74  
% 9.64/9.74  cnf(cls_add__le__less__mono_0,axiom,
% 9.64/9.74      ( ~ class_OrderedGroup_Opordered__cancel__ab__semigroup__add(T_a)
% 9.64/9.74      | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_d,T_a),T_a)
% 9.64/9.74      | ~ c_HOL_Oord__class_Oless(V_c,V_d,T_a)
% 9.64/9.74      | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 9.64/9.74  
% 9.64/9.74  cnf(cls_add__less__le__mono_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Opordered__cancel__ab__semigroup__add(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_d,T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(V_c,V_d,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_minus__diff__eq_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 9.71/9.74      | c_HOL_Ouminus__class_Ouminus(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),T_a) = c_HOL_Ominus__class_Ominus(V_b,V_a,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_minus__minus_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.74      | c_HOL_Ouminus__class_Ouminus(c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) = V_a ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_double__compl_0,axiom,
% 9.71/9.74      ( ~ class_Lattices_Oboolean__algebra(T_a)
% 9.71/9.74      | c_HOL_Ouminus__class_Ouminus(c_HOL_Ouminus__class_Ouminus(V_x,T_a),T_a) = V_x ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_equation__minus__iff_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.74      | V_b = c_HOL_Ouminus__class_Ouminus(c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_equation__minus__iff_1,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.74      | V_a = c_HOL_Ouminus__class_Ouminus(c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_minus__equation__iff_1,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.74      | c_HOL_Ouminus__class_Ouminus(c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) = V_b ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_eq__diff__eq_H_1,axiom,
% 9.71/9.74      V_x = c_HOL_Ominus__class_Ominus(c_HOL_Oplus__class_Oplus(V_x,V_z,tc_RealDef_Oreal),V_z,tc_RealDef_Oreal) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_add__diff__cancel_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.74      | c_HOL_Ominus__class_Ominus(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),V_b,T_a) = V_a ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_class__semiring_Osemiring__rules_I5_J_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.71/9.74      | c_HOL_Oplus__class_Oplus(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) = V_a ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_class__semiring_Osemiring__rules_I6_J_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.71/9.74      | c_HOL_Oplus__class_Oplus(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) = V_a ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_comm__monoid__add_Omult__1_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Ocomm__monoid__add(T_a)
% 9.71/9.74      | c_HOL_Oplus__class_Oplus(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) = V_a ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_class__semiring_Oadd__0_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.71/9.74      | c_HOL_Oplus__class_Oplus(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a) = V_x ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_class__ringb_Oadd__r0__iff_1,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oidom(T_a)
% 9.71/9.74      | ~ class_Int_Onumber__ring(T_a)
% 9.71/9.74      | V_x = c_HOL_Oplus__class_Oplus(V_x,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_comm__monoid__add_Omult__1__right_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Ocomm__monoid__add(T_a)
% 9.71/9.74      | c_HOL_Oplus__class_Oplus(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) = V_a ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_add__0__left_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Omonoid__add(T_a)
% 9.71/9.74      | c_HOL_Oplus__class_Oplus(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) = V_a ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_monoid__add__class_Oadd__0__right_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Omonoid__add(T_a)
% 9.71/9.74      | c_HOL_Oplus__class_Oplus(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) = V_a ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_real__0__le__add__iff_1,axiom,
% 9.71/9.74      ( c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Oplus__class_Oplus(V_x,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Ouminus__class_Ouminus(V_x,tc_RealDef_Oreal),V_y,tc_RealDef_Oreal) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_real__0__le__add__iff_0,axiom,
% 9.71/9.74      ( c_lessequals(c_HOL_Ouminus__class_Ouminus(V_x,tc_RealDef_Oreal),V_y,tc_RealDef_Oreal)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Oplus__class_Oplus(V_x,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_diff__minus__eq__add_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.74      | c_HOL_Ominus__class_Ominus(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) = c_HOL_Oplus__class_Oplus(V_a,V_b,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_add__cancel__end_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 9.71/9.74      | c_HOL_Oplus__class_Oplus(V_x,c_HOL_Oplus__class_Oplus(V_y,V_z,T_a),T_a) != V_y
% 9.71/9.74      | V_x = c_HOL_Ouminus__class_Ouminus(V_z,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_real__minus__mult__self__le_0,axiom,
% 9.71/9.74      c_lessequals(c_HOL_Ouminus__class_Ouminus(c_HOL_Otimes__class_Otimes(V_u,V_u,tc_RealDef_Oreal),tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_x,V_x,tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_Deriv_Oadd__diff__add_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 9.71/9.74      | c_HOL_Ominus__class_Ominus(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_d,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),c_HOL_Ominus__class_Ominus(V_c,V_d,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_sum__squares__le__zero__iff_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.74      | V_x = c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,T_a),c_HOL_Otimes__class_Otimes(V_y,V_y,T_a),T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_sum__squares__le__zero__iff_1,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.74      | V_y = c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,T_a),c_HOL_Otimes__class_Otimes(V_y,V_y,T_a),T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_class__ringb_Osubr0__iff_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oidom(T_a)
% 9.71/9.74      | ~ class_Int_Onumber__ring(T_a)
% 9.71/9.74      | c_HOL_Ominus__class_Ominus(V_x,V_y,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.74      | V_x = V_y ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_right__minus__eq_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.74      | c_HOL_Ominus__class_Ominus(V_a,V_b,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.74      | V_a = V_b ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_eq__iff__diff__eq__0_1,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 9.71/9.74      | c_HOL_Ominus__class_Ominus(V_a,V_b,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.74      | V_a = V_b ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_add__neg__neg_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Opordered__comm__monoid__add(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_real__of__nat__ge__zero_0,axiom,
% 9.71/9.74      c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_RealDef_Oreal(V_n,tc_nat),tc_RealDef_Oreal) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_real__add__eq__0__iff_1,axiom,
% 9.71/9.74      c_HOL_Oplus__class_Oplus(V_x,c_HOL_Ouminus__class_Ouminus(V_x,tc_RealDef_Oreal),tc_RealDef_Oreal) = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_left__minus_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.74      | c_HOL_Oplus__class_Oplus(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_a,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_right__minus_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.74      | c_HOL_Oplus__class_Oplus(V_a,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_ab__left__minus_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 9.71/9.74      | c_HOL_Oplus__class_Oplus(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_a,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_eq__neg__iff__add__eq__0_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.74      | c_HOL_Oplus__class_Oplus(c_HOL_Ouminus__class_Ouminus(V_b,T_a),V_b,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult_Oprod__diff__prod_0,axiom,
% 9.71/9.74      ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 9.71/9.74      | c_HOL_Ominus__class_Ominus(c_HOL_Otimes__class_Otimes(V_x,V_y,T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_x,V_a,T_a),c_HOL_Ominus__class_Ominus(V_y,V_b,T_a),T_a),c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_x,V_a,T_a),V_b,T_a),T_a),c_HOL_Otimes__class_Otimes(V_a,c_HOL_Ominus__class_Ominus(V_y,V_b,T_a),T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_power__le__zero__eq_3,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 9.71/9.74      | V_x = c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.74      | c_lessequals(V_x,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(c_Power_Opower__class_Opower(V_x,V_n,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_power__less__zero__eq_1,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(V_x,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_Power_Opower__class_Opower(V_x,V_n,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_eq__eqI_1,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 9.71/9.74      | c_HOL_Ominus__class_Ominus(V_xa,V_y,T_a) != c_HOL_Ominus__class_Ominus(V_x,V_x,T_a)
% 9.71/9.74      | V_xa = V_y ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_eq__eqI_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 9.71/9.74      | c_HOL_Ominus__class_Ominus(V_x,V_x,T_a) != c_HOL_Ominus__class_Ominus(V_x_H,V_y_H,T_a)
% 9.71/9.74      | V_x_H = V_y_H ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_power__mono_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__semidom(T_a)
% 9.71/9.74      | c_lessequals(c_Power_Opower__class_Opower(V_a,V_n,T_a),c_Power_Opower__class_Opower(V_b,V_n,T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.74      | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_add__strict__increasing2_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 9.71/9.74      | ~ class_OrderedGroup_Ocomm__monoid__add(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(V_b,c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_b,V_c,T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_real__0__le__divide__iff_0,axiom,
% 9.71/9.74      ( c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_y,tc_RealDef_Oreal)
% 9.71/9.74      | c_lessequals(V_x,c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Oinverse__class_Odivide(V_x,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_real__0__le__divide__iff_1,axiom,
% 9.71/9.74      ( c_lessequals(V_y,c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.74      | c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_x,tc_RealDef_Oreal)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Oinverse__class_Odivide(V_x,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_zero__le__divide__iff_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_zero__le__divide__iff_1,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_zero__le__divide__iff_2,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_zero__le__divide__iff_3,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_neg__0__equal__iff__equal_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.74      | c_HOL_Ozero__class_Ozero(T_a) != c_HOL_Ouminus__class_Ouminus(V_a,T_a)
% 9.71/9.74      | c_HOL_Ozero__class_Ozero(T_a) = V_a ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_class__semiring_Osemiring__rules_I21_J_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.71/9.74      | c_HOL_Oplus__class_Oplus(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),V_c,T_a) = c_HOL_Oplus__class_Oplus(V_a,c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_class__semiring_Osemiring__rules_I22_J_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.71/9.74      | c_HOL_Oplus__class_Oplus(V_a,c_HOL_Oplus__class_Oplus(V_c,V_d,T_a),T_a) = c_HOL_Oplus__class_Oplus(V_c,c_HOL_Oplus__class_Oplus(V_a,V_d,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_class__semiring_Osemiring__rules_I23_J_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.71/9.74      | c_HOL_Oplus__class_Oplus(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),V_c,T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),V_b,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_class__semiring_Osemiring__rules_I25_J_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.71/9.74      | c_HOL_Oplus__class_Oplus(V_a,c_HOL_Oplus__class_Oplus(V_c,V_d,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),V_d,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_ab__semigroup__add__class_Oadd__ac_I1_J_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Oab__semigroup__add(T_a)
% 9.71/9.74      | c_HOL_Oplus__class_Oplus(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),V_c,T_a) = c_HOL_Oplus__class_Oplus(V_a,c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_add__cancel__21_1,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 9.71/9.74      | c_HOL_Oplus__class_Oplus(V_x,c_HOL_Oplus__class_Oplus(V_y,V_z,T_a),T_a) = c_HOL_Oplus__class_Oplus(V_y,c_HOL_Oplus__class_Oplus(V_x,V_z,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_class__semiring_Oadd__a_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.71/9.74      | c_HOL_Oplus__class_Oplus(V_x,c_HOL_Oplus__class_Oplus(V_y,V_z,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Oplus__class_Oplus(V_x,V_y,T_a),V_z,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_comm__monoid__add_Omult__assoc_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Ocomm__monoid__add(T_a)
% 9.71/9.74      | c_HOL_Oplus__class_Oplus(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),V_c,T_a) = c_HOL_Oplus__class_Oplus(V_a,c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_comm__monoid__add_Omult__left__commute_0,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Ocomm__monoid__add(T_a)
% 9.71/9.74      | c_HOL_Oplus__class_Oplus(V_a,c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a) = c_HOL_Oplus__class_Oplus(V_b,c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_double__eq__0__iff_1,axiom,
% 9.71/9.74      ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 9.71/9.74      | c_HOL_Oplus__class_Oplus(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_divide__le__eq_4,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_divide__le__eq_1,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_le__divide__eq_7,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_le__divide__eq_5,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_divide__le__eq_7,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_divide__le__eq_5,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_le__divide__eq_8,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_divide__le__eq_8,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 9.71/9.74      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__imp__le__div__pos_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | c_lessequals(V_z,c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_z,V_y,T_a),V_x,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__imp__div__pos__le_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),V_z,T_a)
% 9.71/9.74      | ~ c_lessequals(V_x,c_HOL_Otimes__class_Otimes(V_z,V_y,T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_le__divide__eq_6,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_le__divide__eq_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.74      | ~ c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_divide__le__eq_6,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.74      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_divide__le__eq_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_divide__left__mono__neg_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_c,V_a,T_a),c_HOL_Oinverse__class_Odivide(V_c,V_b,T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_divide__left__mono_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_c,V_a,T_a),c_HOL_Oinverse__class_Odivide(V_c,V_b,T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.74      | ~ c_lessequals(V_b,V_a,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_le__divide__eq__number__of_2,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | ~ class_Int_Onumber(T_a)
% 9.71/9.74      | c_lessequals(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.74      | ~ c_lessequals(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_le__divide__eq__number__of_3,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | ~ class_Int_Onumber(T_a)
% 9.71/9.74      | c_lessequals(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_le__divide__eq__number__of1_3,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | ~ class_Int_Onumber(T_a)
% 9.71/9.74      | c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_le__divide__eq__number__of1_2,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | ~ class_Int_Onumber(T_a)
% 9.71/9.74      | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_divide__le__eq__number__of1_3,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | ~ class_Int_Onumber(T_a)
% 9.71/9.74      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_a,T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_divide__le__eq__number__of1_2,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | ~ class_Int_Onumber(T_a)
% 9.71/9.74      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_a,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_divide__le__eq__number__of_2,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | ~ class_Int_Onumber(T_a)
% 9.71/9.74      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_divide__le__eq__number__of_3,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | ~ class_Int_Onumber(T_a)
% 9.71/9.74      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_le__divide__eq__number__of1_9,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | ~ class_Int_Onumber(T_a)
% 9.71/9.74      | c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_b,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_divide__le__eq__number__of1_9,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | ~ class_Int_Onumber(T_a)
% 9.71/9.74      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_a,T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_b,T_a)
% 9.71/9.74      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_le__divide__eq__number__of_9,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | ~ class_Int_Onumber(T_a)
% 9.71/9.74      | c_lessequals(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_b,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_divide__le__eq__number__of_9,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.74      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.74      | ~ class_Int_Onumber(T_a)
% 9.71/9.74      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.74      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_b,T_a)
% 9.71/9.74      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__less__cancel__right__disj_2,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__less__cancel__right__disj_1,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__less__cancel__left__disj_2,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__less__cancel__left__disj_1,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_not__square__less__zero_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__less__cancel__right__disj_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__less__cancel__left__disj_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__pos__neg2_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_b,V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__pos__neg_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__neg__pos_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_zero__less__mult__pos2_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_b,V_a,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_zero__less__mult__pos_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__pos__pos_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__neg__neg_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__strict__left__mono__comm_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__comm__semiring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__less__cancel__right__disj_5,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__less__cancel__right__disj_4,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__strict__right__mono_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__strict__right__mono__neg_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_b,V_a,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__less__cancel__left__disj_5,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__less__cancel__left__disj_4,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__strict__left__mono_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__strict__left__mono__neg_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_b,V_a,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__less__cancel__left__pos_1,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__less__cancel__left__pos_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__less__cancel__left__neg_1,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_mult__less__cancel__left__neg_0,axiom,
% 9.71/9.74      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_le__number__of__eq__not__less_1,axiom,
% 9.71/9.74      ( ~ class_Orderings_Olinorder(T_a)
% 9.71/9.74      | ~ class_Int_Onumber(T_a)
% 9.71/9.74      | c_lessequals(c_Int_Onumber__class_Onumber__of(V_v,T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.74      | c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_Int_Onumber__class_Onumber__of(V_v,T_a),T_a) ) ).
% 9.71/9.74  
% 9.71/9.74  cnf(cls_le__number__of__eq__not__less_0,axiom,
% 9.71/9.74      ( ~ class_Orderings_Olinorder(T_a)
% 9.71/9.74      | ~ class_Int_Onumber(T_a)
% 9.71/9.74      | ~ c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_Int_Onumber__class_Onumber__of(V_v,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_Int_Onumber__class_Onumber__of(V_v,T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_left__distrib__number__of_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Osemiring(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_HOL_Otimes__class_Otimes(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),c_Int_Onumber__class_Onumber__of(V_v,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_v,T_a),T_a),c_HOL_Otimes__class_Otimes(V_b,c_Int_Onumber__class_Onumber__of(V_v,T_a),T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_left__diff__distrib__number__of_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oring(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),c_Int_Onumber__class_Onumber__of(V_v,T_a),T_a) = c_HOL_Ominus__class_Ominus(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_v,T_a),T_a),c_HOL_Otimes__class_Otimes(V_b,c_Int_Onumber__class_Onumber__of(V_v,T_a),T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_right__diff__distrib__number__of_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oring(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_v,T_a),c_HOL_Ominus__class_Ominus(V_b,V_c,T_a),T_a) = c_HOL_Ominus__class_Ominus(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_v,T_a),V_b,T_a),c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_v,T_a),V_c,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_right__distrib__number__of_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Osemiring(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_v,T_a),c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_v,T_a),V_b,T_a),c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_v,T_a),V_c,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__le__eq__number__of_5,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_b,T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__le__eq__number__of_7,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_le__divide__eq__number__of1_5,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__le__eq__number__of1_5,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_a,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_b,T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_le__divide__eq__number__of_1,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(V_b,c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.75      | ~ c_lessequals(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_le__divide__eq__number__of_4,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_le__divide__eq__number__of1_4,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_le__divide__eq__number__of1_1,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__le__eq__number__of1_4,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_a,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_b,T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__le__eq__number__of1_1,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_b,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_a,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__le__eq__number__of_8,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_b,T_a)
% 9.71/9.75      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_le__divide__eq__number__of1_8,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_b,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__le__eq__number__of1_8,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_a,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_b,T_a)
% 9.71/9.75      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__le__eq__number__of_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(V_b,c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__le__eq__number__of_6,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.75      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_le__divide__eq__number__of1_7,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_b,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__le__eq__number__of1_7,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_a,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_le__divide__eq__number__of_5,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_le__divide__eq__number__of_7,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_b,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_le__divide__eq__number__of_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_b,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.75      | ~ c_lessequals(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_le__divide__eq__number__of_6,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_b,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_le__divide__eq__number__of_8,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_b,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__le__eq__number__of_1,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_b,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__le__eq__number__of_4,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_b,T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_le__divide__eq__number__of1_6,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_b,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_le__divide__eq__number__of1_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_b,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__le__eq__number__of1_6,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_a,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__le__eq__number__of1_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_a,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__less__0__iff_5,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__less__0__iff_4,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__pos__neg_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_y,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__neg__pos_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_x,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__strict__right__mono__neg_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_a,V_c,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_b,V_a,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__strict__right__mono_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_a,V_c,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_zero__less__divide__iff_5,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_zero__less__divide__iff_4,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__pos__pos_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__neg__neg_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_y,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_x,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_less__divide__eq_3,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_add__nonneg__eq__0__iff_2,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Opordered__comm__monoid__add(T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_HOL_Oplus__class_Oplus(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_eq__diff__eq_H_0,axiom,
% 9.71/9.75      V_y = c_HOL_Oplus__class_Oplus(c_HOL_Ominus__class_Ominus(V_y,V_z,tc_RealDef_Oreal),V_z,tc_RealDef_Oreal) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_diff__add__cancel_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.75      | c_HOL_Oplus__class_Oplus(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),V_b,T_a) = V_a ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_arctan__minus_0,axiom,
% 9.71/9.75      c_Transcendental_Oarctan(c_HOL_Ouminus__class_Ouminus(V_x,tc_RealDef_Oreal)) = c_HOL_Ouminus__class_Ouminus(c_Transcendental_Oarctan(V_x),tc_RealDef_Oreal) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_neg__less__0__iff__less_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_neg__less__0__iff__less_1,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_nonzero__minus__divide__right_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.75      | c_HOL_Ouminus__class_Ouminus(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) = c_HOL_Oinverse__class_Odivide(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a)
% 9.71/9.75      | V_b = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_le__imp__neg__le_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Ouminus__class_Ouminus(V_b,T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_neg__le__iff__le_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.71/9.75      | c_lessequals(V_a,V_b,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ouminus__class_Ouminus(V_b,T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_eq__add__iff2_1,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oring(T_a)
% 9.71/9.75      | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_b,V_a,T_a),V_e,T_a),V_d,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_d,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_add__increasing_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 9.71/9.75      | ~ class_OrderedGroup_Ocomm__monoid__add(T_a)
% 9.71/9.75      | c_lessequals(V_b,c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_b,V_c,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_add__increasing2_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 9.71/9.75      | ~ class_OrderedGroup_Ocomm__monoid__add(T_a)
% 9.71/9.75      | c_lessequals(V_b,c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_b,V_a,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__le__0__iff_4,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__le__0__iff_5,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.75      | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_le__add__iff1_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),V_e,T_a),V_c,T_a),V_d,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),V_c,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_d,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_le__add__iff1_1,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),V_c,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_d,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),V_e,T_a),V_c,T_a),V_d,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_le__add__iff2_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 9.71/9.75      | c_lessequals(V_c,c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_b,V_a,T_a),V_e,T_a),V_d,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),V_c,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_d,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_le__add__iff2_1,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),V_c,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_d,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_c,c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_b,V_a,T_a),V_e,T_a),V_d,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_arctan__monotone_H_0,axiom,
% 9.71/9.75      ( c_lessequals(c_Transcendental_Oarctan(V_x),c_Transcendental_Oarctan(V_y),tc_RealDef_Oreal)
% 9.71/9.75      | ~ c_lessequals(V_x,V_y,tc_RealDef_Oreal) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_real__mult__self__sum__ge__zero_0,axiom,
% 9.71/9.75      c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_y,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_sum__squares__ge__zero_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,T_a),c_HOL_Otimes__class_Otimes(V_y,V_y,T_a),T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_real__add__minus__iff_0,axiom,
% 9.71/9.75      ( c_HOL_Oplus__class_Oplus(V_x,c_HOL_Ouminus__class_Ouminus(V_a,tc_RealDef_Oreal),tc_RealDef_Oreal) != c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal)
% 9.71/9.75      | V_x = V_a ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_class__ringb_Oadd__r0__iff_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oidom(T_a)
% 9.71/9.75      | ~ class_Int_Onumber__ring(T_a)
% 9.71/9.75      | V_x != c_HOL_Oplus__class_Oplus(V_x,V_a,T_a)
% 9.71/9.75      | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_class__ringb_Osubr0__iff_1,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oidom(T_a)
% 9.71/9.75      | ~ class_Int_Onumber__ring(T_a)
% 9.71/9.75      | c_HOL_Ominus__class_Ominus(V_x,V_x,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_diff__self_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.75      | c_HOL_Ominus__class_Ominus(V_a,V_a,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_diff__0__right_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.75      | c_HOL_Ominus__class_Ominus(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) = V_a ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_right__minus__eq_1,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.75      | c_HOL_Ominus__class_Ominus(V_x,V_x,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_eq__iff__diff__eq__0_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 9.71/9.75      | c_HOL_Ominus__class_Ominus(V_x,V_x,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_double__eq__0__iff_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 9.71/9.75      | c_HOL_Oplus__class_Oplus(V_a,V_a,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.75      | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_add__nonneg__eq__0__iff_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Opordered__comm__monoid__add(T_a)
% 9.71/9.75      | c_HOL_Oplus__class_Oplus(V_x,V_y,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a)
% 9.71/9.75      | V_x = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_add__nonneg__eq__0__iff_1,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Opordered__comm__monoid__add(T_a)
% 9.71/9.75      | c_HOL_Oplus__class_Oplus(V_x,V_y,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a)
% 9.71/9.75      | V_y = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_even__less__0__iff_1,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_even__less__0__iff_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_double__add__less__zero__iff__single__less__zero_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_double__add__less__zero__iff__single__less__zero_1,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_power__less__imp__less__base_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__semidom(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_Power_Opower__class_Opower(V_a,V_n,T_a),c_Power_Opower__class_Opower(V_b,V_n,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_add__neg__nonpos_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Opordered__comm__monoid__add(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_add__nonpos__neg_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Opordered__comm__monoid__add(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_sum__squares__le__zero__iff_2,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a),c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a),T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_neg__equal__0__iff__equal_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.75      | c_HOL_Ouminus__class_Ouminus(V_a,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.75      | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_neg__equal__iff__equal_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.75      | c_HOL_Ouminus__class_Ouminus(V_a,T_a) != c_HOL_Ouminus__class_Ouminus(V_b,T_a)
% 9.71/9.75      | V_a = V_b ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_compl__eq__compl__iff_0,axiom,
% 9.71/9.75      ( ~ class_Lattices_Oboolean__algebra(T_a)
% 9.71/9.75      | c_HOL_Ouminus__class_Ouminus(V_x,T_a) != c_HOL_Ouminus__class_Ouminus(V_y,T_a)
% 9.71/9.75      | V_x = V_y ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_real__le__antisym_0,axiom,
% 9.71/9.75      ( V_z = V_w
% 9.71/9.75      | ~ c_lessequals(V_w,V_z,tc_RealDef_Oreal)
% 9.71/9.75      | ~ c_lessequals(V_z,V_w,tc_RealDef_Oreal) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_order__antisym_0,axiom,
% 9.71/9.75      ( ~ class_Orderings_Oorder(T_a)
% 9.71/9.75      | V_x = V_y
% 9.71/9.75      | ~ c_lessequals(V_y,V_x,T_a)
% 9.71/9.75      | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_order__eq__iff_2,axiom,
% 9.71/9.75      ( ~ class_Orderings_Oorder(T_a)
% 9.71/9.75      | V_x = V_y
% 9.71/9.75      | ~ c_lessequals(V_y,V_x,T_a)
% 9.71/9.75      | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_order__antisym__conv_0,axiom,
% 9.71/9.75      ( ~ class_Orderings_Oorder(T_a)
% 9.71/9.75      | V_x = V_y
% 9.71/9.75      | ~ c_lessequals(V_x,V_y,T_a)
% 9.71/9.75      | ~ c_lessequals(V_y,V_x,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_arctan__zero__zero_0,axiom,
% 9.71/9.75      c_Transcendental_Oarctan(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal)) = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_real__add__left__mono_0,axiom,
% 9.71/9.75      ( c_lessequals(c_HOL_Oplus__class_Oplus(V_z,V_x,tc_RealDef_Oreal),c_HOL_Oplus__class_Oplus(V_z,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.75      | ~ c_lessequals(V_x,V_y,tc_RealDef_Oreal) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_add__left__mono_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Opordered__ab__semigroup__add(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Oplus__class_Oplus(V_c,V_a,T_a),c_HOL_Oplus__class_Oplus(V_c,V_b,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_add__right__mono_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Opordered__ab__semigroup__add(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_add__le__cancel__left_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 9.71/9.75      | c_lessequals(V_a,V_b,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Oplus__class_Oplus(V_c,V_a,T_a),c_HOL_Oplus__class_Oplus(V_c,V_b,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_add__le__cancel__left_1,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Oplus__class_Oplus(V_c,V_a,T_a),c_HOL_Oplus__class_Oplus(V_c,V_b,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_add__le__cancel__right_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 9.71/9.75      | c_lessequals(V_a,V_b,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_add__le__cancel__right_1,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_real__add__le__0__iff_1,axiom,
% 9.71/9.75      ( c_lessequals(c_HOL_Oplus__class_Oplus(V_x,V_y,tc_RealDef_Oreal),c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.75      | ~ c_lessequals(V_y,c_HOL_Ouminus__class_Ouminus(V_x,tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_real__add__le__0__iff_0,axiom,
% 9.71/9.75      ( c_lessequals(V_y,c_HOL_Ouminus__class_Ouminus(V_x,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Oplus__class_Oplus(V_x,V_y,tc_RealDef_Oreal),c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_le__eq__neg_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_le__eq__neg_1,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 9.71/9.75      | c_lessequals(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_power__eq__0__iff_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Ozero__neq__one(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Ono__zero__divisors(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Omult__zero(T_a)
% 9.71/9.75      | ~ class_Power_Opower(T_a)
% 9.71/9.75      | c_Power_Opower__class_Opower(V_a,V_n,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.75      | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_field__power__not__zero_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oring__1__no__zero__divisors(T_a)
% 9.71/9.75      | c_Power_Opower__class_Opower(V_a,V_n,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.75      | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_neg__le__0__iff__le_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_neg__le__0__iff__le_1,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_mult__le__0__iff_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.75      | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_mult__le__0__iff_1,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_mult__le__0__iff_2,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.75      | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_mult__le__0__iff_3,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.75      | c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_add__minus__cancel_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.75      | c_HOL_Oplus__class_Oplus(V_a,c_HOL_Oplus__class_Oplus(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a),T_a) = V_b ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_pos__add__strict_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__semidom(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_b,c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_b,V_c,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_mult__mono1_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Omult__mono1(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.75      | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_mult__left__mono_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Omult__mono(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.75      | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_mult__right__mono_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Omult__mono(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.75      | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_mult__left__mono__neg_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_b,V_a,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_mult__right__mono__neg_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_b,V_a,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_class__ringb_Oadd__scale__eq__noteq_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oidom(T_a)
% 9.71/9.75      | ~ class_Int_Onumber__ring(T_a)
% 9.71/9.75      | c_HOL_Oplus__class_Oplus(V_x,c_HOL_Otimes__class_Otimes(V_r,V_c,T_a),T_a) != c_HOL_Oplus__class_Oplus(V_x,c_HOL_Otimes__class_Otimes(V_r,V_d,T_a),T_a)
% 9.71/9.75      | V_c = V_d
% 9.71/9.75      | V_r = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_real__sum__squares__cancel_0,axiom,
% 9.71/9.75      ( c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_y,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal) != c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal)
% 9.71/9.75      | V_x = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_real__sum__squares__cancel2_0,axiom,
% 9.71/9.75      ( c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_y,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal) != c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal)
% 9.71/9.75      | V_y = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_sum__squares__eq__zero__iff_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.75      | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,T_a),c_HOL_Otimes__class_Otimes(V_y,V_y,T_a),T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.75      | V_x = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_sum__squares__eq__zero__iff_1,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.75      | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,T_a),c_HOL_Otimes__class_Otimes(V_y,V_y,T_a),T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.75      | V_y = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_le__eqI_1,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.71/9.75      | c_HOL_Ominus__class_Ominus(V_x,V_y,T_a) != c_HOL_Ominus__class_Ominus(V_x_H,V_y_H,T_a)
% 9.71/9.75      | c_lessequals(V_y,V_x,T_a)
% 9.71/9.75      | ~ c_lessequals(V_y_H,V_x_H,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_le__eqI_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.71/9.75      | c_HOL_Ominus__class_Ominus(V_x,V_y,T_a) != c_HOL_Ominus__class_Ominus(V_x_H,V_y_H,T_a)
% 9.71/9.75      | c_lessequals(V_y_H,V_x_H,T_a)
% 9.71/9.75      | ~ c_lessequals(V_y,V_x,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__right__mono_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_a,V_c,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.75      | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__right__mono__neg_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),c_HOL_Oinverse__class_Odivide(V_a,V_c,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_split__mult__pos__le_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_split__mult__pos__le_1,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_mult__nonpos__nonpos_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_zero__le__square_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_a,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_zero__le__mult__iff_4,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_zero__le__mult__iff_5,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_mult__nonneg__nonneg_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Opordered__cancel__semiring(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_real__0__less__add__iff_0,axiom,
% 9.71/9.75      ( c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_x,tc_RealDef_Oreal),V_y,tc_RealDef_Oreal)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Oplus__class_Oplus(V_x,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_real__0__less__add__iff_1,axiom,
% 9.71/9.75      ( c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Oplus__class_Oplus(V_x,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_x,tc_RealDef_Oreal),V_y,tc_RealDef_Oreal) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_zero__less__double__add__iff__zero__less__single__add_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(V_a,V_a,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_zero__less__double__add__iff__zero__less__single__add_1,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(V_a,V_a,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_zero__le__mult__iff_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.75      | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_zero__le__mult__iff_1,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.75      | c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_zero__le__mult__iff_2,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.75      | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_zero__le__mult__iff_3,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.75      | c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_neg__equal__zero_0,axiom,
% 9.71/9.75      ( ~ class_OrderedGroup_Oordered__ab__group__add(T_a)
% 9.71/9.75      | c_HOL_Ouminus__class_Ouminus(V_a,T_a) != V_a
% 9.71/9.75      | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_mult__mono_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Opordered__semiring(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_d,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.75      | ~ c_lessequals(V_c,V_d,T_a)
% 9.71/9.75      | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_mult__mono_H_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Opordered__semiring(T_a)
% 9.71/9.75      | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_d,T_a),T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.75      | ~ c_lessequals(V_c,V_d,T_a)
% 9.71/9.75      | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_less__divide__eq_2,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__less__eq_3,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__less__eq_2,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_zero__less__divide__iff_3,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_zero__less__divide__iff_2,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_zero__less__divide__iff_1,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_zero__less__divide__iff_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__less__0__iff_3,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__less__0__iff_2,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__less__0__iff_1,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__less__0__iff_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_comp__arith_I112_J_0,axiom,
% 9.71/9.75      ( ~ class_Int_Onumber__ring(T_a)
% 9.71/9.75      | c_HOL_Ozero__class_Ozero(T_a) = c_Int_Onumber__class_Onumber__of(c_Int_OPls,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_number__of__Pls_0,axiom,
% 9.71/9.75      ( ~ class_Int_Onumber__ring(T_a)
% 9.71/9.75      | c_Int_Onumber__class_Onumber__of(c_Int_OPls,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_add__numeral__0_0,axiom,
% 9.71/9.75      ( ~ class_Int_Onumber__ring(T_a)
% 9.71/9.75      | c_HOL_Oplus__class_Oplus(c_Int_Onumber__class_Onumber__of(c_Int_OPls,T_a),V_a,T_a) = V_a ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_add__numeral__0__right_0,axiom,
% 9.71/9.75      ( ~ class_Int_Onumber__ring(T_a)
% 9.71/9.75      | c_HOL_Oplus__class_Oplus(V_a,c_Int_Onumber__class_Onumber__of(c_Int_OPls,T_a),T_a) = V_a ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__eq__eq_4,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a),V_c,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_frac__eq__eq_1,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.75      | c_HOL_Otimes__class_Otimes(V_x,V_z,T_a) != c_HOL_Otimes__class_Otimes(V_w,V_y,T_a)
% 9.71/9.75      | V_z = c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.75      | V_y = c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.75      | c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a) = c_HOL_Oinverse__class_Odivide(V_w,V_z,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_frac__eq__eq_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.75      | c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a) != c_HOL_Oinverse__class_Odivide(V_w,V_z,T_a)
% 9.71/9.75      | V_z = c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.75      | V_y = c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.75      | c_HOL_Otimes__class_Otimes(V_x,V_z,T_a) = c_HOL_Otimes__class_Otimes(V_w,V_y,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_eq__divide__eq_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Otimes__class_Otimes(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_c,T_a) = V_b
% 9.71/9.75      | V_c = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__eq__eq_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | V_b = c_HOL_Otimes__class_Otimes(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_c,T_a)
% 9.71/9.75      | V_c = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_eq__divide__eq_4,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Ozero__class_Ozero(T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a),V_c,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_eq__divide__imp_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.75      | V_c = c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.75      | V_a = c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_c,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__eq__imp_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.75      | V_c = c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.75      | c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_c,T_a) = V_a ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_eq__divide__eq_3,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | V_a = c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_c,T_a)
% 9.71/9.75      | V_c = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__eq__eq_3,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_c,T_a) = V_a
% 9.71/9.75      | V_c = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_mult__divide__mult__cancel__right_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) = c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a)
% 9.71/9.75      | V_c = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_mult__divide__mult__cancel__left_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a) = c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a)
% 9.71/9.75      | V_c = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__eq__eq__number__of1_1,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_Int_Onumber__class_Onumber__of(V_w,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.75      | c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__eq__eq__number__of_1,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_HOL_Oinverse__class_Odivide(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a) != c_Int_Onumber__class_Onumber__of(V_w,T_a)
% 9.71/9.75      | c_Int_Onumber__class_Onumber__of(V_w,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__eq__eq__number__of_2,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_Int_Onumber__class_Onumber__of(V_w,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.75      | c_HOL_Oinverse__class_Odivide(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a) = c_Int_Onumber__class_Onumber__of(V_w,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_eq__divide__eq__number__of_1,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_Int_Onumber__class_Onumber__of(V_w,T_a) != c_HOL_Oinverse__class_Odivide(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_Int_Onumber__class_Onumber__of(V_w,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_eq__divide__eq__number__of_2,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_Int_Onumber__class_Onumber__of(V_w,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.75      | c_Int_Onumber__class_Onumber__of(V_w,T_a) = c_HOL_Oinverse__class_Odivide(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_eq__divide__eq__number__of1_2,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | ~ class_Int_Onumber(T_a)
% 9.71/9.75      | c_Int_Onumber__class_Onumber__of(V_w,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.75      | c_HOL_Ozero__class_Ozero(T_a) = c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_not__real__square__gt__zero_0,axiom,
% 9.71/9.75      ( V_x = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_x,V_x,tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_not__real__square__gt__zero_1,axiom,
% 9.71/9.75      ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_real__mult__order_0,axiom,
% 9.71/9.75      ( c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_x,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_y,tc_RealDef_Oreal)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_x,tc_RealDef_Oreal) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_real__mult__less__mono2_0,axiom,
% 9.71/9.75      ( c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_z,V_x,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_z,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_x,V_y,tc_RealDef_Oreal)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_z,tc_RealDef_Oreal) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_real__mult__less__iff1_1,axiom,
% 9.71/9.75      ( c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_x,V_z,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_y,V_z,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_x,V_y,tc_RealDef_Oreal)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_z,tc_RealDef_Oreal) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_real__mult__less__iff1_0,axiom,
% 9.71/9.75      ( c_HOL_Oord__class_Oless(V_x,V_y,tc_RealDef_Oreal)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_x,V_z,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_y,V_z,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_z,tc_RealDef_Oreal) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_not__real__of__nat__less__zero_0,axiom,
% 9.71/9.75      ~ c_HOL_Oord__class_Oless(c_RealDef_Oreal(V_n,tc_nat),c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_lemma__MVT_0,axiom,
% 9.71/9.75      c_HOL_Ominus__class_Ominus(hAPP(V_f,V_a),c_HOL_Otimes__class_Otimes(c_HOL_Oinverse__class_Odivide(c_HOL_Ominus__class_Ominus(hAPP(V_f,V_b),hAPP(V_f,V_a),tc_RealDef_Oreal),c_HOL_Ominus__class_Ominus(V_b,V_a,tc_RealDef_Oreal),tc_RealDef_Oreal),V_a,tc_RealDef_Oreal),tc_RealDef_Oreal) = c_HOL_Ominus__class_Ominus(hAPP(V_f,V_b),c_HOL_Otimes__class_Otimes(c_HOL_Oinverse__class_Odivide(c_HOL_Ominus__class_Ominus(hAPP(V_f,V_b),hAPP(V_f,V_a),tc_RealDef_Oreal),c_HOL_Ominus__class_Ominus(V_b,V_a,tc_RealDef_Oreal),tc_RealDef_Oreal),V_b,tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_pi__gt__zero_0,axiom,
% 9.71/9.75      c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_Transcendental_Opi,tc_RealDef_Oreal) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_pi__not__less__zero_0,axiom,
% 9.71/9.75      ~ c_HOL_Oord__class_Oless(c_Transcendental_Opi,c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_real__average__minus__second_0,axiom,
% 9.71/9.75      c_HOL_Ominus__class_Ominus(c_HOL_Oinverse__class_Odivide(c_HOL_Oplus__class_Oplus(V_b,V_a,tc_RealDef_Oreal),c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal),V_a,tc_RealDef_Oreal) = c_HOL_Oinverse__class_Odivide(c_HOL_Ominus__class_Ominus(V_b,V_a,tc_RealDef_Oreal),c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_real__average__minus__first_0,axiom,
% 9.71/9.75      c_HOL_Ominus__class_Ominus(c_HOL_Oinverse__class_Odivide(c_HOL_Oplus__class_Oplus(V_a,V_b,tc_RealDef_Oreal),c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal),V_a,tc_RealDef_Oreal) = c_HOL_Oinverse__class_Odivide(c_HOL_Ominus__class_Ominus(V_b,V_a,tc_RealDef_Oreal),c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_real__le__add__half__cancel_1,axiom,
% 9.71/9.75      ( c_lessequals(c_HOL_Oplus__class_Oplus(V_x,c_HOL_Oinverse__class_Odivide(V_y,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal),V_y,tc_RealDef_Oreal)
% 9.71/9.75      | ~ c_lessequals(V_x,c_HOL_Oinverse__class_Odivide(V_y,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_real__le__add__half__cancel_0,axiom,
% 9.71/9.75      ( c_lessequals(V_x,c_HOL_Oinverse__class_Odivide(V_y,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.75      | ~ c_lessequals(c_HOL_Oplus__class_Oplus(V_x,c_HOL_Oinverse__class_Odivide(V_y,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal),V_y,tc_RealDef_Oreal) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__strict__left__mono__neg_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_c,V_a,T_a),c_HOL_Oinverse__class_Odivide(V_c,V_b,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__strict__left__mono_0,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_c,V_a,T_a),c_HOL_Oinverse__class_Odivide(V_c,V_b,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_b,V_a,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_less__divide__eq_7,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_less__divide__eq_5,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_less__divide__eq_4,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_less__divide__eq_1,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__less__eq_7,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__less__eq_5,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__less__eq_4,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_divide__less__eq_1,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_less__divide__eq_9,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.75      | c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 9.71/9.75      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a) ) ).
% 9.71/9.75  
% 9.71/9.75  cnf(cls_less__divide__eq_8,axiom,
% 9.71/9.75      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.75      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq_9,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq_8,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_mult__imp__less__div__pos_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_z,c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_z,V_y,T_a),V_x,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_mult__imp__div__pos__less_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),V_z,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_x,c_HOL_Otimes__class_Otimes(V_z,V_y,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__divide__eq_6,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__divide__eq_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq_6,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__divide__eq__number__of_3,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__divide__eq__number__of_2,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq__number__of_3,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq__number__of_2,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__divide__eq__number__of1_3,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__divide__eq__number__of1_2,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq__number__of1_3,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_a,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq__number__of1_2,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__eq__eq__number__of_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a) != c_Int_Onumber__class_Onumber__of(V_w,T_a)
% 9.71/9.76      | V_b = c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a)
% 9.71/9.76      | V_c = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__eq__eq__number__of1_4,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__eq__eq__number__of_3,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_c,T_a) = c_Int_Onumber__class_Onumber__of(V_w,T_a)
% 9.71/9.76      | V_c = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_eq__divide__eq__number__of1_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Otimes__class_Otimes(c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) = V_b
% 9.71/9.76      | c_Int_Onumber__class_Onumber__of(V_w,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__eq__eq__number__of1_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | V_b = c_HOL_Otimes__class_Otimes(c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.76      | c_Int_Onumber__class_Onumber__of(V_w,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_eq__divide__eq__number__of_3,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_Int_Onumber__class_Onumber__of(V_w,T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_c,T_a)
% 9.71/9.76      | V_c = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__eq__eq__number__of_4,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_Int_Onumber__class_Onumber__of(V_w,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.76      | c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_c,T_a) = c_Int_Onumber__class_Onumber__of(V_w,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_eq__divide__eq__number__of_4,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_Int_Onumber__class_Onumber__of(V_w,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.76      | c_Int_Onumber__class_Onumber__of(V_w,T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_c,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_eq__divide__eq__number__of_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_Int_Onumber__class_Onumber__of(V_w,T_a) != c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a)
% 9.71/9.76      | c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a) = V_b
% 9.71/9.76      | V_c = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_eq__divide__eq__number__of1_3,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | V_a = c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.76      | c_Int_Onumber__class_Onumber__of(V_w,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__eq__eq__number__of1_3,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) = V_a
% 9.71/9.76      | c_Int_Onumber__class_Onumber__of(V_w,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_eq__divide__eq__number__of1_4,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Ozero__class_Ozero(T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__Numeral0_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber__ring(T_a)
% 9.71/9.76      | c_HOL_Oinverse__class_Odivide(V_x,c_Int_Onumber__class_Onumber__of(c_Int_OPls,T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_pi__half__ge__zero_0,axiom,
% 9.71/9.76      c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Oinverse__class_Odivide(c_Transcendental_Opi,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_arctan_0,axiom,
% 9.71/9.76      c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(c_HOL_Oinverse__class_Odivide(c_Transcendental_Opi,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal),c_Transcendental_Oarctan(V_y),tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_minus__pi__half__less__zero_0,axiom,
% 9.71/9.76      c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(c_HOL_Oinverse__class_Odivide(c_Transcendental_Opi,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal),c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_lemma__tan__total1_0,axiom,
% 9.71/9.76      c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(c_HOL_Oinverse__class_Odivide(c_Transcendental_Opi,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal),c_Transcendental_Osko__Transcendental__Xlemma__tan__total1__1__1(V_y),tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_tan__total_0,axiom,
% 9.71/9.76      c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(c_HOL_Oinverse__class_Odivide(c_Transcendental_Opi,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal),c_Transcendental_Osko__Transcendental__Xtan__total__1__1(V_y),tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__divide__eq__number__of_8,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_b,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__divide__eq__number__of_4,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__divide__eq__number__of_1,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__divide__eq__number__of_9,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_b,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__divide__eq__number__of_7,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_b,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__divide__eq__number__of_5,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq__number__of_9,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_b,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_group__add__class_Odiff__0_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.76      | c_HOL_Ominus__class_Ominus(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) = c_HOL_Ouminus__class_Ouminus(V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__sum__squares__cancel__a_0,axiom,
% 9.71/9.76      ( c_HOL_Otimes__class_Otimes(V_x,V_x,tc_RealDef_Oreal) != c_HOL_Ouminus__class_Ouminus(c_HOL_Otimes__class_Otimes(V_y,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.76      | V_x = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__sum__squares__cancel__a_1,axiom,
% 9.71/9.76      ( c_HOL_Otimes__class_Otimes(V_x,V_x,tc_RealDef_Oreal) != c_HOL_Ouminus__class_Ouminus(c_HOL_Otimes__class_Otimes(V_y,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.76      | V_y = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_class__semiring_Osemiring__rules_I20_J_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.71/9.76      | c_HOL_Oplus__class_Oplus(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),c_HOL_Oplus__class_Oplus(V_c,V_d,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_d,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__diff__def_0,axiom,
% 9.71/9.76      c_HOL_Ominus__class_Ominus(V_r,V_s,tc_RealDef_Oreal) = c_HOL_Oplus__class_Oplus(V_r,c_HOL_Ouminus__class_Ouminus(V_s,tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_diff__def_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 9.71/9.76      | c_HOL_Ominus__class_Ominus(V_x,V_y,T_a) = c_HOL_Oplus__class_Oplus(V_x,c_HOL_Ouminus__class_Ouminus(V_y,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_class__ring_Osub__add_0,axiom,
% 9.71/9.76      ( ~ class_Int_Onumber__ring(T_a)
% 9.71/9.76      | c_HOL_Ominus__class_Ominus(V_x,V_y,T_a) = c_HOL_Oplus__class_Oplus(V_x,c_HOL_Ouminus__class_Ouminus(V_y,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_diff__minus_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.76      | c_HOL_Ominus__class_Ominus(V_a,V_b,T_a) = c_HOL_Oplus__class_Oplus(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_ab__diff__minus_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 9.71/9.76      | c_HOL_Ominus__class_Ominus(V_a,V_b,T_a) = c_HOL_Oplus__class_Oplus(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_nonzero__minus__divide__divide_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.76      | c_HOL_Oinverse__class_Odivide(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) = c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a)
% 9.71/9.76      | V_b = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__less__sum__gt__zero_0,axiom,
% 9.71/9.76      ( c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Oplus__class_Oplus(V_S,c_HOL_Ouminus__class_Ouminus(V_W,tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_W,V_S,tc_RealDef_Oreal) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__sum__gt__zero__less_0,axiom,
% 9.71/9.76      ( c_HOL_Oord__class_Oless(V_W,V_S,tc_RealDef_Oreal)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Oplus__class_Oplus(V_S,c_HOL_Ouminus__class_Ouminus(V_W,tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_class__ringb_Oadd__cancel_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oidom(T_a)
% 9.71/9.76      | ~ class_Int_Onumber__ring(T_a)
% 9.71/9.76      | c_HOL_Oplus__class_Oplus(V_x,V_y,T_a) != c_HOL_Oplus__class_Oplus(V_x,V_z,T_a)
% 9.71/9.76      | V_y = V_z ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_add__imp__eq_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Ocancel__ab__semigroup__add(T_a)
% 9.71/9.76      | c_HOL_Oplus__class_Oplus(V_a,V_b,T_a) != c_HOL_Oplus__class_Oplus(V_a,V_c,T_a)
% 9.71/9.76      | V_b = V_c ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_add__left__cancel_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Ocancel__semigroup__add(T_a)
% 9.71/9.76      | c_HOL_Oplus__class_Oplus(V_a,V_b,T_a) != c_HOL_Oplus__class_Oplus(V_a,V_c,T_a)
% 9.71/9.76      | V_b = V_c ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_add__right__cancel_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Ocancel__semigroup__add(T_a)
% 9.71/9.76      | c_HOL_Oplus__class_Oplus(V_b,V_a,T_a) != c_HOL_Oplus__class_Oplus(V_c,V_a,T_a)
% 9.71/9.76      | V_b = V_c ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_mult__le__0__iff_4,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_mult__le__0__iff_5,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.76      | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_split__mult__neg__le_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Opordered__cancel__semiring(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_split__mult__neg__le_1,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Opordered__cancel__semiring(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.76      | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_mult__nonneg__nonpos_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Opordered__cancel__semiring(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_mult__nonpos__nonneg_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Opordered__cancel__semiring(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.76      | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_mult__nonneg__nonpos2_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Opordered__cancel__semiring(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Otimes__class_Otimes(V_b,V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_add__nonneg__pos_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Opordered__comm__monoid__add(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_add__pos__nonneg_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Opordered__comm__monoid__add(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_neg__0__le__iff__le_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.71/9.76      | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_neg__0__le__iff__le_1,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_add__cancel__21_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 9.71/9.76      | c_HOL_Oplus__class_Oplus(V_x,c_HOL_Oplus__class_Oplus(V_y,V_z,T_a),T_a) != c_HOL_Oplus__class_Oplus(V_y,V_u,T_a)
% 9.71/9.76      | c_HOL_Oplus__class_Oplus(V_x,V_z,T_a) = V_u ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_add__nonneg__nonneg_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Opordered__comm__monoid__add(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_add__mono_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Opordered__ab__semigroup__add(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_d,T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(V_c,V_d,T_a)
% 9.71/9.76      | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_zero__le__double__add__iff__zero__le__single__add_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(V_a,V_a,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_zero__le__double__add__iff__zero__le__single__add_1,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(V_a,V_a,T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_add__strict__increasing_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 9.71/9.76      | ~ class_OrderedGroup_Ocomm__monoid__add(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_b,c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(V_b,V_c,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_zero__le__power__iff_1,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_Power_Opower__class_Opower(V_a,V_n,T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_zero__le__power_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__semidom(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_Power_Opower__class_Opower(V_a,V_n,T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_le__minus__self__iff_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 9.71/9.76      | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(V_a,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_le__minus__self__iff_1,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 9.71/9.76      | c_lessequals(V_a,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_minus__le__self__iff_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_minus__le__self__iff_1,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_a,T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__eq__neg__nonpos_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Oordered__ab__group__add(T_a)
% 9.71/9.76      | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(V_a,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__eq__neg__nonpos_1,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Oordered__ab__group__add(T_a)
% 9.71/9.76      | c_lessequals(V_a,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_neg__less__eq__nonneg_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Oordered__ab__group__add(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_neg__less__eq__nonneg_1,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Oordered__ab__group__add(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_a,T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_eq__add__iff1_1,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oring(T_a)
% 9.71/9.76      | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),V_c,T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),V_e,T_a),V_c,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__add__less__0__iff_0,axiom,
% 9.71/9.76      ( c_HOL_Oord__class_Oless(V_y,c_HOL_Ouminus__class_Ouminus(V_x,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_x,V_y,tc_RealDef_Oreal),c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__add__less__0__iff_1,axiom,
% 9.71/9.76      ( c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_x,V_y,tc_RealDef_Oreal),c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_y,c_HOL_Ouminus__class_Ouminus(V_x,tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_eq__add__iff1_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oring(T_a)
% 9.71/9.76      | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),V_c,T_a) != c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_d,T_a)
% 9.71/9.76      | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),V_e,T_a),V_c,T_a) = V_d ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_eq__add__iff2_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oring(T_a)
% 9.71/9.76      | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),V_c,T_a) != c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_d,T_a)
% 9.71/9.76      | V_c = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_b,V_a,T_a),V_e,T_a),V_d,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_class__semiring_Osemiring__rules_I24_J_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.71/9.76      | c_HOL_Oplus__class_Oplus(V_a,V_c,T_a) = c_HOL_Oplus__class_Oplus(V_c,V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_class__semiring_Oadd__c_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.71/9.76      | c_HOL_Oplus__class_Oplus(V_x,V_y,T_a) = c_HOL_Oplus__class_Oplus(V_y,V_x,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_comm__monoid__add_Omult__commute_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Ocomm__monoid__add(T_a)
% 9.71/9.76      | c_HOL_Oplus__class_Oplus(V_a,V_b,T_a) = c_HOL_Oplus__class_Oplus(V_b,V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__le__0__iff_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__le__0__iff_1,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__le__0__iff_2,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__le__0__iff_3,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.76      | c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_zero__less__power_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__semidom(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Power_Opower__class_Opower(V_a,V_n,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__add__eq__0__iff_0,axiom,
% 9.71/9.76      ( c_HOL_Oplus__class_Oplus(V_x,V_y,tc_RealDef_Oreal) != c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal)
% 9.71/9.76      | V_y = c_HOL_Ouminus__class_Ouminus(V_x,tc_RealDef_Oreal) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_minus__unique_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.76      | c_HOL_Oplus__class_Oplus(V_a,V_b,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.76      | c_HOL_Ouminus__class_Ouminus(V_a,T_a) = V_b ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_eq__neg__iff__add__eq__0_1,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.76      | c_HOL_Oplus__class_Oplus(V_a,V_b,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 9.71/9.76      | V_a = c_HOL_Ouminus__class_Ouminus(V_b,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_add__pos__pos_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Opordered__comm__monoid__add(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__le__eq__diff_1,axiom,
% 9.71/9.76      ( c_lessequals(V_x,V_y,tc_RealDef_Oreal)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ominus__class_Ominus(V_x,V_y,tc_RealDef_Oreal),c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__le__eq__diff_0,axiom,
% 9.71/9.76      ( c_lessequals(c_HOL_Ominus__class_Ominus(V_x,V_y,tc_RealDef_Oreal),c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.76      | ~ c_lessequals(V_x,V_y,tc_RealDef_Oreal) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_le__iff__diff__le__0_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_le__iff__diff__le__0_1,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.71/9.76      | c_lessequals(V_a,V_b,T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_add__cancel__end_1,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 9.71/9.76      | c_HOL_Oplus__class_Oplus(c_HOL_Ouminus__class_Ouminus(V_z,T_a),c_HOL_Oplus__class_Oplus(V_y,V_z,T_a),T_a) = V_y ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_minus__add__cancel_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.76      | c_HOL_Oplus__class_Oplus(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),T_a) = V_b ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__0__le__divide__iff_2,axiom,
% 9.71/9.76      ( c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Oinverse__class_Odivide(V_x,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_x,tc_RealDef_Oreal)
% 9.71/9.76      | ~ c_lessequals(V_x,c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__0__le__divide__iff_3,axiom,
% 9.71/9.76      ( c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Oinverse__class_Odivide(V_x,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.76      | ~ c_lessequals(V_y,c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.76      | ~ c_lessequals(V_x,c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__0__le__divide__iff_4,axiom,
% 9.71/9.76      ( c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Oinverse__class_Odivide(V_x,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_x,tc_RealDef_Oreal)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_y,tc_RealDef_Oreal) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__0__le__divide__iff_5,axiom,
% 9.71/9.76      ( c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Oinverse__class_Odivide(V_x,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.76      | ~ c_lessequals(V_y,c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_y,tc_RealDef_Oreal) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_zero__le__divide__iff_4,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_zero__le__divide__iff_5,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__iff__diff__less__0_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__iff__diff__less__0_1,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_neg__0__equal__iff__equal_1,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.76      | c_HOL_Ozero__class_Ozero(T_a) = c_HOL_Ouminus__class_Ouminus(c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_minus__zero_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.76      | c_HOL_Ouminus__class_Ouminus(c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_neg__equal__zero_1,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Oordered__ab__group__add(T_a)
% 9.71/9.76      | c_HOL_Ouminus__class_Ouminus(c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_double__add__le__zero__iff__single__add__le__zero_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 9.71/9.76      | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(c_HOL_Oplus__class_Oplus(V_a,V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_double__add__le__zero__iff__single__add__le__zero_1,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Oplus__class_Oplus(V_a,V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_Lim_Ominus__diff__minus_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 9.71/9.76      | c_HOL_Ominus__class_Ominus(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) = c_HOL_Ouminus__class_Ouminus(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_nonzero__power__divide_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.76      | c_Power_Opower__class_Opower(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),V_n,T_a) = c_HOL_Oinverse__class_Odivide(c_Power_Opower__class_Opower(V_a,V_n,T_a),c_Power_Opower__class_Opower(V_b,V_n,T_a),T_a)
% 9.71/9.76      | V_b = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_pi__ge__zero_0,axiom,
% 9.71/9.76      c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_Transcendental_Opi,tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_order__eq__refl_0,axiom,
% 9.71/9.76      ( ~ class_Orderings_Opreorder(T_a)
% 9.71/9.76      | c_lessequals(V_x,V_x,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_order__eq__iff_0,axiom,
% 9.71/9.76      ( ~ class_Orderings_Oorder(T_a)
% 9.71/9.76      | c_lessequals(V_x,V_x,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__le__trans_0,axiom,
% 9.71/9.76      ( c_lessequals(V_i,V_k,tc_RealDef_Oreal)
% 9.71/9.76      | ~ c_lessequals(V_j,V_k,tc_RealDef_Oreal)
% 9.71/9.76      | ~ c_lessequals(V_i,V_j,tc_RealDef_Oreal) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__le__refl_0,axiom,
% 9.71/9.76      c_lessequals(V_w,V_w,tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_le__add__right__mono_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.71/9.76      | c_lessequals(V_a,c_HOL_Oplus__class_Oplus(V_b,V_d,T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(V_c,V_d,T_a)
% 9.71/9.76      | ~ c_lessequals(V_a,c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_order__trans_0,axiom,
% 9.71/9.76      ( ~ class_Orderings_Opreorder(T_a)
% 9.71/9.76      | c_lessequals(V_x,V_z,T_a)
% 9.71/9.76      | ~ c_lessequals(V_y,V_z,T_a)
% 9.71/9.76      | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_add__nonpos__nonpos_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Opordered__comm__monoid__add(T_a)
% 9.71/9.76      | c_lessequals(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_xt1_I6_J_0,axiom,
% 9.71/9.76      ( ~ class_Orderings_Oorder(T_a)
% 9.71/9.76      | c_lessequals(V_z,V_x,T_a)
% 9.71/9.76      | ~ c_lessequals(V_z,V_y,T_a)
% 9.71/9.76      | ~ c_lessequals(V_y,V_x,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__two__squares__add__zero__iff_2,axiom,
% 9.71/9.76      c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal) = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_sum__squares__eq__zero__iff_2,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.76      | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a),c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_neg__0__less__iff__less_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_neg__0__less__iff__less_1,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__minus__self__iff_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__minus__self__iff_1,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_a,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_minus__add_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 9.71/9.76      | c_HOL_Ouminus__class_Ouminus(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Ouminus__class_Ouminus(V_b,T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_minus__add__distrib_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 9.71/9.76      | c_HOL_Ouminus__class_Ouminus(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_linorder__linear_0,axiom,
% 9.71/9.76      ( ~ class_Orderings_Olinorder(T_a)
% 9.71/9.76      | c_lessequals(V_y,V_x,T_a)
% 9.71/9.76      | c_lessequals(V_x,V_y,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__le__linear_0,axiom,
% 9.71/9.76      ( c_lessequals(V_w,V_z,tc_RealDef_Oreal)
% 9.71/9.76      | c_lessequals(V_z,V_w,tc_RealDef_Oreal) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__divide__eq__number__of1_5,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq__number__of1_5,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_a,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_b,T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq__number__of_7,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq__number__of_5,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_b,T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__divide__eq__number__of1_4,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__divide__eq__number__of1_1,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq__number__of1_4,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_a,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_b,T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq__number__of1_1,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_b,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq__number__of_6,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq__number__of_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__divide__eq__number__of_6,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_b,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__divide__eq__number__of_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_b,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq__number__of_4,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_b,T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq__number__of_1,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_b,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__divide__eq__number__of1_9,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_b,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq__number__of1_9,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_a,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_b,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq__number__of_8,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),V_b,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(V_w,T_a),V_c,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__divide__eq__number__of1_7,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_b,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq__number__of1_7,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_a,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__divide__eq__number__of1_8,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_b,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq__number__of1_8,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_a,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_Int_Onumber__class_Onumber__of(V_w,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_b,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__divide__eq__number__of1_6,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_b,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_less__divide__eq__number__of1_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_b,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq__number__of1_6,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_a,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__less__eq__number__of1_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,c_Int_Onumber__class_Onumber__of(V_w,T_a),T_a),V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_FFT__Mirabelle_Oroot__def_0,axiom,
% 9.71/9.76      c_FFT__Mirabelle_Oroot(V_n) = c_Complex_Ocis(c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),c_Transcendental_Opi,tc_RealDef_Oreal),c_RealDef_Oreal(V_n,tc_nat),tc_RealDef_Oreal)) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_mult__2_0,axiom,
% 9.71/9.76      ( ~ class_Int_Onumber__ring(T_a)
% 9.71/9.76      | c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),T_a),V_z,T_a) = c_HOL_Oplus__class_Oplus(V_z,V_z,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_mult__2__right_0,axiom,
% 9.71/9.76      ( ~ class_Int_Onumber__ring(T_a)
% 9.71/9.76      | c_HOL_Otimes__class_Otimes(V_z,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),T_a),T_a) = c_HOL_Oplus__class_Oplus(V_z,V_z,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__minus__half__eq_0,axiom,
% 9.71/9.76      c_HOL_Ominus__class_Ominus(V_x,c_HOL_Oinverse__class_Odivide(V_x,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal) = c_HOL_Oinverse__class_Odivide(V_x,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__sum__of__halves_0,axiom,
% 9.71/9.76      c_HOL_Oplus__class_Oplus(c_HOL_Oinverse__class_Odivide(V_x,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal),c_HOL_Oinverse__class_Odivide(V_x,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal) = V_x ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_pi__ge__two_0,axiom,
% 9.71/9.76      c_lessequals(c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),c_Transcendental_Opi,tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_half__gt__zero_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber__ring(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_r,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),T_a),T_a),T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_r,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_half__gt__zero__iff_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | ~ class_Int_Onumber__ring(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_r,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_r,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),T_a),T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__less__half__sum_0,axiom,
% 9.71/9.76      ( c_HOL_Oord__class_Oless(V_x,c_HOL_Oinverse__class_Odivide(c_HOL_Oplus__class_Oplus(V_x,V_y,tc_RealDef_Oreal),c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_x,V_y,tc_RealDef_Oreal) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__gt__half__sum_0,axiom,
% 9.71/9.76      ( c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(c_HOL_Oplus__class_Oplus(V_x,V_y,tc_RealDef_Oreal),c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal),V_y,tc_RealDef_Oreal)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_x,V_y,tc_RealDef_Oreal) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_two__realpow__gt_0,axiom,
% 9.71/9.76      c_HOL_Oord__class_Oless(c_RealDef_Oreal(V_n,tc_nat),c_Power_Opower__class_Opower(c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),V_n,tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_pi__half__neq__zero_0,axiom,
% 9.71/9.76      c_HOL_Oinverse__class_Odivide(c_Transcendental_Opi,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal) != c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_pi__half__le__two_0,axiom,
% 9.71/9.76      c_lessequals(c_HOL_Oinverse__class_Odivide(c_Transcendental_Opi,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal),c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_m2pi__less__pi_0,axiom,
% 9.71/9.76      c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),c_Transcendental_Opi,tc_RealDef_Oreal),tc_RealDef_Oreal),c_Transcendental_Opi,tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_pi__half__gt__zero_0,axiom,
% 9.71/9.76      c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Oinverse__class_Odivide(c_Transcendental_Opi,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_tan__total_1,axiom,
% 9.71/9.76      c_HOL_Oord__class_Oless(c_Transcendental_Osko__Transcendental__Xtan__total__1__1(V_y),c_HOL_Oinverse__class_Odivide(c_Transcendental_Opi,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_arctan_1,axiom,
% 9.71/9.76      c_HOL_Oord__class_Oless(c_Transcendental_Oarctan(V_y),c_HOL_Oinverse__class_Odivide(c_Transcendental_Opi,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_lemma__tan__total1_1,axiom,
% 9.71/9.76      c_HOL_Oord__class_Oless(c_Transcendental_Osko__Transcendental__Xlemma__tan__total1__1__1(V_y),c_HOL_Oinverse__class_Odivide(c_Transcendental_Opi,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real0_0,axiom,
% 9.71/9.76      c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(c_RealDef_Oreal(v_k,tc_nat),c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),c_Transcendental_Opi,tc_RealDef_Oreal),tc_RealDef_Oreal),c_RealDef_Oreal(v_n,tc_nat),tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_xt1_I9_J_0,axiom,
% 9.71/9.76      ( ~ class_Orderings_Oorder(T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_b,V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_not__less__iff__gr__or__eq_1,axiom,
% 9.71/9.76      ( ~ class_Orderings_Olinorder(T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_y,V_x,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_order__less__asym_H_0,axiom,
% 9.71/9.76      ( ~ class_Orderings_Opreorder(T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_order__less__asym_0,axiom,
% 9.71/9.76      ( ~ class_Orderings_Opreorder(T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_y,V_x,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_eq__divide__2__times__iff_1,axiom,
% 9.71/9.76      ( c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),V_x,tc_RealDef_Oreal) != c_HOL_Oinverse__class_Odivide(V_y,V_z,tc_RealDef_Oreal)
% 9.71/9.76      | V_x = c_HOL_Oinverse__class_Odivide(V_y,c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),V_z,tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_Bit0__Pls_0,axiom,
% 9.71/9.76      c_Int_OBit0(c_Int_OPls) = c_Int_OPls ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_order__less__irrefl_0,axiom,
% 9.71/9.76      ( ~ class_Orderings_Opreorder(T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_x,V_x,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__less__def_1,axiom,
% 9.71/9.76      ~ c_HOL_Oord__class_Oless(V_x,V_x,tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_order__less__le_1,axiom,
% 9.71/9.76      ( ~ class_Orderings_Oorder(T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_x,V_x,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_linorder__neq__iff_1,axiom,
% 9.71/9.76      ( ~ class_Orderings_Olinorder(T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_x,V_x,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_pi__half__less__two_0,axiom,
% 9.71/9.76      c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(c_Transcendental_Opi,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal),c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_rel__simps_I39_J_0,axiom,
% 9.71/9.76      c_Int_OPls != c_Int_OBit1(V_l) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__divide__square__eq_0,axiom,
% 9.71/9.76      c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(V_r,V_a,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_r,V_r,tc_RealDef_Oreal),tc_RealDef_Oreal) = c_HOL_Oinverse__class_Odivide(V_a,V_r,tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_rel__simps_I46_J_0,axiom,
% 9.71/9.76      c_Int_OBit1(V_k) != c_Int_OPls ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_rel__simps_I44_J_0,axiom,
% 9.71/9.76      ( c_Int_OBit0(V_k) != c_Int_OPls
% 9.71/9.76      | V_k = c_Int_OPls ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_rel__simps_I48_J_0,axiom,
% 9.71/9.76      ( c_Int_OBit0(V_k) != c_Int_OBit0(V_l)
% 9.71/9.76      | V_k = V_l ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__Numeral1_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.76      | ~ class_Int_Onumber__ring(T_a)
% 9.71/9.76      | c_HOL_Oinverse__class_Odivide(V_x,c_Int_Onumber__class_Onumber__of(c_Int_OBit1(c_Int_OPls),T_a),T_a) = V_x ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_divide__numeral__1_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.76      | ~ class_Int_Onumber__ring(T_a)
% 9.71/9.76      | c_HOL_Oinverse__class_Odivide(V_a,c_Int_Onumber__class_Onumber__of(c_Int_OBit1(c_Int_OPls),T_a),T_a) = V_a ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_eq__divide__2__times__iff_0,axiom,
% 9.71/9.76      c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),c_HOL_Oinverse__class_Odivide(V_y,c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),V_z,tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal) = c_HOL_Oinverse__class_Odivide(V_y,V_z,tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_pi__half__neq__two_0,axiom,
% 9.71/9.76      c_HOL_Oinverse__class_Odivide(c_Transcendental_Opi,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),tc_RealDef_Oreal) != c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_mult__less__cancel__right__disj_3,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_mult__less__cancel__left__disj_3,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_rel__simps_I50_J_0,axiom,
% 9.71/9.76      c_Int_OBit1(V_k) != c_Int_OBit0(V_l) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_rel__simps_I38_J_1,axiom,
% 9.71/9.76      c_Int_OPls = c_Int_OBit0(c_Int_OPls) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_class__semiring_Omul__a_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.71/9.76      | c_HOL_Otimes__class_Otimes(V_x,c_HOL_Otimes__class_Otimes(V_y,V_z,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_x,V_y,T_a),V_z,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__mult__assoc_0,axiom,
% 9.71/9.76      c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_z1,V_z2,tc_RealDef_Oreal),V_z3,tc_RealDef_Oreal) = c_HOL_Otimes__class_Otimes(V_z1,c_HOL_Otimes__class_Otimes(V_z2,V_z3,tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_class__semiring_Osemiring__rules_I19_J_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.71/9.76      | c_HOL_Otimes__class_Otimes(V_lx,c_HOL_Otimes__class_Otimes(V_rx,V_ry,T_a),T_a) = c_HOL_Otimes__class_Otimes(V_rx,c_HOL_Otimes__class_Otimes(V_lx,V_ry,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_class__semiring_Osemiring__rules_I18_J_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.71/9.76      | c_HOL_Otimes__class_Otimes(V_lx,c_HOL_Otimes__class_Otimes(V_rx,V_ry,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_lx,V_rx,T_a),V_ry,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_class__semiring_Osemiring__rules_I17_J_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.71/9.76      | c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_lx,V_ly,T_a),V_rx,T_a) = c_HOL_Otimes__class_Otimes(V_lx,c_HOL_Otimes__class_Otimes(V_ly,V_rx,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_class__semiring_Osemiring__rules_I16_J_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.71/9.76      | c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_lx,V_ly,T_a),V_rx,T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_lx,V_rx,T_a),V_ly,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_ab__semigroup__mult__class_Omult__ac_I1_J_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Oab__semigroup__mult(T_a)
% 9.71/9.76      | c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),V_c,T_a) = c_HOL_Otimes__class_Otimes(V_a,c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_mult__idem_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Oab__semigroup__idem__mult(T_a)
% 9.71/9.76      | c_HOL_Otimes__class_Otimes(V_x,V_x,T_a) = V_x ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_mult__left__idem_0,axiom,
% 9.71/9.76      ( ~ class_OrderedGroup_Oab__semigroup__idem__mult(T_a)
% 9.71/9.76      | c_HOL_Otimes__class_Otimes(V_x,c_HOL_Otimes__class_Otimes(V_x,V_y,T_a),T_a) = c_HOL_Otimes__class_Otimes(V_x,V_y,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_mult__frac__frac_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | c_HOL_Otimes__class_Otimes(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),c_HOL_Oinverse__class_Odivide(V_z,V_w,T_a),T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(V_x,V_z,T_a),c_HOL_Otimes__class_Otimes(V_y,V_w,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_linorder__neqE__ordered__idom_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_y,V_x,T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 9.71/9.76      | V_x = V_y ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_not__less__iff__gr__or__eq_0,axiom,
% 9.71/9.76      ( ~ class_Orderings_Olinorder(T_a)
% 9.71/9.76      | V_x = V_y
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_y,V_x,T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_linorder__antisym__conv3_0,axiom,
% 9.71/9.76      ( ~ class_Orderings_Olinorder(T_a)
% 9.71/9.76      | V_x = V_y
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_y,V_x,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_linorder__less__linear_0,axiom,
% 9.71/9.76      ( ~ class_Orderings_Olinorder(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_y,V_x,T_a)
% 9.71/9.76      | V_x = V_y
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_linorder__neqE_0,axiom,
% 9.71/9.76      ( ~ class_Orderings_Olinorder(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_y,V_x,T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 9.71/9.76      | V_x = V_y ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_class__semiring_Osemiring__rules_I15_J_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.71/9.76      | c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_lx,V_ly,T_a),c_HOL_Otimes__class_Otimes(V_rx,V_ry,T_a),T_a) = c_HOL_Otimes__class_Otimes(V_rx,c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_lx,V_ly,T_a),V_ry,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_class__semiring_Osemiring__rules_I14_J_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.71/9.76      | c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_lx,V_ly,T_a),c_HOL_Otimes__class_Otimes(V_rx,V_ry,T_a),T_a) = c_HOL_Otimes__class_Otimes(V_lx,c_HOL_Otimes__class_Otimes(V_ly,c_HOL_Otimes__class_Otimes(V_rx,V_ry,T_a),T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_class__semiring_Osemiring__rules_I13_J_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.71/9.76      | c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_lx,V_ly,T_a),c_HOL_Otimes__class_Otimes(V_rx,V_ry,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_lx,V_rx,T_a),c_HOL_Otimes__class_Otimes(V_ly,V_ry,T_a),T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_pi__less__4_0,axiom,
% 9.71/9.76      c_HOL_Oord__class_Oless(c_Transcendental_Opi,c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit0(c_Int_OBit1(c_Int_OPls))),tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__of__nat__inject_0,axiom,
% 9.71/9.76      ( c_RealDef_Oreal(V_n,tc_nat) != c_RealDef_Oreal(V_m,tc_nat)
% 9.71/9.76      | V_n = V_m ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_mult__numeral__1_0,axiom,
% 9.71/9.76      ( ~ class_Int_Onumber__ring(T_a)
% 9.71/9.76      | c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(c_Int_OBit1(c_Int_OPls),T_a),V_a,T_a) = V_a ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_mult__numeral__1__right_0,axiom,
% 9.71/9.76      ( ~ class_Int_Onumber__ring(T_a)
% 9.71/9.76      | c_HOL_Otimes__class_Otimes(V_a,c_Int_Onumber__class_Onumber__of(c_Int_OBit1(c_Int_OPls),T_a),T_a) = V_a ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_rel__simps_I38_J_0,axiom,
% 9.71/9.76      ( c_Int_OPls != c_Int_OBit0(V_l)
% 9.71/9.76      | c_Int_OPls = V_l ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_rel__simps_I51_J_0,axiom,
% 9.71/9.76      ( c_Int_OBit1(V_k) != c_Int_OBit1(V_l)
% 9.71/9.76      | V_k = V_l ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_class__semiring_Omul__c_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.71/9.76      | c_HOL_Otimes__class_Otimes(V_x,V_y,T_a) = c_HOL_Otimes__class_Otimes(V_y,V_x,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_real__mult__commute_0,axiom,
% 9.71/9.76      c_HOL_Otimes__class_Otimes(V_z,V_w,tc_RealDef_Oreal) = c_HOL_Otimes__class_Otimes(V_w,V_z,tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_class__semiring_Osemiring__rules_I7_J_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 9.71/9.76      | c_HOL_Otimes__class_Otimes(V_a,V_b,T_a) = c_HOL_Otimes__class_Otimes(V_b,V_a,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_xt1_I10_J_0,axiom,
% 9.71/9.76      ( ~ class_Orderings_Oorder(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_z,V_x,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_z,V_y,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_y,V_x,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_order__less__trans_0,axiom,
% 9.71/9.76      ( ~ class_Orderings_Opreorder(T_a)
% 9.71/9.76      | c_HOL_Oord__class_Oless(V_x,V_z,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_y,V_z,T_a)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_eq__number__of_0,axiom,
% 9.71/9.76      ( ~ class_Int_Oring__char__0(T_a)
% 9.71/9.76      | ~ class_Int_Onumber__ring(T_a)
% 9.71/9.76      | c_Int_Onumber__class_Onumber__of(V_x,T_a) != c_Int_Onumber__class_Onumber__of(V_y,T_a)
% 9.71/9.76      | V_x = V_y ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_rel__simps_I49_J_0,axiom,
% 9.71/9.76      c_Int_OBit0(V_k) != c_Int_OBit1(V_l) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_mult__frac__num_0,axiom,
% 9.71/9.76      ( ~ class_Ring__and__Field_Ofield(T_a)
% 9.71/9.76      | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 9.71/9.76      | c_HOL_Otimes__class_Otimes(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),V_z,T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(V_x,V_z,T_a),V_y,T_a) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_CHAINED_0,axiom,
% 9.71/9.76      ( c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(c_RealDef_Oreal(v_k,tc_nat),c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),c_Transcendental_Opi,tc_RealDef_Oreal),tc_RealDef_Oreal),c_RealDef_Oreal(v_n,tc_nat),tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),c_Transcendental_Opi,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),c_Transcendental_Opi,tc_RealDef_Oreal),c_RealDef_Oreal(v_n,tc_nat),tc_RealDef_Oreal),tc_RealDef_Oreal)
% 9.71/9.76      | ~ c_HOL_Oord__class_Oless(v_k,v_n,tc_nat) ) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_CHAINED_0_01,axiom,
% 9.71/9.76      c_HOL_Oord__class_Oless(v_k,v_n,tc_nat) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_CHAINED_0_02,axiom,
% 9.71/9.76      c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_nat),v_k,tc_nat) ).
% 9.71/9.76  
% 9.71/9.76  cnf(cls_conjecture_0,negated_conjecture,
% 9.71/9.76      ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(c_RealDef_Oreal(v_k,tc_nat),c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),c_Transcendental_Opi,tc_RealDef_Oreal),tc_RealDef_Oreal),c_RealDef_Oreal(v_n,tc_nat),tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(c_Int_Onumber__class_Onumber__of(c_Int_OBit0(c_Int_OBit1(c_Int_OPls)),tc_RealDef_Oreal),c_Transcendental_Opi,tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 9.71/9.76  
% 9.71/9.76  cnf(clsarity_nat__OrderedGroup_Opordered__cancel__ab__semigroup__add,axiom,
% 9.71/9.76      class_OrderedGroup_Opordered__cancel__ab__semigroup__add(tc_nat) ).
% 9.71/9.76  
% 9.71/9.76  cnf(clsarity_nat__OrderedGroup_Opordered__ab__semigroup__add__imp__le,axiom,
% 9.71/9.76      class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(tc_nat) ).
% 9.71/9.76  
% 9.71/9.76  cnf(clsarity_nat__Ring__and__Field_Oordered__comm__semiring__strict,axiom,
% 9.71/9.76      class_Ring__and__Field_Oordered__comm__semiring__strict(tc_nat) ).
% 9.71/9.76  
% 9.71/9.76  cnf(clsarity_nat__Ring__and__Field_Opordered__cancel__semiring,axiom,
% 9.71/9.76      class_Ring__and__Field_Opordered__cancel__semiring(tc_nat) ).
% 9.71/9.76  
% 9.71/9.76  cnf(clsarity_nat__Ring__and__Field_Oordered__semiring__strict,axiom,
% 9.71/9.76      class_Ring__and__Field_Oordered__semiring__strict(tc_nat) ).
% 9.71/9.76  
% 9.71/9.76  cnf(clsarity_nat__OrderedGroup_Opordered__ab__semigroup__add,axiom,
% 9.71/9.76      class_OrderedGroup_Opordered__ab__semigroup__add(tc_nat) ).
% 9.71/9.76  
% 9.71/9.76  cnf(clsarity_nat__OrderedGroup_Opordered__comm__monoid__add,axiom,
% 9.71/9.76      class_OrderedGroup_Opordered__comm__monoid__add(tc_nat) ).
% 9.71/9.76  
% 9.71/9.76  cnf(clsarity_nat__OrderedGroup_Ocancel__ab__semigroup__add,axiom,
% 9.71/9.76      class_OrderedGroup_Ocancel__ab__semigroup__add(tc_nat) ).
% 9.71/9.76  
% 9.71/9.76  cnf(clsarity_nat__OrderedGroup_Ocancel__semigroup__add,axiom,
% 9.71/9.76      class_OrderedGroup_Ocancel__semigroup__add(tc_nat) ).
% 9.71/9.76  
% 9.71/9.76  cnf(clsarity_nat__Ring__and__Field_Opordered__semiring,axiom,
% 9.71/9.76      class_Ring__and__Field_Opordered__semiring(tc_nat) ).
% 9.71/9.76  
% 9.71/9.76  cnf(clsarity_nat__Ring__and__Field_Oordered__semiring,axiom,
% 9.71/9.76      class_Ring__and__Field_Oordered__semiring(tc_nat) ).
% 9.71/9.76  
% 9.71/9.76  cnf(clsarity_nat__Ring__and__Field_Ono__zero__divisors,axiom,
% 9.71/9.76      class_Ring__and__Field_Ono__zero__divisors(tc_nat) ).
% 9.71/9.76  
% 9.71/9.76  cnf(clsarity_nat__Ring__and__Field_Oordered__semidom,axiom,
% 9.71/9.76      class_Ring__and__Field_Oordered__semidom(tc_nat) ).
% 9.71/9.76  
% 9.71/9.76  cnf(clsarity_nat__Ring__and__Field_Ocomm__semiring__1,axiom,
% 9.71/9.76      class_Ring__and__Field_Ocomm__semiring__1(tc_nat) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_nat__OrderedGroup_Oab__semigroup__mult,axiom,
% 9.71/9.77      class_OrderedGroup_Oab__semigroup__mult(tc_nat) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_nat__OrderedGroup_Ocomm__monoid__mult,axiom,
% 9.71/9.77      class_OrderedGroup_Ocomm__monoid__mult(tc_nat) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_nat__OrderedGroup_Oab__semigroup__add,axiom,
% 9.71/9.77      class_OrderedGroup_Oab__semigroup__add(tc_nat) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_nat__Ring__and__Field_Ocomm__semiring,axiom,
% 9.71/9.77      class_Ring__and__Field_Ocomm__semiring(tc_nat) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_nat__OrderedGroup_Ocomm__monoid__add,axiom,
% 9.71/9.77      class_OrderedGroup_Ocomm__monoid__add(tc_nat) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_nat__Ring__and__Field_Ozero__neq__one,axiom,
% 9.71/9.77      class_Ring__and__Field_Ozero__neq__one(tc_nat) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_nat__Ring__and__Field_Omult__mono1,axiom,
% 9.71/9.77      class_Ring__and__Field_Omult__mono1(tc_nat) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_nat__Ring__and__Field_Omult__zero,axiom,
% 9.71/9.77      class_Ring__and__Field_Omult__zero(tc_nat) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_nat__Ring__and__Field_Omult__mono,axiom,
% 9.71/9.77      class_Ring__and__Field_Omult__mono(tc_nat) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_nat__OrderedGroup_Omonoid__mult,axiom,
% 9.71/9.77      class_OrderedGroup_Omonoid__mult(tc_nat) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_nat__Ring__and__Field_Osemiring,axiom,
% 9.71/9.77      class_Ring__and__Field_Osemiring(tc_nat) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_nat__OrderedGroup_Omonoid__add,axiom,
% 9.71/9.77      class_OrderedGroup_Omonoid__add(tc_nat) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_nat__Orderings_Opreorder,axiom,
% 9.71/9.77      class_Orderings_Opreorder(tc_nat) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_nat__Orderings_Olinorder,axiom,
% 9.71/9.77      class_Orderings_Olinorder(tc_nat) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_nat__Orderings_Oorder,axiom,
% 9.71/9.77      class_Orderings_Oorder(tc_nat) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_nat__Power_Opower,axiom,
% 9.71/9.77      class_Power_Opower(tc_nat) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_nat__Int_Onumber,axiom,
% 9.71/9.77      class_Int_Onumber(tc_nat) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__OrderedGroup_Opordered__cancel__ab__semigroup__add,axiom,
% 9.71/9.77      class_OrderedGroup_Opordered__cancel__ab__semigroup__add(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__OrderedGroup_Opordered__ab__semigroup__add__imp__le,axiom,
% 9.71/9.77      class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Ring__and__Field_Oordered__comm__semiring__strict,axiom,
% 9.71/9.77      class_Ring__and__Field_Oordered__comm__semiring__strict(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Ring__and__Field_Opordered__cancel__semiring,axiom,
% 9.71/9.77      class_Ring__and__Field_Opordered__cancel__semiring(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Ring__and__Field_Oring__1__no__zero__divisors,axiom,
% 9.71/9.77      class_Ring__and__Field_Oring__1__no__zero__divisors(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Ring__and__Field_Oordered__semiring__strict,axiom,
% 9.71/9.77      class_Ring__and__Field_Oordered__semiring__strict(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__OrderedGroup_Opordered__ab__semigroup__add,axiom,
% 9.71/9.77      class_OrderedGroup_Opordered__ab__semigroup__add(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__OrderedGroup_Opordered__comm__monoid__add,axiom,
% 9.71/9.77      class_OrderedGroup_Opordered__comm__monoid__add(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Ring__and__Field_Oring__no__zero__divisors,axiom,
% 9.71/9.77      class_Ring__and__Field_Oring__no__zero__divisors(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__OrderedGroup_Ocancel__ab__semigroup__add,axiom,
% 9.71/9.77      class_OrderedGroup_Ocancel__ab__semigroup__add(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Ring__and__Field_Oordered__ring__strict,axiom,
% 9.71/9.77      class_Ring__and__Field_Oordered__ring__strict(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__OrderedGroup_Opordered__ab__group__add,axiom,
% 9.71/9.77      class_OrderedGroup_Opordered__ab__group__add(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__OrderedGroup_Olordered__ab__group__add,axiom,
% 9.71/9.77      class_OrderedGroup_Olordered__ab__group__add(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__OrderedGroup_Oordered__ab__group__add,axiom,
% 9.71/9.77      class_OrderedGroup_Oordered__ab__group__add(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__OrderedGroup_Ocancel__semigroup__add,axiom,
% 9.71/9.77      class_OrderedGroup_Ocancel__semigroup__add(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Ring__and__Field_Opordered__semiring,axiom,
% 9.71/9.77      class_Ring__and__Field_Opordered__semiring(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Ring__and__Field_Oordered__semiring,axiom,
% 9.71/9.77      class_Ring__and__Field_Oordered__semiring(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Ring__and__Field_Ono__zero__divisors,axiom,
% 9.71/9.77      class_Ring__and__Field_Ono__zero__divisors(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Ring__and__Field_Oordered__semidom,axiom,
% 9.71/9.77      class_Ring__and__Field_Oordered__semidom(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Ring__and__Field_Ocomm__semiring__1,axiom,
% 9.71/9.77      class_Ring__and__Field_Ocomm__semiring__1(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__OrderedGroup_Oab__semigroup__mult,axiom,
% 9.71/9.77      class_OrderedGroup_Oab__semigroup__mult(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__OrderedGroup_Ocomm__monoid__mult,axiom,
% 9.71/9.77      class_OrderedGroup_Ocomm__monoid__mult(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__OrderedGroup_Oab__semigroup__add,axiom,
% 9.71/9.77      class_OrderedGroup_Oab__semigroup__add(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Ring__and__Field_Opordered__ring,axiom,
% 9.71/9.77      class_Ring__and__Field_Opordered__ring(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Ring__and__Field_Ocomm__semiring,axiom,
% 9.71/9.77      class_Ring__and__Field_Ocomm__semiring(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__OrderedGroup_Ocomm__monoid__add,axiom,
% 9.71/9.77      class_OrderedGroup_Ocomm__monoid__add(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Ring__and__Field_Ozero__neq__one,axiom,
% 9.71/9.77      class_Ring__and__Field_Ozero__neq__one(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Ring__and__Field_Oordered__idom,axiom,
% 9.71/9.77      class_Ring__and__Field_Oordered__idom(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Ring__and__Field_Omult__mono1,axiom,
% 9.71/9.77      class_Ring__and__Field_Omult__mono1(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__OrderedGroup_Oab__group__add,axiom,
% 9.71/9.77      class_OrderedGroup_Oab__group__add(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Ring__and__Field_Omult__zero,axiom,
% 9.71/9.77      class_Ring__and__Field_Omult__zero(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Ring__and__Field_Omult__mono,axiom,
% 9.71/9.77      class_Ring__and__Field_Omult__mono(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__OrderedGroup_Omonoid__mult,axiom,
% 9.71/9.77      class_OrderedGroup_Omonoid__mult(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Ring__and__Field_Osemiring,axiom,
% 9.71/9.77      class_Ring__and__Field_Osemiring(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__OrderedGroup_Omonoid__add,axiom,
% 9.71/9.77      class_OrderedGroup_Omonoid__add(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__OrderedGroup_Ogroup__add,axiom,
% 9.71/9.77      class_OrderedGroup_Ogroup__add(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Ring__and__Field_Oring,axiom,
% 9.71/9.77      class_Ring__and__Field_Oring(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Ring__and__Field_Oidom,axiom,
% 9.71/9.77      class_Ring__and__Field_Oidom(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Orderings_Opreorder,axiom,
% 9.71/9.77      class_Orderings_Opreorder(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Orderings_Olinorder,axiom,
% 9.71/9.77      class_Orderings_Olinorder(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Orderings_Oorder,axiom,
% 9.71/9.77      class_Orderings_Oorder(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Int_Oring__char__0,axiom,
% 9.71/9.77      class_Int_Oring__char__0(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Int_Onumber__ring,axiom,
% 9.71/9.77      class_Int_Onumber__ring(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Power_Opower,axiom,
% 9.71/9.77      class_Power_Opower(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Int__Oint__Int_Onumber,axiom,
% 9.71/9.77      class_Int_Onumber(tc_Int_Oint) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__OrderedGroup_Opordered__cancel__ab__semigroup__add,axiom,
% 9.71/9.77      class_OrderedGroup_Opordered__cancel__ab__semigroup__add(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__OrderedGroup_Opordered__ab__semigroup__add__imp__le,axiom,
% 9.71/9.77      class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Oordered__comm__semiring__strict,axiom,
% 9.71/9.77      class_Ring__and__Field_Oordered__comm__semiring__strict(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Opordered__cancel__semiring,axiom,
% 9.71/9.77      class_Ring__and__Field_Opordered__cancel__semiring(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Oring__1__no__zero__divisors,axiom,
% 9.71/9.77      class_Ring__and__Field_Oring__1__no__zero__divisors(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Oordered__semiring__strict,axiom,
% 9.71/9.77      class_Ring__and__Field_Oordered__semiring__strict(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__OrderedGroup_Opordered__ab__semigroup__add,axiom,
% 9.71/9.77      class_OrderedGroup_Opordered__ab__semigroup__add(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__OrderedGroup_Opordered__comm__monoid__add,axiom,
% 9.71/9.77      class_OrderedGroup_Opordered__comm__monoid__add(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Oring__no__zero__divisors,axiom,
% 9.71/9.77      class_Ring__and__Field_Oring__no__zero__divisors(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__OrderedGroup_Ocancel__ab__semigroup__add,axiom,
% 9.71/9.77      class_OrderedGroup_Ocancel__ab__semigroup__add(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Oordered__ring__strict,axiom,
% 9.71/9.77      class_Ring__and__Field_Oordered__ring__strict(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__OrderedGroup_Opordered__ab__group__add,axiom,
% 9.71/9.77      class_OrderedGroup_Opordered__ab__group__add(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__OrderedGroup_Olordered__ab__group__add,axiom,
% 9.71/9.77      class_OrderedGroup_Olordered__ab__group__add(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__OrderedGroup_Oordered__ab__group__add,axiom,
% 9.71/9.77      class_OrderedGroup_Oordered__ab__group__add(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__OrderedGroup_Ocancel__semigroup__add,axiom,
% 9.71/9.77      class_OrderedGroup_Ocancel__semigroup__add(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Opordered__semiring,axiom,
% 9.71/9.77      class_Ring__and__Field_Opordered__semiring(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Oordered__semiring,axiom,
% 9.71/9.77      class_Ring__and__Field_Oordered__semiring(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Ono__zero__divisors,axiom,
% 9.71/9.77      class_Ring__and__Field_Ono__zero__divisors(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Odivision__by__zero,axiom,
% 9.71/9.77      class_Ring__and__Field_Odivision__by__zero(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Oordered__semidom,axiom,
% 9.71/9.77      class_Ring__and__Field_Oordered__semidom(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Ocomm__semiring__1,axiom,
% 9.71/9.77      class_Ring__and__Field_Ocomm__semiring__1(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__RealVector_Oreal__normed__algebra,axiom,
% 9.71/9.77      class_RealVector_Oreal__normed__algebra(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__OrderedGroup_Oab__semigroup__mult,axiom,
% 9.71/9.77      class_OrderedGroup_Oab__semigroup__mult(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__OrderedGroup_Ocomm__monoid__mult,axiom,
% 9.71/9.77      class_OrderedGroup_Ocomm__monoid__mult(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__OrderedGroup_Oab__semigroup__add,axiom,
% 9.71/9.77      class_OrderedGroup_Oab__semigroup__add(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Opordered__ring,axiom,
% 9.71/9.77      class_Ring__and__Field_Opordered__ring(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Oordered__field,axiom,
% 9.71/9.77      class_Ring__and__Field_Oordered__field(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Ocomm__semiring,axiom,
% 9.71/9.77      class_Ring__and__Field_Ocomm__semiring(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__RealVector_Oreal__normed__field,axiom,
% 9.71/9.77      class_RealVector_Oreal__normed__field(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__OrderedGroup_Ocomm__monoid__add,axiom,
% 9.71/9.77      class_OrderedGroup_Ocomm__monoid__add(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Ozero__neq__one,axiom,
% 9.71/9.77      class_Ring__and__Field_Ozero__neq__one(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Oordered__idom,axiom,
% 9.71/9.77      class_Ring__and__Field_Oordered__idom(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Omult__mono1,axiom,
% 9.71/9.77      class_Ring__and__Field_Omult__mono1(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__OrderedGroup_Oab__group__add,axiom,
% 9.71/9.77      class_OrderedGroup_Oab__group__add(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Omult__zero,axiom,
% 9.71/9.77      class_Ring__and__Field_Omult__zero(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Omult__mono,axiom,
% 9.71/9.77      class_Ring__and__Field_Omult__mono(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__OrderedGroup_Omonoid__mult,axiom,
% 9.71/9.77      class_OrderedGroup_Omonoid__mult(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Osemiring,axiom,
% 9.71/9.77      class_Ring__and__Field_Osemiring(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__OrderedGroup_Omonoid__add,axiom,
% 9.71/9.77      class_OrderedGroup_Omonoid__add(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__OrderedGroup_Ogroup__add,axiom,
% 9.71/9.77      class_OrderedGroup_Ogroup__add(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__RealVector_Oreal__field,axiom,
% 9.71/9.77      class_RealVector_Oreal__field(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Ofield,axiom,
% 9.71/9.77      class_Ring__and__Field_Ofield(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Oring,axiom,
% 9.71/9.77      class_Ring__and__Field_Oring(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Ring__and__Field_Oidom,axiom,
% 9.71/9.77      class_Ring__and__Field_Oidom(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Orderings_Opreorder,axiom,
% 9.71/9.77      class_Orderings_Opreorder(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Orderings_Olinorder,axiom,
% 9.71/9.77      class_Orderings_Olinorder(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Orderings_Oorder,axiom,
% 9.71/9.77      class_Orderings_Oorder(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Int_Oring__char__0,axiom,
% 9.71/9.77      class_Int_Oring__char__0(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Int_Onumber__ring,axiom,
% 9.71/9.77      class_Int_Onumber__ring(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Power_Opower,axiom,
% 9.71/9.77      class_Power_Opower(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_RealDef__Oreal__Int_Onumber,axiom,
% 9.71/9.77      class_Int_Onumber(tc_RealDef_Oreal) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Oring__1__no__zero__divisors,axiom,
% 9.71/9.77      class_Ring__and__Field_Oring__1__no__zero__divisors(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Oring__no__zero__divisors,axiom,
% 9.71/9.77      class_Ring__and__Field_Oring__no__zero__divisors(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__OrderedGroup_Ocancel__ab__semigroup__add,axiom,
% 9.71/9.77      class_OrderedGroup_Ocancel__ab__semigroup__add(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__OrderedGroup_Ocancel__semigroup__add,axiom,
% 9.71/9.77      class_OrderedGroup_Ocancel__semigroup__add(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Ono__zero__divisors,axiom,
% 9.71/9.77      class_Ring__and__Field_Ono__zero__divisors(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Odivision__by__zero,axiom,
% 9.71/9.77      class_Ring__and__Field_Odivision__by__zero(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Ocomm__semiring__1,axiom,
% 9.71/9.77      class_Ring__and__Field_Ocomm__semiring__1(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__RealVector_Oreal__normed__algebra,axiom,
% 9.71/9.77      class_RealVector_Oreal__normed__algebra(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__OrderedGroup_Oab__semigroup__mult,axiom,
% 9.71/9.77      class_OrderedGroup_Oab__semigroup__mult(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__OrderedGroup_Ocomm__monoid__mult,axiom,
% 9.71/9.77      class_OrderedGroup_Ocomm__monoid__mult(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__OrderedGroup_Oab__semigroup__add,axiom,
% 9.71/9.77      class_OrderedGroup_Oab__semigroup__add(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Ocomm__semiring,axiom,
% 9.71/9.77      class_Ring__and__Field_Ocomm__semiring(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__RealVector_Oreal__normed__field,axiom,
% 9.71/9.77      class_RealVector_Oreal__normed__field(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__OrderedGroup_Ocomm__monoid__add,axiom,
% 9.71/9.77      class_OrderedGroup_Ocomm__monoid__add(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Ozero__neq__one,axiom,
% 9.71/9.77      class_Ring__and__Field_Ozero__neq__one(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__OrderedGroup_Oab__group__add,axiom,
% 9.71/9.77      class_OrderedGroup_Oab__group__add(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Omult__zero,axiom,
% 9.71/9.77      class_Ring__and__Field_Omult__zero(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__OrderedGroup_Omonoid__mult,axiom,
% 9.71/9.77      class_OrderedGroup_Omonoid__mult(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Osemiring,axiom,
% 9.71/9.77      class_Ring__and__Field_Osemiring(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__OrderedGroup_Omonoid__add,axiom,
% 9.71/9.77      class_OrderedGroup_Omonoid__add(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__OrderedGroup_Ogroup__add,axiom,
% 9.71/9.77      class_OrderedGroup_Ogroup__add(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__RealVector_Oreal__field,axiom,
% 9.71/9.77      class_RealVector_Oreal__field(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Ofield,axiom,
% 9.71/9.77      class_Ring__and__Field_Ofield(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Oring,axiom,
% 9.71/9.77      class_Ring__and__Field_Oring(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Oidom,axiom,
% 9.71/9.77      class_Ring__and__Field_Oidom(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__Int_Oring__char__0,axiom,
% 9.71/9.77      class_Int_Oring__char__0(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__Int_Onumber__ring,axiom,
% 9.71/9.77      class_Int_Onumber__ring(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__Power_Opower,axiom,
% 9.71/9.77      class_Power_Opower(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  cnf(clsarity_Complex__Ocomplex__Int_Onumber,axiom,
% 9.71/9.77      class_Int_Onumber(tc_Complex_Ocomplex) ).
% 9.71/9.77  
% 9.71/9.77  %------------------------------------------------------------------------------
% 9.71/9.77  %-------------------------------------------
% 9.71/9.77  % Proof found
% 9.71/9.77  % SZS status Theorem for theBenchmark
% 9.71/9.77  % SZS output start Proof
% 9.71/9.77  %ClaNum:970(EqnAxiom:93)
% 9.71/9.77  %VarNum:5494(SingletonVarNum:1636)
% 9.71/9.77  %MaxLitNum:6
% 9.71/9.77  %MaxfuncDepth:6
% 9.71/9.77  %SharedTerms:208
% 9.71/9.77  %goalClause: 305
% 9.71/9.77  %singleGoalClaCount:1
% 9.71/9.77  [96]P1(a12)
% 9.71/9.77  [97]P1(a23)
% 9.71/9.77  [98]P1(a13)
% 9.71/9.77  [99]P2(a12)
% 9.71/9.77  [100]P2(a23)
% 9.71/9.77  [101]P2(a13)
% 9.71/9.77  [102]P3(a12)
% 9.71/9.77  [103]P3(a13)
% 9.71/9.77  [104]P48(a12)
% 9.71/9.77  [105]P48(a13)
% 9.71/9.77  [106]P4(a12)
% 9.71/9.77  [107]P4(a13)
% 9.71/9.77  [108]P50(a12)
% 9.71/9.77  [109]P50(a13)
% 9.71/9.77  [110]P50(a14)
% 9.71/9.77  [111]P52(a12)
% 9.71/9.77  [112]P52(a13)
% 9.71/9.77  [113]P52(a14)
% 9.71/9.77  [114]P24(a12)
% 9.71/9.77  [115]P24(a23)
% 9.71/9.77  [116]P24(a13)
% 9.71/9.77  [117]P24(a14)
% 9.71/9.77  [118]P25(a12)
% 9.71/9.77  [119]P25(a23)
% 9.71/9.77  [120]P25(a13)
% 9.71/9.77  [121]P25(a14)
% 9.71/9.77  [122]P26(a12)
% 9.71/9.77  [123]P26(a14)
% 9.71/9.77  [124]P38(a12)
% 9.71/9.77  [125]P38(a13)
% 9.71/9.77  [126]P38(a14)
% 9.71/9.77  [127]P5(a12)
% 9.71/9.77  [128]P5(a13)
% 9.71/9.77  [129]P5(a14)
% 9.71/9.77  [130]P9(a12)
% 9.71/9.77  [131]P9(a23)
% 9.71/9.77  [132]P9(a13)
% 9.71/9.77  [133]P9(a14)
% 9.71/9.77  [134]P36(a12)
% 9.71/9.77  [135]P36(a23)
% 9.71/9.77  [136]P36(a13)
% 9.71/9.77  [137]P36(a14)
% 9.71/9.77  [138]P10(a12)
% 9.71/9.77  [139]P10(a23)
% 9.71/9.77  [140]P10(a13)
% 9.71/9.77  [141]P10(a14)
% 9.71/9.77  [142]P43(a12)
% 9.71/9.77  [143]P43(a23)
% 9.71/9.77  [144]P43(a13)
% 9.71/9.77  [145]P43(a14)
% 9.71/9.77  [146]P54(a12)
% 9.71/9.77  [147]P54(a23)
% 9.71/9.77  [148]P54(a13)
% 9.71/9.77  [149]P54(a14)
% 9.71/9.77  [150]P44(a12)
% 9.71/9.77  [151]P39(a12)
% 9.71/9.77  [152]P39(a14)
% 9.71/9.77  [153]P40(a12)
% 9.71/9.77  [154]P40(a14)
% 9.71/9.77  [155]P27(a12)
% 9.71/9.77  [156]P27(a14)
% 9.71/9.77  [157]P37(a12)
% 9.71/9.77  [158]P37(a14)
% 9.71/9.77  [159]P28(a12)
% 9.71/9.77  [160]P28(a23)
% 9.71/9.77  [161]P28(a13)
% 9.71/9.77  [162]P33(a12)
% 9.71/9.77  [163]P33(a23)
% 9.71/9.77  [164]P33(a13)
% 9.71/9.77  [165]P34(a12)
% 9.71/9.77  [166]P34(a23)
% 9.71/9.77  [167]P34(a13)
% 9.71/9.77  [168]P29(a12)
% 9.71/9.77  [169]P29(a23)
% 9.71/9.77  [170]P29(a13)
% 9.71/9.77  [171]P30(a12)
% 9.71/9.77  [172]P30(a23)
% 9.71/9.77  [173]P30(a13)
% 9.71/9.77  [174]P11(a12)
% 9.71/9.77  [175]P11(a13)
% 9.71/9.77  [176]P11(a14)
% 9.71/9.77  [177]P20(a12)
% 9.71/9.77  [178]P20(a13)
% 9.71/9.77  [179]P20(a14)
% 9.71/9.77  [180]P14(a12)
% 9.71/9.77  [181]P14(a23)
% 9.71/9.77  [182]P14(a13)
% 9.71/9.77  [183]P14(a14)
% 9.71/9.77  [184]P21(a12)
% 9.71/9.77  [185]P21(a23)
% 9.71/9.77  [186]P21(a13)
% 9.71/9.77  [187]P21(a14)
% 9.71/9.77  [188]P32(a12)
% 9.71/9.77  [189]P32(a23)
% 9.71/9.77  [190]P32(a13)
% 9.71/9.77  [191]P46(a12)
% 9.71/9.77  [192]P46(a13)
% 9.71/9.77  [193]P47(a12)
% 9.71/9.77  [194]P47(a23)
% 9.71/9.77  [195]P47(a13)
% 9.71/9.77  [196]P15(a12)
% 9.71/9.77  [197]P15(a23)
% 9.71/9.77  [198]P15(a13)
% 9.71/9.77  [199]P15(a14)
% 9.71/9.77  [200]P22(a12)
% 9.71/9.77  [201]P22(a13)
% 9.71/9.77  [202]P6(a12)
% 9.71/9.77  [203]P6(a23)
% 9.71/9.77  [204]P6(a13)
% 9.71/9.77  [205]P6(a14)
% 9.71/9.77  [206]P45(a12)
% 9.71/9.77  [207]P45(a23)
% 9.71/9.77  [208]P45(a13)
% 9.71/9.77  [209]P31(a12)
% 9.71/9.77  [210]P31(a23)
% 9.71/9.77  [211]P31(a13)
% 9.71/9.77  [212]P55(a12)
% 9.71/9.77  [213]P55(a23)
% 9.71/9.77  [214]P55(a13)
% 9.71/9.77  [215]P55(a14)
% 9.71/9.77  [216]P35(a12)
% 9.71/9.77  [217]P35(a23)
% 9.71/9.77  [218]P35(a13)
% 9.71/9.77  [219]P35(a14)
% 9.71/9.77  [220]P53(a12)
% 9.71/9.77  [221]P53(a13)
% 9.71/9.77  [222]P53(a14)
% 9.71/9.77  [223]P41(a12)
% 9.71/9.77  [224]P41(a23)
% 9.71/9.77  [225]P41(a13)
% 9.71/9.77  [226]P42(a12)
% 9.71/9.77  [227]P42(a23)
% 9.71/9.77  [228]P42(a13)
% 9.71/9.77  [229]P49(a12)
% 9.71/9.77  [230]P49(a23)
% 9.71/9.77  [231]P49(a13)
% 9.71/9.77  [232]P23(a12)
% 9.71/9.77  [233]P23(a13)
% 9.71/9.77  [234]P51(a12)
% 9.71/9.77  [235]P51(a23)
% 9.71/9.77  [236]P51(a13)
% 9.71/9.77  [237]P16(a12)
% 9.71/9.77  [238]P16(a23)
% 9.71/9.77  [239]P16(a13)
% 9.71/9.77  [240]P16(a14)
% 9.71/9.77  [241]P19(a12)
% 9.71/9.77  [242]P19(a23)
% 9.71/9.77  [243]P19(a13)
% 9.71/9.77  [244]P19(a14)
% 9.71/9.77  [245]P17(a12)
% 9.71/9.77  [246]P17(a23)
% 9.71/9.77  [247]P17(a13)
% 9.71/9.77  [248]P17(a14)
% 9.71/9.77  [249]P12(a12)
% 9.71/9.77  [250]P12(a13)
% 9.71/9.77  [251]P12(a14)
% 9.71/9.77  [254]P7(a24,a25,a23)
% 9.71/9.77  [95]E(f2(a1),a1)
% 9.71/9.77  [256]P8(f3(a12),a19,a12)
% 9.71/9.77  [257]P7(f3(a12),a19,a12)
% 9.71/9.77  [258]P7(f3(a23),a24,a23)
% 9.71/9.77  [294]~E(f3(a12),a19)
% 9.71/9.77  [300]~P7(a19,f3(a12),a12)
% 9.71/9.77  [252]E(f15(f3(a12)),f3(a12))
% 9.71/9.77  [292]P7(f3(a12),f7(f10(f16(a24,a23),f10(f17(f2(f11(a1)),a12),a19,a12),a12),f16(a25,a23),a12),a12)
% 9.71/9.77  [304]~P7(f3(a12),f10(f3(a12),f3(a12),a12),a12)
% 9.71/9.77  [261]P8(f17(f2(f11(a1)),a12),a19,a12)
% 9.71/9.77  [273]E(f5(f10(f3(a12),f3(a12),a12),f10(f3(a12),f3(a12),a12),a12),f3(a12))
% 9.71/9.77  [264]P7(a19,f17(f2(f2(f11(a1))),a12),a12)
% 9.71/9.77  [267]P8(f3(a12),f7(a19,f17(f2(f11(a1)),a12),a12),a12)
% 9.71/9.77  [268]P7(f3(a12),f7(a19,f17(f2(f11(a1)),a12),a12),a12)
% 9.71/9.77  [274]P8(f7(a19,f17(f2(f11(a1)),a12),a12),f17(f2(f11(a1)),a12),a12)
% 9.71/9.77  [275]P7(f7(a19,f17(f2(f11(a1)),a12),a12),f17(f2(f11(a1)),a12),a12)
% 9.71/9.77  [302]~E(f7(a19,f17(f2(f11(a1)),a12),a12),f3(a12))
% 9.71/9.77  [303]~E(f7(a19,f17(f2(f11(a1)),a12),a12),f17(f2(f11(a1)),a12))
% 9.71/9.77  [305]~P7(f7(f10(f16(a24,a23),f10(f17(f2(f11(a1)),a12),a19,a12),a12),f16(a25,a23),a12),f10(f17(f2(f11(a1)),a12),a19,a12),a12)
% 9.71/9.77  [282]P7(f4(f10(f17(f2(f11(a1)),a12),a19,a12),a12),a19,a12)
% 9.71/9.77  [283]P7(f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),f3(a12),a12)
% 9.71/9.77  [255]P8(x2551,x2551,a12)
% 9.71/9.77  [299]~P7(x2991,x2991,a12)
% 9.71/9.77  [260]P8(f3(a12),f16(x2601,a23),a12)
% 9.71/9.77  [296]~E(f11(x2961),a1)
% 9.71/9.77  [301]~P7(f16(x3011,a23),f3(a12),a12)
% 9.71/9.77  [253]E(f15(f4(x2531,a12)),f4(f15(x2531),a12))
% 9.71/9.77  [259]E(f5(x2591,f4(x2591,a12),a12),f3(a12))
% 9.71/9.77  [287]E(f8(f7(f10(f17(f2(f11(a1)),a12),a19,a12),f16(x2871,a23),a12)),f9(x2871))
% 9.71/9.77  [269]P7(f15(x2691),f7(a19,f17(f2(f11(a1)),a12),a12),a12)
% 9.71/9.77  [270]P7(f20(x2701),f7(a19,f17(f2(f11(a1)),a12),a12),a12)
% 9.71/9.77  [271]P7(f21(x2711),f7(a19,f17(f2(f11(a1)),a12),a12),a12)
% 9.71/9.77  [272]P7(f16(x2721,a23),f18(f17(f2(f11(a1)),a12),x2721,a12),a12)
% 9.71/9.77  [278]E(f6(x2781,f7(x2781,f17(f2(f11(a1)),a12),a12),a12),f7(x2781,f17(f2(f11(a1)),a12),a12))
% 9.71/9.77  [281]E(f5(f7(x2811,f17(f2(f11(a1)),a12),a12),f7(x2811,f17(f2(f11(a1)),a12),a12),a12),x2811)
% 9.71/9.77  [284]P7(f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),f15(x2841),a12)
% 9.71/9.77  [285]P7(f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),f20(x2851),a12)
% 9.71/9.77  [286]P7(f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),f21(x2861),a12)
% 9.71/9.77  [262]E(f10(x2621,x2622,a12),f10(x2622,x2621,a12))
% 9.71/9.77  [298]~E(f11(x2981),f2(x2982))
% 9.71/9.77  [263]E(f5(x2631,f4(x2632,a12),a12),f6(x2631,x2632,a12))
% 9.71/9.77  [265]E(f5(f6(x2651,x2652,a12),x2652,a12),x2651)
% 9.71/9.77  [266]E(f6(f5(x2661,x2662,a12),x2662,a12),x2661)
% 9.71/9.77  [277]E(f7(f10(x2771,x2772,a12),f10(x2771,x2771,a12),a12),f7(x2772,x2771,a12))
% 9.71/9.77  [279]P8(f4(f10(x2791,x2791,a12),a12),f10(x2792,x2792,a12),a12)
% 9.71/9.77  [288]P8(f3(a12),f5(f10(x2881,x2881,a12),f10(x2882,x2882,a12),a12),a12)
% 9.71/9.77  [290]E(f6(f7(f5(x2901,x2902,a12),f17(f2(f11(a1)),a12),a12),x2902,a12),f7(f6(x2901,x2902,a12),f17(f2(f11(a1)),a12),a12))
% 9.71/9.77  [291]E(f6(f7(f5(x2911,x2912,a12),f17(f2(f11(a1)),a12),a12),x2911,a12),f7(f6(x2912,x2911,a12),f17(f2(f11(a1)),a12),a12))
% 9.71/9.77  [289]E(f10(f17(f2(f11(a1)),a12),f7(x2891,f10(f17(f2(f11(a1)),a12),x2892,a12),a12),a12),f7(x2891,x2892,a12))
% 9.71/9.77  [276]E(f10(f10(x2761,x2762,a12),x2763,a12),f10(x2761,f10(x2762,x2763,a12),a12))
% 9.71/9.77  [280]E(f5(f10(x2801,x2802,a12),f10(x2803,x2802,a12),a12),f10(f5(x2801,x2803,a12),x2802,a12))
% 9.71/9.77  [293]E(f6(f22(x2931,x2932),f10(f7(f6(f22(x2931,x2933),f22(x2931,x2932),a12),f6(x2933,x2932,a12),a12),x2932,a12),a12),f6(f22(x2931,x2933),f10(f7(f6(f22(x2931,x2933),f22(x2931,x2932),a12),f6(x2933,x2932,a12),a12),x2933,a12),a12))
% 9.71/9.77  [306]E(x3061,a1)+~E(f2(x3061),a1)
% 9.71/9.77  [307]E(a1,x3071)+~E(f2(x3071),a1)
% 9.71/9.77  [311]~P5(x3111)+E(f17(a1,x3111),f3(x3111))
% 9.71/9.77  [431]E(x4311,f3(a12))+P7(f3(a12),f10(x4311,x4311,a12),a12)
% 9.71/9.77  [313]~P20(x3131)+E(f4(f3(x3131),x3131),f3(x3131))
% 9.71/9.77  [314]~P23(x3141)+E(f4(f3(x3141),x3141),f3(x3141))
% 9.71/9.77  [356]~P22(x3561)+E(f5(f3(x3561),f3(x3561),x3561),f3(x3561))
% 9.71/9.77  [580]~P3(x5801)+E(f5(f10(f3(x5801),f3(x5801),x5801),f10(f3(x5801),f3(x5801),x5801),x5801),f3(x5801))
% 9.71/9.77  [880]~P3(x8801)+P8(f5(f10(f3(x8801),f3(x8801),x8801),f10(f3(x8801),f3(x8801),x8801),x8801),f3(x8801),x8801)
% 9.71/9.77  [958]~P3(x9581)+~P7(f3(x9581),f5(f10(f3(x9581),f3(x9581),x9581),f10(f3(x9581),f3(x9581),x9581),x9581),x9581)
% 9.71/9.77  [327]~P33(x3272)+P8(x3271,x3271,x3272)
% 9.71/9.77  [328]~P34(x3282)+P8(x3281,x3281,x3282)
% 9.71/9.77  [368]~P7(x3682,x3682,x3681)+~P28(x3681)
% 9.71/9.77  [369]~P7(x3692,x3692,x3691)+~P33(x3691)
% 9.71/9.77  [370]~P7(x3702,x3702,x3701)+~P34(x3701)
% 9.71/9.77  [381]P8(x3812,x3811,a12)+P8(x3811,x3812,a12)
% 9.71/9.77  [410]~P7(x4101,x4102,a12)+P8(x4101,x4102,a12)
% 9.71/9.77  [308]E(x3081,x3082)+~E(f2(x3081),f2(x3082))
% 9.71/9.77  [309]E(x3091,x3092)+~E(f11(x3091),f11(x3092))
% 9.71/9.77  [318]E(x3181,x3182)+~E(f16(x3181,a23),f16(x3182,a23))
% 9.71/9.77  [329]~P18(x3292)+E(f10(x3291,x3291,x3292),x3291)
% 9.71/9.77  [330]~P11(x3302)+E(f6(x3301,x3301,x3302),f3(x3302))
% 9.71/9.77  [332]~P20(x3322)+E(f6(x3321,x3321,x3322),f3(x3322))
% 9.71/9.77  [373]E(x3731,f4(x3732,a12))+~E(f5(x3732,x3731,a12),f3(a12))
% 9.71/9.77  [419]~P8(x4191,x4192,a12)+P8(f15(x4191),f15(x4192),a12)
% 9.71/9.77  [420]~P7(x4201,x4202,a12)+P7(f15(x4201),f15(x4202),a12)
% 9.71/9.77  [443]~P3(x4431)+P8(f3(x4431),f10(x4432,x4432,x4431),x4431)
% 9.71/9.77  [533]~P8(x5331,x5332,a12)+P8(f6(x5331,x5332,a12),f3(a12),a12)
% 9.71/9.77  [548]~P3(x5481)+~P7(f10(x5482,x5482,x5481),f3(x5481),x5481)
% 9.71/9.77  [555]~P8(f4(x5551,a12),x5552,a12)+P8(f3(a12),f5(x5551,x5552,a12),a12)
% 9.71/9.77  [556]~P7(f4(x5561,a12),x5562,a12)+P7(f3(a12),f5(x5561,x5562,a12),a12)
% 9.71/9.77  [557]~P8(x5572,f4(x5571,a12),a12)+P8(f5(x5571,x5572,a12),f3(a12),a12)
% 9.71/9.77  [558]~P7(x5582,f4(x5581,a12),a12)+P7(f5(x5581,x5582,a12),f3(a12),a12)
% 9.71/9.77  [569]P8(x5691,x5692,a12)+~P8(f6(x5691,x5692,a12),f3(a12),a12)
% 9.71/9.77  [576]P8(x5761,f4(x5762,a12),a12)+~P8(f5(x5762,x5761,a12),f3(a12),a12)
% 9.71/9.77  [577]P7(x5771,f4(x5772,a12),a12)+~P7(f5(x5772,x5771,a12),f3(a12),a12)
% 9.71/9.77  [578]P8(f4(x5781,a12),x5782,a12)+~P8(f3(a12),f5(x5781,x5782,a12),a12)
% 9.71/9.77  [579]P7(f4(x5791,a12),x5792,a12)+~P7(f3(a12),f5(x5791,x5792,a12),a12)
% 9.71/9.77  [322]~P20(x3222)+E(f4(f4(x3221,x3222),x3222),x3221)
% 9.71/9.77  [323]~P13(x3232)+E(f4(f4(x3231,x3232),x3232),x3231)
% 9.71/9.77  [333]~P25(x3332)+E(f5(x3331,f3(x3332),x3332),x3331)
% 9.71/9.77  [334]~P14(x3342)+E(f5(x3341,f3(x3342),x3342),x3341)
% 9.71/9.77  [335]~P21(x3352)+E(f5(x3351,f3(x3352),x3352),x3351)
% 9.71/9.77  [336]~P20(x3362)+E(f6(x3361,f3(x3362),x3362),x3361)
% 9.71/9.77  [338]~P25(x3381)+E(f5(f3(x3381),x3382,x3381),x3382)
% 9.71/9.77  [339]~P14(x3391)+E(f5(f3(x3391),x3392,x3391),x3392)
% 9.71/9.77  [340]~P21(x3401)+E(f5(f3(x3401),x3402,x3401),x3402)
% 9.71/9.77  [341]~P52(x3412)+E(f10(x3411,f3(x3412),x3412),f3(x3412))
% 9.71/9.77  [342]~P24(x3422)+E(f10(x3421,f3(x3422),x3422),f3(x3422))
% 9.71/9.77  [343]~P25(x3432)+E(f10(x3431,f3(x3432),x3432),f3(x3432))
% 9.71/9.77  [345]~P26(x3452)+E(f10(x3451,f3(x3452),x3452),f3(x3452))
% 9.71/9.77  [346]~P52(x3461)+E(f10(f3(x3461),x3462,x3461),f3(x3461))
% 9.71/9.77  [347]~P24(x3471)+E(f10(f3(x3471),x3472,x3471),f3(x3471))
% 9.71/9.77  [349]~P25(x3491)+E(f10(f3(x3491),x3492,x3491),f3(x3491))
% 9.71/9.77  [351]~P26(x3511)+E(f10(f3(x3511),x3512,x3511),f3(x3511))
% 9.71/9.77  [352]~P40(x3521)+E(f7(f3(x3521),x3522,x3521),f3(x3521))
% 9.71/9.77  [353]~P37(x3531)+E(f7(f3(x3531),x3532,x3531),f3(x3531))
% 9.71/9.77  [360]~P20(x3601)+E(f6(f3(x3601),x3602,x3601),f4(x3602,x3601))
% 9.71/9.77  [362]~P5(x3622)+E(f5(x3621,f17(a1,x3622),x3622),x3621)
% 9.71/9.77  [363]~P5(x3631)+E(f5(f17(a1,x3631),x3632,x3631),x3632)
% 9.71/9.77  [364]~P20(x3642)+E(f5(x3641,f4(x3641,x3642),x3642),f3(x3642))
% 9.71/9.77  [365]~P11(x3652)+E(f5(f4(x3651,x3652),x3651,x3652),f3(x3652))
% 9.71/9.77  [367]~P20(x3672)+E(f5(f4(x3671,x3672),x3671,x3672),f3(x3672))
% 9.71/9.77  [406]E(x4061,x4062)+~E(f5(x4061,f4(x4062,a12),a12),f3(a12))
% 9.71/9.77  [436]~P38(x4362)+E(f10(f4(x4361,x4362),f4(x4361,x4362),x4362),f10(x4361,x4361,x4362))
% 9.71/9.77  [538]E(x5381,f3(a12))+~E(f10(x5382,x5382,a12),f4(f10(x5381,x5381,a12),a12))
% 9.71/9.77  [539]E(x5391,f3(a12))+~E(f10(x5391,x5391,a12),f4(f10(x5392,x5392,a12),a12))
% 9.71/9.77  [554]~P5(x5541)+E(f5(f5(f3(x5541),f17(x5542,x5541),x5541),f17(x5542,x5541),x5541),f17(f2(x5542),x5541))
% 9.71/9.77  [563]~P7(x5632,x5631,a12)+P7(f3(a12),f5(x5631,f4(x5632,a12),a12),a12)
% 9.71/9.77  [672]P7(x6721,x6722,a12)+~P7(f3(a12),f5(x6722,f4(x6721,a12),a12),a12)
% 9.71/9.77  [703]E(x7031,f3(a12))+~E(f5(f10(x7032,x7032,a12),f10(x7031,x7031,a12),a12),f3(a12))
% 9.71/9.77  [704]E(x7041,f3(a12))+~E(f5(f10(x7041,x7041,a12),f10(x7042,x7042,a12),a12),f3(a12))
% 9.71/9.77  [821]E(x8211,f3(a12))+P7(f3(a12),f5(f10(x8212,x8212,a12),f10(x8211,x8211,a12),a12),a12)
% 9.71/9.77  [822]E(x8221,f3(a12))+P7(f3(a12),f5(f10(x8221,x8221,a12),f10(x8222,x8222,a12),a12),a12)
% 9.71/9.77  [371]~P5(x3712)+E(f10(x3711,f17(f11(a1),x3712),x3712),x3711)
% 9.71/9.77  [372]~P5(x3721)+E(f10(f17(f11(a1),x3721),x3722,x3721),x3722)
% 9.71/9.77  [432]~P5(x4322)+E(f10(x4321,f17(f2(f11(a1)),x4322),x4322),f5(x4321,x4321,x4322))
% 9.71/9.77  [433]~P5(x4331)+E(f10(f17(f2(f11(a1)),x4331),x4332,x4331),f5(x4332,x4332,x4331))
% 9.71/9.77  [798]~P7(x7981,x7982,a12)+P7(x7981,f7(f5(x7981,x7982,a12),f17(f2(f11(a1)),a12),a12),a12)
% 9.71/9.77  [799]~P7(x7991,x7992,a12)+P7(f7(f5(x7991,x7992,a12),f17(f2(f11(a1)),a12),a12),x7992,a12)
% 9.71/9.77  [937]~P8(x9371,f7(x9372,f17(f2(f11(a1)),a12),a12),a12)+P8(f5(x9371,f7(x9372,f17(f2(f11(a1)),a12),a12),a12),x9372,a12)
% 9.71/9.77  [959]P8(x9591,f7(x9592,f17(f2(f11(a1)),a12),a12),a12)+~P8(f5(x9591,f7(x9592,f17(f2(f11(a1)),a12),a12),a12),x9592,a12)
% 9.71/9.77  [390]~P25(x3903)+E(f10(x3901,x3902,x3903),f10(x3902,x3901,x3903))
% 9.71/9.77  [392]~P25(x3923)+E(f5(x3921,x3922,x3923),f5(x3922,x3921,x3923))
% 9.71/9.77  [393]~P14(x3933)+E(f5(x3931,x3932,x3933),f5(x3932,x3931,x3933))
% 9.71/9.77  [612]~P8(x6122,x6123,a12)+P8(f5(x6121,x6122,a12),f5(x6121,x6123,a12),a12)
% 9.71/9.77  [412]~P5(x4123)+E(f5(x4121,f4(x4122,x4123),x4123),f6(x4121,x4122,x4123))
% 9.71/9.77  [414]~P11(x4143)+E(f5(x4141,f4(x4142,x4143),x4143),f6(x4141,x4142,x4143))
% 9.71/9.77  [415]~P20(x4153)+E(f5(x4151,f4(x4152,x4153),x4153),f6(x4151,x4152,x4153))
% 9.71/9.77  [416]~P20(x4163)+E(f6(x4161,f4(x4162,x4163),x4163),f5(x4161,x4162,x4163))
% 9.71/9.77  [434]~P50(x4342)+E(f10(f4(x4341,x4342),x4343,x4342),f10(x4341,f4(x4343,x4342),x4342))
% 9.71/9.77  [435]~P50(x4352)+E(f10(f4(x4351,x4352),f4(x4353,x4352),x4352),f10(x4351,x4353,x4352))
% 9.71/9.77  [437]~P20(x4373)+E(f5(f6(x4371,x4372,x4373),x4372,x4373),x4371)
% 9.71/9.77  [438]~P20(x4383)+E(f6(f5(x4381,x4382,x4383),x4382,x4383),x4381)
% 9.71/9.77  [467]~P11(x4673)+E(f4(f6(x4671,x4672,x4673),x4673),f6(x4672,x4671,x4673))
% 9.71/9.77  [486]~P11(x4862)+E(f5(f4(x4861,x4862),f5(x4863,x4861,x4862),x4862),x4863)
% 9.71/9.77  [487]~P20(x4872)+E(f5(f4(x4871,x4872),f5(x4871,x4873,x4872),x4872),x4873)
% 9.71/9.77  [496]~P50(x4963)+E(f10(x4961,f4(x4962,x4963),x4963),f4(f10(x4961,x4962,x4963),x4963))
% 9.71/9.77  [497]~P50(x4972)+E(f10(f4(x4971,x4972),x4973,x4972),f4(f10(x4971,x4973,x4972),x4972))
% 9.71/9.77  [498]~P40(x4982)+E(f7(f4(x4981,x4982),x4983,x4982),f4(f7(x4981,x4983,x4982),x4982))
% 9.71/9.77  [500]~P26(x5003)+E(f10(x5001,f4(x5002,x5003),x5003),f4(f10(x5001,x5002,x5003),x5003))
% 9.71/9.77  [502]~P26(x5022)+E(f10(f4(x5021,x5022),x5023,x5022),f4(f10(x5021,x5023,x5022),x5022))
% 9.71/9.77  [503]~P37(x5032)+E(f7(f4(x5031,x5032),x5033,x5032),f4(f7(x5031,x5033,x5032),x5032))
% 9.71/9.77  [518]~P18(x5183)+E(f10(x5181,f10(x5181,x5182,x5183),x5183),f10(x5181,x5182,x5183))
% 9.71/9.77  [522]~P20(x5222)+E(f5(f4(x5221,x5222),f4(x5223,x5222),x5222),f4(f5(x5223,x5221,x5222),x5222))
% 9.71/9.77  [523]~P11(x5232)+E(f5(f4(x5231,x5232),f4(x5233,x5232),x5232),f4(f5(x5231,x5233,x5232),x5232))
% 9.71/9.77  [524]~P11(x5242)+E(f6(f4(x5241,x5242),f4(x5243,x5242),x5242),f4(f6(x5241,x5243,x5242),x5242))
% 9.71/9.77  [591]~P9(x5913)+E(f10(f18(x5911,x5912,x5913),x5911,x5913),f10(x5911,f18(x5911,x5912,x5913),x5913))
% 9.71/9.77  [854]~P3(x8541)+P8(f3(x8541),f5(f10(x8542,x8542,x8541),f10(x8543,x8543,x8541),x8541),x8541)
% 9.71/9.77  [934]~P3(x9341)+~P7(f5(f10(x9342,x9342,x9341),f10(x9343,x9343,x9341),x9341),f3(x9341),x9341)
% 9.71/9.77  [517]~P20(x5172)+E(f5(x5171,f5(f4(x5171,x5172),x5173,x5172),x5172),x5173)
% 9.71/9.77  [772]~E(f10(f17(f2(f11(a1)),a12),x7721,a12),f7(x7722,x7723,a12))+E(x7721,f7(x7722,f10(f17(f2(f11(a1)),a12),x7723,a12),a12))
% 9.71/9.77  [581]~P25(x5814)+E(f10(x5811,f10(x5812,x5813,x5814),x5814),f10(x5812,f10(x5811,x5813,x5814),x5814))
% 9.71/9.77  [582]~P25(x5824)+E(f5(x5821,f5(x5822,x5823,x5824),x5824),f5(x5822,f5(x5821,x5823,x5824),x5824))
% 9.71/9.77  [583]~P11(x5834)+E(f5(x5831,f5(x5832,x5833,x5834),x5834),f5(x5832,f5(x5831,x5833,x5834),x5834))
% 9.71/9.77  [584]~P14(x5844)+E(f5(x5841,f5(x5842,x5843,x5844),x5844),f5(x5842,f5(x5841,x5843,x5844),x5844))
% 9.71/9.77  [589]~P25(x5893)+E(f10(f10(x5891,x5892,x5893),x5894,x5893),f10(x5891,f10(x5892,x5894,x5893),x5893))
% 9.71/9.77  [590]~P17(x5903)+E(f10(f10(x5901,x5902,x5903),x5904,x5903),f10(x5901,f10(x5902,x5904,x5903),x5903))
% 9.71/9.77  [592]~P25(x5923)+E(f5(f5(x5921,x5922,x5923),x5924,x5923),f5(x5921,f5(x5922,x5924,x5923),x5923))
% 9.71/9.77  [593]~P14(x5933)+E(f5(f5(x5931,x5932,x5933),x5934,x5933),f5(x5931,f5(x5932,x5934,x5933),x5933))
% 9.71/9.77  [594]~P15(x5943)+E(f5(f5(x5941,x5942,x5943),x5944,x5943),f5(x5941,f5(x5942,x5944,x5943),x5943))
% 9.71/9.77  [595]~P25(x5953)+E(f10(f10(x5951,x5952,x5953),x5954,x5953),f10(f10(x5951,x5954,x5953),x5952,x5953))
% 9.71/9.77  [596]~P25(x5963)+E(f5(f5(x5961,x5962,x5963),x5964,x5963),f5(f5(x5961,x5964,x5963),x5962,x5963))
% 9.71/9.77  [711]~P25(x7113)+E(f5(f10(x7111,x7112,x7113),f10(x7111,x7114,x7113),x7113),f10(x7111,f5(x7112,x7114,x7113),x7113))
% 9.71/9.77  [713]~P26(x7133)+E(f5(f10(x7131,x7132,x7133),f10(x7131,x7134,x7133),x7133),f10(x7131,f5(x7132,x7134,x7133),x7133))
% 9.71/9.77  [715]~P26(x7153)+E(f6(f10(x7151,x7152,x7153),f10(x7151,x7154,x7153),x7153),f10(x7151,f6(x7152,x7154,x7153),x7153))
% 9.71/9.77  [718]~P26(x7183)+E(f5(f10(x7181,x7182,x7183),f10(x7184,x7182,x7183),x7183),f10(f5(x7181,x7184,x7183),x7182,x7183))
% 9.71/9.77  [719]~P36(x7193)+E(f5(f10(x7191,x7192,x7193),f10(x7194,x7192,x7193),x7193),f10(f5(x7191,x7194,x7193),x7192,x7193))
% 9.71/9.77  [721]~P26(x7213)+E(f6(f10(x7211,x7212,x7213),f10(x7214,x7212,x7213),x7213),f10(f6(x7211,x7214,x7213),x7212,x7213))
% 9.71/9.77  [722]~P25(x7223)+E(f10(f18(x7221,x7222,x7223),f18(x7224,x7222,x7223),x7223),f18(f10(x7221,x7224,x7223),x7222,x7223))
% 9.71/9.77  [723]~P10(x7233)+E(f10(f18(x7231,x7232,x7233),f18(x7234,x7232,x7233),x7233),f18(f10(x7231,x7234,x7233),x7232,x7233))
% 9.71/9.77  [724]~P40(x7243)+E(f5(f7(x7241,x7242,x7243),f7(x7244,x7242,x7243),x7243),f7(f5(x7241,x7244,x7243),x7242,x7243))
% 9.71/9.77  [725]~P37(x7253)+E(f5(f7(x7251,x7252,x7253),f7(x7254,x7252,x7253),x7253),f7(f5(x7251,x7254,x7253),x7252,x7253))
% 9.71/9.77  [726]~P40(x7263)+E(f6(f7(x7261,x7262,x7263),f7(x7264,x7262,x7263),x7263),f7(f6(x7261,x7264,x7263),x7262,x7263))
% 9.71/9.77  [727]~P37(x7273)+E(f6(f7(x7271,x7272,x7273),f7(x7274,x7272,x7273),x7273),f7(f6(x7271,x7274,x7273),x7272,x7273))
% 9.71/9.77  [728]~P25(x7283)+E(f5(f10(x7281,x7282,x7283),f10(x7284,x7282,x7283),x7283),f10(f5(x7281,x7284,x7283),x7282,x7283))
% 9.71/9.77  [800]~P25(x8003)+E(f10(f10(x8001,x8002,x8003),f10(x8004,x8005,x8003),x8003),f10(f10(x8001,x8004,x8003),f10(x8002,x8005,x8003),x8003))
% 9.71/9.77  [801]~P25(x8013)+E(f5(f5(x8011,x8012,x8013),f5(x8014,x8015,x8013),x8013),f5(f5(x8011,x8014,x8013),f5(x8012,x8015,x8013),x8013))
% 9.71/9.77  [802]~P11(x8023)+E(f5(f6(x8021,x8022,x8023),f6(x8024,x8025,x8023),x8023),f6(f5(x8021,x8024,x8023),f5(x8022,x8025,x8023),x8023))
% 9.71/9.77  [931]~P54(x9313)+E(f5(f10(x9311,x9312,x9313),f5(f10(x9314,x9312,x9313),x9315,x9313),x9313),f5(f10(f5(x9311,x9314,x9313),x9312,x9313),x9315,x9313))
% 9.71/9.77  [969]~P26(x9693)+E(f5(f5(f10(f6(x9691,x9692,x9693),f6(x9694,x9695,x9693),x9693),f10(f6(x9691,x9692,x9693),x9695,x9693),x9693),f10(x9692,f6(x9694,x9695,x9693),x9693),x9693),f6(f10(x9691,x9694,x9693),f10(x9692,x9695,x9693),x9693))
% 9.71/9.77  [957]~P50(x9573)+E(f5(f10(x9571,x9572,x9573),f5(f10(f6(x9574,x9571,x9573),x9572,x9573),x9575,x9573),x9573),f5(f10(x9574,x9572,x9573),x9575,x9573))
% 9.71/9.77  [968]~P27(x9684)+E(f5(f10(x9681,f7(f6(x9682,x9683,x9684),x9685,x9684),x9684),f10(f7(f6(x9681,x9686,x9684),x9685,x9684),x9683,x9684),x9684),f7(f6(f10(x9681,x9682,x9684),f10(x9686,x9683,x9684),x9684),x9685,x9684))
% 9.71/9.77  [970]~P7(a24,a25,a23)+~P7(f3(a12),f7(f10(f17(f2(f11(a1)),a12),a19,a12),f16(a25,a23),a12),a12)+P7(f7(f10(f16(a24,a23),f10(f17(f2(f11(a1)),a12),a19,a12),a12),f16(a25,a23),a12),f10(f17(f2(f11(a1)),a12),a19,a12),a12)
% 9.71/9.77  [468]~P32(x4681)+~P8(f3(x4681),f3(x4681),x4681)+E(f5(f3(x4681),f3(x4681),x4681),f3(x4681))
% 9.71/9.77  [411]E(x4111,x4112)+P7(x4111,x4112,a12)+~P8(x4111,x4112,a12)
% 9.71/9.77  [439]E(x4391,x4392)+~P8(x4392,x4391,a12)+~P8(x4391,x4392,a12)
% 9.71/9.77  [315]~P23(x3152)+~E(f4(x3151,x3152),x3151)+E(x3151,f3(x3152))
% 9.71/9.77  [316]~P20(x3162)+~E(f4(x3161,x3162),f3(x3162))+E(x3161,f3(x3162))
% 9.71/9.77  [317]~P20(x3171)+~E(f4(x3172,x3171),f3(x3171))+E(f3(x3171),x3172)
% 9.71/9.77  [354]~P38(x3542)+~P5(x3542)+E(f6(x3541,x3541,x3542),f3(x3542))
% 9.71/9.77  [379]~P22(x3792)+~E(f5(x3791,x3791,x3792),f3(x3792))+E(x3791,f3(x3792))
% 9.71/9.77  [469]~P22(x4692)+~P8(x4691,f3(x4692),x4692)+P8(x4691,f4(x4691,x4692),x4692)
% 9.71/9.77  [470]~P23(x4702)+~P8(x4701,f3(x4702),x4702)+P8(x4701,f4(x4701,x4702),x4702)
% 9.71/9.77  [471]~P46(x4712)+~P7(x4711,f3(x4712),x4712)+P7(x4711,f4(x4711,x4712),x4712)
% 9.71/9.77  [472]~P22(x4722)+~P8(f3(x4722),x4721,x4722)+P8(f4(x4721,x4722),x4721,x4722)
% 9.71/9.77  [473]~P23(x4732)+~P8(f3(x4732),x4731,x4732)+P8(f4(x4731,x4732),x4731,x4732)
% 9.71/9.77  [475]~P4(x4751)+~P8(x4752,f3(x4751),x4751)+P8(f3(x4751),f4(x4752,x4751),x4751)
% 9.71/9.77  [476]~P4(x4761)+~P7(x4762,f3(x4761),x4761)+P7(f3(x4761),f4(x4762,x4761),x4761)
% 9.71/9.77  [477]~P4(x4772)+~P8(f3(x4772),x4771,x4772)+P8(f4(x4771,x4772),f3(x4772),x4772)
% 9.71/9.77  [478]~P4(x4782)+~P7(f3(x4782),x4781,x4782)+P7(f4(x4781,x4782),f3(x4782),x4782)
% 9.71/9.77  [481]~P22(x4812)+~P8(x4811,f4(x4811,x4812),x4812)+P8(x4811,f3(x4812),x4812)
% 9.71/9.77  [482]~P23(x4822)+~P8(x4821,f4(x4821,x4822),x4822)+P8(x4821,f3(x4822),x4822)
% 9.71/9.77  [483]~P46(x4832)+~P7(x4831,f4(x4831,x4832),x4832)+P7(x4831,f3(x4832),x4832)
% 9.71/9.77  [484]~P22(x4841)+~P8(f4(x4842,x4841),x4842,x4841)+P8(f3(x4841),x4842,x4841)
% 9.71/9.77  [485]~P23(x4851)+~P8(f4(x4852,x4851),x4852,x4851)+P8(f3(x4851),x4852,x4851)
% 9.71/9.77  [492]~P4(x4922)+~P8(f3(x4922),f4(x4921,x4922),x4922)+P8(x4921,f3(x4922),x4922)
% 9.71/9.77  [493]~P4(x4932)+~P7(f3(x4932),f4(x4931,x4932),x4932)+P7(x4931,f3(x4932),x4932)
% 9.71/9.77  [494]~P4(x4941)+~P8(f4(x4942,x4941),f3(x4941),x4941)+P8(f3(x4941),x4942,x4941)
% 9.71/9.77  [495]~P4(x4951)+~P7(f4(x4952,x4951),f3(x4951),x4951)+P7(f3(x4951),x4952,x4951)
% 9.71/9.77  [540]~P22(x5401)+~P8(f3(x5401),x5402,x5401)+P8(f3(x5401),f5(x5402,x5402,x5401),x5401)
% 9.71/9.77  [543]~P22(x5431)+~P7(f3(x5431),x5432,x5431)+P7(f3(x5431),f5(x5432,x5432,x5431),x5431)
% 9.71/9.77  [545]~P22(x5452)+~P8(x5451,f3(x5452),x5452)+P8(f5(x5451,x5451,x5452),f3(x5452),x5452)
% 9.71/9.77  [546]~P46(x5462)+~P7(x5461,f3(x5462),x5462)+P7(f5(x5461,x5461,x5462),f3(x5462),x5462)
% 9.71/9.77  [547]~P22(x5472)+~P7(x5471,f3(x5472),x5472)+P7(f5(x5471,x5471,x5472),f3(x5472),x5472)
% 9.71/9.77  [597]~P22(x5972)+~P8(f5(x5971,x5971,x5972),f3(x5972),x5972)+P8(x5971,f3(x5972),x5972)
% 9.71/9.77  [598]~P46(x5982)+~P7(f5(x5981,x5981,x5982),f3(x5982),x5982)+P7(x5981,f3(x5982),x5982)
% 9.71/9.77  [600]~P22(x6002)+~P7(f5(x6001,x6001,x6002),f3(x6002),x6002)+P7(x6001,f3(x6002),x6002)
% 9.71/9.77  [601]~P22(x6011)+~P8(f3(x6011),f5(x6012,x6012,x6011),x6011)+P8(f3(x6011),x6012,x6011)
% 9.71/9.77  [602]~P22(x6021)+~P7(f3(x6021),f5(x6022,x6022,x6021),x6021)+P7(f3(x6021),x6022,x6021)
% 9.71/9.77  [605]~P8(x6052,f3(a12),a12)+~P8(x6051,f3(a12),a12)+P8(f3(a12),f7(x6051,x6052,a12),a12)
% 9.71/9.77  [606]~P8(x6062,f3(a12),a12)+~P8(f3(a12),x6062,a12)+P8(f3(a12),f7(x6061,x6062,a12),a12)
% 9.71/9.77  [607]~P8(x6071,f3(a12),a12)+~P8(f3(a12),x6071,a12)+P8(f3(a12),f7(x6071,x6072,a12),a12)
% 9.71/9.77  [608]~P8(f3(a12),x6082,a12)+~P8(f3(a12),x6081,a12)+P8(f3(a12),f7(x6081,x6082,a12),a12)
% 9.71/9.77  [609]~P7(f3(a12),x6092,a12)+~P7(f3(a12),x6091,a12)+P7(f3(a12),f10(x6091,x6092,a12),a12)
% 9.71/9.77  [628]P8(x6281,f3(a12),a12)+P8(f3(a12),x6282,a12)+~P8(f3(a12),f7(x6281,x6282,a12),a12)
% 9.71/9.77  [629]P8(x6291,f3(a12),a12)+P8(f3(a12),x6292,a12)+~P8(f3(a12),f7(x6292,x6291,a12),a12)
% 9.71/9.77  [355]~P38(x3552)+~P5(x3552)+E(f5(x3551,f3(x3552),x3552),x3551)
% 9.71/9.77  [359]~P39(x3592)+~P40(x3592)+E(f7(x3591,f3(x3592),x3592),f3(x3592))
% 9.71/9.77  [377]~P5(x3772)+~P40(x3772)+E(f7(x3771,f17(f11(a1),x3772),x3772),x3771)
% 9.71/9.77  [480]~P39(x4801)+~P40(x4801)+E(f7(f10(f3(x4801),x4802,x4801),x4802,x4801),f3(x4801))
% 9.71/9.77  [394]P8(x3942,x3941,x3943)+~P28(x3943)+P8(x3941,x3942,x3943)
% 9.71/9.77  [397]P7(x3972,x3971,x3973)+~P28(x3973)+P8(x3971,x3972,x3973)
% 9.71/9.77  [417]~P33(x4173)+~P7(x4171,x4172,x4173)+P8(x4171,x4172,x4173)
% 9.71/9.77  [418]~P34(x4183)+~P7(x4181,x4182,x4183)+P8(x4181,x4182,x4183)
% 9.71/9.77  [448]~P7(x4483,x4482,x4481)+~P28(x4481)+~P8(x4482,x4483,x4481)
% 9.71/9.77  [450]~P7(x4503,x4502,x4501)+~P28(x4501)+~P7(x4502,x4503,x4501)
% 9.71/9.77  [451]~P7(x4513,x4512,x4511)+~P33(x4511)+~P8(x4512,x4513,x4511)
% 9.71/9.77  [453]~P7(x4533,x4532,x4531)+~P33(x4531)+~P7(x4532,x4533,x4531)
% 9.71/9.77  [454]~P7(x4543,x4542,x4541)+~P34(x4541)+~P7(x4542,x4543,x4541)
% 9.71/9.77  [516]~P8(x5161,x5163,a12)+P8(x5161,x5162,a12)+~P8(x5163,x5162,a12)
% 9.71/9.77  [324]~P20(x3243)+E(x3241,x3242)+~E(f4(x3241,x3243),f4(x3242,x3243))
% 9.71/9.77  [325]~P13(x3253)+E(x3251,x3252)+~E(f4(x3251,x3253),f4(x3252,x3253))
% 9.71/9.77  [374]~P11(x3743)+E(x3741,x3742)+~E(f6(x3741,x3742,x3743),f3(x3743))
% 9.71/9.77  [375]~P20(x3753)+E(x3751,x3752)+~E(f6(x3751,x3752,x3753),f3(x3753))
% 9.71/9.77  [380]~P53(x3802)+~E(f18(x3801,x3803,x3802),f3(x3802))+E(x3801,f3(x3802))
% 9.71/9.77  [387]~P20(x3873)+~E(f5(x3871,x3872,x3873),f3(x3873))+E(x3871,f4(x3872,x3873))
% 9.71/9.77  [388]~P20(x3882)+~E(f5(x3881,x3883,x3882),f3(x3882))+E(f4(x3881,x3882),x3883)
% 9.71/9.77  [440]E(x4401,x4402)+~E(f10(x4403,x4401,a12),f10(x4403,x4402,a12))+E(x4403,f3(a12))
% 9.71/9.77  [441]E(x4411,x4412)+~E(f10(x4411,x4413,a12),f10(x4412,x4413,a12))+E(x4413,f3(a12))
% 9.71/9.77  [489]~P4(x4892)+~P8(x4893,x4891,x4892)+P8(f4(x4891,x4892),f4(x4893,x4892),x4892)
% 9.71/9.77  [490]~P4(x4902)+~P7(x4903,x4901,x4902)+P7(f4(x4901,x4902),f4(x4903,x4902),x4902)
% 9.71/9.77  [506]~P4(x5063)+~P8(x5062,f4(x5061,x5063),x5063)+P8(x5061,f4(x5062,x5063),x5063)
% 9.71/9.77  [508]~P4(x5083)+~P7(x5082,f4(x5081,x5083),x5083)+P7(x5081,f4(x5082,x5083),x5083)
% 9.71/9.77  [510]~P4(x5102)+~P8(f4(x5103,x5102),x5101,x5102)+P8(f4(x5101,x5102),x5103,x5102)
% 9.71/9.77  [512]~P4(x5122)+~P7(f4(x5123,x5122),x5121,x5122)+P7(f4(x5121,x5122),x5123,x5122)
% 9.71/9.77  [520]~P4(x5203)+P8(x5201,x5202,x5203)+~P8(f4(x5202,x5203),f4(x5201,x5203),x5203)
% 9.71/9.77  [521]~P4(x5213)+P7(x5211,x5212,x5213)+~P7(f4(x5212,x5213),f4(x5211,x5213),x5213)
% 9.71/9.77  [536]~P4(x5363)+~P8(x5361,x5362,x5363)+P8(f6(x5361,x5362,x5363),f3(x5363),x5363)
% 9.71/9.77  [537]~P4(x5373)+~P7(x5371,x5372,x5373)+P7(f6(x5371,x5372,x5373),f3(x5373),x5373)
% 9.71/9.77  [541]~P46(x5411)+~P8(f3(x5411),x5412,x5411)+P8(f3(x5411),f18(x5412,x5413,x5411),x5411)
% 9.71/9.77  [542]~P47(x5421)+~P8(f3(x5421),x5422,x5421)+P8(f3(x5421),f18(x5422,x5423,x5421),x5421)
% 9.71/9.77  [544]~P47(x5441)+~P7(f3(x5441),x5442,x5441)+P7(f3(x5441),f18(x5442,x5443,x5441),x5441)
% 9.71/9.77  [568]~P22(x5683)+~P8(x5681,f4(x5682,x5683),x5683)+P8(f5(x5681,x5682,x5683),f3(x5683),x5683)
% 9.71/9.77  [574]~P4(x5743)+P8(x5741,x5742,x5743)+~P8(f6(x5741,x5742,x5743),f3(x5743),x5743)
% 9.71/9.77  [575]~P4(x5753)+P7(x5751,x5752,x5753)+~P7(f6(x5751,x5752,x5753),f3(x5753),x5753)
% 9.71/9.77  [599]~P46(x5992)+~P7(f18(x5991,x5993,x5992),f3(x5992),x5992)+P7(x5991,f3(x5992),x5992)
% 9.71/9.77  [615]~P22(x6153)+~P8(f5(x6151,x6152,x6153),f3(x6153),x6153)+P8(x6151,f4(x6152,x6153),x6153)
% 9.71/9.77  [707]~P8(x7071,x7073,a12)+P8(f10(x7071,x7072,a12),f10(x7073,x7072,a12),a12)+~P7(f3(a12),x7072,a12)
% 9.71/9.77  [708]~P8(x7082,x7083,a12)+P8(f10(x7081,x7082,a12),f10(x7081,x7083,a12),a12)+~P7(f3(a12),x7081,a12)
% 9.71/9.77  [709]~P7(x7091,x7093,a12)+P7(f10(x7091,x7092,a12),f10(x7093,x7092,a12),a12)+~P7(f3(a12),x7092,a12)
% 9.71/9.77  [710]~P7(x7102,x7103,a12)+P7(f10(x7101,x7102,a12),f10(x7101,x7103,a12),a12)+~P7(f3(a12),x7101,a12)
% 9.71/9.77  [812]P8(x8121,x8122,a12)+~P8(f10(x8123,x8121,a12),f10(x8123,x8122,a12),a12)+~P7(f3(a12),x8123,a12)
% 9.71/9.77  [813]P8(x8131,x8132,a12)+~P8(f10(x8131,x8133,a12),f10(x8132,x8133,a12),a12)+~P7(f3(a12),x8133,a12)
% 9.71/9.77  [814]P7(x8141,x8142,a12)+~P7(f10(x8141,x8143,a12),f10(x8142,x8143,a12),a12)+~P7(f3(a12),x8143,a12)
% 9.71/9.77  [442]~P40(x4422)+E(x4421,f3(x4422))+E(f7(f4(x4423,x4422),f4(x4421,x4422),x4422),f7(x4423,x4421,x4422))
% 9.71/9.77  [445]~P40(x4452)+E(x4451,f3(x4452))+E(f7(f10(x4453,x4451,x4452),x4451,x4452),x4453)
% 9.71/9.77  [446]~P39(x4462)+~P40(x4462)+E(f7(f4(x4461,x4462),f4(x4463,x4462),x4462),f7(x4461,x4463,x4462))
% 9.71/9.77  [504]~P40(x5042)+E(x5041,f3(x5042))+E(f7(x5043,f4(x5041,x5042),x5042),f4(f7(x5043,x5041,x5042),x5042))
% 9.71/9.77  [513]~P39(x5133)+~P40(x5133)+E(f7(x5131,f4(x5132,x5133),x5133),f4(f7(x5131,x5132,x5133),x5133))
% 9.71/9.77  [729]~P3(x7292)+E(x7291,f3(x7292))+~E(f5(f10(x7293,x7293,x7292),f10(x7291,x7291,x7292),x7292),f3(x7292))
% 9.71/9.77  [730]~P3(x7302)+E(x7301,f3(x7302))+~E(f5(f10(x7301,x7301,x7302),f10(x7303,x7303,x7302),x7302),f3(x7302))
% 9.71/9.77  [855]~P3(x8552)+E(x8551,f3(x8552))+P7(f3(x8552),f5(f10(x8553,x8553,x8552),f10(x8551,x8551,x8552),x8552),x8552)
% 9.71/9.77  [856]~P3(x8562)+E(x8561,f3(x8562))+P7(f3(x8562),f5(f10(x8561,x8561,x8562),f10(x8563,x8563,x8562),x8562),x8562)
% 9.71/9.77  [935]~P3(x9352)+E(x9351,f3(x9352))+~P8(f5(f10(x9353,x9353,x9352),f10(x9351,x9351,x9352),x9352),f3(x9352),x9352)
% 9.71/9.77  [936]~P3(x9362)+E(x9361,f3(x9362))+~P8(f5(f10(x9361,x9361,x9362),f10(x9363,x9363,x9362),x9362),f3(x9362),x9362)
% 9.71/9.77  [455]~P16(x4554)+E(x4551,x4552)+~E(f5(x4553,x4551,x4554),f5(x4553,x4552,x4554))
% 9.71/9.77  [456]~P19(x4564)+E(x4561,x4562)+~E(f5(x4563,x4561,x4564),f5(x4563,x4562,x4564))
% 9.71/9.77  [457]~P11(x4574)+E(x4571,x4572)+~E(f6(x4573,x4573,x4574),f6(x4571,x4572,x4574))
% 9.71/9.77  [458]~P19(x4584)+E(x4581,x4582)+~E(f5(x4581,x4583,x4584),f5(x4582,x4583,x4584))
% 9.71/9.77  [459]~P11(x4593)+E(x4591,x4592)+~E(f6(x4591,x4592,x4593),f6(x4594,x4594,x4593))
% 9.71/9.77  [620]~P30(x6203)+~P8(x6201,x6204,x6203)+P8(f5(x6201,x6202,x6203),f5(x6204,x6202,x6203),x6203)
% 9.71/9.77  [621]~P31(x6213)+~P8(x6211,x6214,x6213)+P8(f5(x6211,x6212,x6213),f5(x6214,x6212,x6213),x6213)
% 9.71/9.77  [622]~P30(x6223)+~P8(x6222,x6224,x6223)+P8(f5(x6221,x6222,x6223),f5(x6221,x6224,x6223),x6223)
% 9.71/9.77  [623]~P31(x6233)+~P8(x6232,x6234,x6233)+P8(f5(x6231,x6232,x6233),f5(x6231,x6234,x6233),x6233)
% 9.71/9.77  [624]~P29(x6243)+~P7(x6241,x6244,x6243)+P7(f5(x6241,x6242,x6243),f5(x6244,x6242,x6243),x6243)
% 9.71/9.77  [625]~P30(x6253)+~P7(x6251,x6254,x6253)+P7(f5(x6251,x6252,x6253),f5(x6254,x6252,x6253),x6253)
% 9.71/9.77  [626]~P29(x6263)+~P7(x6262,x6264,x6263)+P7(f5(x6261,x6262,x6263),f5(x6261,x6264,x6263),x6263)
% 9.71/9.77  [627]~P30(x6273)+~P7(x6272,x6274,x6273)+P7(f5(x6271,x6272,x6273),f5(x6271,x6274,x6273),x6273)
% 9.71/9.77  [768]~P30(x7683)+P8(x7681,x7682,x7683)+~P8(f5(x7684,x7681,x7683),f5(x7684,x7682,x7683),x7683)
% 9.71/9.77  [769]~P30(x7693)+P8(x7691,x7692,x7693)+~P8(f5(x7691,x7694,x7693),f5(x7692,x7694,x7693),x7693)
% 9.71/9.77  [770]~P30(x7703)+P7(x7701,x7702,x7703)+~P7(f5(x7704,x7701,x7703),f5(x7704,x7702,x7703),x7703)
% 9.71/9.77  [771]~P30(x7713)+P7(x7711,x7712,x7713)+~P7(f5(x7711,x7714,x7713),f5(x7712,x7714,x7713),x7713)
% 9.71/9.77  [553]~P11(x5533)+E(x5531,f4(x5532,x5533))+~E(f5(x5531,f5(x5534,x5532,x5533),x5533),x5534)
% 9.71/9.77  [603]~P39(x6033)+~P40(x6033)+E(f7(f10(x6031,x6032,x6033),x6034,x6033),f10(f7(x6031,x6034,x6033),x6032,x6033))
% 9.71/9.77  [731]~P40(x7312)+E(x7311,f3(x7312))+E(f7(f18(x7313,x7314,x7312),f18(x7311,x7314,x7312),x7312),f18(f7(x7313,x7311,x7312),x7314,x7312))
% 9.71/9.77  [732]~P39(x7323)+~P40(x7323)+E(f7(f18(x7321,x7322,x7323),f18(x7324,x7322,x7323),x7323),f18(f7(x7321,x7324,x7323),x7322,x7323))
% 9.71/9.77  [808]~P38(x8083)+~P5(x8083)+E(f5(f10(x8081,x8082,x8083),f10(x8081,x8084,x8083),x8083),f5(f10(x8081,x8084,x8083),f10(x8081,x8082,x8083),x8083))
% 9.71/9.77  [817]~P54(x8172)+~P6(x8172)+E(f5(f10(f17(x8171,x8172),x8173,x8172),f10(f17(x8171,x8172),x8174,x8172),x8172),f10(f17(x8171,x8172),f5(x8173,x8174,x8172),x8172))
% 9.71/9.77  [818]~P50(x8182)+~P6(x8182)+E(f6(f10(f17(x8181,x8182),x8183,x8182),f10(f17(x8181,x8182),x8184,x8182),x8182),f10(f17(x8181,x8182),f6(x8183,x8184,x8182),x8182))
% 9.71/9.77  [819]~P54(x8193)+~P6(x8193)+E(f5(f10(x8191,f17(x8192,x8193),x8193),f10(x8194,f17(x8192,x8193),x8193),x8193),f10(f5(x8191,x8194,x8193),f17(x8192,x8193),x8193))
% 9.71/9.77  [820]~P50(x8203)+~P6(x8203)+E(f6(f10(x8201,f17(x8202,x8203),x8203),f10(x8204,f17(x8202,x8203),x8203),x8203),f10(f6(x8201,x8204,x8203),f17(x8202,x8203),x8203))
% 9.71/9.77  [702]~P11(x7023)+E(f5(x7021,x7022,x7023),x7024)+~E(f5(x7021,f5(x7025,x7022,x7023),x7023),f5(x7025,x7024,x7023))
% 9.71/9.77  [809]~P39(x8093)+~P40(x8093)+E(f7(f10(x8091,x8092,x8093),f10(x8094,x8095,x8093),x8093),f10(f7(x8091,x8094,x8093),f7(x8092,x8095,x8093),x8093))
% 9.71/9.77  [932]~P50(x9324)+~E(f5(f10(x9323,x9325,x9324),x9321,x9324),f5(f10(x9322,x9325,x9324),x9326,x9324))+E(x9321,f5(f10(f6(x9322,x9323,x9324),x9325,x9324),x9326,x9324))
% 9.71/9.77  [933]~P50(x9333)+~E(f5(f10(x9331,x9334,x9333),x9335,x9333),f5(f10(x9332,x9334,x9333),x9336,x9333))+E(f5(f10(f6(x9331,x9332,x9333),x9334,x9333),x9335,x9333),x9336)
% 9.71/9.77  [960]~P48(x9604)+~P8(f5(f10(x9603,x9605,x9604),x9601,x9604),f5(f10(x9602,x9605,x9604),x9606,x9604),x9604)+P8(x9601,f5(f10(f6(x9602,x9603,x9604),x9605,x9604),x9606,x9604),x9604)
% 9.71/9.77  [961]~P48(x9614)+~P7(f5(f10(x9613,x9615,x9614),x9611,x9614),f5(f10(x9612,x9615,x9614),x9616,x9614),x9614)+P7(x9611,f5(f10(f6(x9612,x9613,x9614),x9615,x9614),x9616,x9614),x9614)
% 9.71/9.77  [962]~P48(x9623)+~P8(f5(f10(x9621,x9624,x9623),x9625,x9623),f5(f10(x9622,x9624,x9623),x9626,x9623),x9623)+P8(f5(f10(f6(x9621,x9622,x9623),x9624,x9623),x9625,x9623),x9626,x9623)
% 9.71/9.77  [963]~P48(x9633)+~P7(f5(f10(x9631,x9634,x9633),x9635,x9633),f5(f10(x9632,x9634,x9633),x9636,x9633),x9633)+P7(f5(f10(f6(x9631,x9632,x9633),x9634,x9633),x9635,x9633),x9636,x9633)
% 9.71/9.77  [964]~P48(x9643)+P8(f5(f10(x9641,x9642,x9643),x9644,x9643),f5(f10(x9645,x9642,x9643),x9646,x9643),x9643)+~P8(x9644,f5(f10(f6(x9645,x9641,x9643),x9642,x9643),x9646,x9643),x9643)
% 9.71/9.77  [965]~P48(x9653)+P7(f5(f10(x9651,x9652,x9653),x9654,x9653),f5(f10(x9655,x9652,x9653),x9656,x9653),x9653)+~P7(x9654,f5(f10(f6(x9655,x9651,x9653),x9652,x9653),x9656,x9653),x9653)
% 9.71/9.77  [966]~P48(x9663)+P8(f5(f10(x9661,x9662,x9663),x9664,x9663),f5(f10(x9665,x9662,x9663),x9666,x9663),x9663)+~P8(f5(f10(f6(x9661,x9665,x9663),x9662,x9663),x9664,x9663),x9666,x9663)
% 9.71/9.77  [967]~P48(x9673)+P7(f5(f10(x9671,x9672,x9673),x9674,x9673),f5(f10(x9675,x9672,x9673),x9676,x9673),x9673)+~P7(f5(f10(f6(x9671,x9675,x9673),x9672,x9673),x9674,x9673),x9676,x9673)
% 9.71/9.77  [378]~P5(x3782)+~P39(x3782)+~P40(x3782)+E(f7(x3781,f17(a1,x3782),x3782),f3(x3782))
% 9.71/9.77  [402]P7(x4021,x4022,x4023)+~P28(x4023)+E(x4021,x4022)+P7(x4022,x4021,x4023)
% 9.71/9.77  [403]P7(x4031,x4032,x4033)+~P46(x4033)+E(x4031,x4032)+P7(x4032,x4031,x4033)
% 9.71/9.77  [422]~P28(x4223)+~P8(x4221,x4222,x4223)+E(x4221,x4222)+P7(x4221,x4222,x4223)
% 9.71/9.77  [428]~P34(x4283)+~P8(x4281,x4282,x4283)+E(x4281,x4282)+P7(x4281,x4282,x4283)
% 9.71/9.77  [462]~P8(x4622,x4621,x4623)+~P8(x4621,x4622,x4623)+E(x4621,x4622)+~P34(x4623)
% 9.71/9.77  [491]P7(x4912,x4911,x4913)+~P33(x4913)+~P8(x4912,x4911,x4913)+P8(x4911,x4912,x4913)
% 9.71/9.77  [326]~P5(x3263)+~P12(x3263)+E(x3261,x3262)+~E(f17(x3261,x3263),f17(x3262,x3263))
% 9.71/9.77  [382]~P38(x3822)+~P5(x3822)+~E(f5(x3823,x3821,x3822),x3823)+E(x3821,f3(x3822))
% 9.71/9.77  [383]~P38(x3833)+~P5(x3833)+E(x3831,x3832)+~E(f6(x3831,x3832,x3833),f3(x3833))
% 9.71/9.77  [384]~P52(x3842)+~E(f10(x3843,x3841,x3842),f3(x3842))+E(x3841,f3(x3842))+E(x3843,f3(x3842))
% 9.71/9.78  [386]~P43(x3862)+~E(f10(x3863,x3861,x3862),f3(x3862))+E(x3861,f3(x3862))+E(x3863,f3(x3862))
% 9.71/9.78  [488]~P38(x4883)+E(x4881,x4882)+~E(f10(x4881,x4881,x4883),f10(x4882,x4882,x4883))+E(x4881,f4(x4882,x4883))
% 9.71/9.78  [604]~P46(x6042)+~P8(f18(x6041,x6043,x6042),f3(x6042),x6042)+P8(x6041,f3(x6042),x6042)+E(x6041,f3(x6042))
% 9.71/9.78  [630]~P3(x6301)+~P8(x6303,f3(x6301),x6301)+~P8(x6302,f3(x6301),x6301)+P8(f3(x6301),f10(x6302,x6303,x6301),x6301)
% 9.71/9.78  [632]~P48(x6321)+~P8(x6323,f3(x6321),x6321)+~P8(x6322,f3(x6321),x6321)+P8(f3(x6321),f10(x6322,x6323,x6321),x6321)
% 9.71/9.78  [633]~P44(x6331)+~P8(x6332,f3(x6331),x6331)+~P7(x6333,f3(x6331),x6331)+P8(f3(x6331),f7(x6332,x6333,x6331),x6331)
% 9.71/9.78  [634]~P3(x6341)+~P7(x6343,f3(x6341),x6341)+~P7(x6342,f3(x6341),x6341)+P7(f3(x6341),f10(x6342,x6343,x6341),x6341)
% 9.71/9.78  [635]~P44(x6351)+~P7(x6353,f3(x6351),x6351)+~P7(x6352,f3(x6351),x6351)+P7(f3(x6351),f7(x6352,x6353,x6351),x6351)
% 9.71/9.78  [636]~P3(x6361)+~P8(f3(x6361),x6363,x6361)+~P8(f3(x6361),x6362,x6361)+P8(f3(x6361),f10(x6362,x6363,x6361),x6361)
% 9.71/9.78  [637]~P48(x6371)+~P8(f3(x6371),x6373,x6371)+~P8(f3(x6371),x6372,x6371)+P8(f3(x6371),f10(x6372,x6373,x6371),x6371)
% 9.71/9.78  [638]~P49(x6381)+~P8(f3(x6381),x6383,x6381)+~P8(f3(x6381),x6382,x6381)+P8(f3(x6381),f10(x6382,x6383,x6381),x6381)
% 9.71/9.78  [639]~P32(x6391)+~P8(f3(x6391),x6393,x6391)+~P8(f3(x6391),x6392,x6391)+P8(f3(x6391),f5(x6392,x6393,x6391),x6391)
% 9.71/9.78  [640]~P44(x6401)+~P8(f3(x6401),x6402,x6401)+~P7(f3(x6401),x6403,x6401)+P8(f3(x6401),f7(x6402,x6403,x6401),x6401)
% 9.71/9.78  [641]~P1(x6411)+~P7(f3(x6411),x6413,x6411)+~P7(f3(x6411),x6412,x6411)+P7(f3(x6411),f10(x6412,x6413,x6411),x6411)
% 9.71/9.78  [642]~P32(x6421)+~P8(f3(x6421),x6423,x6421)+~P7(f3(x6421),x6422,x6421)+P7(f3(x6421),f5(x6422,x6423,x6421),x6421)
% 9.71/9.78  [643]~P32(x6431)+~P8(f3(x6431),x6432,x6431)+~P7(f3(x6431),x6433,x6431)+P7(f3(x6431),f5(x6432,x6433,x6431),x6431)
% 9.71/9.78  [644]~P32(x6441)+~P7(f3(x6441),x6443,x6441)+~P7(f3(x6441),x6442,x6441)+P7(f3(x6441),f5(x6442,x6443,x6441),x6441)
% 9.71/9.78  [645]~P44(x6451)+~P7(f3(x6451),x6453,x6451)+~P7(f3(x6451),x6452,x6451)+P7(f3(x6451),f7(x6452,x6453,x6451),x6451)
% 9.71/9.78  [646]~P32(x6463)+~P8(x6462,f3(x6463),x6463)+~P8(x6461,f3(x6463),x6463)+P8(f5(x6461,x6462,x6463),f3(x6463),x6463)
% 9.71/9.78  [647]~P32(x6473)+~P8(x6472,f3(x6473),x6473)+~P7(x6471,f3(x6473),x6473)+P7(f5(x6471,x6472,x6473),f3(x6473),x6473)
% 9.71/9.78  [648]~P32(x6483)+~P8(x6481,f3(x6483),x6483)+~P7(x6482,f3(x6483),x6483)+P7(f5(x6481,x6482,x6483),f3(x6483),x6483)
% 9.71/9.78  [649]~P32(x6493)+~P7(x6492,f3(x6493),x6493)+~P7(x6491,f3(x6493),x6493)+P7(f5(x6491,x6492,x6493),f3(x6493),x6493)
% 9.71/9.78  [650]~P3(x6503)+~P8(x6502,f3(x6503),x6503)+~P8(f3(x6503),x6501,x6503)+P8(f10(x6501,x6502,x6503),f3(x6503),x6503)
% 9.71/9.78  [651]~P3(x6513)+~P8(x6511,f3(x6513),x6513)+~P8(f3(x6513),x6512,x6513)+P8(f10(x6511,x6512,x6513),f3(x6513),x6513)
% 9.71/9.78  [653]~P49(x6533)+~P8(x6532,f3(x6533),x6533)+~P8(f3(x6533),x6531,x6533)+P8(f10(x6531,x6532,x6533),f3(x6533),x6533)
% 9.71/9.78  [656]~P49(x6563)+~P8(x6561,f3(x6563),x6563)+~P8(f3(x6563),x6562,x6563)+P8(f10(x6561,x6562,x6563),f3(x6563),x6563)
% 9.71/9.78  [657]~P44(x6573)+~P8(x6571,f3(x6573),x6573)+~P7(f3(x6573),x6572,x6573)+P8(f7(x6571,x6572,x6573),f3(x6573),x6573)
% 9.71/9.78  [658]~P44(x6583)+~P7(x6582,f3(x6583),x6583)+~P8(f3(x6583),x6581,x6583)+P8(f7(x6581,x6582,x6583),f3(x6583),x6583)
% 9.71/9.78  [659]~P1(x6593)+~P7(x6592,f3(x6593),x6593)+~P7(f3(x6593),x6591,x6593)+P7(f10(x6591,x6592,x6593),f3(x6593),x6593)
% 9.71/9.78  [661]~P1(x6613)+~P7(x6611,f3(x6613),x6613)+~P7(f3(x6613),x6612,x6613)+P7(f10(x6611,x6612,x6613),f3(x6613),x6613)
% 9.71/9.78  [662]~P44(x6623)+~P7(x6622,f3(x6623),x6623)+~P7(f3(x6623),x6621,x6623)+P7(f7(x6621,x6622,x6623),f3(x6623),x6623)
% 9.71/9.78  [663]~P44(x6633)+~P7(x6631,f3(x6633),x6633)+~P7(f3(x6633),x6632,x6633)+P7(f7(x6631,x6632,x6633),f3(x6633),x6633)
% 9.71/9.78  [674]~P3(x6742)+~P8(f10(x6743,x6741,x6742),f3(x6742),x6742)+P8(x6741,f3(x6742),x6742)+P8(x6743,f3(x6742),x6742)
% 9.71/9.78  [675]~P3(x6752)+~P8(f3(x6752),f10(x6753,x6751,x6752),x6752)+P8(x6751,f3(x6752),x6752)+P8(f3(x6752),x6753,x6752)
% 9.71/9.78  [676]~P3(x6762)+~P8(f3(x6762),f10(x6761,x6763,x6762),x6762)+P8(x6761,f3(x6762),x6762)+P8(f3(x6762),x6763,x6762)
% 9.71/9.78  [677]~P3(x6772)+~P8(f3(x6772),f10(x6773,x6771,x6772),x6772)+P8(x6771,f3(x6772),x6772)+P8(f3(x6772),x6771,x6772)
% 9.71/9.78  [678]~P3(x6782)+~P8(f3(x6782),f10(x6781,x6783,x6782),x6782)+P8(x6781,f3(x6782),x6782)+P8(f3(x6782),x6781,x6782)
% 9.71/9.78  [679]~P3(x6792)+~P8(f10(x6793,x6791,x6792),f3(x6792),x6792)+P8(x6791,f3(x6792),x6792)+P8(f3(x6792),x6791,x6792)
% 9.71/9.78  [680]~P3(x6802)+~P8(f10(x6801,x6803,x6802),f3(x6802),x6802)+P8(x6801,f3(x6802),x6802)+P8(f3(x6802),x6801,x6802)
% 9.71/9.78  [681]~P3(x6811)+~P8(f10(x6812,x6813,x6811),f3(x6811),x6811)+P8(f3(x6811),x6812,x6811)+P8(f3(x6811),x6813,x6811)
% 9.71/9.78  [705]~P1(x7051)+~P7(f3(x7051),f10(x7053,x7052,x7051),x7051)+P7(f3(x7051),x7052,x7051)+~P7(f3(x7051),x7053,x7051)
% 9.71/9.78  [706]~P1(x7061)+~P7(f3(x7061),f10(x7062,x7063,x7061),x7061)+P7(f3(x7061),x7062,x7061)+~P7(f3(x7061),x7063,x7061)
% 9.71/9.78  [465]~P39(x4652)+~P40(x4652)+E(x4651,f3(x4652))+E(f10(f7(x4653,x4651,x4652),x4651,x4652),x4653)
% 9.71/9.78  [525]~P33(x5253)+~P8(x5251,x5254,x5253)+P8(x5251,x5252,x5253)+~P8(x5254,x5252,x5253)
% 9.71/9.78  [526]~P34(x5263)+~P8(x5261,x5264,x5263)+P8(x5261,x5262,x5263)+~P8(x5264,x5262,x5263)
% 9.71/9.78  [527]~P33(x5273)+~P7(x5271,x5274,x5273)+P7(x5271,x5272,x5273)+~P8(x5274,x5272,x5273)
% 9.71/9.78  [528]~P33(x5283)+~P7(x5284,x5282,x5283)+P7(x5281,x5282,x5283)+~P8(x5281,x5284,x5283)
% 9.71/9.78  [529]~P33(x5293)+~P7(x5291,x5294,x5293)+P7(x5291,x5292,x5293)+~P7(x5294,x5292,x5293)
% 9.71/9.78  [530]~P34(x5303)+~P7(x5301,x5304,x5303)+P7(x5301,x5302,x5303)+~P8(x5304,x5302,x5303)
% 9.71/9.78  [531]~P34(x5313)+~P7(x5314,x5312,x5313)+P7(x5311,x5312,x5313)+~P8(x5311,x5314,x5313)
% 9.71/9.78  [532]~P34(x5323)+~P7(x5321,x5324,x5323)+P7(x5321,x5322,x5323)+~P7(x5324,x5322,x5323)
% 9.71/9.78  [474]~P38(x4744)+~P5(x4744)+E(x4741,x4742)+~E(f5(x4743,x4741,x4744),f5(x4743,x4742,x4744))
% 9.71/9.78  [614]~P47(x6144)+~P7(x6141,x6143,x6144)+~P7(f3(x6144),x6142,x6144)+P7(x6141,f5(x6142,x6143,x6144),x6144)
% 9.71/9.78  [741]~P48(x7413)+~P8(x7414,x7411,x7413)+~P8(x7412,f3(x7413),x7413)+P8(f10(x7411,x7412,x7413),f10(x7414,x7412,x7413),x7413)
% 9.71/9.78  [742]~P3(x7423)+~P8(x7424,x7422,x7423)+~P7(x7421,f3(x7423),x7423)+P8(f10(x7421,x7422,x7423),f10(x7421,x7424,x7423),x7423)
% 9.71/9.78  [743]~P48(x7433)+~P8(x7434,x7432,x7433)+~P8(x7431,f3(x7433),x7433)+P8(f10(x7431,x7432,x7433),f10(x7431,x7434,x7433),x7433)
% 9.71/9.78  [745]~P3(x7453)+~P7(x7454,x7451,x7453)+~P7(x7452,f3(x7453),x7453)+P7(f10(x7451,x7452,x7453),f10(x7454,x7452,x7453),x7453)
% 9.71/9.78  [748]~P3(x7483)+~P7(x7484,x7482,x7483)+~P7(x7481,f3(x7483),x7483)+P7(f10(x7481,x7482,x7483),f10(x7481,x7484,x7483),x7483)
% 9.71/9.78  [749]~P44(x7493)+~P7(x7494,x7491,x7493)+~P7(x7492,f3(x7493),x7493)+P7(f7(x7491,x7492,x7493),f7(x7494,x7492,x7493),x7493)
% 9.71/9.78  [750]~P42(x7503)+~P8(x7501,x7504,x7503)+~P8(f3(x7503),x7502,x7503)+P8(f10(x7501,x7502,x7503),f10(x7504,x7502,x7503),x7503)
% 9.71/9.78  [751]~P3(x7513)+~P8(x7512,x7514,x7513)+~P7(f3(x7513),x7511,x7513)+P8(f10(x7511,x7512,x7513),f10(x7511,x7514,x7513),x7513)
% 9.71/9.78  [752]~P41(x7523)+~P8(x7522,x7524,x7523)+~P8(f3(x7523),x7521,x7523)+P8(f10(x7521,x7522,x7523),f10(x7521,x7524,x7523),x7523)
% 9.71/9.78  [753]~P42(x7533)+~P8(x7532,x7534,x7533)+~P8(f3(x7533),x7531,x7533)+P8(f10(x7531,x7532,x7533),f10(x7531,x7534,x7533),x7533)
% 9.71/9.78  [754]~P47(x7543)+~P8(x7541,x7544,x7543)+~P8(f3(x7543),x7541,x7543)+P8(f18(x7541,x7542,x7543),f18(x7544,x7542,x7543),x7543)
% 9.71/9.78  [755]~P1(x7553)+~P7(x7551,x7554,x7553)+~P7(f3(x7553),x7552,x7553)+P7(f10(x7551,x7552,x7553),f10(x7554,x7552,x7553),x7553)
% 9.71/9.78  [756]~P3(x7563)+~P7(x7561,x7564,x7563)+~P7(f3(x7563),x7562,x7563)+P7(f10(x7561,x7562,x7563),f10(x7564,x7562,x7563),x7563)
% 9.71/9.78  [757]~P1(x7573)+~P7(x7572,x7574,x7573)+~P7(f3(x7573),x7571,x7573)+P7(f10(x7571,x7572,x7573),f10(x7571,x7574,x7573),x7573)
% 9.71/9.78  [759]~P3(x7593)+~P7(x7592,x7594,x7593)+~P7(f3(x7593),x7591,x7593)+P7(f10(x7591,x7592,x7593),f10(x7591,x7594,x7593),x7593)
% 9.71/9.78  [760]~P45(x7603)+~P7(x7602,x7604,x7603)+~P7(f3(x7603),x7601,x7603)+P7(f10(x7601,x7602,x7603),f10(x7601,x7604,x7603),x7603)
% 9.71/9.78  [761]~P44(x7613)+~P7(x7611,x7614,x7613)+~P7(f3(x7613),x7612,x7613)+P7(f7(x7611,x7612,x7613),f7(x7614,x7612,x7613),x7613)
% 9.71/9.78  [779]~P44(x7794)+~P7(f3(x7794),x7793,x7794)+~P8(f10(x7791,x7793,x7794),x7792,x7794)+P8(x7791,f7(x7792,x7793,x7794),x7794)
% 9.71/9.78  [780]~P44(x7804)+~P7(f3(x7804),x7803,x7804)+~P7(f10(x7801,x7803,x7804),x7802,x7804)+P7(x7801,f7(x7802,x7803,x7804),x7804)
% 9.71/9.78  [781]~P44(x7813)+~P7(f3(x7813),x7812,x7813)+~P8(x7811,f10(x7814,x7812,x7813),x7813)+P8(f7(x7811,x7812,x7813),x7814,x7813)
% 9.71/9.78  [782]~P44(x7823)+~P7(f3(x7823),x7822,x7823)+~P7(x7821,f10(x7824,x7822,x7823),x7823)+P7(f7(x7821,x7822,x7823),x7824,x7823)
% 9.71/9.78  [796]P7(x7962,x7961,x7963)+~P3(x7963)+P7(x7961,x7962,x7963)+~P7(f10(x7964,x7961,x7963),f10(x7964,x7962,x7963),x7963)
% 9.71/9.78  [797]P7(x7972,x7971,x7973)+~P3(x7973)+P7(x7971,x7972,x7973)+~P7(f10(x7971,x7974,x7973),f10(x7972,x7974,x7973),x7973)
% 9.71/9.78  [803]~P3(x8033)+P7(x8031,x8032,x8033)+~P7(f10(x8031,x8034,x8033),f10(x8032,x8034,x8033),x8033)+P7(x8034,f3(x8033),x8033)
% 9.71/9.78  [804]~P3(x8043)+P7(x8041,x8042,x8043)+~P7(f10(x8044,x8041,x8043),f10(x8044,x8042,x8043),x8043)+P7(x8044,f3(x8043),x8043)
% 9.71/9.78  [805]~P3(x8053)+P7(x8051,x8052,x8053)+~P7(f10(x8054,x8052,x8053),f10(x8054,x8051,x8053),x8053)+P7(f3(x8053),x8054,x8053)
% 9.71/9.78  [806]~P3(x8063)+P7(x8061,x8062,x8063)+~P7(f10(x8062,x8064,x8063),f10(x8061,x8064,x8063),x8063)+P7(f3(x8063),x8064,x8063)
% 9.71/9.78  [810]~P3(x8102)+~P7(f10(x8103,x8101,x8102),f10(x8104,x8101,x8102),x8102)+P7(x8101,f3(x8102),x8102)+P7(f3(x8102),x8101,x8102)
% 9.71/9.78  [811]~P3(x8112)+~P7(f10(x8111,x8113,x8112),f10(x8111,x8114,x8112),x8112)+P7(x8111,f3(x8112),x8112)+P7(f3(x8112),x8111,x8112)
% 9.71/9.78  [823]~P3(x8233)+P8(x8231,x8232,x8233)+~P8(f10(x8234,x8232,x8233),f10(x8234,x8231,x8233),x8233)+~P7(x8234,f3(x8233),x8233)
% 9.71/9.78  [824]~P3(x8243)+P7(x8241,x8242,x8243)+~P7(f10(x8244,x8242,x8243),f10(x8244,x8241,x8243),x8243)+~P7(x8244,f3(x8243),x8243)
% 9.71/9.78  [825]~P1(x8253)+P8(x8251,x8252,x8253)+~P8(f10(x8254,x8251,x8253),f10(x8254,x8252,x8253),x8253)+~P7(f3(x8253),x8254,x8253)
% 9.71/9.78  [826]~P1(x8263)+P8(x8261,x8262,x8263)+~P8(f10(x8261,x8264,x8263),f10(x8262,x8264,x8263),x8263)+~P7(f3(x8263),x8264,x8263)
% 9.71/9.78  [827]~P3(x8273)+P8(x8271,x8272,x8273)+~P8(f10(x8274,x8271,x8273),f10(x8274,x8272,x8273),x8273)+~P7(f3(x8273),x8274,x8273)
% 9.71/9.78  [828]~P1(x8283)+P7(x8281,x8282,x8283)+~P7(f10(x8284,x8281,x8283),f10(x8284,x8282,x8283),x8283)+~P8(f3(x8283),x8284,x8283)
% 9.71/9.78  [829]~P1(x8293)+P7(x8291,x8292,x8293)+~P7(f10(x8291,x8294,x8293),f10(x8292,x8294,x8293),x8293)+~P8(f3(x8293),x8294,x8293)
% 9.71/9.78  [830]~P2(x8303)+P7(x8301,x8302,x8303)+~P7(f10(x8304,x8301,x8303),f10(x8304,x8302,x8303),x8303)+~P8(f3(x8303),x8304,x8303)
% 9.71/9.78  [831]~P2(x8313)+P7(x8311,x8312,x8313)+~P7(f10(x8311,x8314,x8313),f10(x8312,x8314,x8313),x8313)+~P8(f3(x8313),x8314,x8313)
% 9.71/9.78  [832]~P3(x8323)+P7(x8321,x8322,x8323)+~P7(f10(x8324,x8321,x8323),f10(x8324,x8322,x8323),x8323)+~P7(f3(x8323),x8324,x8323)
% 9.71/9.78  [833]~P47(x8333)+P7(x8331,x8332,x8333)+~P8(f3(x8333),x8332,x8333)+~P7(f18(x8331,x8334,x8333),f18(x8332,x8334,x8333),x8333)
% 9.71/9.78  [610]~P39(x6102)+~P40(x6102)+E(x6101,f3(x6102))+E(f7(f10(x6103,x6101,x6102),f10(x6104,x6101,x6102),x6102),f7(x6103,x6104,x6102))
% 9.71/9.78  [611]~P39(x6112)+~P40(x6112)+E(x6111,f3(x6112))+E(f7(f10(x6111,x6113,x6112),f10(x6111,x6114,x6112),x6112),f7(x6113,x6114,x6112))
% 9.71/9.78  [815]~P39(x8152)+~P40(x8152)+E(x8151,f3(x8152))+E(f7(f5(x8153,f10(x8154,x8151,x8152),x8152),x8151,x8152),f5(x8154,f7(x8153,x8151,x8152),x8152))
% 9.71/9.78  [816]~P39(x8162)+~P40(x8162)+E(x8161,f3(x8162))+E(f7(f5(x8163,f10(x8164,x8161,x8162),x8162),x8161,x8162),f5(f7(x8163,x8161,x8162),x8164,x8162))
% 9.71/9.78  [570]~P4(x5703)+~P8(x5705,x5704,x5703)+P8(x5701,x5702,x5703)+~E(f6(x5704,x5705,x5703),f6(x5702,x5701,x5703))
% 9.71/9.78  [571]~P4(x5713)+~P8(x5715,x5714,x5713)+P8(x5711,x5712,x5713)+~E(f6(x5712,x5711,x5713),f6(x5714,x5715,x5713))
% 9.71/9.78  [572]~P4(x5723)+~P7(x5724,x5725,x5723)+P7(x5721,x5722,x5723)+~E(f6(x5724,x5725,x5723),f6(x5721,x5722,x5723))
% 9.71/9.78  [573]~P4(x5733)+~P7(x5734,x5735,x5733)+P7(x5731,x5732,x5733)+~E(f6(x5731,x5732,x5733),f6(x5734,x5735,x5733))
% 9.71/9.78  [733]~P31(x7333)+~P8(x7332,x7335,x7333)+~P8(x7331,x7334,x7333)+P8(f5(x7331,x7332,x7333),f5(x7334,x7335,x7333),x7333)
% 9.71/9.78  [734]~P29(x7343)+~P8(x7342,x7345,x7343)+~P7(x7341,x7344,x7343)+P7(f5(x7341,x7342,x7343),f5(x7344,x7345,x7343),x7343)
% 9.71/9.78  [735]~P29(x7353)+~P8(x7351,x7354,x7353)+~P7(x7352,x7355,x7353)+P7(f5(x7351,x7352,x7353),f5(x7354,x7355,x7353),x7353)
% 9.71/9.78  [736]~P29(x7363)+~P7(x7362,x7365,x7363)+~P7(x7361,x7364,x7363)+P7(f5(x7361,x7362,x7363),f5(x7364,x7365,x7363),x7363)
% 9.71/9.78  [778]~P4(x7784)+~P8(x7785,x7783,x7784)+~P8(x7781,f5(x7782,x7785,x7784),x7784)+P8(x7781,f5(x7782,x7783,x7784),x7784)
% 9.71/9.78  [942]~P40(x9422)+E(x9421,f3(x9422))+E(x9423,f3(x9422))+E(f7(f5(f10(x9424,x9421,x9422),f10(x9425,x9423,x9422),x9422),f10(x9423,x9421,x9422),x9422),f5(f7(x9424,x9423,x9422),f7(x9425,x9421,x9422),x9422))
% 9.71/9.78  [943]~P40(x9432)+E(x9431,f3(x9432))+E(x9433,f3(x9432))+E(f7(f6(f10(x9434,x9431,x9432),f10(x9435,x9433,x9432),x9432),f10(x9433,x9431,x9432),x9432),f6(f7(x9434,x9433,x9432),f7(x9435,x9431,x9432),x9432))
% 9.71/9.78  [673]~P5(x6731)+~P44(x6731)+~P39(x6731)+~P7(f3(x6731),x6732,x6731)+P7(f3(x6731),f7(x6732,f17(f2(f11(a1)),x6731),x6731),x6731)
% 9.71/9.78  [773]~P5(x7731)+~P44(x7731)+~P39(x7731)+P7(f3(x7731),x7732,x7731)+~P7(f3(x7731),f7(x7732,f17(f2(f11(a1)),x7731),x7731),x7731)
% 9.71/9.78  [564]~P32(x5642)+~P8(f3(x5642),x5641,x5642)+~P8(f3(x5642),x5643,x5642)+~E(f5(x5643,x5641,x5642),f3(x5642))+E(x5641,f3(x5642))
% 9.71/9.78  [565]~P32(x5652)+~P8(f3(x5652),x5653,x5652)+~P8(f3(x5652),x5651,x5652)+~E(f5(x5651,x5653,x5652),f3(x5652))+E(x5651,f3(x5652))
% 9.71/9.78  [664]~P44(x6641)+~P39(x6641)+~P8(x6643,f3(x6641),x6641)+~P8(x6642,f3(x6641),x6641)+P8(f3(x6641),f7(x6642,x6643,x6641),x6641)
% 9.71/9.78  [666]~P44(x6661)+~P39(x6661)+~P8(f3(x6661),x6663,x6661)+~P8(f3(x6661),x6662,x6661)+P8(f3(x6661),f7(x6662,x6663,x6661),x6661)
% 9.71/9.78  [668]~P44(x6683)+~P39(x6683)+~P8(x6682,f3(x6683),x6683)+~P8(f3(x6683),x6681,x6683)+P8(f7(x6681,x6682,x6683),f3(x6683),x6683)
% 9.71/9.78  [669]~P44(x6693)+~P39(x6693)+~P8(x6691,f3(x6693),x6693)+~P8(f3(x6693),x6692,x6693)+P8(f7(x6691,x6692,x6693),f3(x6693),x6693)
% 9.71/9.78  [686]~P44(x6862)+~P39(x6862)+~P8(f7(x6863,x6861,x6862),f3(x6862),x6862)+P8(x6861,f3(x6862),x6862)+P8(x6863,f3(x6862),x6862)
% 9.71/9.78  [687]~P44(x6872)+~P39(x6872)+~P7(f7(x6873,x6871,x6872),f3(x6872),x6872)+P7(x6871,f3(x6872),x6872)+P7(x6873,f3(x6872),x6872)
% 9.71/9.78  [688]~P44(x6882)+~P39(x6882)+~P8(f3(x6882),f7(x6883,x6881,x6882),x6882)+P8(x6881,f3(x6882),x6882)+P8(f3(x6882),x6883,x6882)
% 9.71/9.78  [689]~P44(x6892)+~P39(x6892)+~P8(f3(x6892),f7(x6891,x6893,x6892),x6892)+P8(x6891,f3(x6892),x6892)+P8(f3(x6892),x6893,x6892)
% 9.71/9.78  [690]~P44(x6902)+~P39(x6902)+~P8(f3(x6902),f7(x6903,x6901,x6902),x6902)+P8(x6901,f3(x6902),x6902)+P8(f3(x6902),x6901,x6902)
% 9.71/9.78  [691]~P44(x6912)+~P39(x6912)+~P8(f3(x6912),f7(x6911,x6913,x6912),x6912)+P8(x6911,f3(x6912),x6912)+P8(f3(x6912),x6911,x6912)
% 9.71/9.78  [692]~P44(x6922)+~P39(x6922)+~P7(f3(x6922),f7(x6923,x6921,x6922),x6922)+P7(x6921,f3(x6922),x6922)+P7(f3(x6922),x6923,x6922)
% 9.71/9.78  [693]~P44(x6932)+~P39(x6932)+~P7(f3(x6932),f7(x6931,x6933,x6932),x6932)+P7(x6931,f3(x6932),x6932)+P7(f3(x6932),x6933,x6932)
% 9.71/9.78  [694]~P44(x6942)+~P39(x6942)+~P7(f3(x6942),f7(x6943,x6941,x6942),x6942)+P7(x6941,f3(x6942),x6942)+P7(f3(x6942),x6941,x6942)
% 9.71/9.78  [695]~P44(x6952)+~P39(x6952)+~P7(f3(x6952),f7(x6951,x6953,x6952),x6952)+P7(x6951,f3(x6952),x6952)+P7(f3(x6952),x6951,x6952)
% 9.71/9.78  [696]~P44(x6962)+~P39(x6962)+~P8(f7(x6963,x6961,x6962),f3(x6962),x6962)+P8(x6961,f3(x6962),x6962)+P8(f3(x6962),x6961,x6962)
% 9.71/9.78  [697]~P44(x6972)+~P39(x6972)+~P8(f7(x6971,x6973,x6972),f3(x6972),x6972)+P8(x6971,f3(x6972),x6972)+P8(f3(x6972),x6971,x6972)
% 9.71/9.78  [698]~P44(x6982)+~P39(x6982)+~P7(f7(x6983,x6981,x6982),f3(x6982),x6982)+P7(x6981,f3(x6982),x6982)+P7(f3(x6982),x6981,x6982)
% 9.71/9.78  [699]~P44(x6992)+~P39(x6992)+~P7(f7(x6991,x6993,x6992),f3(x6992),x6992)+P7(x6991,f3(x6992),x6992)+P7(f3(x6992),x6991,x6992)
% 9.71/9.78  [700]~P44(x7001)+~P39(x7001)+~P8(f7(x7002,x7003,x7001),f3(x7001),x7001)+P8(f3(x7001),x7002,x7001)+P8(f3(x7001),x7003,x7001)
% 9.71/9.78  [701]~P44(x7011)+~P39(x7011)+~P7(f7(x7012,x7013,x7011),f3(x7011),x7011)+P7(f3(x7011),x7012,x7011)+P7(f3(x7011),x7013,x7011)
% 9.71/9.78  [404]~P39(x4042)+~P40(x4042)+~P6(x4042)+~E(f17(x4041,x4042),f3(x4042))+E(f17(x4041,x4042),f7(x4043,f3(x4042),x4042))
% 9.71/9.78  [405]~P39(x4052)+~P40(x4052)+~P6(x4052)+~E(f17(x4053,x4052),f3(x4052))+E(f7(x4051,f3(x4052),x4052),f17(x4053,x4052))
% 9.71/9.78  [409]~P39(x4093)+~P40(x4093)+~P6(x4093)+~E(f17(x4092,x4093),f3(x4093))+E(f7(x4091,f17(x4092,x4093),x4093),f3(x4093))
% 9.71/9.78  [429]~P39(x4292)+~P40(x4292)+~P6(x4292)+E(f17(x4291,x4292),f3(x4292))+~E(f17(x4291,x4292),f7(x4293,f3(x4292),x4292))
% 9.71/9.78  [430]~P39(x4302)+~P40(x4302)+~P6(x4302)+E(f17(x4301,x4302),f3(x4302))+~E(f7(x4303,f3(x4302),x4302),f17(x4301,x4302))
% 9.71/9.78  [552]~P39(x5522)+~P40(x5522)+~P6(x5522)+~E(f17(x5521,x5522),f3(x5522))+E(f7(f10(f17(x5521,x5522),x5523,x5522),x5523,x5522),f17(x5521,x5522))
% 9.71/9.78  [616]~P30(x6164)+~P14(x6164)+~P8(x6161,x6163,x6164)+~P8(f3(x6164),x6162,x6164)+P8(x6161,f5(x6162,x6163,x6164),x6164)
% 9.71/9.78  [617]~P30(x6174)+~P14(x6174)+~P8(x6171,x6172,x6174)+~P8(f3(x6174),x6173,x6174)+P8(x6171,f5(x6172,x6173,x6174),x6174)
% 9.71/9.78  [618]~P30(x6184)+~P14(x6184)+~P8(x6181,x6183,x6184)+~P7(f3(x6184),x6182,x6184)+P7(x6181,f5(x6182,x6183,x6184),x6184)
% 9.71/9.78  [619]~P30(x6194)+~P14(x6194)+~P7(x6191,x6193,x6194)+~P8(f3(x6194),x6192,x6194)+P7(x6191,f5(x6192,x6193,x6194),x6194)
% 9.71/9.78  [762]~P44(x7623)+~P39(x7623)+~P8(x7624,x7621,x7623)+~P8(x7622,f3(x7623),x7623)+P8(f7(x7621,x7622,x7623),f7(x7624,x7622,x7623),x7623)
% 9.71/9.78  [763]~P44(x7633)+~P39(x7633)+~P8(x7631,x7634,x7633)+~P8(f3(x7633),x7632,x7633)+P8(f7(x7631,x7632,x7633),f7(x7634,x7632,x7633),x7633)
% 9.71/9.78  [787]~P44(x7874)+~P39(x7874)+~P7(f3(x7874),x7873,x7874)+~P8(f7(x7871,x7873,x7874),x7872,x7874)+P8(x7871,f10(x7872,x7873,x7874),x7874)
% 9.71/9.78  [789]~P44(x7894)+~P39(x7894)+~P7(f3(x7894),x7893,x7894)+~P7(f7(x7891,x7893,x7894),x7892,x7894)+P7(x7891,f10(x7892,x7893,x7894),x7894)
% 9.71/9.78  [791]~P44(x7913)+~P39(x7913)+~P7(f3(x7913),x7912,x7913)+~P8(x7911,f7(x7914,x7912,x7913),x7913)+P8(f10(x7911,x7912,x7913),x7914,x7913)
% 9.71/9.78  [793]~P44(x7933)+~P39(x7933)+~P7(f3(x7933),x7932,x7933)+~P7(x7931,f7(x7934,x7932,x7933),x7933)+P7(f10(x7931,x7932,x7933),x7934,x7933)
% 9.71/9.78  [893]~P44(x8933)+~P7(x8932,x8934,x8933)+~P7(x8931,f3(x8933),x8933)+~P7(f3(x8933),f10(x8932,x8934,x8933),x8933)+P7(f7(x8931,x8932,x8933),f7(x8931,x8934,x8933),x8933)
% 9.71/9.78  [894]~P44(x8943)+~P8(x8944,x8942,x8943)+~P8(f3(x8943),x8941,x8943)+~P7(f3(x8943),f10(x8942,x8944,x8943),x8943)+P8(f7(x8941,x8942,x8943),f7(x8941,x8944,x8943),x8943)
% 9.71/9.78  [895]~P44(x8953)+~P7(x8954,x8952,x8953)+~P7(f3(x8953),x8951,x8953)+~P7(f3(x8953),f10(x8952,x8954,x8953),x8953)+P7(f7(x8951,x8952,x8953),f7(x8951,x8954,x8953),x8953)
% 9.71/9.78  [566]~P40(x5662)+~E(f7(x5664,x5663,x5662),f7(x5665,x5661,x5662))+E(f10(x5664,x5661,x5662),f10(x5665,x5663,x5662))+E(x5661,f3(x5662))+E(x5663,f3(x5662))
% 9.71/9.78  [567]~P40(x5672)+~E(f10(x5674,x5673,x5672),f10(x5675,x5671,x5672))+E(f7(x5674,x5671,x5672),f7(x5675,x5673,x5672))+E(x5671,f3(x5672))+E(x5673,f3(x5672))
% 9.71/9.78  [795]~P38(x7954)+~P5(x7954)+E(x7951,x7952)+E(x7953,f3(x7954))+~E(f5(x7955,f10(x7953,x7951,x7954),x7954),f5(x7955,f10(x7953,x7952,x7954),x7954))
% 9.71/9.78  [930]~P38(x9305)+~P5(x9305)+E(x9301,x9302)+E(x9303,x9304)+~E(f5(f10(x9303,x9301,x9305),f10(x9304,x9302,x9305),x9305),f5(f10(x9303,x9302,x9305),f10(x9304,x9301,x9305),x9305))
% 9.71/9.78  [407]~P24(x4072)+~P43(x4072)+~P55(x4072)+~P35(x4072)+~E(f18(x4071,x4073,x4072),f3(x4072))+E(x4071,f3(x4072))
% 9.71/9.78  [682]~P44(x6822)+~P39(x6822)+P7(x6821,f3(x6822),x6822)+P7(f3(x6822),x6821,x6822)+~P8(x6823,f3(x6822),x6822)+P8(x6823,f7(x6824,x6821,x6822),x6822)
% 9.71/9.78  [683]~P44(x6832)+~P39(x6832)+P7(x6831,f3(x6832),x6832)+P7(f3(x6832),x6831,x6832)+~P7(x6833,f3(x6832),x6832)+P7(x6833,f7(x6834,x6831,x6832),x6832)
% 9.71/9.78  [684]~P44(x6842)+~P39(x6842)+P7(x6841,f3(x6842),x6842)+P7(f3(x6842),x6841,x6842)+~P8(f3(x6842),x6844,x6842)+P8(f7(x6843,x6841,x6842),x6844,x6842)
% 9.71/9.78  [685]~P44(x6852)+~P39(x6852)+P7(x6851,f3(x6852),x6852)+P7(f3(x6852),x6851,x6852)+~P7(f3(x6852),x6854,x6852)+P7(f7(x6853,x6851,x6852),x6854,x6852)
% 9.71/9.78  [737]~P44(x7372)+~P39(x7372)+P8(x7371,f3(x7372),x7372)+P7(f3(x7372),x7373,x7372)+~P8(x7371,f7(x7374,x7373,x7372),x7372)+P7(x7373,f3(x7372),x7372)
% 9.71/9.78  [738]~P44(x7382)+~P39(x7382)+P7(x7381,f3(x7382),x7382)+P7(f3(x7382),x7381,x7382)+~P7(x7383,f7(x7384,x7381,x7382),x7382)+P7(x7383,f3(x7382),x7382)
% 9.71/9.78  [739]~P44(x7392)+~P39(x7392)+P7(x7391,f3(x7392),x7392)+P7(f3(x7392),x7391,x7392)+~P8(f7(x7394,x7391,x7392),x7393,x7392)+P8(f3(x7392),x7393,x7392)
% 9.71/9.78  [740]~P44(x7402)+~P39(x7402)+P7(x7401,f3(x7402),x7402)+P7(f3(x7402),x7401,x7402)+~P7(f7(x7404,x7401,x7402),x7403,x7402)+P7(f3(x7402),x7403,x7402)
% 9.71/9.78  [834]~P44(x8342)+~P39(x8342)+~P8(f10(x8343,x8341,x8342),x8344,x8342)+P7(x8341,f3(x8342),x8342)+~P8(x8343,f3(x8342),x8342)+P8(x8343,f7(x8344,x8341,x8342),x8342)
% 9.71/9.78  [835]~P44(x8352)+~P39(x8352)+~P7(f10(x8353,x8351,x8352),x8354,x8352)+P7(x8351,f3(x8352),x8352)+~P7(x8353,f3(x8352),x8352)+P7(x8353,f7(x8354,x8351,x8352),x8352)
% 9.71/9.78  [836]~P44(x8362)+~P39(x8362)+~P8(x8363,f10(x8364,x8361,x8362),x8362)+P7(x8361,f3(x8362),x8362)+~P8(f3(x8362),x8364,x8362)+P8(f7(x8363,x8361,x8362),x8364,x8362)
% 9.71/9.78  [837]~P44(x8372)+~P39(x8372)+~P7(x8373,f10(x8374,x8371,x8372),x8372)+P7(x8371,f3(x8372),x8372)+~P7(f3(x8372),x8374,x8372)+P7(f7(x8373,x8371,x8372),x8374,x8372)
% 9.71/9.78  [838]~P44(x8381)+~P39(x8381)+~P8(x8384,f7(x8383,x8382,x8381),x8381)+~P7(x8382,f3(x8381),x8381)+P7(f3(x8381),x8382,x8381)+P8(x8383,f10(x8384,x8382,x8381),x8381)
% 9.71/9.78  [839]~P44(x8391)+~P39(x8391)+~P8(x8394,f10(x8393,x8392,x8391),x8391)+~P8(x8393,f3(x8391),x8391)+P7(f3(x8391),x8392,x8391)+P8(x8393,f7(x8394,x8392,x8391),x8391)
% 9.71/9.78  [840]~P44(x8401)+~P39(x8401)+~P8(x8404,f10(x8403,x8402,x8401),x8401)+~P7(x8402,f3(x8401),x8401)+P7(f3(x8401),x8402,x8401)+P8(x8403,f7(x8404,x8402,x8401),x8401)
% 9.71/9.78  [841]~P44(x8411)+~P39(x8411)+~P7(x8414,f7(x8413,x8412,x8411),x8411)+~P7(x8412,f3(x8411),x8411)+P7(f3(x8411),x8412,x8411)+P7(x8413,f10(x8414,x8412,x8411),x8411)
% 9.71/9.78  [842]~P44(x8421)+~P39(x8421)+~P7(x8424,f10(x8423,x8422,x8421),x8421)+~P7(x8422,f3(x8421),x8421)+P7(f3(x8421),x8422,x8421)+P7(x8423,f7(x8424,x8422,x8421),x8421)
% 9.71/9.78  [843]~P44(x8431)+~P39(x8431)+~P7(x8434,f10(x8433,x8432,x8431),x8431)+~P7(x8433,f3(x8431),x8431)+P7(f3(x8431),x8432,x8431)+P7(x8433,f7(x8434,x8432,x8431),x8431)
% 9.71/9.78  [844]~P44(x8441)+~P39(x8441)+~P8(f7(x8444,x8442,x8441),x8443,x8441)+~P7(x8442,f3(x8441),x8441)+P7(f3(x8441),x8442,x8441)+P8(f10(x8443,x8442,x8441),x8444,x8441)
% 9.71/9.78  [845]~P44(x8451)+~P39(x8451)+~P8(f10(x8454,x8452,x8451),x8453,x8451)+~P7(x8452,f3(x8451),x8451)+P7(f3(x8451),x8452,x8451)+P8(f7(x8453,x8452,x8451),x8454,x8451)
% 9.71/9.78  [846]~P44(x8461)+~P39(x8461)+~P7(f7(x8464,x8462,x8461),x8463,x8461)+~P7(x8462,f3(x8461),x8461)+P7(f3(x8461),x8462,x8461)+P7(f10(x8463,x8462,x8461),x8464,x8461)
% 9.71/9.78  [847]~P44(x8471)+~P39(x8471)+~P7(f10(x8474,x8472,x8471),x8473,x8471)+~P7(x8472,f3(x8471),x8471)+P7(f3(x8471),x8472,x8471)+P7(f7(x8473,x8472,x8471),x8474,x8471)
% 9.71/9.78  [848]~P44(x8481)+~P39(x8481)+~P8(f10(x8484,x8482,x8481),x8483,x8481)+~P8(f3(x8481),x8484,x8481)+P7(f3(x8481),x8482,x8481)+P8(f7(x8483,x8482,x8481),x8484,x8481)
% 9.71/9.78  [849]~P44(x8491)+~P39(x8491)+~P7(f10(x8494,x8492,x8491),x8493,x8491)+~P7(f3(x8491),x8494,x8491)+P7(f3(x8491),x8492,x8491)+P7(f7(x8493,x8492,x8491),x8494,x8491)
% 9.71/9.78  [896]~P44(x8963)+~P39(x8963)+~P8(x8962,x8964,x8963)+~P8(x8961,f3(x8963),x8963)+~P7(f3(x8963),f10(x8962,x8964,x8963),x8963)+P8(f7(x8961,x8962,x8963),f7(x8961,x8964,x8963),x8963)
% 9.71/9.78  [913]~P44(x9134)+~P39(x9134)+~P8(x9131,f3(x9134),x9134)+~P8(x9132,f10(x9131,x9133,x9134),x9134)+~P8(f10(x9131,x9133,x9134),x9132,x9134)+P8(x9131,f7(x9132,x9133,x9134),x9134)
% 9.71/9.78  [914]~P44(x9144)+~P39(x9144)+~P7(x9143,f3(x9144),x9144)+~P8(x9142,f10(x9141,x9143,x9144),x9144)+~P8(f10(x9141,x9143,x9144),x9142,x9144)+P8(x9141,f7(x9142,x9143,x9144),x9144)
% 9.71/9.78  [915]~P44(x9154)+~P39(x9154)+~P7(x9153,f3(x9154),x9154)+~P7(x9152,f10(x9151,x9153,x9154),x9154)+~P7(f10(x9151,x9153,x9154),x9152,x9154)+P7(x9151,f7(x9152,x9153,x9154),x9154)
% 9.71/9.78  [916]~P44(x9164)+~P39(x9164)+~P7(x9161,f3(x9164),x9164)+~P7(x9162,f10(x9161,x9163,x9164),x9164)+~P7(f10(x9161,x9163,x9164),x9162,x9164)+P7(x9161,f7(x9162,x9163,x9164),x9164)
% 9.71/9.78  [917]~P44(x9173)+~P39(x9173)+~P7(x9172,f3(x9173),x9173)+~P8(x9171,f10(x9174,x9172,x9173),x9173)+~P8(f10(x9174,x9172,x9173),x9171,x9173)+P8(f7(x9171,x9172,x9173),x9174,x9173)
% 9.71/9.78  [918]~P44(x9183)+~P39(x9183)+~P7(x9182,f3(x9183),x9183)+~P7(x9181,f10(x9184,x9182,x9183),x9183)+~P7(f10(x9184,x9182,x9183),x9181,x9183)+P7(f7(x9181,x9182,x9183),x9184,x9183)
% 9.71/9.78  [919]~P44(x9193)+~P39(x9193)+~P8(f3(x9193),x9194,x9193)+~P8(x9191,f10(x9194,x9192,x9193),x9193)+~P8(f10(x9194,x9192,x9193),x9191,x9193)+P8(f7(x9191,x9192,x9193),x9194,x9193)
% 9.71/9.78  [920]~P44(x9203)+~P39(x9203)+~P7(f3(x9203),x9204,x9203)+~P7(x9201,f10(x9204,x9202,x9203),x9203)+~P7(f10(x9204,x9202,x9203),x9201,x9203)+P7(f7(x9201,x9202,x9203),x9204,x9203)
% 9.71/9.78  [514]~P39(x5142)+~P40(x5142)+~P6(x5142)+~E(f7(x5143,x5141,x5142),f17(x5144,x5142))+E(x5141,f3(x5142))+E(x5143,f10(f17(x5144,x5142),x5141,x5142))
% 9.71/9.78  [515]~P39(x5152)+~P40(x5152)+~P6(x5152)+~E(f17(x5153,x5152),f7(x5154,x5151,x5152))+E(x5151,f3(x5152))+E(f10(f17(x5153,x5152),x5151,x5152),x5154)
% 9.71/9.78  [861]~P51(x8613)+~P8(x8612,x8615,x8613)+~P8(x8611,x8614,x8613)+~P8(f3(x8613),x8614,x8613)+~P8(f3(x8613),x8612,x8613)+P8(f10(x8611,x8612,x8613),f10(x8614,x8615,x8613),x8613)
% 9.71/9.78  [862]~P51(x8623)+~P8(x8622,x8625,x8623)+~P8(x8621,x8624,x8623)+~P8(f3(x8623),x8622,x8623)+~P8(f3(x8623),x8621,x8623)+P8(f10(x8621,x8622,x8623),f10(x8624,x8625,x8623),x8623)
% 9.71/9.78  [863]~P44(x8633)+~P8(x8635,x8632,x8633)+~P8(x8631,x8634,x8633)+~P8(f3(x8633),x8631,x8633)+~P7(f3(x8633),x8635,x8633)+P8(f7(x8631,x8632,x8633),f7(x8634,x8635,x8633),x8633)
% 9.71/9.78  [864]~P1(x8643)+~P8(x8642,x8645,x8643)+~P7(x8641,x8644,x8643)+~P8(f3(x8643),x8641,x8643)+~P7(f3(x8643),x8642,x8643)+P7(f10(x8641,x8642,x8643),f10(x8644,x8645,x8643),x8643)
% 9.71/9.78  [865]~P1(x8653)+~P8(x8651,x8654,x8653)+~P7(x8652,x8655,x8653)+~P8(f3(x8653),x8652,x8653)+~P7(f3(x8653),x8651,x8653)+P7(f10(x8651,x8652,x8653),f10(x8654,x8655,x8653),x8653)
% 9.71/9.78  [866]~P1(x8663)+~P7(x8662,x8665,x8663)+~P7(x8661,x8664,x8663)+~P8(f3(x8663),x8662,x8663)+~P8(f3(x8663),x8661,x8663)+P7(f10(x8661,x8662,x8663),f10(x8664,x8665,x8663),x8663)
% 9.71/9.78  [867]~P1(x8673)+~P7(x8672,x8675,x8673)+~P7(x8671,x8674,x8673)+~P8(f3(x8673),x8672,x8673)+~P7(f3(x8673),x8674,x8673)+P7(f10(x8671,x8672,x8673),f10(x8674,x8675,x8673),x8673)
% 9.71/9.78  [868]~P44(x8683)+~P8(x8685,x8682,x8683)+~P7(x8681,x8684,x8683)+~P8(f3(x8683),x8681,x8683)+~P7(f3(x8683),x8685,x8683)+P7(f7(x8681,x8682,x8683),f7(x8684,x8685,x8683),x8683)
% 9.71/9.78  [869]~P44(x8693)+~P8(x8691,x8694,x8693)+~P7(x8695,x8692,x8693)+~P7(f3(x8693),x8695,x8693)+~P7(f3(x8693),x8691,x8693)+P7(f7(x8691,x8692,x8693),f7(x8694,x8695,x8693),x8693)
% 9.71/9.78  %EqnAxiom
% 9.71/9.78  [1]E(x11,x11)
% 9.71/9.78  [2]E(x22,x21)+~E(x21,x22)
% 9.71/9.78  [3]E(x31,x33)+~E(x31,x32)+~E(x32,x33)
% 9.71/9.78  [4]~E(x41,x42)+E(f2(x41),f2(x42))
% 9.71/9.78  [5]~E(x51,x52)+E(f7(x51,x53,x54),f7(x52,x53,x54))
% 9.71/9.78  [6]~E(x61,x62)+E(f7(x63,x61,x64),f7(x63,x62,x64))
% 9.71/9.78  [7]~E(x71,x72)+E(f7(x73,x74,x71),f7(x73,x74,x72))
% 9.71/9.78  [8]~E(x81,x82)+E(f3(x81),f3(x82))
% 9.71/9.78  [9]~E(x91,x92)+E(f15(x91),f15(x92))
% 9.71/9.78  [10]~E(x101,x102)+E(f10(x101,x103,x104),f10(x102,x103,x104))
% 9.71/9.78  [11]~E(x111,x112)+E(f10(x113,x111,x114),f10(x113,x112,x114))
% 9.71/9.78  [12]~E(x121,x122)+E(f10(x123,x124,x121),f10(x123,x124,x122))
% 9.71/9.78  [13]~E(x131,x132)+E(f4(x131,x133),f4(x132,x133))
% 9.71/9.78  [14]~E(x141,x142)+E(f4(x143,x141),f4(x143,x142))
% 9.71/9.78  [15]~E(x151,x152)+E(f18(x151,x153,x154),f18(x152,x153,x154))
% 9.71/9.78  [16]~E(x161,x162)+E(f18(x163,x161,x164),f18(x163,x162,x164))
% 9.71/9.78  [17]~E(x171,x172)+E(f18(x173,x174,x171),f18(x173,x174,x172))
% 9.71/9.78  [18]~E(x181,x182)+E(f17(x181,x183),f17(x182,x183))
% 9.71/9.78  [19]~E(x191,x192)+E(f17(x193,x191),f17(x193,x192))
% 9.71/9.78  [20]~E(x201,x202)+E(f5(x201,x203,x204),f5(x202,x203,x204))
% 9.71/9.78  [21]~E(x211,x212)+E(f5(x213,x211,x214),f5(x213,x212,x214))
% 9.71/9.78  [22]~E(x221,x222)+E(f5(x223,x224,x221),f5(x223,x224,x222))
% 9.71/9.78  [23]~E(x231,x232)+E(f11(x231),f11(x232))
% 9.71/9.78  [24]~E(x241,x242)+E(f6(x241,x243,x244),f6(x242,x243,x244))
% 9.71/9.78  [25]~E(x251,x252)+E(f6(x253,x251,x254),f6(x253,x252,x254))
% 9.71/9.78  [26]~E(x261,x262)+E(f6(x263,x264,x261),f6(x263,x264,x262))
% 9.71/9.78  [27]~E(x271,x272)+E(f16(x271,x273),f16(x272,x273))
% 9.71/9.78  [28]~E(x281,x282)+E(f16(x283,x281),f16(x283,x282))
% 9.71/9.78  [29]~E(x291,x292)+E(f20(x291),f20(x292))
% 9.71/9.78  [30]~E(x301,x302)+E(f22(x301,x303),f22(x302,x303))
% 9.71/9.78  [31]~E(x311,x312)+E(f22(x313,x311),f22(x313,x312))
% 9.71/9.78  [32]~E(x321,x322)+E(f21(x321),f21(x322))
% 9.71/9.78  [33]~E(x331,x332)+E(f9(x331),f9(x332))
% 9.71/9.78  [34]~E(x341,x342)+E(f8(x341),f8(x342))
% 9.71/9.78  [35]~P1(x351)+P1(x352)+~E(x351,x352)
% 9.71/9.78  [36]P7(x362,x363,x364)+~E(x361,x362)+~P7(x361,x363,x364)
% 9.71/9.78  [37]P7(x373,x372,x374)+~E(x371,x372)+~P7(x373,x371,x374)
% 9.71/9.78  [38]P7(x383,x384,x382)+~E(x381,x382)+~P7(x383,x384,x381)
% 9.71/9.78  [39]~P48(x391)+P48(x392)+~E(x391,x392)
% 9.71/9.78  [40]~P2(x401)+P2(x402)+~E(x401,x402)
% 9.71/9.78  [41]P8(x412,x413,x414)+~E(x411,x412)+~P8(x411,x413,x414)
% 9.71/9.78  [42]P8(x423,x422,x424)+~E(x421,x422)+~P8(x423,x421,x424)
% 9.71/9.78  [43]P8(x433,x434,x432)+~E(x431,x432)+~P8(x433,x434,x431)
% 9.71/9.78  [44]~P39(x441)+P39(x442)+~E(x441,x442)
% 9.71/9.78  [45]~P3(x451)+P3(x452)+~E(x451,x452)
% 9.71/9.78  [46]~P25(x461)+P25(x462)+~E(x461,x462)
% 9.71/9.78  [47]~P47(x471)+P47(x472)+~E(x471,x472)
% 9.71/9.78  [48]~P37(x481)+P37(x482)+~E(x481,x482)
% 9.71/9.78  [49]~P4(x491)+P4(x492)+~E(x491,x492)
% 9.71/9.78  [50]~P46(x501)+P46(x502)+~E(x501,x502)
% 9.71/9.78  [51]~P50(x511)+P50(x512)+~E(x511,x512)
% 9.71/9.78  [52]~P44(x521)+P44(x522)+~E(x521,x522)
% 9.71/9.78  [53]~P6(x531)+P6(x532)+~E(x531,x532)
% 9.71/9.78  [54]~P52(x541)+P52(x542)+~E(x541,x542)
% 9.71/9.78  [55]~P40(x551)+P40(x552)+~E(x551,x552)
% 9.71/9.78  [56]~P5(x561)+P5(x562)+~E(x561,x562)
% 9.71/9.78  [57]~P24(x571)+P24(x572)+~E(x571,x572)
% 9.71/9.78  [58]~P32(x581)+P32(x582)+~E(x581,x582)
% 9.71/9.78  [59]~P22(x591)+P22(x592)+~E(x591,x592)
% 9.71/9.78  [60]~P49(x601)+P49(x602)+~E(x601,x602)
% 9.71/9.78  [61]~P41(x611)+P41(x612)+~E(x611,x612)
% 9.71/9.78  [62]~P26(x621)+P26(x622)+~E(x621,x622)
% 9.71/9.78  [63]~P14(x631)+P14(x632)+~E(x631,x632)
% 9.71/9.78  [64]~P30(x641)+P30(x642)+~E(x641,x642)
% 9.71/9.78  [65]~P28(x651)+P28(x652)+~E(x651,x652)
% 9.71/9.78  [66]~P11(x661)+P11(x662)+~E(x661,x662)
% 9.71/9.78  [67]~P38(x671)+P38(x672)+~E(x671,x672)
% 9.71/9.78  [68]~P20(x681)+P20(x682)+~E(x681,x682)
% 9.71/9.78  [69]~P33(x691)+P33(x692)+~E(x691,x692)
% 9.71/9.78  [70]~P27(x701)+P27(x702)+~E(x701,x702)
% 9.71/9.78  [71]~P18(x711)+P18(x712)+~E(x711,x712)
% 9.71/9.78  [72]~P31(x721)+P31(x722)+~E(x721,x722)
% 9.71/9.78  [73]~P9(x731)+P9(x732)+~E(x731,x732)
% 9.71/9.78  [74]~P29(x741)+P29(x742)+~E(x741,x742)
% 9.71/9.78  [75]~P23(x751)+P23(x752)+~E(x751,x752)
% 9.71/9.78  [76]~P42(x761)+P42(x762)+~E(x761,x762)
% 9.71/9.78  [77]~P36(x771)+P36(x772)+~E(x771,x772)
% 9.71/9.78  [78]~P16(x781)+P16(x782)+~E(x781,x782)
% 9.71/9.78  [79]~P34(x791)+P34(x792)+~E(x791,x792)
% 9.71/9.78  [80]~P51(x801)+P51(x802)+~E(x801,x802)
% 9.71/9.78  [81]~P10(x811)+P10(x812)+~E(x811,x812)
% 9.71/9.78  [82]~P35(x821)+P35(x822)+~E(x821,x822)
% 9.71/9.78  [83]~P13(x831)+P13(x832)+~E(x831,x832)
% 9.71/9.78  [84]~P54(x841)+P54(x842)+~E(x841,x842)
% 9.71/9.78  [85]~P43(x851)+P43(x852)+~E(x851,x852)
% 9.71/9.78  [86]~P21(x861)+P21(x862)+~E(x861,x862)
% 9.71/9.78  [87]~P55(x871)+P55(x872)+~E(x871,x872)
% 9.71/9.78  [88]~P19(x881)+P19(x882)+~E(x881,x882)
% 9.71/9.78  [89]~P53(x891)+P53(x892)+~E(x891,x892)
% 9.71/9.78  [90]~P17(x901)+P17(x902)+~E(x901,x902)
% 9.71/9.78  [91]~P15(x911)+P15(x912)+~E(x911,x912)
% 9.71/9.78  [92]~P45(x921)+P45(x922)+~E(x921,x922)
% 9.71/9.78  [93]~P12(x931)+P12(x932)+~E(x931,x932)
% 9.71/9.78  
% 9.71/9.78  %-------------------------------------------
% 9.71/9.81  cnf(971,plain,
% 9.71/9.81     (E(a1,f2(a1))),
% 9.71/9.81     inference(scs_inference,[],[95,2])).
% 9.71/9.81  cnf(974,plain,
% 9.71/9.81     (~P7(x9741,x9741,a13)),
% 9.71/9.81     inference(scs_inference,[],[164,166,95,2,370,369])).
% 9.71/9.81  cnf(976,plain,
% 9.71/9.81     (E(f6(f3(a12),f4(x9761,a12),a12),x9761)),
% 9.71/9.81     inference(scs_inference,[],[164,166,95,265,2,370,369,406])).
% 9.71/9.81  cnf(977,plain,
% 9.71/9.81     (E(f5(f6(x9771,x9772,a12),x9772,a12),x9771)),
% 9.71/9.81     inference(rename_variables,[],[265])).
% 9.71/9.81  cnf(982,plain,
% 9.71/9.81     (P8(x9821,x9821,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(984,plain,
% 9.71/9.81     (P8(x9841,x9841,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(988,plain,
% 9.71/9.81     (~P7(a25,a24,a23)),
% 9.71/9.81     inference(scs_inference,[],[255,982,164,166,254,258,95,252,302,273,265,2,370,369,406,373,42,41,37,36,3,454])).
% 9.71/9.81  cnf(990,plain,
% 9.71/9.81     (~P8(a25,a24,a23)),
% 9.71/9.81     inference(scs_inference,[],[255,982,163,164,166,254,258,95,252,302,273,265,2,370,369,406,373,42,41,37,36,3,454,451])).
% 9.71/9.81  cnf(992,plain,
% 9.71/9.81     (~P8(f7(a19,f17(f2(f11(a1)),a12),a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[255,982,163,164,166,254,258,95,252,267,302,273,265,2,370,369,406,373,42,41,37,36,3,454,451,439])).
% 9.71/9.81  cnf(994,plain,
% 9.71/9.81     (~P7(f7(a19,f17(f2(f11(a1)),a12),a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[255,982,163,164,165,166,254,258,95,252,267,302,273,265,2,370,369,406,373,42,41,37,36,3,454,451,439,418])).
% 9.71/9.81  cnf(996,plain,
% 9.71/9.81     (P8(x9961,x9961,a13)),
% 9.71/9.81     inference(scs_inference,[],[255,982,161,163,164,165,166,254,258,95,252,267,302,273,265,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397])).
% 9.71/9.81  cnf(998,plain,
% 9.71/9.81     (P8(a24,a25,a23)),
% 9.71/9.81     inference(scs_inference,[],[255,982,160,161,163,164,165,166,254,258,95,252,267,302,273,265,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394])).
% 9.71/9.81  cnf(1000,plain,
% 9.71/9.81     (~P7(f3(a12),f7(f10(f17(f2(f11(a1)),a12),a19,a12),f16(a25,a23),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,160,161,163,164,165,166,254,258,95,252,267,302,273,265,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970])).
% 9.71/9.81  cnf(1002,plain,
% 9.71/9.81     (E(f6(f5(x10021,x10022,a12),x10022,a12),x10021)),
% 9.71/9.81     inference(rename_variables,[],[266])).
% 9.71/9.81  cnf(1005,plain,
% 9.71/9.81     (E(f6(f5(x10051,x10052,a12),x10052,a12),x10051)),
% 9.71/9.81     inference(rename_variables,[],[266])).
% 9.71/9.81  cnf(1009,plain,
% 9.71/9.81     (~P7(f3(a12),f4(f3(a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,299,160,161,163,164,165,166,174,177,191,254,258,95,252,267,302,273,265,266,1002,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483])).
% 9.71/9.81  cnf(1010,plain,
% 9.71/9.81     (~P7(x10101,x10101,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1012,plain,
% 9.71/9.81     (~P8(f7(a19,f17(f2(f11(a1)),a12),a12),f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,299,160,161,163,164,165,166,174,177,191,232,254,258,95,252,267,302,273,265,266,1002,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482])).
% 9.71/9.81  cnf(1017,plain,
% 9.71/9.81     (~P7(x10171,x10171,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1020,plain,
% 9.71/9.81     (~P7(x10201,x10201,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1023,plain,
% 9.71/9.81     (~P7(x10231,x10231,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1025,plain,
% 9.71/9.81     (~P7(f4(f3(a12),a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,299,1010,1017,1020,1023,106,160,161,163,164,165,166,174,177,191,232,254,258,95,252,267,302,273,265,266,1002,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495])).
% 9.71/9.81  cnf(1026,plain,
% 9.71/9.81     (~P7(x10261,x10261,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1028,plain,
% 9.71/9.81     (~P7(f3(a12),f4(a19,a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,299,1010,1017,1020,1023,106,160,161,163,164,165,166,174,177,191,232,254,258,300,95,252,267,302,273,265,266,1002,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493])).
% 9.71/9.81  cnf(1030,plain,
% 9.71/9.81     (~P8(f3(a12),f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,299,1010,1017,1020,1023,106,160,161,163,164,165,166,174,177,191,232,254,258,300,95,252,267,302,273,265,266,1002,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492])).
% 9.71/9.81  cnf(1034,plain,
% 9.71/9.81     (~E(f4(a19,a12),f3(a12))),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,299,1010,1017,1020,1023,106,160,161,163,164,165,166,174,177,191,220,232,254,258,300,95,294,252,267,302,273,265,266,1002,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317])).
% 9.71/9.81  cnf(1039,plain,
% 9.71/9.81     (~P7(x10391,x10391,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1042,plain,
% 9.71/9.81     (~P7(x10421,x10421,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1053,plain,
% 9.71/9.81     (E(f5(f6(x10531,x10532,a12),x10532,a12),x10531)),
% 9.71/9.81     inference(rename_variables,[],[265])).
% 9.71/9.81  cnf(1055,plain,
% 9.71/9.81     (~E(f5(a19,f3(a12),a12),f3(a12))),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,299,1010,1017,1020,1023,1026,1039,106,160,161,163,164,165,166,174,177,191,200,220,232,254,258,300,95,294,252,267,302,273,265,977,266,1002,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388])).
% 9.71/9.81  cnf(1057,plain,
% 9.71/9.81     (E(f5(f6(f5(x10571,x10572,a12),f5(x10571,x10573,a12),a12),x10573,a12),x10572)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,299,1010,1017,1020,1023,1026,1039,106,160,161,163,164,165,166,174,177,191,200,220,232,254,258,300,95,294,252,267,302,273,265,977,1053,266,1002,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702])).
% 9.71/9.81  cnf(1058,plain,
% 9.71/9.81     (E(f5(f6(x10581,x10582,a12),x10582,a12),x10581)),
% 9.71/9.81     inference(rename_variables,[],[265])).
% 9.71/9.81  cnf(1061,plain,
% 9.71/9.81     (P8(x10611,x10611,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1064,plain,
% 9.71/9.81     (P8(x10641,x10641,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1066,plain,
% 9.71/9.81     (~P7(f5(f10(x10661,x10662,a12),x10663,a12),f5(f10(x10664,x10662,a12),f5(f10(f6(x10661,x10664,a12),x10662,a12),x10663,a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,299,1010,1017,1020,1023,1026,1039,1042,104,106,160,161,163,164,165,166,174,177,191,200,220,232,254,258,300,95,294,252,267,302,273,265,977,1053,266,1002,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963])).
% 9.71/9.81  cnf(1067,plain,
% 9.71/9.81     (~P7(x10671,x10671,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1069,plain,
% 9.71/9.81     (~P7(f5(f10(x10691,x10692,a12),f5(f10(f6(x10693,x10691,a12),x10692,a12),x10694,a12),a12),f5(f10(x10693,x10692,a12),x10694,a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,299,1010,1017,1020,1023,1026,1039,1042,1067,104,106,160,161,163,164,165,166,174,177,191,200,220,232,254,258,300,95,294,252,267,302,273,265,977,1053,266,1002,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961])).
% 9.71/9.81  cnf(1070,plain,
% 9.71/9.81     (~P7(x10701,x10701,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1072,plain,
% 9.71/9.81     (P7(f3(a23),a25,a23)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,299,1010,1017,1020,1023,1026,1039,1042,1067,104,106,160,161,163,164,165,166,174,177,191,200,220,232,254,258,300,95,294,252,267,302,273,265,977,1053,266,1002,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532])).
% 9.71/9.81  cnf(1074,plain,
% 9.71/9.81     (P7(f3(a12),f17(f2(f2(f11(a1))),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,299,1010,1017,1020,1023,1026,1039,1042,1067,104,106,160,161,163,164,165,166,174,177,191,200,220,232,254,256,258,300,95,294,252,264,267,302,273,265,977,1053,266,1002,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531])).
% 9.71/9.81  cnf(1078,plain,
% 9.71/9.81     (~P7(a24,f3(a23),a23)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,299,1010,1017,1020,1023,1026,1039,1042,1067,104,106,160,161,163,164,165,166,174,177,191,200,220,232,254,256,258,300,95,294,252,264,267,302,283,273,265,977,1053,266,1002,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529])).
% 9.71/9.81  cnf(1084,plain,
% 9.71/9.81     (~P8(a19,f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,299,1010,1017,1020,1023,1026,1039,1042,1067,104,106,160,161,162,163,164,165,166,174,177,191,200,220,232,254,256,258,300,95,294,252,261,264,267,302,283,275,273,265,977,1053,266,1002,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462])).
% 9.71/9.81  cnf(1086,plain,
% 9.71/9.81     (~E(f5(x10861,f7(a19,f17(f2(f11(a1)),a12),a12),a12),x10861)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,299,1010,1017,1020,1023,1026,1039,1042,1067,104,106,124,127,160,161,162,163,164,165,166,174,177,191,200,220,232,254,256,258,300,95,294,252,261,264,267,302,283,275,273,265,977,1053,266,1002,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382])).
% 9.71/9.81  cnf(1088,plain,
% 9.71/9.81     (~P7(f5(a19,x10881,a12),x10881,a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,104,106,124,127,160,161,162,163,164,165,166,174,177,191,193,200,220,232,254,256,257,258,300,95,294,252,261,264,267,302,283,275,273,265,977,1053,266,1002,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614])).
% 9.71/9.81  cnf(1089,plain,
% 9.71/9.81     (~P7(x10891,x10891,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1091,plain,
% 9.71/9.81     (~P7(f5(f17(f2(f2(f11(a1))),a12),x10911,a12),x10911,a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,104,106,124,127,160,161,162,163,164,165,166,168,174,177,191,193,200,220,232,254,256,257,258,300,95,294,252,261,264,267,302,283,275,273,265,977,1053,266,1002,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736])).
% 9.71/9.81  cnf(1093,plain,
% 9.71/9.81     (~P7(x10931,f5(f10(f6(x10932,x10932,a12),x10933,a12),x10931,a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,104,106,124,127,160,161,162,163,164,165,166,168,174,177,191,193,200,220,232,254,256,257,258,300,95,294,252,261,264,267,302,283,275,273,265,977,1053,266,1002,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735])).
% 9.71/9.81  cnf(1094,plain,
% 9.71/9.81     (P8(x10941,x10941,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1096,plain,
% 9.71/9.81     (~P8(f5(f17(f2(f2(f11(a1))),a12),x10961,a12),x10961,a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,104,106,124,127,160,161,162,163,164,165,166,168,174,177,191,193,200,220,232,254,256,257,258,300,95,294,252,261,264,267,302,283,275,273,265,977,1053,266,1002,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734])).
% 9.71/9.81  cnf(1098,plain,
% 9.71/9.81     (P7(f5(f6(f3(a12),a19,a12),x10981,a12),x10981,a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,104,106,124,127,160,161,162,163,164,165,166,168,174,177,191,193,200,220,232,254,256,257,258,300,95,294,252,261,264,267,302,283,275,273,265,977,1053,266,1002,1005,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573])).
% 9.71/9.81  cnf(1099,plain,
% 9.71/9.81     (E(f6(f5(x10991,x10992,a12),x10992,a12),x10991)),
% 9.71/9.81     inference(rename_variables,[],[266])).
% 9.71/9.81  cnf(1101,plain,
% 9.71/9.81     (P8(x11011,f5(f6(x11012,x11012,a12),x11011,a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,104,106,124,127,160,161,162,163,164,165,166,168,174,177,191,193,200,220,232,254,256,257,258,300,95,294,252,261,264,267,302,283,275,273,265,977,1053,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571])).
% 9.71/9.81  cnf(1102,plain,
% 9.71/9.81     (E(f6(f5(x11021,x11022,a12),x11022,a12),x11021)),
% 9.71/9.81     inference(rename_variables,[],[266])).
% 9.71/9.81  cnf(1105,plain,
% 9.71/9.81     (P8(x11051,x11051,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1122,plain,
% 9.71/9.81     (~P7(x11221,x11221,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1124,plain,
% 9.71/9.81     (~P7(f10(f7(x11241,a19,a12),a19,a12),x11241,a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,96,97,99,102,104,106,124,127,150,160,161,162,163,164,165,166,168,174,177,191,193,200,220,232,254,256,257,258,300,95,294,252,261,304,264,267,302,283,275,273,260,265,977,1053,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780])).
% 9.71/9.81  cnf(1125,plain,
% 9.71/9.81     (~P7(x11251,x11251,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1127,plain,
% 9.71/9.81     (~P8(f10(f5(f17(f2(f2(f11(a1))),a12),f7(x11271,a19,a12),a12),a19,a12),x11271,a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,96,97,99,102,104,106,124,127,150,160,161,162,163,164,165,166,168,174,177,191,193,200,220,232,254,256,257,258,300,95,294,252,261,304,264,267,302,283,275,273,260,265,977,1053,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779])).
% 9.71/9.81  cnf(1129,plain,
% 9.71/9.81     (~P7(f3(a12),f10(f3(a12),a19,a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,96,97,99,102,104,106,124,127,150,160,161,162,163,164,165,166,168,174,177,191,193,200,220,232,254,256,257,258,300,95,294,252,261,304,264,267,302,283,275,273,260,265,977,1053,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706])).
% 9.71/9.81  cnf(1130,plain,
% 9.71/9.81     (~P7(x11301,x11301,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1133,plain,
% 9.71/9.81     (~P7(x11331,x11331,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1135,plain,
% 9.71/9.81     (~P8(f3(a12),f10(a19,f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,96,97,99,102,104,106,124,127,150,160,161,162,163,164,165,166,168,174,177,191,193,200,220,232,254,256,257,258,300,95,294,252,261,304,264,267,302,283,275,273,260,265,977,1053,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676])).
% 9.71/9.81  cnf(1141,plain,
% 9.71/9.81     (~P7(f17(f2(f11(a1)),a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,96,97,99,102,104,106,124,127,150,160,161,162,163,164,165,166,168,174,177,191,193,200,220,232,254,256,257,258,300,95,294,252,261,304,264,267,302,283,275,273,260,265,977,1053,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662])).
% 9.71/9.81  cnf(1145,plain,
% 9.71/9.81     (~P8(f5(f17(f2(f2(f11(a1))),a12),f7(f3(a12),a19,a12),a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,96,97,99,102,104,106,124,127,150,160,161,162,163,164,165,166,168,174,177,191,193,200,220,229,232,254,256,257,258,300,95,294,252,261,304,264,267,302,283,275,273,260,265,977,1053,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656])).
% 9.71/9.81  cnf(1147,plain,
% 9.71/9.81     (~P7(f3(a12),f10(f6(x11471,x11471,a12),x11472,a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,96,97,99,102,104,106,124,127,150,160,161,162,163,164,165,166,168,174,177,188,191,193,200,220,229,232,254,256,257,258,300,95,294,252,261,304,264,267,302,283,275,273,260,265,977,1053,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642])).
% 9.71/9.81  cnf(1148,plain,
% 9.71/9.81     (P8(x11481,x11481,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1152,plain,
% 9.71/9.81     (~P7(f6(x11521,x11521,a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,96,97,99,102,104,106,124,127,150,160,161,162,163,164,165,166,168,174,177,188,191,193,200,220,229,232,254,256,257,258,300,95,294,252,261,304,264,267,302,283,275,273,260,265,977,1053,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634])).
% 9.71/9.81  cnf(1158,plain,
% 9.71/9.81     (~E(f10(f4(a19,a12),f4(a19,a12),a12),f3(a12))),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,96,97,99,102,104,106,111,124,127,142,150,160,161,162,163,164,165,166,168,174,177,188,191,193,200,220,229,232,254,256,257,258,300,95,294,252,261,304,264,267,302,283,275,273,260,265,977,1053,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384])).
% 9.71/9.81  cnf(1160,plain,
% 9.71/9.81     (~P7(f10(f3(a12),x11601,a12),f10(f3(a12),x11602,a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,96,97,99,102,104,106,111,124,127,142,150,160,161,162,163,164,165,166,168,174,177,188,191,193,200,220,229,232,254,256,257,258,300,95,294,252,261,304,264,267,302,283,275,273,260,265,977,1053,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811])).
% 9.71/9.81  cnf(1161,plain,
% 9.71/9.81     (~P7(x11611,x11611,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1164,plain,
% 9.71/9.81     (~P7(x11641,x11641,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1167,plain,
% 9.71/9.81     (~P7(x11671,x11671,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1168,plain,
% 9.71/9.81     (P8(x11681,x11681,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1170,plain,
% 9.71/9.81     (~P8(f5(a19,x11701,a12),x11701,a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,96,97,99,102,104,106,111,124,127,142,150,160,161,162,163,164,165,166,168,171,174,177,180,188,191,193,200,220,229,232,254,256,257,258,300,95,294,252,261,304,264,267,302,283,275,273,260,265,977,1053,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618])).
% 9.71/9.81  cnf(1171,plain,
% 9.71/9.81     (~P7(x11711,x11711,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1173,plain,
% 9.71/9.81     (~P8(f5(a19,f5(x11731,f3(a12),a12),a12),x11731,a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,96,97,99,102,104,106,111,124,127,142,150,160,161,162,163,164,165,166,168,171,174,177,180,188,191,193,200,220,229,232,254,256,257,258,300,95,294,252,261,304,264,267,302,283,275,273,260,265,977,1053,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617])).
% 9.71/9.81  cnf(1174,plain,
% 9.71/9.81     (P8(x11741,x11741,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1176,plain,
% 9.71/9.81     (~P8(f5(a19,f5(f5(f3(a12),x11761,a12),f3(a12),a12),a12),x11761,a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,96,97,99,102,104,106,111,124,127,142,150,160,161,162,163,164,165,166,168,171,174,177,180,188,191,193,200,220,229,232,254,256,257,258,300,95,294,252,261,304,264,267,302,283,275,273,260,265,977,1053,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616])).
% 9.71/9.81  cnf(1177,plain,
% 9.71/9.81     (P8(x11771,x11771,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1179,plain,
% 9.71/9.81     (~P7(x11791,f7(f10(x11791,a19,a12),a19,a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,96,97,99,102,104,106,111,124,127,142,150,151,160,161,162,163,164,165,166,168,171,174,177,180,188,191,193,200,220,229,232,254,256,257,258,300,95,294,252,261,304,264,267,302,283,275,273,260,265,977,1053,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793])).
% 9.71/9.81  cnf(1180,plain,
% 9.71/9.81     (~P7(x11801,x11801,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1189,plain,
% 9.71/9.81     (~P7(x11891,x11891,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1192,plain,
% 9.71/9.81     (~P7(x11921,x11921,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1195,plain,
% 9.71/9.81     (~P7(x11951,x11951,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1197,plain,
% 9.71/9.81     (~P7(f3(a12),f7(f3(a12),x11971,a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,96,97,99,102,104,106,111,124,127,142,150,151,160,161,162,163,164,165,166,168,171,174,177,180,188,191,193,200,220,229,232,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,260,265,977,1053,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695])).
% 9.71/9.81  cnf(1198,plain,
% 9.71/9.81     (~P7(x11981,x11981,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1201,plain,
% 9.71/9.81     (~P7(x12011,x12011,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1203,plain,
% 9.71/9.81     (~P8(f3(a12),f7(a19,f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,96,97,99,102,104,106,111,124,127,142,150,151,160,161,162,163,164,165,166,168,171,174,177,180,188,191,193,200,220,229,232,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,260,265,977,1053,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689])).
% 9.71/9.81  cnf(1205,plain,
% 9.71/9.81     (~P8(f3(a12),f7(f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a19,a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,96,97,99,102,104,106,111,124,127,142,150,151,160,161,162,163,164,165,166,168,171,174,177,180,188,191,193,200,220,229,232,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,260,265,977,1053,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688])).
% 9.71/9.81  cnf(1211,plain,
% 9.71/9.81     (~P8(f17(f2(f11(a1)),a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,96,97,99,102,104,106,111,124,127,142,150,151,160,161,162,163,164,165,166,168,171,174,177,180,188,191,193,200,220,229,232,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,260,265,977,1053,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668])).
% 9.71/9.81  cnf(1213,plain,
% 9.71/9.81     (~E(f17(f2(f11(a1)),a12),f3(a12))),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,96,97,99,102,104,106,111,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,177,180,188,191,193,200,202,220,229,232,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,260,265,977,1053,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409])).
% 9.71/9.81  cnf(1215,plain,
% 9.71/9.81     (~P8(f3(a12),f6(f3(a12),f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,96,97,99,102,104,106,111,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,177,180,188,191,193,200,202,220,229,232,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,260,265,977,1053,1058,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564])).
% 9.71/9.81  cnf(1216,plain,
% 9.71/9.81     (E(f5(f6(x12161,x12162,a12),x12162,a12),x12161)),
% 9.71/9.81     inference(rename_variables,[],[265])).
% 9.71/9.81  cnf(1220,plain,
% 9.71/9.81     (~P7(f7(x12201,f4(f3(a12),a12),a12),f4(f3(a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,96,97,99,102,104,106,111,114,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,177,180,188,191,193,200,202,212,216,220,229,232,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,260,265,977,1053,1058,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740])).
% 9.71/9.81  cnf(1223,plain,
% 9.71/9.81     (~P7(x12231,x12231,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1226,plain,
% 9.71/9.81     (~P7(x12261,x12261,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1228,plain,
% 9.71/9.81     (~P8(f7(a19,f17(f2(f11(a1)),a12),a12),f7(x12281,f3(a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,96,97,99,102,104,106,111,114,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,177,180,188,191,193,200,202,212,216,220,229,232,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,260,265,977,1053,1058,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737])).
% 9.71/9.81  cnf(1229,plain,
% 9.71/9.81     (~P7(x12291,x12291,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1231,plain,
% 9.71/9.81     (~P7(f3(a12),f4(f4(f7(x12311,f3(a12),a12),a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,96,97,99,102,104,106,111,114,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,177,180,188,191,193,200,202,212,216,220,229,232,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,260,265,977,1053,1058,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685])).
% 9.71/9.81  cnf(1232,plain,
% 9.71/9.81     (~P7(x12321,x12321,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1234,plain,
% 9.71/9.81     (P8(f7(x12341,f4(f3(a12),a12),a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,96,97,99,102,104,106,111,114,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,177,180,188,191,193,200,202,212,216,220,229,232,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,260,265,977,1053,1058,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684])).
% 9.71/9.81  cnf(1235,plain,
% 9.71/9.81     (P8(x12351,x12351,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1237,plain,
% 9.71/9.81     (~P7(f4(f4(f7(x12371,f3(a12),a12),a12),a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,96,97,99,102,104,106,111,114,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,177,180,188,191,193,200,202,212,216,220,229,232,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,260,265,977,1053,1058,266,1002,1005,1099,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683])).
% 9.71/9.81  cnf(1238,plain,
% 9.71/9.81     (~P7(x12381,x12381,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1241,plain,
% 9.71/9.81     (~P7(x12411,x12411,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1244,plain,
% 9.71/9.81     (P8(x12441,x12441,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1247,plain,
% 9.71/9.81     (P8(x12471,x12471,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1250,plain,
% 9.71/9.81     (~P7(x12501,x12501,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1251,plain,
% 9.71/9.81     (P8(x12511,x12511,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1254,plain,
% 9.71/9.81     (P8(x12541,x12541,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1255,plain,
% 9.71/9.81     (~P7(x12551,x12551,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1256,plain,
% 9.71/9.81     (P8(f4(f10(x12561,x12561,a12),a12),f10(x12562,x12562,a12),a12)),
% 9.71/9.81     inference(rename_variables,[],[279])).
% 9.71/9.81  cnf(1259,plain,
% 9.71/9.81     (~P7(x12591,x12591,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1262,plain,
% 9.71/9.81     (~P7(x12621,x12621,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1263,plain,
% 9.71/9.81     (P8(x12631,x12631,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1267,plain,
% 9.71/9.81     (P8(x12671,x12671,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1273,plain,
% 9.71/9.81     (P8(x12731,x12731,a23)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,96,97,99,102,104,106,111,114,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,177,180,188,191,193,200,202,212,216,220,229,232,234,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,260,265,977,1053,1058,266,1002,1005,1099,279,1256,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328])).
% 9.71/9.81  cnf(1286,plain,
% 9.71/9.81     (E(f6(x12861,f2(a1),x12862),f6(x12861,a1,x12862))),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,96,97,99,102,104,106,111,114,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,177,180,188,191,193,200,202,212,216,220,229,232,234,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,296,260,265,977,1053,1058,266,1002,1005,1099,279,1256,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25])).
% 9.71/9.81  cnf(1290,plain,
% 9.71/9.81     (E(f5(x12901,f2(a1),x12902),f5(x12901,a1,x12902))),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,96,97,99,102,104,106,111,114,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,177,180,188,191,193,200,202,212,216,220,229,232,234,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,296,260,265,977,1053,1058,266,1002,1005,1099,279,1256,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21])).
% 9.71/9.81  cnf(1316,plain,
% 9.71/9.81     (~P7(f10(x13161,x13161,a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,96,97,99,102,104,106,111,114,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,177,180,188,191,193,200,202,212,216,220,229,232,234,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,296,260,265,977,1053,1058,266,1002,1005,1099,279,1256,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548])).
% 9.71/9.81  cnf(1318,plain,
% 9.71/9.81     (P8(f6(x13181,x13181,a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,96,97,99,102,104,106,111,114,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,177,180,188,191,193,200,202,212,216,220,229,232,234,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,296,260,265,977,1053,1058,266,1002,1005,1099,279,1256,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533])).
% 9.71/9.81  cnf(1320,plain,
% 9.71/9.81     (P8(f3(a12),f10(x13201,x13201,a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,96,97,99,102,104,106,111,114,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,177,180,188,191,193,200,202,212,216,220,229,232,234,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,296,260,265,977,1053,1058,266,1002,1005,1099,279,1256,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443])).
% 9.71/9.81  cnf(1322,plain,
% 9.71/9.81     (E(f6(f5(x13221,x13222,a13),x13222,a13),x13221)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,96,97,99,102,104,106,111,114,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,177,178,180,188,191,193,200,202,212,216,220,229,232,234,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,296,260,265,977,1053,1058,266,1002,1005,1099,279,1256,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438])).
% 9.71/9.81  cnf(1324,plain,
% 9.71/9.81     (E(f5(f6(x13241,x13242,a13),x13242,a13),x13241)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,96,97,99,102,104,106,111,114,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,177,178,180,188,191,193,200,202,212,216,220,229,232,234,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,296,260,265,977,1053,1058,266,1002,1005,1099,279,1256,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437])).
% 9.71/9.81  cnf(1342,plain,
% 9.71/9.81     (E(f5(x13421,f17(a1,a12),a12),x13421)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,96,97,99,102,104,106,111,114,119,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,177,178,180,188,191,193,200,202,212,216,220,229,232,234,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,296,260,265,977,1053,1058,266,1002,1005,1099,279,1256,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362])).
% 9.71/9.81  cnf(1372,plain,
% 9.71/9.81     (~E(f5(f10(f7(a19,f17(f2(f11(a1)),a12),a12),f7(a19,f17(f2(f11(a1)),a12),a12),a12),f10(x13721,x13721,a12),a12),f3(a12))),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,96,97,99,102,104,106,111,114,119,120,121,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,175,177,178,180,181,182,184,185,188,191,193,200,202,212,216,220,229,232,234,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,296,260,265,977,1053,1058,266,1002,1005,1099,279,1256,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704])).
% 9.71/9.81  cnf(1376,plain,
% 9.71/9.81     (~P7(f3(a12),f5(x13761,f4(x13761,a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,104,106,111,114,119,120,121,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,175,177,178,180,181,182,184,185,188,191,193,200,202,212,216,220,229,232,234,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,296,260,265,977,1053,1058,266,1002,1005,1099,279,1256,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672])).
% 9.71/9.81  cnf(1380,plain,
% 9.71/9.81     (~E(f10(f7(a19,f17(f2(f11(a1)),a12),a12),f7(a19,f17(f2(f11(a1)),a12),a12),a12),f4(f10(x13801,x13801,a12),a12))),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,104,106,111,114,119,120,121,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,175,177,178,180,181,182,184,185,188,191,193,200,202,212,216,220,229,232,234,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,296,260,265,977,1053,1058,266,1002,1005,1099,279,1256,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539])).
% 9.71/9.81  cnf(1386,plain,
% 9.71/9.81     (~E(f10(x13861,x13861,a12),f4(f10(f4(a19,a12),f4(a19,a12),a12),a12))),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,104,106,111,114,119,120,121,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,175,177,178,180,181,182,184,185,188,191,193,200,202,212,216,220,229,232,234,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,296,260,265,977,1053,1058,266,1002,1005,1099,279,1256,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538])).
% 9.71/9.81  cnf(1388,plain,
% 9.71/9.81     (P7(f3(a12),f10(f7(a19,f17(f2(f11(a1)),a12),a12),f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,104,106,111,114,119,120,121,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,175,177,178,180,181,182,184,185,188,191,193,200,202,212,216,220,229,232,234,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,296,260,265,977,1053,1058,266,1002,1005,1099,279,1256,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431])).
% 9.71/9.81  cnf(1390,plain,
% 9.71/9.81     (P8(f5(f7(x13901,f17(f2(f11(a1)),a12),a12),f7(x13901,f17(f2(f11(a1)),a12),a12),a12),x13901,a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,104,106,111,114,119,120,121,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,175,177,178,180,181,182,184,185,188,191,193,200,202,212,216,220,229,232,234,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,296,260,265,977,1053,1058,266,1002,1005,1099,279,1256,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937])).
% 9.71/9.81  cnf(1391,plain,
% 9.71/9.81     (P8(x13911,x13911,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1393,plain,
% 9.71/9.81     (~P7(f5(x13931,f4(x13931,a12),a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,104,106,111,114,119,120,121,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,175,177,178,180,181,182,184,185,188,191,193,200,202,212,216,220,229,232,234,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,296,260,265,977,1053,1058,266,1002,1005,1099,279,1256,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577])).
% 9.71/9.81  cnf(1394,plain,
% 9.71/9.81     (~P7(x13941,x13941,a12)),
% 9.71/9.81     inference(rename_variables,[],[299])).
% 9.71/9.81  cnf(1399,plain,
% 9.71/9.81     (P8(x13991,x13991,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1405,plain,
% 9.71/9.81     (E(f5(f4(x14051,a12),f5(x14052,x14051,a12),a12),x14052)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,104,106,111,114,119,120,121,124,127,142,150,151,153,160,161,162,163,164,165,166,168,171,174,175,177,178,180,181,182,184,185,188,191,193,200,202,212,216,220,229,232,234,254,256,257,258,300,95,294,252,261,304,264,268,267,302,283,275,273,296,260,265,977,1053,1058,266,1002,1005,1099,279,1256,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486])).
% 9.71/9.81  cnf(1456,plain,
% 9.71/9.81     (P8(x14561,x14561,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1460,plain,
% 9.71/9.81     (P8(f3(a13),f5(f10(x14601,x14601,a13),f10(x14602,x14602,a13),a13),a13)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,111,113,114,116,119,120,121,122,124,127,142,150,151,153,154,157,160,161,162,163,164,165,166,168,171,174,175,176,177,178,180,181,182,184,185,188,191,193,200,202,212,216,220,229,232,234,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,266,1002,1005,1099,279,1256,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854])).
% 9.71/9.81  cnf(1558,plain,
% 9.71/9.81     (~E(a12,x15581)+P12(x15581)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,108,109,111,113,114,116,118,119,120,121,122,123,124,127,132,136,138,142,146,150,151,153,154,155,157,160,161,162,163,164,165,166,168,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,202,212,216,220,229,232,234,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,266,1002,1005,1099,279,1256,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93])).
% 9.71/9.81  cnf(1560,plain,
% 9.71/9.81     (~P7(f7(f10(f16(a24,a23),f10(f17(f2(f11(a1)),a12),a19,a12),a12),f16(a25,a23),a12),f10(f17(f2(f11(a1)),a12),a19,a12),f6(f5(a12,x15601,a12),x15601,a12))),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,108,109,111,113,114,116,118,119,120,121,122,123,124,127,132,136,138,142,146,150,151,153,154,155,157,160,161,162,163,164,165,166,168,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,202,212,216,220,229,232,234,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38])).
% 9.71/9.81  cnf(1562,plain,
% 9.71/9.81     (~P8(a19,f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,108,109,111,113,114,116,118,119,120,121,122,123,124,127,132,136,138,142,146,150,151,153,154,155,157,160,161,162,163,164,165,166,168,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,202,212,216,220,229,232,234,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516])).
% 9.71/9.81  cnf(1571,plain,
% 9.71/9.81     (P8(f3(a12),f5(f10(x15711,x15711,a12),f10(x15712,x15712,a12),a12),a12)),
% 9.71/9.81     inference(rename_variables,[],[288])).
% 9.71/9.81  cnf(1573,plain,
% 9.71/9.81     (~P8(f3(a12),f7(f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),f17(f2(f11(a1)),a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,108,109,111,113,114,116,118,119,120,121,122,123,124,127,132,136,138,142,146,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,202,212,216,220,229,232,234,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629])).
% 9.71/9.81  cnf(1575,plain,
% 9.71/9.81     (~P8(f3(a12),f7(f17(f2(f11(a1)),a12),f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,108,109,111,113,114,116,118,119,120,121,122,123,124,127,132,136,138,142,146,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,202,212,216,220,229,232,234,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628])).
% 9.71/9.81  cnf(1580,plain,
% 9.71/9.81     (P8(x15801,x15801,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1583,plain,
% 9.71/9.81     (P8(x15831,x15831,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1586,plain,
% 9.71/9.81     (P8(x15861,x15861,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1592,plain,
% 9.71/9.81     (~E(f6(x15921,x15921,a12),f6(f3(a12),a19,a12))),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,108,109,111,113,114,116,118,119,120,121,122,123,124,127,132,136,138,142,146,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,202,212,216,220,229,232,234,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457])).
% 9.71/9.81  cnf(1594,plain,
% 9.71/9.81     (~E(f5(x15941,f3(a12),a12),f5(x15941,a19,a12))),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,108,109,111,113,114,116,118,119,120,121,122,123,124,127,132,136,138,142,146,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,202,212,216,220,229,232,234,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456])).
% 9.71/9.81  cnf(1604,plain,
% 9.71/9.81     (~E(f4(f3(a12),a12),f4(a19,a12))),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,108,109,111,113,114,116,118,119,120,121,122,123,124,126,127,129,132,136,138,142,146,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,202,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324])).
% 9.71/9.81  cnf(1606,plain,
% 9.71/9.81     (P8(f4(f3(a12),a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,108,109,111,113,114,116,118,119,120,121,122,123,124,126,127,129,132,136,138,142,146,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,202,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473])).
% 9.71/9.81  cnf(1607,plain,
% 9.71/9.81     (P8(x16071,x16071,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1611,plain,
% 9.71/9.81     (P8(f3(a12),f4(f3(a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,108,109,111,113,114,116,118,119,120,121,122,123,124,126,127,129,132,136,138,142,146,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,202,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470])).
% 9.71/9.81  cnf(1612,plain,
% 9.71/9.81     (P8(x16121,x16121,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1614,plain,
% 9.71/9.81     (P8(f3(a13),f4(f3(a13),a13),a13)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,108,109,111,113,114,116,118,119,120,121,122,123,124,126,127,129,132,136,138,142,146,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469])).
% 9.71/9.81  cnf(1618,plain,
% 9.71/9.81     (~P8(f5(x16181,f7(a19,f17(f2(f11(a1)),a12),a12),a12),f5(x16181,f3(a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,108,109,111,113,114,116,118,119,120,121,122,123,124,126,127,129,132,136,138,142,146,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768])).
% 9.71/9.81  cnf(1620,plain,
% 9.71/9.81     (P7(f5(x16201,f3(a12),a12),f5(x16201,a19,a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,108,109,111,113,114,116,118,119,120,121,122,123,124,126,127,129,132,136,138,142,146,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627])).
% 9.71/9.81  cnf(1634,plain,
% 9.71/9.81     (P7(f6(f3(a12),a19,a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,126,127,129,132,136,138,142,146,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537])).
% 9.71/9.81  cnf(1638,plain,
% 9.71/9.81     (~P8(f4(f3(a12),a12),f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,126,127,129,132,136,138,142,146,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520])).
% 9.71/9.81  cnf(1641,plain,
% 9.71/9.81     (P8(x16411,x16411,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1644,plain,
% 9.71/9.81     (P8(x16441,x16441,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1646,plain,
% 9.71/9.81     (P7(f4(a19,a12),f4(f3(a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,126,127,129,132,136,138,142,146,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490])).
% 9.71/9.81  cnf(1653,plain,
% 9.71/9.81     (P8(x16531,x16531,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1657,plain,
% 9.71/9.81     (P7(f4(a19,a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,126,127,129,132,136,138,142,146,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478])).
% 9.71/9.81  cnf(1667,plain,
% 9.71/9.81     (P8(f3(a13),f10(x16671,x16671,a13),a13)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,126,127,129,132,136,138,142,146,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601])).
% 9.71/9.81  cnf(1669,plain,
% 9.71/9.81     (P7(f5(f6(f3(a12),a19,a12),f6(f3(a12),a19,a12),a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,126,127,129,132,136,138,142,146,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547])).
% 9.71/9.81  cnf(1671,plain,
% 9.71/9.81     (P7(f5(f4(a19,a12),f4(a19,a12),a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,126,127,129,132,136,138,142,146,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546])).
% 9.71/9.81  cnf(1674,plain,
% 9.71/9.81     (P8(x16741,x16741,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1676,plain,
% 9.71/9.81     (P7(f3(a12),f5(a19,a19,a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,126,127,129,132,136,138,142,146,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543])).
% 9.71/9.81  cnf(1679,plain,
% 9.71/9.81     (P8(x16791,x16791,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1690,plain,
% 9.71/9.81     (P8(x16901,x16901,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1692,plain,
% 9.71/9.81     (E(x16921,f4(f4(x16921,a12),a12))),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,126,127,129,132,136,138,142,146,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387])).
% 9.71/9.81  cnf(1698,plain,
% 9.71/9.81     (~P8(f5(f10(x16981,x16981,a12),f10(f4(a19,a12),f4(a19,a12),a12),a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,126,127,129,132,136,138,142,146,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935])).
% 9.71/9.81  cnf(1702,plain,
% 9.71/9.81     (P7(f3(a12),f5(f10(x17021,x17021,a12),f10(f5(a19,f3(a12),a12),f5(a19,f3(a12),a12),a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,126,127,129,132,136,138,142,146,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855])).
% 9.71/9.81  cnf(1708,plain,
% 9.71/9.81     (~E(f5(f10(f4(a19,a12),f4(a19,a12),a12),f10(x17081,x17081,a12),a12),f3(a12))),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730])).
% 9.71/9.81  cnf(1718,plain,
% 9.71/9.81     (~P7(f5(f10(f6(x17181,x17181,a12),x17182,a12),x17183,a12),x17183,a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,204,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967])).
% 9.71/9.81  cnf(1720,plain,
% 9.71/9.81     (~P7(f5(f10(x17201,x17202,a12),x17203,a12),f5(f10(f6(x17201,f6(x17204,x17204,a12),a12),x17202,a12),x17203,a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,204,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965])).
% 9.71/9.81  cnf(1722,plain,
% 9.71/9.81     (P8(f5(f10(f6(x17221,x17221,a12),x17222,a12),x17223,a12),x17223,a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,204,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962])).
% 9.71/9.81  cnf(1723,plain,
% 9.71/9.81     (P8(x17231,x17231,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1725,plain,
% 9.71/9.81     (P8(x17251,f5(f10(f6(x17252,x17252,a12),x17253,a12),x17251,a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,204,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960])).
% 9.71/9.81  cnf(1726,plain,
% 9.71/9.81     (P8(x17261,x17261,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1738,plain,
% 9.71/9.81     (P7(f3(a12),f10(f4(a19,a12),f4(a19,a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,204,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403])).
% 9.71/9.81  cnf(1740,plain,
% 9.71/9.81     (P7(f3(a12),f17(f2(f11(a1)),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,204,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402])).
% 9.71/9.81  cnf(1744,plain,
% 9.71/9.81     (~E(f6(f3(a12),a19,a12),f3(a12))),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,204,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383])).
% 9.71/9.81  cnf(1750,plain,
% 9.71/9.81     (P8(f5(a24,a24,a23),f5(a25,a25,a23),a23)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,204,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733])).
% 9.71/9.81  cnf(1752,plain,
% 9.71/9.81     (~P7(f5(f6(f3(a13),f3(a13),a13),x17521,a13),x17521,a13)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,204,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572])).
% 9.71/9.81  cnf(1754,plain,
% 9.71/9.81     (~E(f6(x17541,x17541,a12),f6(f3(a12),f7(a19,f17(f2(f11(a1)),a12),a12),a12))),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,204,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570])).
% 9.71/9.81  cnf(1760,plain,
% 9.71/9.81     (P7(f7(f3(a12),a19,a12),f7(a19,a19,a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,204,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761])).
% 9.71/9.81  cnf(1762,plain,
% 9.71/9.81     (P7(f10(a19,f3(a12),a12),f10(a19,a19,a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,204,206,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760])).
% 9.71/9.81  cnf(1768,plain,
% 9.71/9.81     (P7(f10(f3(a12),a19,a12),f10(a19,a19,a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,204,206,210,212,216,220,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756])).
% 9.71/9.81  cnf(1772,plain,
% 9.71/9.81     (P8(f10(a19,f3(a12),a12),f10(a19,a19,a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,204,206,210,212,216,220,226,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753])).
% 9.71/9.81  cnf(1780,plain,
% 9.71/9.81     (P7(f10(f6(f3(a12),a19,a12),f3(a12),a12),f10(f6(f3(a12),a19,a12),f6(f3(a12),a19,a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748])).
% 9.71/9.81  cnf(1784,plain,
% 9.71/9.81     (P8(f10(f7(x17841,f4(f3(a12),a12),a12),f3(a12),a12),f10(f7(x17841,f4(f3(a12),a12),a12),f7(x17841,f4(f3(a12),a12),a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743])).
% 9.71/9.81  cnf(1788,plain,
% 9.71/9.81     (P8(f7(f10(x17881,a19,a12),a19,a12),x17881,a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781])).
% 9.71/9.81  cnf(1789,plain,
% 9.71/9.81     (P8(x17891,x17891,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1793,plain,
% 9.71/9.81     (P7(f10(a19,f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659])).
% 9.71/9.81  cnf(1795,plain,
% 9.71/9.81     (P8(f7(f3(a12),f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658])).
% 9.71/9.81  cnf(1796,plain,
% 9.71/9.81     (P8(x17961,x17961,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1800,plain,
% 9.71/9.81     (P8(f10(f3(a12),f3(a12),a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653])).
% 9.71/9.81  cnf(1802,plain,
% 9.71/9.81     (P8(f10(f3(a13),f3(a13),a13),f3(a13),a13)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651])).
% 9.71/9.81  cnf(1812,plain,
% 9.71/9.81     (P8(f5(f3(a13),f3(a13),a13),f3(a13),a13)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,190,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651,650,649,648,647,646])).
% 9.71/9.81  cnf(1816,plain,
% 9.71/9.81     (P7(f3(a23),f5(a24,a24,a23),a23)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,189,190,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651,650,649,648,647,646,645,644])).
% 9.71/9.81  cnf(1824,plain,
% 9.71/9.81     (P8(f3(a23),f10(f3(a23),f3(a23),a23),a23)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,189,190,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,230,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651,650,649,648,647,646,645,644,643,640,639,638])).
% 9.71/9.81  cnf(1844,plain,
% 9.71/9.81     (~E(f5(x18441,f10(f4(a19,a12),f4(a19,a12),a12),a12),f5(x18441,f10(f4(a19,a12),f3(a12),a12),a12))),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,189,190,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,230,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651,650,649,648,647,646,645,644,643,640,639,638,635,633,611,610,816,815,943,942,930,795])).
% 9.71/9.81  cnf(1846,plain,
% 9.71/9.81     (P8(f7(f3(a12),a19,a12),f7(a19,a19,a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,189,190,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,230,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651,650,649,648,647,646,645,644,643,640,639,638,635,633,611,610,816,815,943,942,930,795,763])).
% 9.71/9.81  cnf(1854,plain,
% 9.71/9.81     (P8(f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,189,190,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,230,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651,650,649,648,647,646,645,644,643,640,639,638,635,633,611,610,816,815,943,942,930,795,763,762,773,673,697])).
% 9.71/9.81  cnf(1860,plain,
% 9.71/9.81     (P8(f10(a19,f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,189,190,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,230,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651,650,649,648,647,646,645,644,643,640,639,638,635,633,611,610,816,815,943,942,930,795,763,762,773,673,697,693,692,691])).
% 9.71/9.81  cnf(1879,plain,
% 9.71/9.81     (P8(x18791,x18791,a12)),
% 9.71/9.81     inference(rename_variables,[],[255])).
% 9.71/9.81  cnf(1887,plain,
% 9.71/9.81     (P7(f10(f3(a23),f3(a23),a23),f10(a24,a24,a23),a23)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,189,190,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,230,232,234,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651,650,649,648,647,646,645,644,643,640,639,638,635,633,611,610,816,815,943,942,930,795,763,762,773,673,697,693,692,691,690,669,666,664,430,429,405,404,565,552,869,868,867])).
% 9.71/9.81  cnf(1899,plain,
% 9.71/9.81     (P8(f7(f10(x18991,f4(a19,a12),a12),f4(a19,a12),a12),x18991,a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,1879,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,189,190,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,230,232,234,236,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651,650,649,648,647,646,645,644,643,640,639,638,635,633,611,610,816,815,943,942,930,795,763,762,773,673,697,693,692,691,690,669,666,664,430,429,405,404,565,552,869,868,867,865,864,862,847,846,845])).
% 9.71/9.81  cnf(1901,plain,
% 9.71/9.81     (P8(f10(f4(f4(f7(x19011,f4(a19,a12),a12),a12),a12),f4(a19,a12),a12),x19011,a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,1879,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,189,190,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,230,232,234,236,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651,650,649,648,647,646,645,644,643,640,639,638,635,633,611,610,816,815,943,942,930,795,763,762,773,673,697,693,692,691,690,669,666,664,430,429,405,404,565,552,869,868,867,865,864,862,847,846,845,844])).
% 9.71/9.81  cnf(1903,plain,
% 9.71/9.81     (~P7(x19031,f10(f5(f3(a12),f7(x19031,f4(a19,a12),a12),a12),f4(a19,a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,1879,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,189,190,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,230,232,234,236,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651,650,649,648,647,646,645,644,643,640,639,638,635,633,611,610,816,815,943,942,930,795,763,762,773,673,697,693,692,691,690,669,666,664,430,429,405,404,565,552,869,868,867,865,864,862,847,846,845,844,842])).
% 9.71/9.81  cnf(1905,plain,
% 9.71/9.81     (~P7(f3(a12),f7(f10(f3(a12),f4(a19,a12),a12),f4(a19,a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,1879,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,189,190,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,230,232,234,236,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651,650,649,648,647,646,645,644,643,640,639,638,635,633,611,610,816,815,943,942,930,795,763,762,773,673,697,693,692,691,690,669,666,664,430,429,405,404,565,552,869,868,867,865,864,862,847,846,845,844,842,841])).
% 9.71/9.81  cnf(1907,plain,
% 9.71/9.81     (P8(x19071,f7(f10(x19071,f4(a19,a12),a12),f4(a19,a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,1879,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,189,190,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,230,232,234,236,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651,650,649,648,647,646,645,644,643,640,639,638,635,633,611,610,816,815,943,942,930,795,763,762,773,673,697,693,692,691,690,669,666,664,430,429,405,404,565,552,869,868,867,865,864,862,847,846,845,844,842,841,840])).
% 9.71/9.81  cnf(1909,plain,
% 9.71/9.81     (P8(x19091,f10(f5(f7(f7(x19091,f4(a19,a12),a12),f17(f2(f11(a1)),a12),a12),f7(f7(x19091,f4(a19,a12),a12),f17(f2(f11(a1)),a12),a12),a12),f4(a19,a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,1879,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,189,190,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,230,232,234,236,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651,650,649,648,647,646,645,644,643,640,639,638,635,633,611,610,816,815,943,942,930,795,763,762,773,673,697,693,692,691,690,669,666,664,430,429,405,404,565,552,869,868,867,865,864,862,847,846,845,844,842,841,840,838])).
% 9.71/9.81  cnf(1919,plain,
% 9.71/9.81     (P8(f3(a23),a24,a23)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,1879,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,189,190,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,230,232,234,236,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651,650,649,648,647,646,645,644,643,640,639,638,635,633,611,610,816,815,943,942,930,795,763,762,773,673,697,693,692,691,690,669,666,664,430,429,405,404,565,552,869,868,867,865,864,862,847,846,845,844,842,841,840,838,515,959,558,578,417])).
% 9.71/9.81  cnf(1927,plain,
% 9.71/9.81     (~P8(f10(a19,f7(a19,f17(f2(f11(a1)),a12),a12),a12),f10(a19,f3(a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,1879,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,189,190,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,230,232,234,236,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651,650,649,648,647,646,645,644,643,640,639,638,635,633,611,610,816,815,943,942,930,795,763,762,773,673,697,693,692,691,690,669,666,664,430,429,405,404,565,552,869,868,867,865,864,862,847,846,845,844,842,841,840,838,515,959,558,578,417,325,814,813,812])).
% 9.71/9.81  cnf(1931,plain,
% 9.71/9.81     (P7(f10(a19,a19,a12),f10(f17(f2(f2(f11(a1))),a12),a19,a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,1879,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,189,190,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,230,232,234,236,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651,650,649,648,647,646,645,644,643,640,639,638,635,633,611,610,816,815,943,942,930,795,763,762,773,673,697,693,692,691,690,669,666,664,430,429,405,404,565,552,869,868,867,865,864,862,847,846,845,844,842,841,840,838,515,959,558,578,417,325,814,813,812,710,709])).
% 9.71/9.81  cnf(1937,plain,
% 9.71/9.81     (~E(f10(f4(a19,a12),f4(a19,a12),a12),f10(f3(a12),f4(a19,a12),a12))),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,1879,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,189,190,191,193,196,200,201,202,204,206,210,212,216,220,223,226,229,230,232,234,236,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651,650,649,648,647,646,645,644,643,640,639,638,635,633,611,610,816,815,943,942,930,795,763,762,773,673,697,693,692,691,690,669,666,664,430,429,405,404,565,552,869,868,867,865,864,862,847,846,845,844,842,841,840,838,515,959,558,578,417,325,814,813,812,710,709,708,707,441])).
% 9.71/9.81  cnf(1955,plain,
% 9.71/9.81     (~P7(f4(f3(a12),a12),f4(a19,a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,1879,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,189,190,191,192,193,196,200,201,202,204,206,210,212,216,220,223,226,229,230,232,233,234,236,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651,650,649,648,647,646,645,644,643,640,639,638,635,633,611,610,816,815,943,942,930,795,763,762,773,673,697,693,692,691,690,669,666,664,430,429,405,404,565,552,869,868,867,865,864,862,847,846,845,844,842,841,840,838,515,959,558,578,417,325,814,813,812,710,709,708,707,441,440,485,471,771,770,622,620,574,521])).
% 9.71/9.81  cnf(1957,plain,
% 9.71/9.81     (P8(f4(a19,a12),f4(f3(a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,1879,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,189,190,191,192,193,196,200,201,202,204,206,210,212,216,220,223,226,229,230,232,233,234,236,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651,650,649,648,647,646,645,644,643,640,639,638,635,633,611,610,816,815,943,942,930,795,763,762,773,673,697,693,692,691,690,669,666,664,430,429,405,404,565,552,869,868,867,865,864,862,847,846,845,844,842,841,840,838,515,959,558,578,417,325,814,813,812,710,709,708,707,441,440,485,471,771,770,622,620,574,521,489])).
% 9.71/9.81  cnf(1959,plain,
% 9.71/9.81     (~P8(f4(f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12),f3(a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,1879,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,189,190,191,192,193,196,200,201,202,204,206,210,212,216,220,223,226,229,230,232,233,234,236,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651,650,649,648,647,646,645,644,643,640,639,638,635,633,611,610,816,815,943,942,930,795,763,762,773,673,697,693,692,691,690,669,666,664,430,429,405,404,565,552,869,868,867,865,864,862,847,846,845,844,842,841,840,838,515,959,558,578,417,325,814,813,812,710,709,708,707,441,440,485,471,771,770,622,620,574,521,489,494])).
% 9.71/9.81  cnf(1965,plain,
% 9.71/9.81     (P7(f10(f3(a12),f3(a12),a12),f3(a12),a12)+~P7(f10(f3(a12),x19651,a12),f10(f10(f3(a12),f3(a12),a12),x19651,a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,1879,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,189,190,191,192,193,196,200,201,202,204,206,210,212,216,220,223,226,229,230,232,233,234,236,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,1571,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651,650,649,648,647,646,645,644,643,640,639,638,635,633,611,610,816,815,943,942,930,795,763,762,773,673,697,693,692,691,690,669,666,664,430,429,405,404,565,552,869,868,867,865,864,862,847,846,845,844,842,841,840,838,515,959,558,578,417,325,814,813,812,710,709,708,707,441,440,485,471,771,770,622,620,574,521,489,494,526,525,797])).
% 9.71/9.81  cnf(1967,plain,
% 9.71/9.81     (P7(f10(f3(a12),f3(a12),a12),f3(a12),a12)+~P7(f10(x19671,f3(a12),a12),f10(x19671,f10(f3(a12),f3(a12),a12),a12),a12)),
% 9.71/9.81     inference(scs_inference,[],[305,255,982,984,1061,1064,1094,1105,1148,1168,1174,1177,1235,1244,1247,1251,1254,1263,1267,1391,1399,1456,1580,1583,1586,1607,1612,1641,1644,1653,1674,1679,1690,1723,1726,1789,1796,1879,299,1010,1017,1020,1023,1026,1039,1042,1067,1070,1089,1122,1125,1130,1133,1161,1164,1167,1171,1180,1189,1192,1195,1198,1201,1223,1226,1229,1232,1238,1241,1250,1255,1259,1262,1394,96,97,99,102,103,104,106,107,108,109,111,113,114,116,118,119,120,121,122,123,124,125,126,127,128,129,132,136,138,142,146,148,150,151,153,154,155,157,159,160,161,162,163,164,165,166,168,169,171,174,175,176,177,178,180,181,182,184,185,188,189,190,191,192,193,196,200,201,202,204,206,210,212,216,220,223,226,229,230,232,233,234,236,238,241,246,249,254,256,257,258,300,95,294,252,261,304,264,268,267,302,282,283,275,273,296,260,265,977,1053,1058,1216,266,1002,1005,1099,1102,279,1256,259,288,1571,2,370,369,406,373,42,41,37,36,3,454,451,439,418,397,394,970,459,375,374,483,482,315,512,508,599,495,493,492,380,317,316,602,600,598,597,379,615,553,388,702,966,964,963,961,532,531,530,529,528,527,462,382,614,736,735,734,573,571,831,829,826,825,806,805,804,803,782,780,779,706,705,676,675,674,662,661,656,642,641,634,604,386,384,811,810,619,618,617,616,793,791,789,787,701,699,698,695,694,689,688,687,686,668,409,564,407,740,739,738,737,685,684,683,682,863,861,848,839,837,836,834,410,381,328,306,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,799,798,612,569,548,533,443,438,437,420,419,393,392,390,372,371,363,362,340,339,338,336,335,334,333,332,330,322,318,311,309,308,704,703,672,563,539,822,821,538,431,937,577,576,557,517,487,486,467,433,432,416,415,414,367,365,364,360,353,352,351,349,347,346,345,343,342,341,314,313,579,556,555,934,854,596,595,594,593,592,591,590,589,584,583,582,581,503,502,500,498,497,496,436,435,434,728,727,726,725,724,723,722,721,719,718,715,713,711,524,523,522,802,801,800,554,957,931,958,880,580,968,969,93,43,38,516,453,450,448,411,629,628,609,608,607,606,605,458,457,456,455,377,355,354,324,473,472,470,469,769,768,627,626,625,624,623,621,575,537,536,520,510,506,490,359,544,542,541,478,477,476,475,603,601,547,546,545,543,540,513,480,446,445,568,387,732,936,935,856,855,809,808,730,729,820,818,817,967,965,962,960,933,932,491,428,422,403,402,474,383,326,778,733,572,570,378,465,761,760,759,757,756,755,753,752,750,749,748,745,743,741,781,663,659,658,657,653,651,650,649,648,647,646,645,644,643,640,639,638,635,633,611,610,816,815,943,942,930,795,763,762,773,673,697,693,692,691,690,669,666,664,430,429,405,404,565,552,869,868,867,865,864,862,847,846,845,844,842,841,840,838,515,959,558,578,417,325,814,813,812,710,709,708,707,441,440,485,471,771,770,622,620,574,521,489,494,526,525,797,796])).
% 9.71/9.81  cnf(1977,plain,
% 9.71/9.81     (E(x19771,f4(f4(x19771,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(1979,plain,
% 9.71/9.81     (E(x19791,f4(f4(x19791,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(1981,plain,
% 9.71/9.81     (E(x19811,f4(f4(x19811,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(1983,plain,
% 9.71/9.81     (E(x19831,f4(f4(x19831,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(1985,plain,
% 9.71/9.81     (E(x19851,f4(f4(x19851,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(1987,plain,
% 9.71/9.81     (E(x19871,f4(f4(x19871,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(1989,plain,
% 9.71/9.81     (E(x19891,f4(f4(x19891,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(1991,plain,
% 9.71/9.81     (E(x19911,f4(f4(x19911,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(1993,plain,
% 9.71/9.81     (E(x19931,f4(f4(x19931,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(1995,plain,
% 9.71/9.81     (E(x19951,f4(f4(x19951,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(1997,plain,
% 9.71/9.81     (E(x19971,f4(f4(x19971,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(1999,plain,
% 9.71/9.81     (E(x19991,f4(f4(x19991,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2001,plain,
% 9.71/9.81     (E(x20011,f4(f4(x20011,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2002,plain,
% 9.71/9.81     (P34(f4(f4(a13,a12),a12))),
% 9.71/9.81     inference(scs_inference,[],[139,143,186,197,207,213,217,221,235,242,245,147,167,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,1558,92,91,90,89,88,87,86,85,84,82,81,80,79])).
% 9.71/9.81  cnf(2003,plain,
% 9.71/9.81     (E(x20031,f4(f4(x20031,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2005,plain,
% 9.71/9.81     (E(x20051,f4(f4(x20051,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2007,plain,
% 9.71/9.81     (E(x20071,f4(f4(x20071,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2009,plain,
% 9.71/9.81     (E(x20091,f4(f4(x20091,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2011,plain,
% 9.71/9.81     (E(x20111,f4(f4(x20111,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2013,plain,
% 9.71/9.81     (E(x20131,f4(f4(x20131,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2015,plain,
% 9.71/9.81     (E(x20151,f4(f4(x20151,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2017,plain,
% 9.71/9.81     (E(x20171,f4(f4(x20171,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2019,plain,
% 9.71/9.81     (E(x20191,f4(f4(x20191,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2020,plain,
% 9.71/9.81     (P33(f4(f4(a13,a12),a12))),
% 9.71/9.81     inference(scs_inference,[],[130,134,139,143,156,170,186,197,207,211,213,217,221,227,235,239,242,245,147,167,233,164,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69])).
% 9.71/9.81  cnf(2021,plain,
% 9.71/9.81     (E(x20211,f4(f4(x20211,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2023,plain,
% 9.71/9.81     (E(x20231,f4(f4(x20231,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2025,plain,
% 9.71/9.81     (E(x20251,f4(f4(x20251,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2027,plain,
% 9.71/9.81     (E(x20271,f4(f4(x20271,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2028,plain,
% 9.71/9.81     (P28(f4(f4(a23,a12),a12))),
% 9.71/9.81     inference(scs_inference,[],[130,134,139,143,156,170,179,186,197,207,211,213,217,221,227,235,239,242,245,147,167,176,233,160,164,125,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65])).
% 9.71/9.81  cnf(2029,plain,
% 9.71/9.81     (E(x20291,f4(f4(x20291,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2031,plain,
% 9.71/9.81     (E(x20311,f4(f4(x20311,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2033,plain,
% 9.71/9.81     (E(x20331,f4(f4(x20331,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2035,plain,
% 9.71/9.81     (E(x20351,f4(f4(x20351,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2037,plain,
% 9.71/9.81     (E(x20371,f4(f4(x20371,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2039,plain,
% 9.71/9.81     (E(x20391,f4(f4(x20391,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2040,plain,
% 9.71/9.81     (P22(f4(f4(a13,a12),a12))),
% 9.71/9.81     inference(scs_inference,[],[130,134,139,143,156,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,147,167,172,123,176,233,160,164,125,201,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59])).
% 9.71/9.81  cnf(2041,plain,
% 9.71/9.81     (E(x20411,f4(f4(x20411,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2042,plain,
% 9.71/9.81     (P32(f4(f4(a23,a12),a12))),
% 9.71/9.81     inference(scs_inference,[],[130,134,139,143,156,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,147,167,172,123,176,233,160,164,189,125,201,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58])).
% 9.71/9.81  cnf(2043,plain,
% 9.71/9.81     (E(x20431,f4(f4(x20431,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2045,plain,
% 9.71/9.81     (E(x20451,f4(f4(x20451,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2046,plain,
% 9.71/9.81     (P5(f4(f4(a14,a12),a12))),
% 9.71/9.81     inference(scs_inference,[],[115,130,134,139,143,156,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,147,167,172,123,176,233,160,164,189,125,129,201,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56])).
% 9.71/9.81  cnf(2047,plain,
% 9.71/9.81     (E(x20471,f4(f4(x20471,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2048,plain,
% 9.71/9.81     (P40(f4(f4(a14,a12),a12))),
% 9.71/9.81     inference(scs_inference,[],[115,130,134,139,143,156,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,147,167,172,123,176,233,160,164,189,125,129,201,154,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55])).
% 9.71/9.81  cnf(2049,plain,
% 9.71/9.81     (E(x20491,f4(f4(x20491,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2051,plain,
% 9.71/9.81     (E(x20511,f4(f4(x20511,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2053,plain,
% 9.71/9.81     (E(x20531,f4(f4(x20531,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2055,plain,
% 9.71/9.81     (E(x20551,f4(f4(x20551,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2057,plain,
% 9.71/9.81     (E(x20571,f4(f4(x20571,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2059,plain,
% 9.71/9.81     (E(x20591,f4(f4(x20591,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2060,plain,
% 9.71/9.81     (P4(f4(f4(a13,a12),a12))),
% 9.71/9.81     inference(scs_inference,[],[110,112,115,130,134,139,143,156,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,147,167,205,172,123,176,192,233,160,164,189,125,129,201,107,154,150,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49])).
% 9.71/9.81  cnf(2061,plain,
% 9.71/9.81     (E(x20611,f4(f4(x20611,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2063,plain,
% 9.71/9.81     (E(x20631,f4(f4(x20631,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2065,plain,
% 9.71/9.81     (E(x20651,f4(f4(x20651,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2067,plain,
% 9.71/9.81     (E(x20671,f4(f4(x20671,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2068,plain,
% 9.71/9.81     (P3(f4(f4(a13,a12),a12))),
% 9.71/9.81     inference(scs_inference,[],[110,112,115,130,134,139,143,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,147,167,195,205,172,121,123,176,192,233,160,164,189,125,129,201,107,154,103,150,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45])).
% 9.71/9.81  cnf(2069,plain,
% 9.71/9.81     (E(x20691,f4(f4(x20691,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2070,plain,
% 9.71/9.81     (P39(f4(f4(a14,a12),a12))),
% 9.71/9.81     inference(scs_inference,[],[110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,147,167,195,205,172,121,123,176,192,233,160,164,189,125,129,201,107,154,103,150,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44])).
% 9.71/9.81  cnf(2071,plain,
% 9.71/9.81     (E(x20711,f4(f4(x20711,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2073,plain,
% 9.71/9.81     (E(x20731,f4(f4(x20731,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2074,plain,
% 9.71/9.81     (P48(f4(f4(a13,a12),a12))),
% 9.71/9.81     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,100,147,167,195,205,172,121,123,176,192,233,160,164,189,125,129,201,107,154,103,150,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39])).
% 9.71/9.81  cnf(2075,plain,
% 9.71/9.81     (E(x20751,f4(f4(x20751,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2077,plain,
% 9.71/9.81     (E(x20771,f4(f4(x20771,a12),a12))),
% 9.71/9.81     inference(rename_variables,[],[1692])).
% 9.71/9.81  cnf(2079,plain,
% 9.71/9.81     (E(f7(f10(x20791,x20792,a12),f10(x20791,x20791,a12),a12),f7(x20792,x20791,a12))),
% 9.71/9.81     inference(rename_variables,[],[277])).
% 9.71/9.81  cnf(2083,plain,
% 9.71/9.81     (~P7(f10(f3(a23),a25,a23),f10(f3(a23),a24,a23),a23)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,277,98,100,147,167,195,205,172,121,123,176,192,233,160,164,189,125,129,201,107,154,103,200,153,150,988,1211,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1273,1158,1034,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830])).
% 9.71/9.82  cnf(2084,plain,
% 9.71/9.82     (P8(x20841,x20841,a23)),
% 9.71/9.82     inference(rename_variables,[],[1273])).
% 9.71/9.82  cnf(2087,plain,
% 9.71/9.82     (P8(x20871,x20871,a23)),
% 9.71/9.82     inference(rename_variables,[],[1273])).
% 9.71/9.82  cnf(2091,plain,
% 9.71/9.82     (P8(x20911,x20911,f4(f4(a13,a12),a12))),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,277,98,100,147,167,195,205,172,121,123,176,192,233,160,164,189,125,129,201,107,154,103,97,200,153,150,988,1211,1078,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1273,2084,1158,1034,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327])).
% 9.71/9.82  cnf(2096,plain,
% 9.71/9.82     (P8(x20961,x20961,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2100,plain,
% 9.71/9.82     (P7(f5(f3(a12),f4(a19,a12),a12),f3(a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,301,277,98,100,147,167,195,205,172,255,121,123,176,192,233,160,164,189,125,129,201,193,107,154,103,97,200,153,150,988,1211,1669,1078,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1273,2084,1646,1158,1034,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558])).
% 9.71/9.82  cnf(2112,plain,
% 9.71/9.82     (~E(f6(f7(a19,f17(f2(f11(a1)),a12),a12),f17(f2(f11(a1)),a12),a14),f3(a14))),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,303,301,277,98,100,147,167,195,205,172,255,121,123,176,192,233,160,164,189,125,129,201,193,107,154,103,97,200,153,150,1604,988,1606,1211,1669,1078,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1273,2084,1646,1158,1034,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375])).
% 9.71/9.82  cnf(2116,plain,
% 9.71/9.82     (P8(f4(f4(f3(a13),a13),a13),f4(f3(a13),a13),a13)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,303,301,277,98,100,147,167,195,205,172,255,121,123,176,192,233,160,164,189,125,129,201,193,107,154,103,97,200,153,150,1604,988,1606,1211,1669,1078,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1614,1273,2084,1646,1158,1034,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472])).
% 9.71/9.82  cnf(2136,plain,
% 9.71/9.82     (P7(f5(x21361,f3(a12),a12),f5(x21361,a19,a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[1620])).
% 9.71/9.82  cnf(2144,plain,
% 9.71/9.82     (~P8(f5(f17(f2(f2(f11(a1))),a12),f17(f2(f11(a1)),a12),a12),f7(a19,f17(f2(f11(a1)),a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,303,301,277,98,100,147,167,195,205,209,274,172,255,121,123,176,192,233,160,164,189,125,129,201,193,107,154,166,162,103,97,254,104,200,106,153,150,1604,988,1606,1211,1669,1086,1078,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1614,1273,2084,1646,1158,1034,1390,1096,1620,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525])).
% 9.71/9.82  cnf(2145,plain,
% 9.71/9.82     (~P8(f5(f17(f2(f2(f11(a1))),a12),x21451,a12),x21451,a12)),
% 9.71/9.82     inference(rename_variables,[],[1096])).
% 9.71/9.82  cnf(2149,plain,
% 9.71/9.82     (P7(f3(a12),f5(f7(a19,f17(f2(f11(a1)),a12),a12),f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,301,277,98,100,147,167,195,205,209,274,172,255,121,123,176,192,233,160,164,189,125,129,268,201,193,107,154,166,162,103,97,254,104,200,106,153,150,1604,988,1606,1211,1669,1086,1078,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1614,1273,2084,1646,1158,1034,1390,1096,1620,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614])).
% 9.71/9.82  cnf(2152,plain,
% 9.71/9.82     (~P7(f10(x21521,x21521,a12),f3(a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[1316])).
% 9.71/9.82  cnf(2155,plain,
% 9.71/9.82     (~P7(f10(x21551,x21551,a12),f3(a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[1316])).
% 9.71/9.82  cnf(2165,plain,
% 9.71/9.82     (P8(f10(f3(a23),a24,a23),f10(f3(a23),a25,a23),a23)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,301,277,98,100,147,167,195,205,209,274,172,255,121,123,176,192,233,160,164,189,125,129,169,268,201,193,107,154,166,162,103,97,254,304,104,200,106,153,102,150,1604,988,998,1606,1211,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1802,1614,974,996,1273,2084,2087,1646,1158,1034,1390,1096,1620,1316,2152,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752])).
% 9.71/9.82  cnf(2169,plain,
% 9.71/9.82     (P8(f7(a19,f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12),f3(a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,301,277,98,100,147,167,195,205,209,274,172,255,121,123,176,192,233,160,164,189,125,129,169,268,201,193,107,154,166,162,103,97,254,304,104,200,106,153,102,150,1604,988,998,1606,1211,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1802,1614,1203,974,996,1273,2084,2087,1646,1158,1034,1390,1096,1620,1316,2152,1320,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675])).
% 9.71/9.82  cnf(2170,plain,
% 9.71/9.82     (P8(f3(a12),f10(x21701,x21701,a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[1320])).
% 9.71/9.82  cnf(2172,plain,
% 9.71/9.82     (P7(f3(a12),f5(f3(a12),f7(f10(f16(a24,a23),f10(f17(f2(f11(a1)),a12),a19,a12),a12),f16(a25,a23),a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,277,98,100,147,167,195,205,209,274,172,255,2096,121,123,176,192,233,160,164,189,125,129,169,268,201,193,107,154,166,162,103,180,97,254,304,104,200,171,106,153,102,150,1604,988,998,1606,1211,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1802,1614,1203,974,996,1273,2084,2087,1646,1158,1034,1390,1096,1620,1316,2152,1320,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619])).
% 9.71/9.82  cnf(2173,plain,
% 9.71/9.82     (P8(x21731,x21731,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2177,plain,
% 9.71/9.82     (P8(f7(f7(a19,f17(f2(f11(a1)),a12),a12),f3(a12),a12),f7(f17(f2(f11(a1)),a12),f3(a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,277,98,100,147,167,195,205,209,274,172,255,2096,2173,121,123,176,192,233,160,164,189,125,129,169,268,201,193,107,154,166,162,103,180,97,254,304,104,200,171,106,153,102,150,151,1604,988,998,1606,1211,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1802,1614,1203,974,996,1273,2084,2087,1646,1158,1034,1390,1096,1620,1316,2152,1320,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763])).
% 9.71/9.82  cnf(2182,plain,
% 9.71/9.82     (~P7(f10(x21821,x21821,a12),f3(a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[1316])).
% 9.71/9.82  cnf(2185,plain,
% 9.71/9.82     (~P7(f10(x21851,x21851,a12),f3(a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[1316])).
% 9.71/9.82  cnf(2188,plain,
% 9.71/9.82     (P8(x21881,x21881,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2190,plain,
% 9.71/9.82     (~P7(f3(a12),f5(f10(f6(x21901,x21901,a12),x21902,a12),f7(x21903,f3(a12),a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,277,98,100,147,167,195,205,209,274,172,255,2096,2173,299,121,123,176,192,233,160,164,189,125,129,169,268,201,193,107,154,166,162,103,180,97,254,304,104,200,171,106,153,102,257,150,151,1604,988,998,1606,1211,1800,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1802,1614,1203,974,996,1273,2084,2087,1646,1158,1034,1760,1093,1390,1096,1620,1316,2152,2155,2182,1320,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685])).
% 9.71/9.82  cnf(2191,plain,
% 9.71/9.82     (~P7(x21911,x21911,a12)),
% 9.71/9.82     inference(rename_variables,[],[299])).
% 9.71/9.82  cnf(2192,plain,
% 9.71/9.82     (~P7(x21921,f5(f10(f6(x21922,x21922,a12),x21923,a12),x21921,a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[1093])).
% 9.71/9.82  cnf(2195,plain,
% 9.71/9.82     (P8(x21951,x21951,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2197,plain,
% 9.71/9.82     (~P7(f3(a12),f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,277,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,299,121,123,176,192,233,160,164,189,125,129,169,268,201,193,107,154,166,162,103,180,97,254,304,104,200,171,106,153,102,257,150,151,1030,1604,988,998,1606,1211,1800,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1802,1614,1203,974,996,1273,2084,2087,1646,1158,1034,1760,1093,1390,1096,1620,1316,2152,2155,2182,1320,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410])).
% 9.71/9.82  cnf(2203,plain,
% 9.71/9.82     (~P8(f4(f3(a12),a12),f4(a19,a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,277,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,299,121,123,176,192,233,160,164,189,125,129,169,268,201,193,107,154,166,162,103,180,97,254,304,104,200,171,106,153,102,257,150,151,1030,1604,988,998,1606,1211,1800,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1802,1676,1614,1203,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1093,1390,1096,1620,1316,2152,2155,2182,1320,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411])).
% 9.71/9.82  cnf(2211,plain,
% 9.71/9.82     (~E(f6(f7(a19,f17(f2(f11(a1)),a12),a12),f17(f2(f11(a1)),a12),a13),f3(a13))),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,277,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,299,121,123,176,192,233,160,164,189,125,129,169,268,201,175,193,107,154,166,162,103,180,97,254,304,104,200,171,106,153,102,257,150,151,1030,1604,988,998,1606,1211,1800,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1614,1203,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1093,1390,1096,1620,1316,2152,2155,2182,1320,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374])).
% 9.71/9.82  cnf(2221,plain,
% 9.71/9.82     (P8(f10(f6(x22211,x22211,a12),x22212,a12),f4(f3(a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,277,286,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,299,121,123,176,192,233,160,164,189,194,125,129,169,268,201,175,193,107,154,166,162,103,180,97,254,304,104,200,171,258,106,153,102,257,150,151,1030,1604,988,998,1606,1211,1800,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1614,1203,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1093,1722,1390,1096,1620,1316,2152,2155,2182,1320,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615])).
% 9.71/9.82  cnf(2222,plain,
% 9.71/9.82     (P8(f5(f10(f6(x22221,x22221,a12),x22222,a12),x22223,a12),x22223,a12)),
% 9.71/9.82     inference(rename_variables,[],[1722])).
% 9.71/9.82  cnf(2224,plain,
% 9.71/9.82     (~P8(f7(f10(f16(a24,a23),f10(f17(f2(f11(a1)),a12),a19,a12),a12),f16(a25,a23),a12),f3(a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,277,286,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,299,2191,121,123,176,192,233,160,164,189,194,125,129,169,268,201,175,193,107,154,166,162,103,180,165,97,254,304,104,200,171,258,106,153,102,257,150,151,1030,1604,988,998,1606,1211,1800,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1614,1203,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1093,1722,1390,1096,1620,1316,2152,2155,2182,1320,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531])).
% 9.71/9.82  cnf(2226,plain,
% 9.71/9.82     (~P8(a25,f3(a23),a23)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,277,286,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,299,2191,121,123,176,192,233,160,164,189,194,125,129,169,268,201,175,193,107,154,166,162,103,180,165,97,254,304,104,200,171,258,106,153,102,257,150,151,1030,1604,988,998,1606,1211,1800,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1614,1203,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1093,1722,1390,1096,1620,1316,2152,2155,2182,1320,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530])).
% 9.71/9.82  cnf(2233,plain,
% 9.71/9.82     (P8(f3(a12),f10(x22331,x22331,a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[1320])).
% 9.71/9.82  cnf(2236,plain,
% 9.71/9.82     (P8(x22361,x22361,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2242,plain,
% 9.71/9.82     (P8(x22421,x22421,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2248,plain,
% 9.71/9.82     (~P7(f4(f3(a12),a12),f7(x22481,f4(f3(a12),a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,277,286,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,299,2191,121,123,176,192,233,279,160,164,189,194,125,129,169,268,201,175,193,107,154,166,162,103,180,165,97,254,188,304,104,200,171,258,106,153,102,257,150,151,992,1030,1604,988,998,1606,1009,1211,1800,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1093,1722,1390,1096,1620,1316,2152,2155,2182,1320,2170,1376,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738])).
% 9.71/9.82  cnf(2250,plain,
% 9.71/9.82     (~P7(f7(f10(f16(a24,a23),f10(f17(f2(f11(a1)),a12),a19,a12),a12),f16(a25,a23),a12),f3(a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,277,286,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,299,2191,121,123,176,192,233,279,160,164,189,194,125,129,169,268,201,175,193,107,154,166,162,103,180,165,97,254,188,304,104,200,171,258,106,153,102,257,150,151,992,1030,1604,988,998,1606,1009,1211,1800,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1093,1722,1390,1096,1620,1316,2152,2155,2182,1320,2170,1376,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454])).
% 9.71/9.82  cnf(2252,plain,
% 9.71/9.82     (~P8(f7(a19,f17(f2(f11(a1)),a12),a12),f21(x22521),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,277,271,286,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,299,2191,121,123,176,192,233,279,160,164,189,194,125,129,169,268,201,175,193,107,154,159,166,162,103,180,165,97,254,188,304,104,200,171,258,106,153,102,257,150,151,992,1030,1604,988,998,1606,1009,1211,1800,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1093,1722,1390,1096,1620,1316,2152,2155,2182,1320,2170,1376,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448])).
% 9.71/9.82  cnf(2258,plain,
% 9.71/9.82     (P8(f3(a12),f7(f4(f3(a12),a12),x22581,a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,277,271,286,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,299,2191,121,123,176,192,233,279,160,164,189,194,125,129,169,268,201,175,193,107,154,159,166,162,103,180,165,97,254,188,304,104,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,998,1611,1606,1009,1211,1800,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1093,1722,1390,1096,1620,1316,2152,2155,2182,1320,2170,1376,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607])).
% 9.71/9.82  cnf(2260,plain,
% 9.71/9.82     (P8(f3(a12),f7(x22601,f4(f3(a12),a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,277,271,286,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,299,2191,121,123,176,192,233,279,160,164,189,194,125,129,169,268,201,175,193,107,154,159,166,162,103,180,165,97,254,188,304,104,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,998,1611,1606,1009,1211,1800,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1093,1722,1390,1096,1620,1316,2152,2155,2182,1320,2170,1376,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606])).
% 9.71/9.82  cnf(2270,plain,
% 9.71/9.82     (P8(f6(f7(a19,f17(f2(f11(a1)),a12),a12),f17(f2(f11(a1)),a12),a12),f3(a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,277,271,286,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,299,2191,121,123,176,192,233,279,160,164,189,194,125,129,169,268,201,175,193,107,168,154,159,166,162,103,180,165,97,254,188,304,104,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,998,1611,1606,1009,1211,1800,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1093,1722,1390,1096,1620,1316,2152,2155,2182,1320,2170,1376,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536])).
% 9.71/9.82  cnf(2272,plain,
% 9.71/9.82     (~P8(f4(f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12),f4(f3(a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,277,271,286,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,299,2191,121,123,176,192,233,279,160,164,189,194,125,129,169,268,201,175,193,107,168,154,159,166,162,103,180,165,97,254,188,304,104,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,998,1611,1606,1009,1211,1800,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1093,1722,1390,1096,1620,1316,2152,2155,2182,1320,2170,1376,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520])).
% 9.71/9.82  cnf(2276,plain,
% 9.71/9.82     (~P8(f7(f10(f16(a24,a23),f10(f17(f2(f11(a1)),a12),a19,a12),a12),f16(a25,a23),a12),f10(f3(a12),f3(a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,277,271,286,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,299,2191,121,123,176,192,233,279,160,164,189,194,125,129,169,268,201,175,193,107,168,154,159,166,162,103,180,165,97,254,188,304,104,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,998,1611,1606,1009,1211,1800,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1093,1722,1390,1096,1620,1316,2152,2155,2182,1320,2170,1376,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527])).
% 9.71/9.82  cnf(2281,plain,
% 9.71/9.82     (E(f5(f10(f6(x22811,x22811,a12),x22812,a12),x22813,a12),x22813)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,277,271,286,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,299,2191,121,123,176,192,233,279,160,164,189,194,125,129,169,268,201,175,193,107,168,154,159,166,162,103,180,165,97,191,254,188,304,104,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,998,1611,1606,1009,1211,1800,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1220,1093,2192,1718,1722,1390,1096,1620,1316,2152,2155,2182,1320,2170,1376,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402])).
% 9.71/9.82  cnf(2282,plain,
% 9.71/9.82     (~P7(x22821,f5(f10(f6(x22822,x22822,a12),x22823,a12),x22821,a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[1093])).
% 9.71/9.82  cnf(2285,plain,
% 9.71/9.82     (P8(x22851,x22851,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2287,plain,
% 9.71/9.82     (P8(f3(a12),f17(f2(f11(a1)),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,277,271,286,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,299,2191,121,123,176,192,233,234,279,288,160,164,189,194,125,129,169,268,201,175,193,107,168,154,159,166,162,103,180,165,97,191,254,188,304,104,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,998,1611,1606,1009,1211,1800,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1220,1093,2192,1718,1722,1390,1096,1620,1316,2152,2155,2182,1320,2170,1376,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381])).
% 9.71/9.82  cnf(2293,plain,
% 9.71/9.82     (P8(f5(f10(f6(x22931,x22931,a13),x22932,a13),f10(f3(a13),f3(a13),a13),a13),f10(f3(a13),f3(a13),a13),a13)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,277,271,286,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,299,2191,121,123,176,192,233,234,279,288,160,164,189,194,125,129,169,268,201,175,193,107,168,154,159,166,162,103,180,165,97,191,254,188,304,104,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,998,1611,1606,1009,1211,1800,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1220,1093,2192,1718,1722,1390,1096,1620,1316,2152,2155,2182,1320,2170,1376,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962])).
% 9.71/9.82  cnf(2298,plain,
% 9.71/9.82     (P8(x22981,x22981,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2309,plain,
% 9.71/9.82     (P8(x23091,x23091,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2313,plain,
% 9.71/9.82     (P7(f3(a12),f16(a25,a23),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,277,271,286,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,299,2191,121,123,176,192,233,234,279,288,160,164,189,194,125,129,169,229,268,201,175,193,107,168,154,159,166,162,103,180,165,97,191,254,188,304,104,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,998,1611,1606,1009,1211,1800,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1220,1093,2192,1718,1722,1390,1096,1620,1316,2152,2155,2182,1320,2170,1376,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684])).
% 9.71/9.82  cnf(2314,plain,
% 9.71/9.82     (~P7(f16(x23141,a23),f3(a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[301])).
% 9.71/9.82  cnf(2315,plain,
% 9.71/9.82     (P8(x23151,x23151,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2317,plain,
% 9.71/9.82     (P8(f5(f4(x23171,f4(f4(a13,a12),a12)),x23171,f4(f4(a13,a12),a12)),f3(f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12))),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,277,271,286,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,299,2191,121,123,176,192,233,234,279,288,160,164,189,194,125,129,169,229,268,201,175,193,107,168,154,159,166,162,103,180,165,97,191,254,188,304,104,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,998,1611,1606,1009,1211,1800,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1220,1093,2192,1718,1722,1390,1096,1620,1316,2152,2155,2182,1320,2170,1376,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568])).
% 9.71/9.82  cnf(2321,plain,
% 9.71/9.82     (~P8(a19,f10(f3(a12),f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,277,271,286,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,299,2191,121,123,176,192,233,234,279,288,160,164,189,194,125,129,169,229,268,201,175,193,107,168,154,159,166,267,162,103,180,165,97,191,254,188,304,104,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,998,1611,1606,1009,1211,1800,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1220,1093,2192,1718,1722,1390,1096,1620,1316,2152,2155,2182,1320,2170,1376,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839])).
% 9.71/9.82  cnf(2322,plain,
% 9.71/9.82     (P8(x23221,x23221,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2324,plain,
% 9.71/9.82     (P7(f3(a12),f10(f16(a24,a23),f10(f17(f2(f11(a1)),a12),a19,a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,2314,277,271,286,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,299,2191,121,123,176,192,233,234,279,288,160,164,189,194,125,129,169,229,268,201,175,193,107,168,154,159,166,267,162,103,180,165,97,191,254,188,304,104,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,998,1611,1606,1009,1211,1800,1669,1086,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1220,1093,2192,1718,1722,1390,1096,1620,1316,2152,2155,2182,1320,2170,1376,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692])).
% 9.71/9.82  cnf(2325,plain,
% 9.71/9.82     (~P7(f16(x23251,a23),f3(a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[301])).
% 9.71/9.82  cnf(2328,plain,
% 9.71/9.82     (~E(a19,f3(a12))),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,2314,277,271,286,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,299,2191,121,123,176,192,233,234,279,288,160,164,189,194,125,129,169,229,268,201,175,193,107,168,154,159,166,267,162,103,180,165,97,191,254,188,304,104,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,998,1611,1606,1009,1211,1800,1669,1086,1592,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1220,1093,2192,1718,1722,1390,1096,1620,1316,2152,2155,2182,1320,2170,1376,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24])).
% 9.71/9.82  cnf(2333,plain,
% 9.71/9.82     (~P8(f5(f5(a19,f5(f7(x23331,f17(f2(f11(a1)),a12),a12),f3(a12),a12),a12),f7(x23331,f17(f2(f11(a1)),a12),a12),a12),x23331,a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,2314,277,271,286,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,299,2191,121,123,176,192,233,234,279,288,160,164,189,194,125,129,169,229,268,201,175,193,107,168,154,159,166,267,162,103,180,165,97,191,254,188,304,104,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,998,1611,1606,1009,1211,1800,1669,1086,1592,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1844,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1220,1093,2192,1718,1722,1390,1096,1173,1620,1316,2152,2155,2182,1320,2170,1376,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959])).
% 9.71/9.82  cnf(2334,plain,
% 9.71/9.82     (~P8(f5(a19,f5(x23341,f3(a12),a12),a12),x23341,a12)),
% 9.71/9.82     inference(rename_variables,[],[1173])).
% 9.71/9.82  cnf(2337,plain,
% 9.71/9.82     (~P7(x23371,f5(f10(f6(x23372,x23372,a12),x23373,a12),x23371,a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[1093])).
% 9.71/9.82  cnf(2340,plain,
% 9.71/9.82     (E(f5(f6(x23401,x23402,a12),x23402,a12),x23401)),
% 9.71/9.82     inference(rename_variables,[],[265])).
% 9.71/9.82  cnf(2342,plain,
% 9.71/9.82     (E(f5(f7(x23421,f17(f2(f11(a1)),a12),a12),f7(x23421,f17(f2(f11(a1)),a12),a12),a12),x23421)),
% 9.71/9.82     inference(rename_variables,[],[281])).
% 9.71/9.82  cnf(2346,plain,
% 9.71/9.82     (~P8(f17(f2(f11(a1)),a12),f7(a19,f17(f2(f11(a1)),a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,2314,277,271,286,281,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,299,2191,121,123,176,192,233,234,265,279,288,160,164,189,194,125,129,169,229,268,201,175,193,107,168,154,159,166,267,162,103,180,165,97,191,254,188,304,104,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1611,1606,1009,1211,1800,1669,1086,1592,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1844,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1220,1093,2192,2282,1718,1722,1390,1096,1170,1173,1620,1316,2152,2155,2182,1320,2170,1376,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439])).
% 9.71/9.82  cnf(2350,plain,
% 9.71/9.82     (~P8(f5(f5(a19,x23501,a12),f3(a12),a12),x23501,a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,2314,277,271,286,281,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,299,2191,121,123,176,192,233,234,265,279,288,160,164,189,194,125,129,169,229,268,201,175,193,107,168,154,159,166,267,162,103,180,165,97,191,254,188,304,104,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1611,1606,1009,1211,1800,1669,1086,1592,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1844,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1220,1093,2192,2282,1718,1722,1390,1096,1170,1173,2334,1620,1316,2152,2155,2182,1320,2170,1376,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622])).
% 9.71/9.82  cnf(2351,plain,
% 9.71/9.82     (~P8(f5(a19,f5(x23511,f3(a12),a12),a12),x23511,a12)),
% 9.71/9.82     inference(rename_variables,[],[1173])).
% 9.71/9.82  cnf(2359,plain,
% 9.71/9.82     (P7(f3(a12),f10(f5(a19,f3(a12),a12),f5(a19,f3(a12),a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,2314,2325,277,271,286,281,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,299,2191,121,123,176,192,233,234,265,279,288,160,164,189,194,125,129,169,229,268,201,175,193,107,168,154,159,166,267,162,103,180,165,97,191,254,188,304,104,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1611,1606,1009,1211,1800,1669,1086,1592,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1844,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1220,1093,2192,2282,1718,1722,1390,1096,1170,1173,2334,1620,1316,2152,2155,2182,1320,2170,1376,1702,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602])).
% 9.71/9.82  cnf(2366,plain,
% 9.71/9.82     (~E(f5(f4(f3(a12),a12),f5(x23661,a19,a12),a12),x23661)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,2314,2325,277,271,286,281,98,100,147,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,299,2191,121,123,176,192,233,234,265,279,288,160,164,189,194,125,129,169,229,268,201,175,193,107,168,154,159,166,267,162,103,180,165,97,191,254,188,304,104,174,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1611,1606,1009,1211,1800,1669,1086,1592,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1844,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1220,1093,2192,2282,1718,1722,1390,1096,1170,1173,2334,1620,1316,2152,2155,2182,1320,2170,1376,1702,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553])).
% 9.71/9.82  cnf(2373,plain,
% 9.71/9.82     (~E(f5(x23731,f7(a19,f17(f2(f11(a1)),a12),a12),a12),x23731)),
% 9.71/9.82     inference(rename_variables,[],[1086])).
% 9.71/9.82  cnf(2382,plain,
% 9.71/9.82     (~P8(f5(x23821,f7(a19,f17(f2(f11(a1)),a12),a12),a12),f5(x23821,f3(a12),a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[1618])).
% 9.71/9.82  cnf(2384,plain,
% 9.71/9.82     (P7(f5(f10(x23841,x23842,a12),f5(f6(f3(a12),a19,a12),f5(f10(f6(x23843,x23841,a12),x23842,a12),x23844,a12),a12),a12),f5(f10(x23843,x23842,a12),x23844,a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,2314,2325,277,271,286,281,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,299,2191,121,123,176,192,233,234,265,279,288,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,267,162,103,180,165,97,191,254,188,304,104,174,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1611,1606,1009,1211,1800,1669,1086,1592,1078,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1844,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1220,1093,2192,2282,1718,1722,1390,1096,1098,1170,1173,2334,1618,1620,2136,1316,2152,2155,2182,1320,2170,1376,1702,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965])).
% 9.71/9.82  cnf(2389,plain,
% 9.71/9.82     (P8(x23891,f5(f6(f3(a13),f10(f3(a13),f3(a13),a13),a13),x23891,a13),a13)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,231,235,239,242,245,251,303,292,301,2314,2325,277,271,286,281,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,299,2191,121,123,176,192,233,234,265,279,288,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,267,162,103,180,165,97,191,254,188,304,104,174,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1611,1606,1009,1211,1800,1669,1086,1592,1078,1322,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1844,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1220,1093,2192,2282,1718,1722,1390,1096,1098,1170,1173,2334,2351,1618,1620,2136,1316,2152,2155,2182,1320,2170,1376,1702,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571])).
% 9.71/9.82  cnf(2393,plain,
% 9.71/9.82     (P8(f10(a24,f3(a23),a23),f10(a25,f3(a23),a23),a23)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,301,2314,2325,277,271,286,281,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,299,2191,121,123,176,192,233,234,265,279,288,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,267,162,103,180,165,97,191,254,188,304,104,174,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1611,1606,1009,1211,1800,1669,1086,1592,1078,1322,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1676,1025,1614,1844,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1220,1093,2192,2282,1718,1722,1390,1096,1098,1170,1173,2334,2351,1618,1620,2136,1316,2152,2155,2182,1320,2170,1376,1702,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750])).
% 9.71/9.82  cnf(2402,plain,
% 9.71/9.82     (P8(x24021,x24021,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2410,plain,
% 9.71/9.82     (P7(f7(f7(f10(f16(a24,a23),f10(f17(f2(f11(a1)),a12),a19,a12),a12),f16(a25,a23),a12),f4(a19,a12),a12),f3(a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,301,2314,2325,277,271,286,281,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,299,2191,121,123,176,192,233,234,265,279,288,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,267,162,103,96,180,165,97,191,254,188,304,104,174,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1611,1606,1009,1768,1211,1800,1657,1669,1086,1592,1078,1322,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1388,1676,1025,1614,1844,1203,1205,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1220,1093,2192,2282,1718,1722,1390,1096,1098,1170,1173,2334,2351,1618,1620,2136,1316,2152,2155,2182,1320,2170,1376,1702,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662])).
% 9.71/9.82  cnf(2415,plain,
% 9.71/9.82     (~P7(f10(x24151,x24151,a12),f3(a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[1316])).
% 9.71/9.82  cnf(2418,plain,
% 9.71/9.82     (P8(x24181,x24181,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2428,plain,
% 9.71/9.82     (P8(f7(f17(f2(f11(a1)),a12),f3(a12),a12),f7(f7(a19,f17(f2(f11(a1)),a12),a12),f3(a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,301,2314,2325,277,271,286,281,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,299,2191,121,123,176,192,233,234,265,279,288,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,162,103,96,180,165,97,191,254,188,304,104,174,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1611,1854,1606,1009,1768,1211,1800,1657,1669,1086,1592,1078,1322,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1388,1676,1025,1614,1844,1074,1203,1205,1213,974,996,1273,2084,2087,1955,1646,1158,1034,1760,1220,1093,2192,2282,1718,1722,1390,1096,1098,1170,1173,2334,2351,1618,1620,2136,1316,2152,2155,2182,2185,1320,2170,1376,1702,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762])).
% 9.71/9.82  cnf(2437,plain,
% 9.71/9.82     (~P7(f10(x24371,x24371,a12),f3(a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[1316])).
% 9.71/9.82  cnf(2439,plain,
% 9.71/9.82     (~P7(f3(a12),f7(f10(f3(a12),f3(a12),a12),x24391,a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,301,2314,2325,277,271,286,281,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,299,2191,121,123,176,192,233,234,265,279,288,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,162,103,96,180,165,97,191,254,188,304,104,174,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1611,1854,1606,1009,1768,1211,1800,1657,1669,1086,1592,1078,1322,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1388,1676,1025,1614,1844,1074,1203,1205,1213,974,996,1273,2084,2087,1955,1846,1646,1158,1034,1760,1220,1093,2192,2282,1718,1722,1390,1096,1098,1170,1173,2334,2351,1618,1620,2136,1316,2152,2155,2182,2185,2415,2437,1320,2170,1376,1702,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695])).
% 9.71/9.82  cnf(2440,plain,
% 9.71/9.82     (~P7(f10(x24401,x24401,a12),f3(a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[1316])).
% 9.71/9.82  cnf(2443,plain,
% 9.71/9.82     (P8(x24431,x24431,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2445,plain,
% 9.71/9.82     (~P7(f5(f10(f6(x24451,x24451,a12),x24452,a12),f7(x24453,f4(f3(a12),a12),a12),a12),f3(a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,301,2314,2325,277,271,286,281,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,299,2191,121,123,176,192,233,234,265,279,288,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,162,103,96,180,165,97,191,254,188,304,104,174,200,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1611,1854,1606,1009,1768,1211,1800,1657,1669,1086,1592,1078,1322,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1388,1676,1025,1614,1844,1074,1203,1205,1213,974,996,1273,2084,2087,1955,1846,1646,1158,1034,1760,1220,1093,2192,2282,1718,1722,1390,1096,1098,1170,1173,2334,2351,1618,1620,2136,1316,2152,2155,2182,2185,2415,2437,1320,2170,1376,1702,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683])).
% 9.71/9.82  cnf(2446,plain,
% 9.71/9.82     (~P7(f5(f10(f6(x24461,x24461,a12),x24462,a12),x24463,a12),x24463,a12)),
% 9.71/9.82     inference(rename_variables,[],[1718])).
% 9.71/9.82  cnf(2452,plain,
% 9.71/9.82     (P8(x24521,x24521,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2455,plain,
% 9.71/9.82     (P8(x24551,x24551,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2462,plain,
% 9.71/9.82     (~P7(f3(a12),f7(f10(f3(a12),x24621,a12),f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,301,2314,2325,277,271,286,281,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,299,2191,121,123,176,192,233,234,265,279,288,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1768,1211,1800,1657,1669,1086,1592,1078,1322,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1388,1676,1025,1614,1844,1074,1203,1205,1213,974,996,1273,2084,2087,1955,1846,1646,1158,1034,1760,1220,1093,2192,2282,1718,1722,1390,1096,2145,1098,1170,1173,2334,2351,1618,1160,1620,2136,1316,2152,2155,2182,2185,2415,2437,1320,2170,1376,1702,1197,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841])).
% 9.71/9.82  cnf(2465,plain,
% 9.71/9.82     (~P8(f17(f2(f11(a1)),a12),f10(f3(a12),f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,301,2314,2325,277,271,286,281,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,299,2191,121,123,176,192,233,234,265,279,288,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1768,1211,1800,1657,1669,1086,1592,1078,1322,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1388,1676,1025,1614,1844,1074,1203,1205,1213,974,996,1273,2084,2087,1955,1846,1646,1158,1034,1760,1220,1093,2192,2282,1718,1722,1390,1096,2145,1098,1170,1173,2334,2351,1618,1160,1620,2136,1316,2152,2155,2182,2185,2415,2437,1320,2170,1575,1376,1702,1197,1215,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840])).
% 9.71/9.82  cnf(2469,plain,
% 9.71/9.82     (~P8(f5(f5(f3(a12),f5(a19,x24691,a12),a12),f3(a12),a12),x24691,a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,301,2314,2325,277,271,286,281,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,299,2191,121,123,176,192,233,234,265,279,288,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1768,1211,1800,1657,1669,1086,1592,1078,1322,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1388,1676,1025,1614,1844,1074,1203,1205,1213,974,996,1273,2084,2087,1955,1846,1646,1158,1034,1760,1220,1093,2192,2282,1718,1722,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,1160,1620,2136,1316,2152,2155,2182,2185,2415,2437,1320,2170,1575,1376,1702,1197,1215,1135,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612])).
% 9.71/9.82  cnf(2472,plain,
% 9.71/9.82     (P8(f3(a12),f4(f10(f6(x24721,x24721,a12),x24722,a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,301,2314,2325,277,271,286,281,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,299,2191,121,123,176,192,233,234,265,279,288,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1768,1211,1800,1657,1669,1086,1592,1078,1322,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1388,1676,1025,1614,1844,1074,1203,1205,1213,974,996,1273,2084,2087,1955,1846,1646,1158,1034,1760,1220,1093,2192,2282,1718,1722,2222,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,1160,1620,2136,1316,2152,2155,2182,2185,2415,2437,1320,2170,1575,1376,1702,1197,1215,1135,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576])).
% 9.71/9.82  cnf(2475,plain,
% 9.71/9.82     (~P8(f3(a12),f5(f3(a12),f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,301,2314,2325,277,271,286,281,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,299,2191,121,123,176,192,233,234,265,279,288,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1768,1211,1800,1657,1669,1086,1592,1078,1322,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1388,1676,1025,1614,1844,1074,1203,1205,1213,974,996,1273,2084,2087,1638,1955,1846,1646,1158,1034,1760,1220,1093,2192,2282,1718,1722,2222,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,1160,1620,2136,1316,2152,2155,2182,2185,2415,2437,1320,2170,1575,1376,1702,1197,1215,1135,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578])).
% 9.71/9.82  cnf(2489,plain,
% 9.71/9.82     (~P8(f4(f4(a19,a12),a12),f3(a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,301,2314,2325,277,271,286,281,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,299,2191,121,123,176,192,233,234,265,279,288,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1768,1211,1800,1657,1669,1086,1592,1078,1322,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1388,1676,1025,1614,1844,1074,1203,1205,1213,974,996,1273,2084,2087,1638,1955,1846,1646,1158,1034,1760,1220,1093,2192,2282,1718,1722,2222,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,2382,1160,1620,2136,1316,2152,2155,2182,2185,2415,2437,1320,2170,1575,1376,1393,1702,1197,1215,1135,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647])).
% 9.71/9.82  cnf(2490,plain,
% 9.71/9.82     (~P7(f5(x24901,f4(x24901,a12),a12),f3(a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[1393])).
% 9.71/9.82  cnf(2493,plain,
% 9.71/9.82     (P8(x24931,x24931,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2495,plain,
% 9.71/9.82     (P7(f3(a23),f10(a24,a24,a23),a23)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,301,2314,2325,277,271,286,281,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,299,2191,121,123,176,192,233,234,265,279,288,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1768,1211,1800,1657,1669,1086,1592,1078,1322,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1388,1676,1025,1614,1844,1074,1203,1205,1213,974,996,1273,2084,2087,1638,1955,1846,1646,1158,1034,1760,1220,1093,2192,2282,1718,1722,2222,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,2382,1160,1620,2136,1316,2152,2155,2182,2185,2415,2437,1320,2170,1575,1376,1393,1702,1197,1215,1135,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641])).
% 9.71/9.82  cnf(2500,plain,
% 9.71/9.82     (P8(x25001,x25001,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2510,plain,
% 9.71/9.82     (P7(f5(x25101,f21(x25102),a12),f5(x25101,f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,301,2314,2325,277,271,270,286,281,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,299,2191,121,123,176,192,233,234,265,279,288,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1768,1211,1800,1657,1669,1562,1086,1592,1078,1322,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1388,1676,1025,1614,1844,1074,1203,1205,1213,974,996,1273,2084,2087,1638,1955,1846,1646,1158,1034,1760,1220,1093,2192,2282,1718,1722,2222,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,2382,1160,1620,2136,1316,2152,2155,2182,2185,2415,2437,1320,2170,1575,1376,1393,1702,1197,1215,1135,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626])).
% 9.71/9.82  cnf(2514,plain,
% 9.71/9.82     (~P8(f7(a19,f17(f2(f11(a1)),a12),a12),f4(f3(a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,301,2314,2325,277,271,270,286,281,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,299,2191,121,123,176,192,233,234,265,279,288,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1768,1211,1800,1657,1669,1562,1086,1592,1078,1322,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1388,1676,1025,1614,1844,1074,1203,1205,1213,974,996,1273,2084,2087,1638,1955,1846,1646,1158,1034,1760,1220,1093,2192,2282,1718,1722,2222,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,2382,1160,1620,2136,1316,2152,2155,2182,2185,2415,2437,1320,2170,1575,1376,1393,1702,1197,1215,1135,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506])).
% 9.71/9.82  cnf(2525,plain,
% 9.71/9.82     (P8(f3(a23),f10(f10(f3(a23),f3(a23),a23),f10(f3(a23),f3(a23),a23),a23),a23)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,301,2314,2325,277,271,270,286,281,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,299,2191,121,123,176,192,230,233,234,265,279,288,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1768,1211,1800,1657,1669,1562,1086,1592,1078,1322,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1388,1676,1025,1614,1844,1074,1203,1205,1213,974,996,1273,2084,2087,1638,1955,1846,1646,1158,1034,1760,1220,1093,2192,2282,1718,1722,2222,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,2382,1160,1620,2136,1316,2152,2155,2182,2185,2415,2437,1320,2170,1575,1376,1393,2490,1702,1197,1215,1824,1135,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638])).
% 9.71/9.82  cnf(2528,plain,
% 9.71/9.82     (~P7(f10(x25281,x25281,a12),f3(a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[1316])).
% 9.71/9.82  cnf(2531,plain,
% 9.71/9.82     (~P7(f10(x25311,x25311,a12),f3(a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[1316])).
% 9.71/9.82  cnf(2534,plain,
% 9.71/9.82     (P8(x25341,x25341,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2539,plain,
% 9.71/9.82     (P8(f3(a12),f5(f10(x25391,x25391,a12),f10(x25392,x25392,a12),a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[288])).
% 9.71/9.82  cnf(2543,plain,
% 9.71/9.82     (P8(f10(f3(a13),f3(a13),a13),f4(f10(f3(a13),f3(a13),a13),a13),a13)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,301,2314,2325,277,271,270,286,281,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,299,2191,121,123,176,192,230,233,234,265,279,288,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1768,1211,1800,1657,1669,1562,1086,1592,1078,1322,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1388,1676,1025,1614,1844,1145,1074,1203,1205,1213,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1093,2192,2282,1718,1722,2222,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,2382,1160,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,1320,2170,1575,1376,1393,2490,1702,1197,1215,1824,1135,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469])).
% 9.71/9.82  cnf(2549,plain,
% 9.71/9.82     (P8(f3(a13),f4(f10(f3(a13),f3(a13),a13),a13),a13)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,301,2314,2325,277,271,270,286,281,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,299,2191,121,123,176,192,230,233,234,265,279,288,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1768,1211,1800,1657,1669,1562,1086,1592,1078,1322,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1388,1676,1025,1614,1844,1145,1074,1203,1205,1213,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1093,2192,2282,1718,1722,2222,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,2382,1160,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,1320,2170,1575,1376,1393,2490,1702,1197,1215,1824,1135,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469,542,477,475])).
% 9.71/9.82  cnf(2551,plain,
% 9.71/9.82     (~E(f6(f7(a19,f17(f2(f11(a1)),a12),a12),f17(f2(f11(a1)),a12),a12),f3(a12))),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,301,2314,2325,277,271,270,286,281,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,299,2191,121,123,176,192,230,233,234,265,279,288,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,124,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,127,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1768,1211,1800,1657,1669,1562,1086,1592,1078,1322,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1388,1676,1025,1614,1844,1145,1074,1203,1205,1213,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1093,2192,2282,1718,1722,2222,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,2382,1160,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,1320,2170,1575,1376,1393,2490,1702,1197,1215,1824,1135,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469,542,477,475,383])).
% 9.71/9.82  cnf(2556,plain,
% 9.71/9.82     (P8(x25561,x25561,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2560,plain,
% 9.71/9.82     (P8(f4(f4(x25601,f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12)),x25601,f4(f4(a13,a12),a12))),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,301,2314,2325,277,271,270,286,281,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,2534,299,2191,121,123,176,192,230,233,234,265,279,288,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,124,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,127,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1772,1768,1211,1800,1657,1669,1562,1086,1592,1078,1322,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1388,1676,1025,1614,1844,1145,1074,1203,1205,1213,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1093,2192,2282,1718,1722,2222,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,2382,1160,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,1320,2170,1575,1376,1393,2490,1702,1197,1215,1824,1135,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469,542,477,475,383,781,650,470,510])).
% 9.71/9.82  cnf(2562,plain,
% 9.71/9.82     (P8(f10(f6(x25621,x25621,a12),x25622,a12),f3(a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,301,2314,2325,277,271,270,286,281,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,2534,299,2191,121,123,176,192,230,233,234,265,279,288,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,124,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,127,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1772,1768,1211,1800,1657,1669,1562,1086,1592,1078,1322,1286,1290,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1738,1802,1388,1676,1025,1614,1844,1145,1074,1203,1205,1213,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1093,2192,2282,1718,1722,2222,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,2382,1160,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,1320,2170,1575,1376,1393,2490,1702,1197,1215,1824,1135,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469,542,477,475,383,781,650,470,510,492])).
% 9.71/9.82  cnf(2565,plain,
% 9.71/9.82     (P8(x25651,x25651,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2568,plain,
% 9.71/9.82     (P8(x25681,x25681,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2574,plain,
% 9.71/9.82     (P7(f10(a19,f3(a12),a12),f10(a19,f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,301,2314,2325,277,271,270,286,281,2342,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,2534,2556,2565,299,2191,121,123,176,192,230,233,234,265,279,288,2539,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,124,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,177,127,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1772,1768,1211,1800,1657,1669,1562,1086,1592,1078,1322,1286,1290,1927,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1141,1738,1802,1388,1676,1025,1614,1844,1145,1074,1203,1205,1213,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1093,2192,2282,1718,1722,2222,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,2382,1160,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,1320,2170,1575,1376,1393,2490,1702,1197,1215,1824,1135,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469,542,477,475,383,781,650,470,510,492,651,836,540,388,397])).
% 9.71/9.82  cnf(2578,plain,
% 9.71/9.82     (~P8(f7(f10(f17(f2(f11(a1)),a12),a19,a12),f10(f17(f2(f11(a1)),a12),f17(f2(f11(a1)),a12),a12),a12),f3(a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,301,2314,2325,277,2079,271,270,286,281,2342,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,2534,2556,2565,299,2191,121,123,176,192,230,233,234,265,279,288,2539,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,124,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,177,127,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1772,1768,1211,1800,1657,1669,1562,1086,1592,1078,1322,1286,1290,1754,1927,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,1141,1738,1802,1388,1676,1025,1614,1844,1145,1074,1203,1205,1213,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1093,2192,2282,1718,1722,2222,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,2382,1160,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,1320,2170,1575,1376,1393,2490,1702,1197,1215,1824,1135,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469,542,477,475,383,781,650,470,510,492,651,836,540,388,397,25,41])).
% 9.71/9.82  cnf(2583,plain,
% 9.71/9.82     (~E(f4(f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12),f17(f2(f11(a1)),a12))),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,262,301,2314,2325,263,277,2079,271,270,286,281,2342,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,2534,2556,2565,299,2191,121,123,176,192,230,233,234,265,279,288,2539,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,124,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,177,127,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1772,1768,1211,1800,1657,1669,1562,1086,1592,1560,1078,1322,1286,1290,1754,1927,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,2077,1141,1738,1802,1388,1676,1025,1614,1844,1145,1074,1203,1205,1213,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1093,2192,2282,1718,1722,2222,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,2382,1160,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,1320,2170,1575,1376,1393,2490,1702,1197,1215,1824,1135,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469,542,477,475,383,781,650,470,510,492,651,836,540,388,397,25,41,38,37,3])).
% 9.71/9.82  cnf(2584,plain,
% 9.71/9.82     (E(x25841,f4(f4(x25841,a12),a12))),
% 9.71/9.82     inference(rename_variables,[],[1692])).
% 9.71/9.82  cnf(2585,plain,
% 9.71/9.82     (~P7(f5(f6(f16(x25851,a23),x25852,a12),x25852,a12),f3(a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,262,301,2314,2325,263,277,2079,271,270,286,281,2342,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,2534,2556,2565,299,2191,121,123,176,192,230,233,234,265,2340,279,288,2539,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,124,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,177,127,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1772,1768,1211,1800,1657,1669,1562,1086,1592,1560,1078,1322,1286,1290,1754,1927,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,2077,1141,1738,1802,1388,1676,1025,1614,1844,1145,1074,1203,1205,1213,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1093,2192,2282,1718,1722,2222,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,2382,1160,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,1320,2170,1575,1376,1393,2490,1702,1197,1215,1824,1135,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469,542,477,475,383,781,650,470,510,492,651,836,540,388,397,25,41,38,37,3,36])).
% 9.71/9.82  cnf(2586,plain,
% 9.71/9.82     (E(f5(f6(x25861,x25862,a12),x25862,a12),x25861)),
% 9.71/9.82     inference(rename_variables,[],[265])).
% 9.71/9.82  cnf(2588,plain,
% 9.71/9.82     (~P7(f10(x25881,x25881,a12),f3(a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[1316])).
% 9.71/9.82  cnf(2590,plain,
% 9.71/9.82     (~P7(f10(x25901,x25901,a12),f3(a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[1316])).
% 9.71/9.82  cnf(2607,plain,
% 9.71/9.82     (~P7(x26071,x26071,f4(f4(a23,a12),a12))),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,262,301,2314,2325,263,277,2079,271,270,286,281,2342,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,2534,2556,2565,299,2191,121,123,176,192,230,233,234,265,2340,279,288,2539,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,124,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,177,127,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1772,1768,1211,1800,1657,1669,1562,1086,1592,1560,1078,1322,1286,1290,1754,1927,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,2077,1141,1738,1802,1388,1676,1025,1614,1844,1145,1074,1203,1205,1386,1213,1072,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1093,2192,2282,1718,1722,2222,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,2382,1160,1793,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,2531,2588,1318,1320,2170,2233,1575,1376,1393,2490,1702,1197,1215,1824,1135,1028,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469,542,477,475,383,781,650,470,510,492,651,836,540,388,397,25,41,38,37,3,36,1967,1965,329,832,632,849,843,835,913,368])).
% 9.71/9.82  cnf(2609,plain,
% 9.71/9.82     (P7(f10(a24,a24,a23),f10(a25,a25,a23),a23)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,262,301,2314,2325,263,277,2079,271,270,286,281,2342,98,100,147,149,167,195,205,209,274,172,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,2534,2556,2565,299,2191,121,123,176,192,230,233,234,265,2340,279,288,2539,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,124,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,177,127,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1772,1768,1211,1800,1657,1669,1562,1086,1592,1560,1078,1322,1286,1290,1754,1927,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,2077,1141,1738,1802,1388,1676,1025,1614,1844,1145,1074,1203,1205,1386,1213,1072,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1093,2192,2282,1718,1722,2222,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,2382,1160,1793,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,2531,2588,1318,1320,2170,2233,1575,1376,1393,2490,1702,1197,1215,1824,1135,1028,1919,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469,542,477,475,383,781,650,470,510,492,651,836,540,388,397,25,41,38,37,3,36,1967,1965,329,832,632,849,843,835,913,368,866])).
% 9.71/9.82  cnf(2615,plain,
% 9.71/9.82     (~P7(f10(a25,f3(a23),a23),f10(a24,f3(a23),a23),a23)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,262,301,2314,2325,263,277,2079,271,270,286,281,2342,98,100,147,149,167,195,205,209,274,172,173,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,2534,2556,2565,299,2191,121,123,176,192,230,233,234,265,2340,279,288,2539,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,124,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,177,127,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1772,1768,1211,1800,1657,1669,1562,1086,2373,1592,1560,1078,1322,1286,1290,1754,1927,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,2077,1141,1738,1802,1388,1676,1025,1614,1844,1145,1074,1203,1205,1386,1213,1072,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1093,2192,2282,1718,1722,2222,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,2382,1160,1793,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,2531,2588,1318,1320,2170,2233,1575,1376,1393,2490,1702,1197,1215,1824,1135,1028,1919,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469,542,477,475,383,781,650,470,510,492,651,836,540,388,397,25,41,38,37,3,36,1967,1965,329,832,632,849,843,835,913,368,866,620,380,831])).
% 9.71/9.82  cnf(2617,plain,
% 9.71/9.82     (P8(f3(a12),f10(f3(a12),a19,a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,262,301,2314,2325,263,277,2079,271,270,286,281,2342,98,100,147,149,167,195,205,209,274,172,173,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,2534,2556,2565,299,2191,121,123,176,192,230,233,234,265,2340,279,288,2539,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,124,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,177,127,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1772,1768,1211,1800,1657,1669,1562,1086,2373,1592,1560,1078,1084,1322,1286,1290,1754,1927,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,2077,1141,1738,1802,1388,1676,1025,1614,1844,1145,1074,1203,1205,1386,1213,1072,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1093,2192,2282,1718,1722,2222,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,2382,1160,1793,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,2531,2588,1318,1320,2170,2233,1575,1376,1393,2490,1702,1197,1215,1824,1135,1028,1919,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469,542,477,475,383,781,650,470,510,492,651,836,540,388,397,25,41,38,37,3,36,1967,1965,329,832,632,849,843,835,913,368,866,620,380,831,688])).
% 9.71/9.82  cnf(2620,plain,
% 9.71/9.82     (~P7(f5(f10(f6(x26201,x26201,a12),x26202,a12),x26203,a12),x26203,a12)),
% 9.71/9.82     inference(rename_variables,[],[1718])).
% 9.71/9.82  cnf(2621,plain,
% 9.71/9.82     (P8(x26211,x26211,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2622,plain,
% 9.71/9.82     (~P7(x26221,f5(f10(f6(x26222,x26222,a12),x26223,a12),x26221,a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[1093])).
% 9.71/9.82  cnf(2624,plain,
% 9.71/9.82     (P8(f7(x26241,f10(f3(a12),f3(a12),a12),a12),f3(a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,262,301,2314,2325,263,277,2079,271,270,286,281,2342,98,100,147,149,167,195,205,209,274,172,173,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,2534,2556,2565,2568,2621,299,2191,121,123,176,192,230,233,234,265,2340,279,288,2539,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,124,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,177,127,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1772,1768,1211,1800,1657,1669,1562,1086,2373,1592,1560,1078,1084,1322,1286,1290,1754,1927,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,2077,1141,1738,1802,1388,1676,1025,1614,1844,1145,1074,1203,1205,1386,1213,1072,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1093,2192,2282,2337,1718,2446,1722,2222,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,2382,1160,1793,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,2531,2588,2590,1318,1320,2170,2233,1575,1376,1393,2490,1702,1197,1215,1824,1135,1028,1919,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469,542,477,475,383,781,650,470,510,492,651,836,540,388,397,25,41,38,37,3,36,1967,1965,329,832,632,849,843,835,913,368,866,620,380,831,688,739,737])).
% 9.71/9.82  cnf(2632,plain,
% 9.71/9.82     (~P7(f5(f5(f6(f3(a13),f3(a13),a13),f3(a13),a13),f5(f6(f3(a13),f3(a13),a13),f3(a13),a13),a13),f3(a13),a13)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,262,301,2314,2325,263,277,2079,271,270,286,281,2342,98,100,147,149,167,195,205,209,274,172,173,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,2534,2556,2565,2568,2621,299,2191,121,123,176,192,230,233,234,265,2340,279,288,2539,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,124,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,177,127,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1772,1768,1211,1800,1657,1669,1562,1086,2373,1592,1560,1078,1084,1322,1286,1290,1754,1927,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,2077,1141,1738,1802,1388,1860,1676,1025,1614,1844,1145,1074,1203,1205,1386,1213,1072,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1752,1093,2192,2282,2337,1718,2446,1722,2222,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,2382,1160,1793,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,2531,2588,2590,1318,1320,2170,2233,1575,1376,1393,2490,1702,1197,1215,1824,1135,1028,1919,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469,542,477,475,383,781,650,470,510,492,651,836,540,388,397,25,41,38,37,3,36,1967,1965,329,832,632,849,843,835,913,368,866,620,380,831,688,739,737,846,845,600])).
% 9.71/9.82  cnf(2641,plain,
% 9.71/9.82     (~P8(f5(f10(f6(x26411,x26411,a12),x26412,a12),f7(a19,f17(f2(f11(a1)),a12),a12),a12),f21(x26413),a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,262,301,2314,2325,263,277,2079,271,270,286,281,2342,98,100,147,149,167,195,205,209,274,172,173,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,2534,2556,2565,2568,2621,299,2191,121,123,176,192,230,233,234,265,2340,266,279,288,2539,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,124,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,177,127,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1772,1768,1211,1800,1657,1669,1562,1086,2373,1592,1560,1078,1084,1322,1286,1290,1754,1927,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,2077,1141,1738,1802,1388,1860,1676,1025,1614,1844,1145,1074,1203,1205,1386,1213,1072,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1752,1093,2192,2282,2337,1718,2446,2620,1722,2222,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,2382,1160,1793,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,2531,2588,2590,1318,1320,2170,2233,1575,1376,1393,2490,1702,1197,1215,1824,1135,1028,1919,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469,542,477,475,383,781,650,470,510,492,651,836,540,388,397,25,41,38,37,3,36,1967,1965,329,832,632,849,843,835,913,368,866,620,380,831,688,739,737,846,845,600,735,572,740,528])).
% 9.71/9.82  cnf(2647,plain,
% 9.71/9.82     (E(x26471,f5(f10(f6(x26472,x26472,a12),x26473,a12),x26471,a12))),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,262,301,2314,2325,263,277,2079,271,270,286,281,2342,98,100,147,149,167,195,205,209,274,172,173,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,2534,2556,2565,2568,2621,299,2191,121,123,176,192,230,233,234,265,2340,266,279,288,2539,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,124,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,177,127,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1772,1768,1211,1800,1657,1669,1562,1086,2373,1592,1560,1078,1084,1322,1286,1290,1754,1927,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,2077,1141,1738,1802,1388,1860,1676,1025,1614,1844,1145,1074,1203,1205,1386,1213,1072,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1752,1907,1093,2192,2282,2337,2622,1718,2446,2620,1722,2222,1725,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,2382,1160,1793,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,2531,2588,2590,1318,1320,2170,2233,1575,1905,1376,1393,2490,1702,1197,1215,1824,1135,1028,1919,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469,542,477,475,383,781,650,470,510,492,651,836,540,388,397,25,41,38,37,3,36,1967,1965,329,832,632,849,843,835,913,368,866,620,380,831,688,739,737,846,845,600,735,572,740,528,428,422])).
% 9.71/9.82  cnf(2650,plain,
% 9.71/9.82     (P8(f4(f3(a13),a13),f4(f10(f3(a13),f3(a13),a13),a13),a13)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,262,301,2314,2325,263,277,2079,271,270,286,281,2342,98,100,147,149,167,195,205,209,274,172,173,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,2534,2556,2565,2568,2621,299,2191,121,123,176,192,230,233,234,265,2340,266,279,288,2539,160,164,189,194,125,126,129,169,229,268,201,175,193,107,168,154,159,166,260,267,124,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,177,127,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1772,1768,1211,1800,1657,1669,1562,1086,2373,1592,1560,1078,1084,1322,1286,1290,1754,1927,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,2077,1141,1738,1802,1388,1860,1676,1025,1614,1844,1145,1074,1203,1205,1386,1213,1072,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1752,1907,1093,2192,2282,2337,2622,1718,2446,2620,1722,2222,1725,1390,1096,2145,1098,1170,1173,2334,2351,1176,1618,2382,1160,1793,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,2531,2588,2590,1318,1320,2170,2233,1575,1905,1376,1393,2490,1702,1197,1215,1824,1135,1028,1919,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469,542,477,475,383,781,650,470,510,492,651,836,540,388,397,25,41,38,37,3,36,1967,1965,329,832,632,849,843,835,913,368,866,620,380,831,688,739,737,846,845,600,735,572,740,528,428,422,489])).
% 9.71/9.82  cnf(2665,plain,
% 9.71/9.82     (~P7(f3(a13),f4(f5(f6(f3(a13),f3(a13),a13),f3(a13),a13),a13),a13)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,298,262,301,2314,2325,263,277,2079,271,270,286,281,2342,98,100,147,149,167,195,205,209,274,172,173,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,2534,2556,2565,2568,2621,299,2191,121,123,176,192,230,233,234,265,2340,266,279,288,2539,160,164,189,194,125,126,129,169,229,268,128,201,175,193,107,168,154,159,166,260,267,124,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,177,127,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1772,1768,1211,1800,1657,1669,1562,1086,2373,1592,1560,1078,1084,1322,1286,1290,1754,1927,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,2077,1141,1738,1802,1388,1860,1676,1025,1614,1844,1145,1074,1203,1205,1386,1213,1072,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1752,1907,1093,2192,2282,2337,2622,1718,2446,2620,1722,2222,1725,1390,1096,2145,1098,1170,1173,2334,2351,1176,1788,1618,2382,1160,1793,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,2531,2588,2590,1318,1320,2170,2233,1575,1905,1376,1393,2490,1702,1197,1215,1824,1135,1028,1919,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469,542,477,475,383,781,650,470,510,492,651,836,540,388,397,25,41,38,37,3,36,1967,1965,329,832,632,849,843,835,913,368,866,620,380,831,688,739,737,846,845,600,735,572,740,528,428,422,489,599,316,930,686,483,471,493])).
% 9.71/9.82  cnf(2671,plain,
% 9.71/9.82     (P7(f7(f3(a12),f4(a19,a12),a12),f7(f4(a19,a12),f4(a19,a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,298,262,301,2314,2325,263,277,2079,271,270,286,281,2342,98,100,147,149,167,195,205,209,274,172,173,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,2534,2556,2565,2568,2621,299,2191,121,123,176,192,230,233,234,265,2340,266,279,288,2539,160,164,189,194,125,126,129,169,229,268,128,201,175,193,107,168,154,159,166,260,267,124,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,177,127,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1772,1768,1211,1800,1657,1669,1562,1086,2373,1592,1560,1078,1084,1322,1286,1290,1754,1927,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,2077,1141,1738,1802,1388,1860,1676,1025,1614,1844,1145,1074,1203,1205,1386,1213,1072,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1752,1907,1093,2192,2282,2337,2622,1718,2446,2620,1722,2222,1725,1390,1096,2145,1098,1170,1173,2334,2351,1176,1788,1618,2382,1160,1793,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,2531,2588,2590,1318,1320,2170,2233,1575,1905,1376,1393,2490,1702,1197,1215,1824,1135,1028,1919,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469,542,477,475,383,781,650,470,510,492,651,836,540,388,397,25,41,38,37,3,36,1967,1965,329,832,632,849,843,835,913,368,866,620,380,831,688,739,737,846,845,600,735,572,740,528,428,422,489,599,316,930,686,483,471,493,734,761,749])).
% 9.71/9.82  cnf(2677,plain,
% 9.71/9.82     (~P7(f7(f10(x26771,a19,a12),a19,a12),x26771,a12)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,298,262,301,2314,2325,263,277,2079,271,270,286,281,2342,98,100,147,149,167,195,205,209,274,172,173,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,2534,2556,2565,2568,2621,299,2191,121,123,176,192,230,233,234,265,2340,266,279,288,2539,160,164,189,194,125,126,129,169,229,268,128,201,175,193,107,168,154,159,166,260,267,124,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,177,127,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1772,1768,1211,1800,1657,1669,1562,1086,2373,1592,1560,1078,1084,1322,1286,1290,1754,1927,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,2077,1141,1738,1802,1388,1860,1676,1025,1614,1844,1145,1074,1203,1205,1386,1213,1072,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1752,1907,1093,2192,2282,2337,2622,1718,2446,2620,1722,2222,1725,1390,1096,2145,1098,1170,1173,2334,2351,1176,1124,1788,1618,2382,1160,1793,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,2531,2588,2590,1318,1320,2170,2233,1575,1905,1376,1393,2490,1702,1197,1795,1215,1824,1135,1028,1919,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469,542,477,475,383,781,650,470,510,492,651,836,540,388,397,25,41,38,37,3,36,1967,1965,329,832,632,849,843,835,913,368,866,620,380,831,688,739,737,846,845,600,735,572,740,528,428,422,489,599,316,930,686,483,471,493,734,761,749,407,844,709])).
% 9.71/9.82  cnf(2682,plain,
% 9.71/9.82     (P7(f10(a25,f3(a23),a23),f10(a25,a25,a23),a23)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,298,262,301,2314,2325,263,277,2079,271,270,286,281,2342,98,100,147,149,167,195,205,209,274,172,173,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,2534,2556,2565,2568,2621,299,2191,121,123,176,192,230,233,234,265,2340,266,279,288,2539,160,164,189,194,125,126,129,169,229,268,128,201,175,193,107,168,154,159,166,260,267,124,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,177,127,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1772,1768,1211,1800,1657,1669,1562,1086,2373,1592,1560,1078,1084,1322,1286,1290,1754,1927,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,2077,1141,1738,1802,1388,1860,1676,1025,1614,1844,1145,1074,1203,1205,1386,1213,1072,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1752,1907,1093,2192,2282,2337,2622,1718,2446,2620,1722,2222,1725,1390,1096,2145,1098,1170,1173,2334,2351,1176,1124,1788,1618,2382,1160,1793,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,2531,2588,2590,1318,1320,2170,2233,1575,1667,1905,1376,1393,2490,1702,1197,1795,1215,1824,1135,1028,1919,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469,542,477,475,383,781,650,470,510,492,651,836,540,388,397,25,41,38,37,3,36,1967,1965,329,832,632,849,843,835,913,368,866,620,380,831,688,739,737,846,845,600,735,572,740,528,428,422,489,599,316,930,686,483,471,493,734,761,749,407,844,709,462,757])).
% 9.71/9.82  cnf(2686,plain,
% 9.71/9.82     (P8(f10(a24,a24,a23),f10(a25,a25,a23),a23)),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,251,303,292,298,262,301,2314,2325,263,277,2079,271,270,286,281,2342,98,100,147,149,167,195,205,209,274,172,173,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,2534,2556,2565,2568,2621,299,2191,121,123,176,192,230,233,234,265,2340,266,279,288,2539,160,164,189,194,125,126,129,169,229,268,128,201,175,193,107,168,154,159,166,260,267,124,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,177,127,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1772,1768,1211,1800,1657,1669,1562,1086,2373,1592,1560,1078,1084,1322,1286,1290,1754,1927,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,2077,1141,1738,1802,1388,1860,1676,1025,1614,1844,1145,1074,1203,1205,1386,1213,1072,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1752,1907,1093,2192,2282,2337,2622,1718,2446,2620,1722,2222,1725,1390,1096,2145,1098,1170,1173,2334,2351,1176,1124,1788,1618,2382,1160,1793,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,2531,2588,2590,1318,1320,2170,2233,1575,1667,1905,1376,1393,2490,1702,1197,1795,1215,1231,1824,1135,1028,1919,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469,542,477,475,383,781,650,470,510,492,651,836,540,388,397,25,41,38,37,3,36,1967,1965,329,832,632,849,843,835,913,368,866,620,380,831,688,739,737,846,845,600,735,572,740,528,428,422,489,599,316,930,686,483,471,493,734,761,749,407,844,709,462,757,476,862])).
% 9.71/9.82  cnf(2691,plain,
% 9.71/9.82     (~P18(f5(f6(a12,x26911,a12),x26911,a12))),
% 9.71/9.82     inference(scs_inference,[],[305,105,110,112,115,130,134,139,143,152,156,158,170,179,183,186,197,207,211,213,217,221,224,227,228,231,235,239,242,245,250,251,303,292,298,262,301,2314,2325,263,277,2079,271,270,286,281,2342,98,100,147,149,167,195,205,209,274,172,173,255,2096,2173,2188,2195,2236,2242,2285,2298,2309,2315,2322,2402,2418,2443,2452,2455,2493,2500,2534,2556,2565,2568,2621,299,2191,121,123,176,192,230,233,234,265,2340,2586,266,279,288,2539,160,164,189,194,125,126,129,169,229,268,128,201,175,193,107,168,154,159,166,260,267,124,162,103,96,180,165,97,191,254,188,283,304,104,174,200,300,171,258,177,127,106,153,102,257,150,151,992,1030,1604,988,1012,990,998,1762,1611,1854,1606,1009,1772,1768,1211,1800,1657,1669,1562,1086,2373,1592,1560,1078,1084,1322,1286,1290,1754,1927,1692,1977,1979,1981,1983,1985,1987,1989,1991,1993,1995,1997,1999,2001,2003,2005,2007,2009,2011,2013,2015,2017,2019,2021,2023,2025,2027,2029,2031,2033,2035,2037,2039,2041,2043,2045,2047,2049,2051,2053,2055,2057,2059,2061,2063,2065,2067,2069,2071,2073,2075,2077,2584,1141,1738,1802,1388,1860,1676,1025,1614,1844,1145,1074,1203,1205,1386,1213,1072,974,996,1273,2084,2087,1638,1955,1846,1646,1708,1158,1034,1760,1220,1752,1907,1093,2192,2282,2337,2622,1718,2446,2620,1722,2222,1725,1390,1096,2145,1098,1170,1173,2334,2351,1176,1124,1788,1618,2382,1160,1793,1620,2136,1316,2152,2155,2182,2185,2415,2437,2440,2528,2531,2588,2590,1318,1320,2170,2233,1575,1667,1905,1376,1393,2490,1702,1197,1795,1215,1231,1237,1824,1135,1028,1919,1558,92,91,90,89,88,87,86,85,84,82,81,80,79,78,77,76,75,74,73,72,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,40,39,35,566,481,830,828,356,327,412,833,577,558,373,605,459,457,377,375,324,472,623,621,494,597,513,387,732,820,963,933,932,532,525,326,614,797,796,778,736,573,378,752,743,675,619,618,763,793,699,694,668,685,834,410,579,451,411,609,456,455,374,708,707,512,544,615,531,530,733,570,676,648,644,643,634,664,738,454,448,418,417,607,606,769,768,627,624,536,520,529,527,403,402,861,381,608,537,962,491,657,639,490,545,960,653,646,684,568,754,839,692,2,24,21,406,959,556,43,42,516,439,814,622,575,359,603,602,480,446,553,809,808,702,818,817,967,966,965,526,571,753,750,741,782,780,779,706,705,674,662,661,659,656,604,943,942,617,762,789,787,701,698,695,564,683,682,863,848,837,842,841,840,838,612,576,578,458,508,964,961,658,647,642,641,616,791,687,453,450,394,626,625,506,474,760,755,649,638,811,810,669,666,565,557,469,542,477,475,383,781,650,470,510,492,651,836,540,388,397,25,41,38,37,3,36,1967,1965,329,832,632,849,843,835,913,368,866,620,380,831,688,739,737,846,845,600,735,572,740,528,428,422,489,599,316,930,686,483,471,493,734,761,749,407,844,709,462,757,476,862,478,93,71])).
% 9.71/9.82  cnf(2713,plain,
% 9.71/9.82     (P8(f5(f3(a12),f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12),f3(a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[256,102,150,2287,1228,2475,1320,894,678])).
% 9.71/9.82  cnf(2714,plain,
% 9.71/9.82     (P8(f3(a12),f10(x27141,x27141,a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[1320])).
% 9.71/9.82  cnf(2720,plain,
% 9.71/9.82     (~E(f5(f4(f3(a12),a12),f5(x27201,a19,a12),a12),x27201)),
% 9.71/9.82     inference(rename_variables,[],[2366])).
% 9.71/9.82  cnf(2722,plain,
% 9.71/9.82     (~E(f5(x27221,f10(f5(f4(f3(a12),a12),f5(f3(a13),a19,a12),a12),f11(x27222),a13),a13),f5(x27221,f10(f5(f4(f3(a12),a12),f5(f3(a13),a19,a12),a12),a1,a13),a13))),
% 9.71/9.82     inference(scs_inference,[],[296,128,125,103,256,102,150,2287,2366,2720,1228,2475,1573,1320,2714,894,678,677,855,795])).
% 9.71/9.82  cnf(2723,plain,
% 9.71/9.82     (~E(f5(f4(f3(a12),a12),f5(x27231,a19,a12),a12),x27231)),
% 9.71/9.82     inference(rename_variables,[],[2366])).
% 9.71/9.82  cnf(2725,plain,
% 9.71/9.82     (P7(f10(f3(a12),f3(a12),a12),f10(f7(a19,f17(f2(f11(a1)),a12),a12),f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[296,255,128,125,268,103,96,256,102,150,2287,2366,2720,1228,2475,1573,1320,2714,894,678,677,855,795,867])).
% 9.71/9.82  cnf(2726,plain,
% 9.71/9.82     (P8(x27261,x27261,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2728,plain,
% 9.71/9.82     (P7(f5(f6(f3(a12),a19,a12),f5(f10(f6(x27281,x27281,a12),x27282,a12),x27283,a12),a12),x27283,a12)),
% 9.71/9.82     inference(scs_inference,[],[296,255,128,125,268,103,96,256,171,102,150,2287,2366,2720,1228,2384,2475,1573,1320,2714,894,678,677,855,795,867,770])).
% 9.71/9.82  cnf(2734,plain,
% 9.71/9.82     (~P7(x27341,f10(f5(f3(a12),f7(x27341,f4(a19,a12),a12),a12),f4(a19,a12),a12),a12)),
% 9.71/9.82     inference(rename_variables,[],[1903])).
% 9.71/9.82  cnf(2741,plain,
% 9.71/9.82     (P8(x27411,f5(f6(f3(a13),f10(f3(a13),f3(a13),a13),a13),x27411,a13),a13)),
% 9.71/9.82     inference(rename_variables,[],[2389])).
% 9.71/9.82  cnf(2750,plain,
% 9.71/9.82     (~P7(f10(f3(a12),x27501,a12),f3(a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[101,296,98,255,301,128,125,268,103,96,97,254,283,256,171,102,151,150,2287,1959,2366,2720,2615,1129,2632,2686,2389,1903,1228,2384,2495,2475,2549,1573,2624,2525,2462,1320,2714,1919,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635])).
% 9.71/9.82  cnf(2754,plain,
% 9.71/9.82     (~P7(f3(a12),f10(f17(f2(f11(a1)),a12),a19,a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[101,296,98,255,301,128,125,268,103,96,97,254,283,256,171,102,151,150,2287,1959,2250,2366,2720,2615,1129,2632,2686,2389,1903,1228,2384,2495,2313,2475,2549,1573,2624,2525,2462,1000,1320,2714,1919,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645])).
% 9.71/9.82  cnf(2767,plain,
% 9.71/9.82     (P38(f5(f10(f6(x27671,x27671,a12),x27672,a12),a13,a12))),
% 9.71/9.82     inference(scs_inference,[],[133,208,222,243,247,101,170,211,228,296,98,148,255,167,301,128,125,178,268,103,96,97,254,283,256,171,102,151,150,2287,1959,2250,2647,2366,2720,2615,1129,2632,2686,2389,1903,1228,2384,2495,2313,2475,2549,1573,2624,2525,2462,1000,1692,1320,2714,1919,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67])).
% 9.71/9.82  cnf(2774,plain,
% 9.71/9.82     (E(x27741,f5(f10(f6(x27742,x27742,a12),x27743,a12),x27741,a12))),
% 9.71/9.82     inference(rename_variables,[],[2647])).
% 9.71/9.82  cnf(2777,plain,
% 9.71/9.82     (E(x27771,f5(f10(f6(x27772,x27772,a12),x27773,a12),x27771,a12))),
% 9.71/9.82     inference(rename_variables,[],[2647])).
% 9.71/9.82  cnf(2784,plain,
% 9.71/9.82     (~P8(f5(f5(f3(a12),f5(a19,x27841,a12),a12),f3(a12),a12),x27841,a12)),
% 9.71/9.82     inference(rename_variables,[],[2469])).
% 9.71/9.82  cnf(2790,plain,
% 9.71/9.82     (~P7(x27901,x27901,a12)),
% 9.71/9.82     inference(rename_variables,[],[299])).
% 9.71/9.82  cnf(2792,plain,
% 9.71/9.82     (P8(f5(x27921,f4(f4(x27922,f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12)),f5(x27921,x27922,f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12))),
% 9.71/9.82     inference(scs_inference,[],[133,208,222,225,243,247,101,269,112,158,170,211,228,231,296,98,148,255,299,167,301,204,128,209,109,125,108,178,105,268,103,152,96,165,107,97,254,283,256,171,102,151,150,2560,2091,2060,2287,1959,2250,2647,2774,2777,2366,2720,2615,1129,2632,1594,2686,2389,1903,1228,2469,2384,2495,2313,2475,2549,1573,2624,2525,2462,1000,1692,1320,2714,1919,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778])).
% 9.71/9.82  cnf(2793,plain,
% 9.71/9.82     (P8(x27931,x27931,f4(f4(a13,a12),a12))),
% 9.71/9.82     inference(rename_variables,[],[2091])).
% 9.71/9.82  cnf(2798,plain,
% 9.71/9.82     (P8(x27981,x27981,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2801,plain,
% 9.71/9.82     (E(f5(f5(f4(x28011,a12),x28012,a12),x28011,a12),x28012)),
% 9.71/9.82     inference(scs_inference,[],[133,208,222,225,243,247,101,269,112,158,170,211,223,228,231,296,98,148,255,2726,299,241,167,233,301,204,128,209,109,125,108,178,279,105,268,103,168,152,96,165,107,97,254,283,256,171,102,151,150,2560,2091,2060,2287,1959,2250,2647,2774,2777,2366,2720,1405,2615,1129,2632,1594,2686,2389,1903,1228,2469,2384,2495,2313,2475,2549,1573,2624,2525,2462,1000,1692,1320,2714,1919,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456])).
% 9.71/9.82  cnf(2804,plain,
% 9.71/9.82     (P7(f3(a13),f5(f10(f5(f4(f3(a12),a12),f5(f3(a13),a19,a12),a12),f5(f4(f3(a12),a12),f5(f3(a13),a19,a12),a12),a13),f10(x28041,x28041,a13),a13),a13)),
% 9.71/9.82     inference(scs_inference,[],[133,208,222,225,243,247,101,269,112,158,170,211,223,228,231,296,98,148,255,2726,299,241,167,233,301,204,128,209,109,125,108,178,279,105,268,103,168,152,96,165,107,97,254,283,256,171,102,151,150,2560,2091,2060,2287,1959,2250,2647,2774,2777,2366,2720,2723,1405,2615,1129,2632,1594,2686,2389,1903,1228,2469,2384,2495,2313,2475,2549,1573,2624,2525,2462,1000,1692,1320,2714,1919,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856])).
% 9.71/9.82  cnf(2805,plain,
% 9.71/9.82     (~E(f5(f4(f3(a12),a12),f5(x28051,a19,a12),a12),x28051)),
% 9.71/9.82     inference(rename_variables,[],[2366])).
% 9.71/9.82  cnf(2807,plain,
% 9.71/9.82     (P8(x28071,f4(f4(x28071,f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12))),
% 9.71/9.82     inference(scs_inference,[],[133,208,222,225,243,247,101,269,112,158,170,211,223,228,231,296,98,148,255,2726,299,241,167,233,301,204,128,209,109,125,108,178,279,105,268,103,168,152,96,165,107,97,254,283,256,171,102,151,150,2560,2091,2060,2287,1959,2250,2647,2774,2777,2366,2720,2723,1405,2615,1129,2632,1594,2686,2389,1903,1228,2469,2384,2495,2313,2475,2549,1573,2624,2525,2462,1000,1692,1320,2714,1919,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520])).
% 9.71/9.82  cnf(2808,plain,
% 9.71/9.82     (P8(f4(f4(x28081,f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12)),x28081,f4(f4(a13,a12),a12))),
% 9.71/9.82     inference(rename_variables,[],[2560])).
% 9.71/9.82  cnf(2813,plain,
% 9.71/9.82     (~P7(x28131,x28131,a12)),
% 9.71/9.82     inference(rename_variables,[],[299])).
% 9.71/9.82  cnf(2818,plain,
% 9.71/9.82     (P8(x28181,x28181,a12)),
% 9.71/9.82     inference(rename_variables,[],[255])).
% 9.71/9.82  cnf(2826,plain,
% 9.71/9.82     (~P8(f10(f4(a19,a12),f4(a19,a12),a12),f3(a12),a12)),
% 9.71/9.82     inference(scs_inference,[],[133,208,222,225,243,247,101,269,112,158,170,211,223,228,231,296,98,148,255,2726,2798,299,2790,241,167,233,301,204,128,209,109,125,108,178,279,105,268,103,168,260,152,96,165,107,97,162,200,254,104,283,256,171,102,151,150,2560,2091,2060,2287,1959,2250,2197,2647,2774,2777,2366,2720,2723,1405,2615,2617,1129,2632,1594,2686,2641,2389,1903,1228,2469,2384,2495,2313,2475,2549,1573,2624,2525,1698,2462,1000,1692,1320,2714,1919,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545])).
% 10.00/9.82  cnf(2832,plain,
% 10.00/9.82     (P8(x28321,f5(f6(f3(a13),f10(f3(a13),f3(a13),a13),a13),x28321,a13),a13)),
% 10.00/9.82     inference(rename_variables,[],[2389])).
% 10.00/9.82  cnf(2839,plain,
% 10.00/9.82     (~P8(f5(f5(a19,f5(f7(x28391,f17(f2(f11(a1)),a12),a12),f3(a12),a12),a12),f7(x28391,f17(f2(f11(a1)),a12),a12),a12),x28391,a12)),
% 10.00/9.82     inference(rename_variables,[],[2333])).
% 10.00/9.82  cnf(2840,plain,
% 10.00/9.82     (P8(f10(f6(x28401,x28401,a12),x28402,a12),f3(a12),a12)),
% 10.00/9.82     inference(rename_variables,[],[2562])).
% 10.00/9.82  cnf(2845,plain,
% 10.00/9.82     (P7(f16(x28451,a23),f18(f17(f2(f11(a1)),a12),x28451,a12),a12)),
% 10.00/9.82     inference(rename_variables,[],[272])).
% 10.00/9.82  cnf(2848,plain,
% 10.00/9.82     (~P7(f5(f17(f2(f2(f11(a1))),a12),x28481,a12),x28481,a12)),
% 10.00/9.82     inference(rename_variables,[],[1091])).
% 10.00/9.82  cnf(2858,plain,
% 10.00/9.82     (~P7(f10(x28581,x28582,a12),f10(f6(x28581,f6(x28583,x28583,a12),a12),x28582,a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[133,208,222,225,243,247,101,269,272,112,158,170,211,223,228,231,296,98,148,172,255,2726,2798,299,2790,181,241,164,167,194,233,301,204,128,209,109,125,192,108,178,279,105,268,103,168,260,152,96,165,107,97,162,200,254,104,258,283,256,171,102,151,150,2560,2091,2060,2287,1959,2250,2144,2197,2647,2774,2777,2366,2720,2723,2165,1405,2615,2617,1129,2632,1594,2686,2641,2389,2741,2832,1903,1091,2333,1228,2469,1720,2384,2495,2313,2475,2549,1573,2624,2525,2562,1698,2462,1000,1692,974,1320,2714,1919,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624])).
% 10.00/9.82  cnf(2860,plain,
% 10.00/9.82     (P7(f3(a12),f5(a19,f3(a12),a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[133,208,222,225,243,247,101,269,272,112,158,170,211,223,228,231,296,98,148,172,255,2726,2798,299,2790,181,241,164,167,194,233,301,204,128,209,109,125,192,108,178,279,105,268,103,168,260,152,96,191,165,107,97,162,200,254,104,258,283,256,171,102,151,150,2560,2091,2060,2287,1959,2250,2144,2197,2647,2774,2777,2366,2720,2723,2165,1405,2615,2617,1129,2632,1594,2686,2641,2389,2741,2832,1903,1091,2333,1228,2469,1088,1055,1720,2384,2495,2313,2475,2549,1573,2624,2525,2562,1698,2462,1000,1692,974,1320,2714,1919,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403])).
% 10.00/9.82  cnf(2863,plain,
% 10.00/9.82     (P7(f5(x28631,f15(x28632),a12),f5(x28631,f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[133,208,222,225,243,247,101,269,272,112,158,170,211,223,228,231,296,98,148,172,255,2726,2798,2818,299,2790,181,241,164,167,194,233,301,204,128,209,109,125,192,108,178,279,105,268,103,168,260,152,96,191,165,107,97,162,200,254,104,258,283,256,171,102,151,150,2560,2091,2060,2287,1959,2250,2144,2197,2647,2774,2777,2366,2720,2723,2165,1405,2615,2617,1129,2632,1594,2686,2641,2389,2741,2832,1903,1091,2333,1228,2469,1088,1055,1720,2384,2495,2313,2475,2549,1573,2624,2525,2562,1698,2462,1000,1692,974,1320,2714,1919,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735])).
% 10.00/9.82  cnf(2866,plain,
% 10.00/9.82     (P8(x28661,f5(f6(f3(a13),f10(f3(a13),f3(a13),a13),a13),x28661,a13),a13)),
% 10.00/9.82     inference(rename_variables,[],[2389])).
% 10.00/9.82  cnf(2882,plain,
% 10.00/9.82     (E(f5(f7(x28821,f17(f2(f11(a1)),a12),a12),f7(x28821,f17(f2(f11(a1)),a12),a12),a12),x28821)),
% 10.00/9.82     inference(rename_variables,[],[281])).
% 10.00/9.82  cnf(2884,plain,
% 10.00/9.82     (P7(f3(a12),f5(f7(a19,f17(f2(f11(a1)),a12),a12),f20(x28841),a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[133,208,222,225,243,247,101,269,272,285,112,158,170,211,223,228,231,296,281,98,148,172,255,2726,2798,2818,299,2790,181,241,164,167,194,195,233,189,301,204,128,209,109,125,192,108,178,279,105,268,103,168,260,152,96,191,165,107,97,162,200,254,104,258,283,256,171,102,151,150,2560,2091,2060,2287,1959,2250,2144,2197,2226,2647,2774,2777,2366,2720,2723,2165,1405,2615,2617,1129,2632,1594,2686,2641,2389,2741,2832,1903,1091,2333,2839,1228,2469,1088,1055,1720,2384,2495,2313,2475,2549,1152,1573,2624,2525,2562,1698,2462,1000,1692,974,1320,2714,1318,1919,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556])).
% 10.00/9.82  cnf(2904,plain,
% 10.00/9.82     (P5(f5(f10(f6(x29041,x29041,a12),x29042,a12),a13,a12))),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,285,112,158,170,182,211,223,228,231,236,296,281,2882,98,148,161,190,172,255,2726,2798,2818,299,2790,181,241,164,167,194,195,233,189,301,204,128,209,109,125,175,192,108,178,279,105,268,103,168,260,201,152,96,191,165,107,97,162,200,254,104,258,283,256,171,102,151,150,2560,2091,2060,2287,1959,2250,2144,2197,2226,2647,2774,2777,2366,2720,2723,2165,1405,2615,2617,1129,2632,2691,1594,2686,2641,2389,2741,2832,1903,1091,2333,2839,1228,2469,1088,1055,1720,2384,2495,2313,2475,2549,1152,1573,2624,2525,2562,1698,2462,1000,1692,974,1320,2714,1318,1919,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56])).
% 10.00/9.82  cnf(2909,plain,
% 10.00/9.82     (P8(f4(f10(x29091,x29091,a12),a12),f10(x29092,x29092,a12),a12)),
% 10.00/9.82     inference(rename_variables,[],[279])).
% 10.00/9.82  cnf(2916,plain,
% 10.00/9.82     (~E(f5(f4(f3(a12),a12),f5(x29161,a19,a12),a12),x29161)),
% 10.00/9.82     inference(rename_variables,[],[2366])).
% 10.00/9.82  cnf(2919,plain,
% 10.00/9.82     (~E(f5(f4(f3(a12),a12),f5(x29191,a19,a12),a12),x29191)),
% 10.00/9.82     inference(rename_variables,[],[2366])).
% 10.00/9.82  cnf(2921,plain,
% 10.00/9.82     (P8(f4(f4(f5(f4(x29211,f4(f4(a13,a12),a12)),x29211,f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12)),f3(f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12))),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,285,112,158,170,182,211,223,228,231,236,296,281,2882,98,148,161,190,172,255,2726,2798,2818,299,2790,181,241,164,167,194,195,233,189,120,301,204,128,209,109,125,175,192,108,178,279,105,268,103,168,260,201,152,96,191,165,107,97,162,200,254,104,258,283,256,171,102,151,150,2560,2808,2091,2317,2060,2020,2287,1959,2250,2144,2197,2226,1324,2647,2774,2777,2366,2720,2723,2805,2916,2165,1405,2615,1380,2617,1129,2632,2691,1594,2686,2641,2389,2741,2832,1903,1091,2333,2839,1228,2469,1088,1055,1720,2384,2495,2313,2475,2549,1152,1573,2624,2525,2562,1698,2462,1000,1692,974,1320,2714,1318,1919,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525])).
% 10.00/9.82  cnf(2922,plain,
% 10.00/9.82     (P8(f4(f4(x29221,f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12)),x29221,f4(f4(a13,a12),a12))),
% 10.00/9.82     inference(rename_variables,[],[2560])).
% 10.00/9.82  cnf(2924,plain,
% 10.00/9.82     (~E(f6(x29241,x29241,a12),f6(f15(x29242),f7(a19,f17(f2(f11(a1)),a12),a12),a12))),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,285,112,158,170,182,211,223,228,231,236,296,281,2882,98,148,161,190,172,255,2726,2798,2818,299,2790,2813,181,241,164,167,194,195,233,189,120,301,204,128,209,109,125,175,192,108,178,279,105,268,103,168,260,201,152,96,191,165,107,97,162,200,254,104,258,283,256,171,106,102,151,150,2560,2808,2091,2317,2060,2020,2287,1959,2250,2144,2197,2226,1324,2647,2774,2777,2366,2720,2723,2805,2916,2165,1405,2615,1380,2617,1129,2632,2691,1594,2686,2641,2389,2741,2832,1903,1091,2333,2839,1228,2469,1088,1055,1720,2384,2495,2313,2475,2549,1152,1573,2624,2525,2562,1698,2462,1000,1692,974,1320,2714,1318,1919,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573])).
% 10.00/9.82  cnf(2929,plain,
% 10.00/9.82     (P8(x29291,x29291,a12)),
% 10.00/9.82     inference(rename_variables,[],[255])).
% 10.00/9.82  cnf(2931,plain,
% 10.00/9.82     (P8(a19,f10(f17(f2(f11(a1)),a12),f17(f2(f11(a1)),a12),a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,285,112,158,170,182,211,223,228,231,236,296,281,2882,98,148,161,190,172,255,2726,2798,2818,299,2790,2813,181,241,164,167,194,195,233,189,120,301,204,128,209,109,125,175,192,108,178,279,2909,105,268,103,168,260,201,152,96,191,165,107,97,162,200,254,274,104,258,283,256,171,106,102,151,150,2560,2808,2091,2317,2060,2070,2020,2048,2287,2046,1959,2250,2144,2197,2226,1324,2647,2774,2777,2366,2720,2723,2805,2916,2165,1405,2615,1380,2617,1129,2632,2691,1594,2686,2641,2389,2741,2832,1903,1091,2333,2839,1228,2469,1088,1055,1720,2384,2495,2313,2475,2549,1152,1573,2624,2525,2562,1698,2462,1000,1740,1692,974,1320,2714,1318,1919,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787])).
% 10.00/9.82  cnf(2936,plain,
% 10.00/9.82     (~P7(x29361,x29361,a12)),
% 10.00/9.82     inference(rename_variables,[],[299])).
% 10.00/9.82  cnf(2941,plain,
% 10.00/9.82     (~P7(x29411,x29411,a12)),
% 10.00/9.82     inference(rename_variables,[],[299])).
% 10.00/9.82  cnf(2944,plain,
% 10.00/9.82     (P8(x29441,x29441,a12)),
% 10.00/9.82     inference(rename_variables,[],[255])).
% 10.00/9.82  cnf(2952,plain,
% 10.00/9.82     (P8(f4(f4(x29521,f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12)),x29521,f4(f4(a13,a12),a12))),
% 10.00/9.82     inference(rename_variables,[],[2560])).
% 10.00/9.82  cnf(2955,plain,
% 10.00/9.82     (~P7(x29551,x29551,a12)),
% 10.00/9.82     inference(rename_variables,[],[299])).
% 10.00/9.82  cnf(2966,plain,
% 10.00/9.82     (P7(f5(f6(f3(a12),a19,a12),f7(x29661,f3(a12),a12),a12),f3(a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,112,158,170,182,211,223,228,231,236,250,296,281,2882,98,148,161,190,173,172,255,2726,2798,2818,2929,299,2790,2813,2936,2941,2955,116,181,241,164,167,194,195,233,189,120,301,204,128,209,109,125,175,192,108,178,279,2909,105,268,103,168,260,201,152,96,191,165,107,97,162,200,254,274,104,258,188,283,256,171,106,102,151,150,2560,2808,2922,2091,2317,2060,2070,2020,2048,2287,2046,1959,2250,2144,2116,2197,2226,1324,2647,2774,2777,2366,2720,2723,2805,2916,2919,2165,1405,2615,976,1380,2617,1129,2632,2691,1594,2686,2641,2389,2741,2832,1903,2734,1091,2848,2333,2839,1228,2469,1088,1055,1720,2384,2495,2313,2475,2549,1152,1573,2624,2525,2562,1698,2462,2328,1000,1740,1692,974,1320,2714,1141,1318,1098,1919,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738])).
% 10.00/9.82  cnf(2967,plain,
% 10.00/9.82     (~P7(x29671,x29671,a12)),
% 10.00/9.82     inference(rename_variables,[],[299])).
% 10.00/9.82  cnf(2968,plain,
% 10.00/9.82     (P7(f5(f6(f3(a12),a19,a12),x29681,a12),x29681,a12)),
% 10.00/9.82     inference(rename_variables,[],[1098])).
% 10.00/9.82  cnf(2975,plain,
% 10.00/9.82     (P8(x29751,f5(f6(x29752,x29752,a12),x29751,a12),a12)),
% 10.00/9.82     inference(rename_variables,[],[1101])).
% 10.00/9.82  cnf(2985,plain,
% 10.00/9.82     (~P7(x29851,x29851,a12)),
% 10.00/9.82     inference(rename_variables,[],[299])).
% 10.00/9.82  cnf(2989,plain,
% 10.00/9.82     (~P8(x29891,f5(f6(f3(a12),f7(f10(f16(a24,a23),f10(f17(f2(f11(a1)),a12),a19,a12),a12),f16(a25,a23),a12),a12),x29891,a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,281,2882,98,148,161,190,173,172,255,2726,2798,2818,2929,299,2790,2813,2936,2941,2955,2967,116,181,241,266,164,167,194,195,233,189,120,301,204,128,209,109,125,175,192,108,178,279,2909,105,261,268,103,168,260,201,152,96,191,165,107,97,162,200,254,274,104,258,188,283,256,171,106,102,151,150,2560,2808,2922,2091,2317,2060,2070,2020,2048,2287,2046,1959,2224,2250,2144,2116,2197,2226,1324,2647,2774,2777,2366,2720,2723,2805,2916,2919,2165,1405,2615,976,1380,2617,1129,2632,2691,1594,2203,2686,2671,1101,2641,2389,2741,2832,1903,2734,1091,2848,2333,2839,1228,2469,1088,1055,1720,2384,2495,2313,2475,2549,1152,1573,2624,2525,2562,1698,2462,2328,1000,1740,1692,974,1320,2714,1028,1141,1318,1098,1919,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570])).
% 10.00/9.82  cnf(2997,plain,
% 10.00/9.82     (~P7(x29971,x29971,a12)),
% 10.00/9.82     inference(rename_variables,[],[299])).
% 10.00/9.82  cnf(3005,plain,
% 10.00/9.82     (~P8(f5(f17(f2(f2(f11(a1))),a12),f7(f10(x30051,a19,a12),a19,a12),a12),x30051,a12)),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,281,2882,98,148,161,190,173,172,255,2726,2798,2818,2929,299,2790,2813,2936,2941,2955,2967,2985,116,181,241,266,164,167,194,195,233,189,120,301,204,128,209,109,125,175,192,108,178,279,2909,105,261,268,103,168,260,267,201,152,96,191,165,107,97,162,200,254,274,104,258,188,283,256,171,106,102,257,151,150,2560,2808,2922,2091,2317,2060,2070,2020,2048,2287,2046,1959,2224,2250,2144,2116,2197,2226,1324,2647,2774,2777,2366,2720,2723,2805,2916,2919,2165,1405,2615,976,1380,2617,1129,2632,2691,1594,2203,2686,2671,1101,2975,2641,2389,2741,2832,1903,2734,1091,2848,2333,2839,1228,2469,1088,1055,1127,1720,2384,2495,2313,2475,2549,1152,1573,2624,2525,2562,1698,2462,2328,1000,1740,1692,974,1320,2714,1028,1141,1318,1098,1919,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707])).
% 10.00/9.82  cnf(3008,plain,
% 10.00/9.82     (~P8(f3(a12),f4(a19,a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,281,2882,98,148,161,190,173,172,255,2726,2798,2818,2929,299,2790,2813,2936,2941,2955,2967,2985,116,181,241,266,164,167,194,195,233,189,120,301,204,128,209,109,125,175,192,108,178,279,2909,105,261,268,103,168,260,267,201,152,96,191,165,107,97,162,200,254,274,104,258,188,283,256,171,106,102,257,151,150,2560,2808,2922,2091,2317,2060,2070,2020,2048,2287,2046,1959,2224,2250,2144,2116,2197,2226,1324,2647,2774,2777,2366,2720,2723,2805,2916,2919,2165,1405,2615,976,1380,2617,1129,2632,2691,1594,2203,2686,2671,1101,2975,2641,2389,2741,2832,1903,2734,1091,2848,2333,2839,1228,2469,1088,1055,1127,1720,2384,2495,2313,2489,2475,2549,1152,1573,2624,2525,2562,1698,2462,2328,1000,1740,1692,974,1320,2714,1028,1141,1318,1098,1919,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477])).
% 10.00/9.82  cnf(3011,plain,
% 10.00/9.82     (~P7(x30111,x30111,a12)),
% 10.00/9.82     inference(rename_variables,[],[299])).
% 10.00/9.82  cnf(3018,plain,
% 10.00/9.82     (~P8(f10(f16(a24,a23),f10(f17(f2(f11(a1)),a12),a19,a12),a12),f3(a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,281,2882,98,148,161,190,173,172,255,2726,2798,2818,2929,299,2790,2813,2936,2941,2955,2967,2985,2997,116,181,241,266,164,167,194,195,233,189,120,301,100,204,128,209,109,125,175,192,108,178,279,2909,105,261,268,103,168,260,267,201,152,96,191,165,107,97,162,200,254,274,104,258,188,283,256,171,106,102,257,151,150,2560,2808,2922,2091,2317,2060,2070,2020,2048,2287,2046,1959,2224,2250,2144,2116,2197,2226,1324,2647,2774,2777,2366,2720,2723,2805,2916,2919,2165,1405,2615,976,1380,2083,2617,1129,2632,2691,1594,2203,2686,2671,1101,2975,2641,1909,2389,2741,2832,1903,2734,1091,2848,2333,2839,1228,2469,1088,1055,1127,1720,2384,2495,2313,2489,2475,2549,1152,1573,2624,2525,2562,1698,2462,2328,1000,1740,1692,974,1320,2714,1028,1141,1318,1098,1919,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657])).
% 10.00/9.82  cnf(3021,plain,
% 10.00/9.82     (P7(f5(x30211,f21(x30212),a12),f5(x30211,f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12)),
% 10.00/9.82     inference(rename_variables,[],[2510])).
% 10.00/9.82  cnf(3024,plain,
% 10.00/9.82     (~P8(f5(f5(f3(a12),f5(a19,x30241,a12),a12),f3(a12),a12),x30241,a12)),
% 10.00/9.82     inference(rename_variables,[],[2469])).
% 10.00/9.82  cnf(3033,plain,
% 10.00/9.82     (~P7(f10(x30331,x30331,a12),f3(a12),a12)),
% 10.00/9.82     inference(rename_variables,[],[1316])).
% 10.00/9.82  cnf(3035,plain,
% 10.00/9.82     (P8(f3(a13),f5(f5(f6(f3(a13),f10(f3(a13),f3(a13),a13),a13),f3(a13),a13),f5(f6(f3(a13),f10(f3(a13),f3(a13),a13),a13),f3(a13),a13),a13),a13)),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,281,2882,98,148,161,190,173,172,255,2726,2798,2818,2929,2944,299,2790,2813,2936,2941,2955,2967,2985,2997,116,181,241,266,164,167,194,195,233,189,120,301,100,204,128,209,109,125,175,192,108,178,279,2909,105,261,268,103,168,260,267,201,152,96,191,165,107,97,162,200,254,274,104,258,188,283,256,171,106,102,257,151,150,2560,2808,2922,2091,2317,2060,2070,2020,2048,2287,2046,1959,2224,2250,2144,2116,2197,2226,1324,2647,2774,2777,2366,2720,2723,2805,2916,2919,2165,1405,2615,976,1380,2083,2617,2149,1129,2632,2691,1594,2203,2686,2574,2671,1101,2975,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,2333,2839,1228,2469,2784,1088,2510,1055,1127,1720,2384,2495,2313,2489,2475,2549,1152,1573,2624,2525,2562,1698,2462,2328,1000,1740,1692,974,1316,1320,2714,1028,1141,1318,1098,1919,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639])).
% 10.00/9.82  cnf(3053,plain,
% 10.00/9.82     (P8(f5(f10(f6(x30531,x30531,a13),x30532,a13),f10(f3(a13),f3(a13),a13),a13),f10(f3(a13),f3(a13),a13),a13)),
% 10.00/9.82     inference(rename_variables,[],[2293])).
% 10.00/9.82  cnf(3056,plain,
% 10.00/9.82     (P8(f10(f6(x30561,x30561,a12),x30562,a12),f4(f3(a12),a12),a12)),
% 10.00/9.82     inference(rename_variables,[],[2221])).
% 10.00/9.82  cnf(3058,plain,
% 10.00/9.82     (P8(f10(f5(f6(f3(a13),f10(f3(a13),f3(a13),a13),a13),f3(a13),a13),f5(f3(a13),f3(a13),a13),a13),f3(a13),a13)),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,281,2882,98,148,161,190,173,172,255,2726,2798,2818,2929,2944,299,2790,2813,2936,2941,2955,2967,2985,2997,116,181,241,266,164,167,194,195,233,189,120,301,100,204,128,209,109,125,175,192,108,178,279,2909,105,261,268,103,168,260,267,201,152,96,191,165,107,97,162,200,254,274,104,258,294,188,283,256,171,106,102,257,151,150,2560,2808,2922,2091,2317,2060,2070,2020,2048,2287,2046,1959,2224,2250,2144,2116,2197,2226,1324,2647,2774,2777,2366,2720,2723,2805,2916,2919,2165,1405,2615,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,2203,2514,2686,2574,2248,2671,1101,2975,2221,2293,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,2333,2839,1228,2469,2784,1088,2510,1055,1127,1720,2384,2495,2313,2489,2475,2549,1152,1573,2624,2525,2562,1698,2462,1460,2328,1000,1740,1692,974,1316,1320,2714,1028,1141,1318,1098,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653])).
% 10.00/9.82  cnf(3060,plain,
% 10.00/9.82     (P8(f10(f5(f3(a13),f3(a13),a13),f5(f6(f3(a13),f10(f3(a13),f3(a13),a13),a13),f3(a13),a13),a13),f3(a13),a13)),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,281,2882,98,148,161,190,173,172,255,2726,2798,2818,2929,2944,299,2790,2813,2936,2941,2955,2967,2985,2997,116,181,241,266,164,167,194,195,233,189,120,301,100,204,128,209,109,125,175,192,108,178,279,2909,105,261,268,103,168,260,267,201,152,96,191,165,107,97,162,200,254,274,104,258,294,188,283,256,171,106,102,257,151,150,2560,2808,2922,2091,2317,2060,2070,2020,2048,2287,2046,1959,2224,2250,2144,2116,2197,2226,1324,2647,2774,2777,2366,2720,2723,2805,2916,2919,2165,1405,2615,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,2203,2514,2686,2574,2248,2671,1101,2975,2221,2293,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,2333,2839,1228,2469,2784,1088,2510,1055,1127,1720,2384,2495,2313,2489,2475,2549,1152,1573,2624,2525,2562,1698,2462,1460,2328,1000,1740,1692,974,1316,1320,2714,1028,1141,1318,1098,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651])).
% 10.00/9.82  cnf(3069,plain,
% 10.00/9.82     (~P7(x30691,x30691,a12)),
% 10.00/9.82     inference(rename_variables,[],[299])).
% 10.00/9.82  cnf(3071,plain,
% 10.00/9.82     (~P7(f7(f10(f5(f3(a12),x30711,a12),f4(a19,a12),a12),f4(a19,a12),a12),x30711,a12)),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,281,2882,98,148,161,190,173,172,255,2726,2798,2818,2929,2944,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,116,181,241,266,164,167,194,195,233,189,120,301,100,204,128,209,109,125,175,192,108,178,279,2909,105,261,268,103,168,260,267,201,152,96,191,165,107,97,162,200,254,274,104,258,294,188,283,256,171,106,102,257,151,150,2560,2808,2922,2952,2091,2793,2317,2068,2060,2070,2020,2048,2287,2046,1959,2224,2250,2144,2116,2197,2226,1324,2647,2774,2777,2366,2720,2723,2805,2916,2919,2165,1405,2615,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,2203,2514,2686,2574,2248,2671,1101,2975,2221,2293,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,2333,2839,1228,2469,2784,1088,2510,1055,1127,1720,2384,2495,2313,2489,2475,2549,1152,1573,2624,2525,2562,1698,2462,1460,2328,1000,1740,1692,974,1316,1320,2714,1028,1141,1318,1098,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627])).
% 10.00/9.82  cnf(3073,plain,
% 10.00/9.82     (~P8(f4(f4(f3(a12),a12),a12),f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,281,2882,98,148,161,190,173,172,255,2726,2798,2818,2929,2944,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,116,181,241,266,164,167,194,195,233,189,120,301,100,204,128,209,109,125,175,192,108,178,279,2909,105,261,268,103,168,260,267,201,152,96,191,165,107,97,162,200,254,274,104,258,294,188,283,256,171,106,102,257,151,150,2560,2808,2922,2952,2091,2793,2317,2068,2060,2070,2020,2048,2287,2046,1959,2224,2250,2144,2116,2197,2226,1324,2647,2774,2777,2366,2720,2723,2805,2916,2919,2165,1405,2615,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,2203,2514,2686,2272,2574,2248,2671,1101,2975,2221,2293,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,2333,2839,1228,2469,2784,1088,2510,1055,1127,1720,2384,2495,2313,2489,2475,2549,1152,1573,2624,2525,2562,1698,2462,1460,2328,1000,1740,1692,974,1316,1320,2714,1028,1141,1318,1098,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510])).
% 10.00/9.82  cnf(3082,plain,
% 10.00/9.82     (~P7(x30821,f5(f10(f6(x30822,x30822,a13),x30823,a13),x30821,a13),a13)),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,116,181,241,266,164,167,194,195,233,189,120,301,100,204,128,209,109,125,175,192,108,178,279,2909,105,261,268,103,168,260,267,201,152,96,191,165,107,97,162,200,254,274,104,258,294,188,283,256,171,106,102,257,151,150,2560,2808,2922,2952,2091,2793,2317,2068,2060,2070,2020,2048,2287,2046,1959,2224,2250,2144,2116,2197,2226,1324,2647,2774,2777,2366,2720,2723,2805,2916,2919,2165,1405,2615,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,2203,2514,2686,2272,2574,2248,2671,1101,2975,2221,2293,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,2333,2839,1228,2469,2784,1088,2510,1055,1127,1720,2384,2495,2313,2489,2475,2549,1152,1573,2624,2525,2562,1698,2462,1460,2328,1000,1147,1740,1692,974,1316,1320,2714,1028,1141,1318,1098,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626])).
% 10.00/9.82  cnf(3087,plain,
% 10.00/9.82     (P8(f4(f10(x30871,x30871,a12),a12),f10(x30872,x30872,a12),a12)),
% 10.00/9.82     inference(rename_variables,[],[279])).
% 10.00/9.82  cnf(3092,plain,
% 10.00/9.82     (~P7(f4(f3(a13),a13),f3(a13),a13)),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,116,181,234,241,266,164,167,194,195,233,160,189,120,301,100,204,128,209,109,125,175,192,108,178,279,2909,105,261,268,103,168,260,267,201,152,96,191,165,107,97,162,200,254,274,104,258,294,188,283,256,171,106,102,257,151,150,2560,2808,2922,2952,2091,2793,2317,2068,2060,2070,2020,2048,2287,2046,1959,2224,2250,2144,2116,2197,2226,1324,2647,2774,2777,2366,2720,2723,2805,2916,2919,2165,1405,2615,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,2203,2514,2686,2272,2574,2248,2671,1101,2975,2221,2293,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,2333,2839,1228,2469,2784,1088,2510,1055,1127,1720,2384,2495,2313,2489,2475,2549,1152,1573,2624,2525,2562,1698,2462,1460,2100,2472,2328,1000,1147,1740,1692,974,1316,1320,2714,1028,1141,1318,1098,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626,634,862,394,490])).
% 10.00/9.82  cnf(3094,plain,
% 10.00/9.82     (P8(f4(f3(f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12)),f3(f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12))),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,116,181,234,241,266,164,167,194,195,233,160,189,120,301,100,204,128,209,109,125,175,192,108,178,279,2909,105,261,268,103,168,260,267,201,152,96,191,165,107,97,162,200,254,274,104,258,294,188,283,256,171,106,102,257,151,150,2560,2808,2922,2952,2091,2793,2317,2068,2060,2070,2020,2048,2287,2046,1959,2224,2250,2144,2116,2197,2226,1324,2647,2774,2777,2366,2720,2723,2805,2916,2919,2165,1405,2615,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,2203,2514,2686,2272,2574,2248,2671,1101,2975,2221,2293,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,2333,2839,1228,2469,2784,1088,2510,1055,1127,1720,2384,2495,2313,2489,2475,2549,1152,1573,2624,2525,2562,1698,2462,1460,2100,2472,2328,1000,1147,1740,1692,974,1316,1320,2714,1028,1141,1318,1098,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626,634,862,394,490,492])).
% 10.00/9.82  cnf(3098,plain,
% 10.00/9.82     (E(x30981,f7(f10(x30981,a19,a12),a19,a12))),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,116,181,234,241,266,164,167,194,195,233,160,189,120,301,100,204,128,209,109,125,175,192,108,178,279,2909,105,261,268,103,168,260,267,201,152,96,159,191,165,107,97,162,200,254,274,104,258,294,188,283,256,171,106,102,257,151,150,2560,2808,2922,2952,2091,2793,2317,2068,2060,2070,2020,2048,2287,2046,1959,2224,2250,2144,2116,2197,2226,1324,2647,2774,2777,2366,2720,2723,2805,2916,2919,2165,1405,2615,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,2203,2514,2686,2272,2574,2248,2671,1101,2975,2221,2293,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,2333,2839,1228,2469,2784,1088,2510,1055,1127,1179,2677,1720,2384,2495,2313,2489,2475,2549,2665,1152,1573,2624,2525,2562,1698,2462,1460,2100,2472,2328,1000,1147,1740,1692,974,1316,1320,2714,1028,1141,1318,1098,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626,634,862,394,490,492,602,402])).
% 10.00/9.82  cnf(3102,plain,
% 10.00/9.82     (P8(x31021,x31021,a12)),
% 10.00/9.82     inference(rename_variables,[],[255])).
% 10.00/9.82  cnf(3106,plain,
% 10.00/9.82     (~P7(x31061,x31061,a12)),
% 10.00/9.82     inference(rename_variables,[],[299])).
% 10.00/9.82  cnf(3110,plain,
% 10.00/9.82     (P8(f3(a23),f10(f10(f10(f3(a23),f3(a23),a23),f10(f3(a23),f3(a23),a23),a23),f10(f10(f3(a23),f3(a23),a23),f10(f3(a23),f3(a23),a23),a23),a23),a23)),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,3069,116,181,230,234,241,266,164,167,194,195,233,160,189,120,301,100,204,128,209,109,125,175,192,108,178,279,2909,105,261,268,103,168,260,267,201,152,96,159,191,165,107,97,162,200,254,274,104,258,294,188,283,256,171,106,102,257,151,150,2560,2808,2922,2952,2091,2793,2317,2607,2068,2060,2070,2028,2020,2048,2287,2046,1959,2224,2250,2144,2116,2197,2226,1324,2647,2774,2777,2366,2720,2723,2805,2916,2919,2165,1405,2615,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,2203,2514,2686,2272,2574,2248,2671,1101,2975,2221,2293,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,2333,2839,1228,2469,2784,1088,2510,1055,1127,1179,2677,1720,2384,2495,2313,2489,2475,2549,2665,1152,1573,2624,2578,2525,2562,1698,2462,1460,2100,2472,2328,1000,1147,1740,1692,974,1316,3033,1320,2714,1028,1141,1318,1098,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626,634,862,394,490,492,602,402,684,737,397,638])).
% 10.00/9.82  cnf(3112,plain,
% 10.00/9.82     (E(f6(f5(x31121,f3(a12),a12),f5(x31121,f4(x31122,a12),a12),a12),x31122)),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,3069,116,181,230,234,241,266,164,167,194,195,233,160,189,120,301,100,204,128,209,109,125,175,192,108,178,279,2909,105,261,268,103,168,260,267,201,152,96,159,191,165,107,97,162,200,254,274,104,258,294,188,283,256,171,106,102,257,151,150,2560,2808,2922,2952,2091,2793,2317,2607,2068,2060,2070,2028,2020,2048,2287,2046,1959,2224,2250,2144,2116,2197,2226,1324,2647,2774,2777,1057,2366,2720,2723,2805,2916,2919,2165,1405,2615,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,2203,2514,2686,2272,2574,2248,2671,1101,2975,2221,2293,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,2333,2839,1228,2469,2784,1088,2510,1055,1127,1179,2677,1720,2384,2495,2313,2489,2475,2549,2665,1152,1573,2624,2578,2525,2562,1698,2462,1460,2100,2472,2328,1000,1147,1740,1692,974,1316,3033,1320,2714,1028,1141,1318,1098,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626,634,862,394,490,492,602,402,684,737,397,638,406])).
% 10.00/9.82  cnf(3113,plain,
% 10.00/9.82     (E(f5(f6(f5(x31131,x31132,a12),f5(x31131,x31133,a12),a12),x31133,a12),x31132)),
% 10.00/9.82     inference(rename_variables,[],[1057])).
% 10.00/9.82  cnf(3115,plain,
% 10.00/9.82     (P8(x31151,f5(f6(f4(f3(a13),a13),f4(f4(f3(a13),a13),a13),a13),x31151,a13),a13)),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,3069,116,181,230,234,241,266,164,167,194,195,233,160,189,120,301,100,204,128,209,109,125,175,192,108,178,279,2909,105,261,268,103,168,260,267,201,152,96,159,191,165,107,97,162,200,254,274,104,258,294,188,283,256,171,106,102,257,151,150,2560,2808,2922,2952,2091,2793,2317,2607,2068,2060,2070,2028,2020,2048,2287,2046,1959,2224,2250,2144,2116,2197,2226,1324,2647,2774,2777,1057,2366,2720,2723,2805,2916,2919,2165,1405,2615,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,2203,2514,2686,2272,2574,2248,2671,1101,2975,2221,2293,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,2333,2839,1228,2469,2784,1088,2510,1055,1127,1179,2677,1720,2384,2495,2313,2489,2475,2549,2665,1152,1573,2624,2578,2525,2562,1698,2462,1460,2100,2472,2328,1000,1147,1740,1322,1692,974,1316,3033,1320,2714,1028,1141,1318,1098,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626,634,862,394,490,492,602,402,684,737,397,638,406,571])).
% 10.00/9.82  cnf(3118,plain,
% 10.00/9.82     (P8(f10(f4(f10(x31181,x31181,a12),a12),f3(a12),a12),f10(f10(x31182,x31182,a12),f3(a12),a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,3102,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,3069,116,181,226,230,234,241,266,164,167,194,195,233,160,189,120,301,100,204,128,209,109,125,175,192,108,178,279,2909,3087,105,261,268,103,168,260,267,201,152,96,159,191,165,107,97,162,200,254,274,104,258,294,188,283,256,171,106,102,257,151,150,2560,2808,2922,2952,2091,2793,2317,2607,2068,2060,2070,2028,2020,2048,2287,2046,1959,2224,2250,2144,2116,2197,2226,1324,2647,2774,2777,1057,2366,2720,2723,2805,2916,2919,2165,1405,2615,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,2203,2514,2686,2272,2574,2248,2671,1101,2975,2221,2293,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,2333,2839,1228,2469,2784,1088,2510,1055,1127,1179,2677,1720,2384,2495,2313,2489,2475,2549,2665,1152,1573,2624,2578,2525,2562,1698,2462,1460,2100,2472,2328,1000,1147,1740,1322,1692,974,1316,3033,1320,2714,1028,1141,1318,1098,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626,634,862,394,490,492,602,402,684,737,397,638,406,571,750])).
% 10.00/9.82  cnf(3119,plain,
% 10.00/9.82     (P8(x31191,x31191,a12)),
% 10.00/9.82     inference(rename_variables,[],[255])).
% 10.00/9.82  cnf(3121,plain,
% 10.00/9.82     (P8(f10(f10(x31211,x31211,a12),f3(a12),a12),f10(f4(f10(x31212,x31212,a12),a12),f3(a12),a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,3102,3119,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,3069,116,181,226,230,234,241,266,164,167,194,195,233,160,189,120,301,100,204,128,209,109,125,175,192,108,178,279,2909,3087,105,261,268,103,168,260,267,201,152,96,159,191,165,107,97,162,200,254,274,104,258,294,188,283,256,171,106,102,257,151,150,2560,2808,2922,2952,2091,2793,2317,2607,2068,2060,2070,2028,2020,2048,2287,2046,1959,2224,2250,2144,2116,2197,2226,1324,2647,2774,2777,1057,2366,2720,2723,2805,2916,2919,2165,1405,2615,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,2203,2514,2686,2272,2574,2248,2671,1101,2975,2221,2293,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,2333,2839,1228,2469,2784,1088,2510,1055,1127,1179,2677,1720,2384,2495,2313,2489,2475,2549,2665,1152,1573,2624,2578,2525,2562,1698,2462,1460,2100,2472,2328,1000,1147,1740,1322,1692,974,1316,3033,1320,2714,1028,1141,1318,1098,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626,634,862,394,490,492,602,402,684,737,397,638,406,571,750,741])).
% 10.00/9.82  cnf(3122,plain,
% 10.00/9.82     (P8(x31221,x31221,a12)),
% 10.00/9.82     inference(rename_variables,[],[255])).
% 10.00/9.82  cnf(3124,plain,
% 10.00/9.82     (~P7(f3(a12),f16(a24,a23),a12)),
% 10.00/9.82     inference(scs_inference,[],[117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,3102,3119,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,3069,116,181,226,230,234,241,266,164,167,194,195,233,160,189,120,301,100,204,128,209,109,125,175,192,108,178,279,2909,3087,105,261,268,103,168,260,267,201,152,96,159,191,165,107,97,162,200,254,274,104,258,294,188,283,256,171,106,102,257,151,150,2560,2808,2922,2952,2091,2793,2317,2607,2068,2060,2070,2028,2020,2048,2287,2046,1959,2224,2250,2144,2116,2197,2226,1324,2647,2774,2777,1057,2366,2720,2723,2805,2916,2919,2165,1405,2615,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,2203,2514,2686,2272,2574,2248,2671,1101,2975,2221,2293,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,2333,2839,1228,2469,2784,1088,2510,1055,1127,1179,2677,1720,2384,2495,2313,2489,2324,2475,2549,2665,1152,1573,2624,2578,2525,2562,1698,2462,1460,2100,2472,2328,1000,1147,1740,1322,1692,974,1316,3033,1320,2714,1028,1141,1318,1098,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626,634,862,394,490,492,602,402,684,737,397,638,406,571,750,741,705])).
% 10.00/9.82  cnf(3129,plain,
% 10.00/9.82     (P8(f3(a12),f7(f4(f3(a12),a12),x31291,a12),a12)),
% 10.00/9.82     inference(rename_variables,[],[2258])).
% 10.00/9.82  cnf(3131,plain,
% 10.00/9.82     (E(f5(x31311,a1,x31312),f5(x31311,f2(a1),x31312))),
% 10.00/9.82     inference(scs_inference,[],[971,117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,3102,3119,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,3069,116,181,226,230,234,241,266,164,167,194,195,233,160,189,120,301,100,204,128,209,109,125,175,192,108,178,279,2909,3087,105,261,268,103,168,260,267,201,152,96,159,191,165,107,97,162,200,254,274,104,258,294,188,283,256,171,106,102,257,151,150,2560,2808,2922,2952,2091,2793,2317,2607,2068,2060,2070,2028,2020,2048,2287,2046,1959,2224,2250,2144,2116,2197,2226,1324,2647,2774,2777,1057,2366,2720,2723,2805,2916,2919,2165,1405,2615,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,2203,2514,2686,2272,2574,2248,2671,1101,2975,2221,2293,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,2333,2839,1228,2469,2784,1088,2510,1055,1127,1179,2677,1720,2384,2495,2313,2489,2324,2475,2549,2665,1152,1573,2258,2624,2578,2525,2562,1698,2462,1460,2100,2472,2328,1000,1147,1740,1322,1692,974,1316,3033,1320,2714,1028,1141,1318,1098,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626,634,862,394,490,492,602,402,684,737,397,638,406,571,750,741,705,930,838,21])).
% 10.00/9.82  cnf(3133,plain,
% 10.00/9.82     (P8(x31331,x31331,a12)),
% 10.00/9.82     inference(rename_variables,[],[255])).
% 10.00/9.82  cnf(3136,plain,
% 10.00/9.82     (~P8(f5(f5(f3(a12),f5(a19,x31361,a12),a12),f3(a12),a12),x31361,a12)),
% 10.00/9.82     inference(rename_variables,[],[2469])).
% 10.00/9.82  cnf(3138,plain,
% 10.00/9.82     (~P7(x31381,x31381,a12)),
% 10.00/9.82     inference(rename_variables,[],[299])).
% 10.00/9.82  cnf(3142,plain,
% 10.00/9.82     (E(f6(f5(x31421,f5(x31422,x31423,a12),a12),f5(x31421,x31423,a12),a12),x31422)),
% 10.00/9.82     inference(scs_inference,[],[971,117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,3102,3119,3122,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,3069,3106,116,181,226,230,234,241,266,164,167,194,195,233,160,189,120,301,100,204,128,209,109,125,175,229,192,108,178,279,2909,3087,105,261,268,103,168,260,267,201,152,96,159,191,165,107,97,162,200,254,274,104,258,294,188,283,256,171,106,102,257,151,150,2560,2808,2922,2952,2091,2793,2317,2607,2068,2060,2070,2028,2020,2048,2287,2046,1959,2224,2250,2144,2116,2197,2226,1324,2647,2774,2777,1057,3113,2366,2720,2723,2805,2916,2919,2165,1405,2615,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,2203,2514,2686,2272,2574,2248,2671,1101,2975,2221,2293,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,2333,2839,1228,2469,2784,3024,1088,2510,1055,1127,1179,2677,1720,2384,2495,2313,2489,2324,2475,2549,2665,1152,1573,2258,2624,2578,2525,2562,1698,2462,1460,2100,2472,2328,1000,1147,1740,1322,1692,974,1316,3033,1320,2714,1028,1141,1318,1098,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626,634,862,394,490,492,602,402,684,737,397,638,406,571,750,741,705,930,838,21,656,682,576,458])).
% 10.00/9.82  cnf(3146,plain,
% 10.00/9.82     (P8(f4(f4(x31461,f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12)),x31461,f4(f4(a13,a12),a12))),
% 10.00/9.82     inference(rename_variables,[],[2560])).
% 10.00/9.82  cnf(3150,plain,
% 10.00/9.82     (P8(f10(f3(a12),f17(f2(f11(a1)),a12),a12),f10(f3(a12),a19,a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[971,117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,3102,3119,3122,3133,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,3069,3106,116,181,207,226,230,234,241,266,164,167,194,195,233,160,189,120,301,100,204,128,209,109,125,175,229,192,108,178,279,2909,3087,105,261,268,103,168,260,267,201,152,96,159,191,165,107,97,162,200,254,274,104,258,294,188,283,256,171,106,102,257,151,150,2560,2808,2922,2952,2091,2793,2317,2607,2068,2060,2070,2028,2020,2048,2287,2046,2609,1959,2224,2250,2144,2116,2197,2226,2002,1324,2647,2774,2777,1057,3113,2366,2720,2723,2805,2916,2919,2165,1405,2615,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,2203,2514,2686,2272,2574,2248,2671,1101,2975,2221,2293,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,2333,2839,1228,2469,2784,3024,1088,2510,1055,1127,1179,2677,1720,2384,2495,2313,2489,2324,2475,2549,2665,1152,1573,2258,2624,2578,2525,2562,1698,2462,1460,2100,2472,2328,1000,1147,1740,1322,1692,974,1316,3033,1320,2714,1028,1141,1318,1098,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626,634,862,394,490,492,602,402,684,737,397,638,406,571,750,741,705,930,838,21,656,682,576,458,462,760,753])).
% 10.00/9.82  cnf(3151,plain,
% 10.00/9.82     (P8(x31511,x31511,a12)),
% 10.00/9.82     inference(rename_variables,[],[255])).
% 10.00/9.82  cnf(3165,plain,
% 10.00/9.82     (P8(f5(f10(f6(x31651,x31651,a13),x31652,a13),f10(f3(a13),f3(a13),a13),a13),f4(f10(f3(a13),f3(a13),a13),a13),a13)),
% 10.00/9.82     inference(scs_inference,[],[971,117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,259,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,3102,3119,3122,3133,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,3069,3106,116,181,207,226,230,234,241,266,164,167,194,195,233,160,189,120,301,100,204,128,209,109,125,175,229,192,108,178,279,2909,3087,105,261,268,103,168,260,267,201,152,288,96,159,191,165,107,97,162,200,254,274,104,258,294,188,283,256,171,106,102,257,151,150,2560,2808,2922,2952,2091,2793,2317,2607,2068,2060,2070,2028,2020,2048,2287,2046,2609,1959,2224,2250,2144,2116,2197,2226,2002,1324,2647,2774,2777,1057,3113,2366,2720,2723,2805,2916,2919,2165,1405,2615,2543,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,2203,2514,2686,2272,2574,1372,2248,2671,1101,2975,2221,2293,3053,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,2333,2839,1228,2469,2784,3024,1088,2510,1055,1127,1179,2677,1720,2384,2359,2495,2313,2489,2324,2475,2549,2665,1152,1573,2258,2624,2578,2525,2562,1698,2462,1460,2100,2472,2328,1000,1147,1740,1322,1692,974,1316,3033,1320,2714,1028,1141,1318,1098,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626,634,862,394,490,492,602,402,684,737,397,638,406,571,750,741,705,930,838,21,656,682,576,458,462,760,753,641,617,565,612,506,526])).
% 10.00/9.82  cnf(3184,plain,
% 10.00/9.82     (P8(x31841,x31841,a12)),
% 10.00/9.82     inference(rename_variables,[],[255])).
% 10.00/9.82  cnf(3186,plain,
% 10.00/9.82     (P8(x31861,x31861,a12)),
% 10.00/9.82     inference(rename_variables,[],[255])).
% 10.00/9.82  cnf(3189,plain,
% 10.00/9.82     (~P7(x31891,x31891,a12)),
% 10.00/9.82     inference(rename_variables,[],[299])).
% 10.00/9.82  cnf(3200,plain,
% 10.00/9.82     (~P8(f7(f4(a19,a12),f4(a19,a12),a12),f3(a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[95,971,117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,253,276,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,262,259,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,3102,3119,3122,3133,3151,3184,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,3069,3106,3138,116,181,207,226,230,234,241,266,164,167,194,195,233,160,189,120,301,100,204,128,209,109,125,175,229,192,108,178,279,2909,3087,105,261,268,103,168,260,267,201,152,288,96,159,191,165,107,97,162,200,254,274,104,258,294,188,283,256,171,106,102,257,151,150,2560,2808,2922,2952,3146,2091,2793,2317,2607,2068,2060,2070,2028,2020,2048,2287,2046,2609,1959,2224,2250,2144,2116,2197,2226,2002,1324,2647,2774,2777,1057,3113,2366,2720,2723,2805,2916,2919,2165,1405,2615,2543,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,1957,2203,2514,2686,2272,2574,1372,2248,2671,1101,2975,2221,2293,3053,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,2333,2839,1228,2469,2784,3024,1088,2510,3021,1055,1127,1179,2677,1720,2384,2359,2495,2313,2489,2324,2475,2549,2665,1152,1573,2258,2624,2578,2525,2562,1698,2462,1460,2100,2472,2328,1000,1147,1931,1740,1322,1692,974,1316,3033,1320,2714,1028,1141,1318,1098,2968,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626,634,862,394,490,492,602,402,684,737,397,638,406,571,750,741,705,930,838,21,656,682,576,458,462,760,753,641,617,565,612,506,526,474,755,557,709,965,780,2,24,43,42,41,25,36,38,37,3,751,742,700])).
% 10.00/9.82  cnf(3216,plain,
% 10.00/9.82     (~P7(f10(f5(f4(f3(a12),a12),f5(f3(a13),a19,a12),a12),f5(f4(f3(a12),a12),f5(f3(a13),a19,a12),a12),a13),f3(a13),a13)),
% 10.00/9.82     inference(scs_inference,[],[95,971,117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,253,276,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,262,259,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,3102,3119,3122,3133,3151,3184,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,3069,3106,3138,116,181,207,226,230,234,241,266,164,167,194,195,233,160,189,120,301,100,204,128,209,109,125,175,229,192,108,178,279,2909,3087,105,261,268,103,168,260,267,201,152,288,96,159,191,165,107,97,162,200,254,274,104,258,294,188,283,256,171,106,102,257,151,150,2560,2808,2922,2952,3146,2091,2793,2317,2607,2074,2068,2042,2060,2070,2028,2020,2048,2287,2046,2609,1959,2224,2250,2144,2116,2197,2226,2002,1324,2647,2774,2777,1057,3113,2366,2720,2723,2805,2916,2919,2165,1405,2615,2543,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,1957,2203,2514,2686,2272,2574,1372,2248,2671,1101,2975,2221,2293,3053,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,1901,2333,2839,1228,2469,2784,3024,1088,2510,3021,1055,1127,1179,2677,1720,2384,2359,2495,2313,2489,2324,2475,2549,2665,1152,1573,2258,2624,2578,2525,2562,1698,2462,1460,2100,2472,2328,1000,1147,1931,1740,1322,1692,974,1316,3033,1320,2714,1028,1141,1318,1098,2968,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626,634,862,394,490,492,602,402,684,737,397,638,406,571,750,741,705,930,838,21,656,682,576,458,462,760,753,641,617,565,612,506,526,474,755,557,709,965,780,2,24,43,42,41,25,36,38,37,3,751,742,700,681,630,637,468,495,598,547])).
% 10.00/9.82  cnf(3218,plain,
% 10.00/9.82     (P8(f3(a12),f5(f5(f3(a12),f5(a19,f3(a12),a12),a12),f3(a12),a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[95,971,117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,253,276,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,262,259,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,3102,3119,3122,3133,3151,3184,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,3069,3106,3138,116,181,207,226,230,234,241,266,164,167,194,195,233,160,189,120,301,100,204,128,209,109,125,175,229,192,108,178,279,2909,3087,105,261,268,103,168,260,267,201,152,288,96,159,191,165,107,97,162,200,254,274,104,258,294,188,283,256,171,106,102,257,151,150,2560,2808,2922,2952,3146,2091,2793,2317,2607,2074,2068,2042,2060,2070,2028,2020,2048,2287,2046,2609,1959,2224,2250,2144,2116,2197,2226,2002,1324,2647,2774,2777,1057,3113,2366,2720,2723,2805,2916,2919,2165,1405,2615,2543,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,1957,2203,2514,2686,2272,2574,1372,2248,2671,1101,2975,2221,2293,3053,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,1901,2333,2839,1228,2469,2784,3024,3136,1088,2510,3021,1055,1127,1179,2677,1720,2384,2359,2495,2313,2489,2324,2475,2549,2665,1152,1573,2258,2260,2624,2578,2525,2562,1698,2462,1460,2100,2472,2328,1000,1147,1931,1740,1322,1692,974,1316,3033,1320,2714,1028,1141,1318,1098,2968,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626,634,862,394,490,492,602,402,684,737,397,638,406,571,750,741,705,930,838,21,656,682,576,458,462,760,753,641,617,565,612,506,526,474,755,557,709,965,780,2,24,43,42,41,25,36,38,37,3,751,742,700,681,630,637,468,495,598,547,691])).
% 10.00/9.82  cnf(3225,plain,
% 10.00/9.82     (~P8(f5(f5(f3(a12),f5(a19,f5(f10(f6(x32251,x32251,a12),x32252,a12),x32253,a12),a12),a12),f3(a12),a12),x32253,a12)),
% 10.00/9.82     inference(scs_inference,[],[95,971,117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,253,276,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,262,259,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,3102,3119,3122,3133,3151,3184,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,3069,3106,3138,116,181,207,226,230,234,241,266,164,167,194,195,233,160,189,120,301,100,204,128,209,109,125,175,229,192,108,178,279,2909,3087,105,261,268,103,124,168,260,267,201,152,288,96,159,191,165,107,97,162,200,254,274,104,258,294,188,127,283,256,171,106,102,257,151,150,2560,2808,2922,2952,3146,2091,2793,2317,2607,2074,2068,2042,2060,2070,2028,2020,2048,2287,2046,2609,1959,2224,2250,2144,2116,2197,2226,2002,1324,2281,2647,2774,2777,1057,3113,2366,2720,2723,2805,2916,2919,2165,1405,2615,2543,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,1957,2203,2514,2686,2272,2574,1372,2248,2671,1101,2975,2221,2293,3053,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,1901,2333,2839,1228,2469,2784,3024,3136,1088,2510,3021,1055,1127,1179,2677,1720,2384,2359,2495,2313,2489,2324,2475,2549,2665,1152,1573,2258,2260,2624,2578,2525,2562,1698,2462,1460,2100,2472,2328,1000,1147,1931,1740,1322,1692,974,1316,3033,1320,2714,1028,1141,1318,1098,2968,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626,634,862,394,490,492,602,402,684,737,397,638,406,571,750,741,705,930,838,21,656,682,576,458,462,760,753,641,617,565,612,506,526,474,755,557,709,965,780,2,24,43,42,41,25,36,38,37,3,751,742,700,681,630,637,468,495,598,547,691,382,623])).
% 10.00/9.82  cnf(3232,plain,
% 10.00/9.82     (P8(f10(f3(a12),f4(a19,a12),a12),f3(a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[95,971,117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,253,276,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,262,259,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,3102,3119,3122,3133,3151,3184,3186,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,3069,3106,3138,116,181,207,226,230,234,241,266,164,167,194,195,233,160,189,120,301,100,204,128,209,109,125,175,229,192,108,178,279,2909,3087,105,261,268,103,124,168,260,267,201,152,288,96,159,191,165,107,97,162,200,254,274,104,258,294,188,127,283,256,171,106,102,257,151,150,2560,2808,2922,2952,3146,2091,2793,2317,2607,2074,2068,2042,2060,2070,2028,2020,2048,2287,2046,2609,1959,2224,2250,2144,2116,2197,2226,2002,1324,2281,2647,2774,2777,1057,3113,2366,2720,2723,2805,2916,2919,2165,1405,2615,2543,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,1957,2203,2514,2686,2272,2574,1372,2248,2671,1101,2975,2221,2293,3053,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,1901,2333,2839,1228,2469,2784,3024,3136,1088,2510,3021,1055,1127,1179,2677,1720,2384,2359,2495,2313,2489,2324,2475,2549,2665,1152,1573,2258,2260,2624,2578,2525,2562,1698,2462,1460,2100,2472,2328,1000,1147,1931,1740,1322,1692,974,1316,3033,1320,2714,1028,1141,1318,1907,1098,2968,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626,634,862,394,490,492,602,402,684,737,397,638,406,571,750,741,705,930,838,21,656,682,576,458,462,760,753,641,617,565,612,506,526,474,755,557,709,965,780,2,24,43,42,41,25,36,38,37,3,751,742,700,681,630,637,468,495,598,547,691,382,623,832,763,628])).
% 10.00/9.82  cnf(3235,plain,
% 10.00/9.82     (~P7(f4(f3(a13),a13),f4(f5(f5(f6(f3(a13),f3(a13),a13),f3(a13),a13),f5(f6(f3(a13),f3(a13),a13),f3(a13),a13),a13),a13),a13)),
% 10.00/9.82     inference(scs_inference,[],[95,971,117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,253,276,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,262,259,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,3102,3119,3122,3133,3151,3184,3186,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,3069,3106,3138,116,181,207,226,230,234,241,266,164,167,194,195,233,160,189,120,301,100,204,128,209,109,125,175,229,192,108,178,279,2909,3087,105,261,268,103,124,168,260,267,201,152,288,96,159,191,165,107,97,162,200,254,274,104,258,294,188,127,283,256,171,106,102,257,151,150,2560,2808,2922,2952,3146,2091,2793,2317,2607,2074,2068,2042,2060,2070,2028,2020,2048,2287,2046,2609,1959,2224,2250,2144,2116,2197,2226,2002,1324,2281,2647,2774,2777,1057,3113,2366,2720,2723,2805,2916,2919,2165,1405,2615,2543,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,1957,2203,2514,2686,2272,2574,1372,2248,2671,1101,2975,2221,2293,3053,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,1901,2333,2839,1228,2469,2784,3024,3136,1088,2510,3021,1055,1127,1179,2677,1720,2384,2359,2495,2313,2489,2324,2475,2549,2665,1152,1573,2258,2260,2624,2578,2525,2562,1698,2462,1460,2100,2472,2328,1000,1147,1931,1740,1322,1692,974,1316,3033,1320,2714,1028,1141,1318,1907,1098,2968,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626,634,862,394,490,492,602,402,684,737,397,638,406,571,750,741,705,930,838,21,656,682,576,458,462,760,753,641,617,565,612,506,526,474,755,557,709,965,780,2,24,43,42,41,25,36,38,37,3,751,742,700,681,630,637,468,495,598,547,691,382,623,832,763,628,521])).
% 10.00/9.82  cnf(3239,plain,
% 10.00/9.82     (~P8(f3(a12),f5(f4(a19,a12),f4(a19,a12),a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[95,971,117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,253,276,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,262,259,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,3102,3119,3122,3133,3151,3184,3186,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,3069,3106,3138,116,181,207,226,230,234,241,266,164,167,194,195,233,160,189,120,301,100,204,128,209,109,125,175,229,192,108,178,279,2909,3087,105,261,268,103,124,168,260,267,201,152,288,96,159,191,165,107,97,162,200,254,274,104,258,294,188,127,283,256,171,106,102,257,151,150,2560,2808,2922,2952,3146,2091,2793,2317,2607,2074,2068,2042,2060,2070,2028,2020,2048,2287,2046,2609,1959,2224,2250,2144,2116,2197,2226,2002,1324,2281,2647,2774,2777,1057,3113,2366,2720,2723,2805,2916,2919,2165,1405,2615,2543,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,1957,2203,2514,2686,2272,2574,1372,2248,2671,1101,2975,2221,2293,3053,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,1901,2333,2839,1228,2469,2784,3024,3136,1088,2510,3021,1055,1127,1179,2677,1720,2384,2359,2495,2313,2489,2324,2475,2549,2665,1152,1573,2258,2260,2624,2578,2525,2562,1698,2462,1460,2100,2472,2328,1000,1147,1931,1740,1322,1692,974,1316,3033,1320,2714,1028,1141,1318,1907,1098,2968,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626,634,862,394,490,492,602,402,684,737,397,638,406,571,750,741,705,930,838,21,656,682,576,458,462,760,753,641,617,565,612,506,526,474,755,557,709,965,780,2,24,43,42,41,25,36,38,37,3,751,742,700,681,630,637,468,495,598,547,691,382,623,832,763,628,521,771,601])).
% 10.00/9.82  cnf(3248,plain,
% 10.00/9.82     (P8(f7(x32481,f4(f3(a12),a12),a12),f3(a12),a12)),
% 10.00/9.82     inference(rename_variables,[],[1234])).
% 10.00/9.82  cnf(3251,plain,
% 10.00/9.82     (~P7(f5(f10(f6(x32511,x32511,a12),x32512,a12),f7(x32513,f4(f3(a12),a12),a12),a12),f3(a12),a12)),
% 10.00/9.82     inference(rename_variables,[],[2445])).
% 10.00/9.82  cnf(3261,plain,
% 10.00/9.82     (~P8(f5(f3(a12),f5(a19,f5(f10(f6(x32611,x32611,a12),x32612,a12),f5(x32613,f3(a12),a12),a12),a12),a12),x32613,a12)),
% 10.00/9.82     inference(scs_inference,[],[95,971,117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,253,276,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,262,259,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,3102,3119,3122,3133,3151,3184,3186,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,3069,3106,3138,3189,116,181,207,226,230,234,241,266,164,167,194,195,233,160,189,120,301,100,204,128,209,109,125,175,229,192,108,178,279,2909,3087,105,261,268,103,124,168,260,267,201,152,288,96,159,191,165,107,97,162,200,254,274,104,258,294,188,127,283,256,171,106,102,257,151,150,2560,2808,2922,2952,3146,2091,2793,2317,2607,2074,2068,2042,2060,2070,2028,2020,2048,2287,2046,2609,1959,2224,2250,2144,2116,2197,2226,2002,1324,2281,2647,2774,2777,1057,3113,2366,2720,2723,2805,2916,2919,2165,1405,2615,2543,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,1957,2203,2514,2686,2272,2574,1372,2248,2671,1101,2975,2221,3056,2293,3053,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,1901,2333,2839,1228,2469,2784,3024,3136,2350,1088,2510,3021,1055,1127,1179,2677,1720,2384,1784,2359,2495,2313,2489,2324,2475,2549,2665,1152,1573,2258,3129,2260,2439,2624,1234,2578,2525,2562,2840,1698,2462,1460,2445,2100,2472,2328,1000,1147,1931,1740,1322,1692,974,1316,3033,1320,2714,1028,1141,1318,1907,1098,2968,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626,634,862,394,490,492,602,402,684,737,397,638,406,571,750,741,705,930,838,21,656,682,576,458,462,760,753,641,617,565,612,506,526,474,755,557,709,965,780,2,24,43,42,41,25,36,38,37,3,751,742,700,681,630,637,468,495,598,547,691,382,623,832,763,628,521,771,601,827,512,839,648,690,848,620])).
% 10.00/9.82  cnf(3263,plain,
% 10.00/9.82     (~P7(f6(f16(x32631,a23),f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12),f3(a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[95,971,117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,253,276,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,262,259,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,3102,3119,3122,3133,3151,3184,3186,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,3069,3106,3138,3189,116,181,207,226,230,234,241,266,164,167,194,195,233,160,189,120,301,100,204,128,209,109,125,175,229,192,108,178,279,2909,3087,105,261,268,103,124,168,260,267,201,152,288,96,159,191,165,107,97,162,200,254,274,104,258,294,188,127,283,256,171,106,102,257,151,150,2560,2808,2922,2952,3146,2091,2793,2317,2607,2074,2068,2042,2060,2070,2028,2020,2048,2287,2046,2609,1959,2224,2250,2144,2116,2197,2226,2002,1324,2281,2647,2774,2777,1057,3113,2366,2720,2723,2805,2916,2919,2165,1405,2615,2543,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,1957,2203,2514,2686,2272,2574,1372,2248,2671,1101,2975,2221,3056,2293,3053,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,1901,2333,2839,1228,2469,2784,3024,3136,2350,1088,2510,3021,1055,1127,1179,2677,1720,2384,1784,2359,2495,2313,2489,2324,2475,2549,2665,1152,1573,2258,3129,2260,2439,2624,1234,2578,2525,2562,2840,1698,2585,2462,1460,2445,2100,2472,2328,1000,1147,1931,1740,1322,1692,974,1316,3033,1320,2714,1028,1141,1318,1907,1098,2968,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626,634,862,394,490,492,602,402,684,737,397,638,406,571,750,741,705,930,838,21,656,682,576,458,462,760,753,641,617,565,612,506,526,474,755,557,709,965,780,2,24,43,42,41,25,36,38,37,3,751,742,700,681,630,637,468,495,598,547,691,382,623,832,763,628,521,771,601,827,512,839,648,690,848,620,649])).
% 10.00/9.82  cnf(3266,plain,
% 10.00/9.82     (~P7(f10(f6(x32661,x32661,a12),x32662,a12),f3(a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[95,971,117,133,137,140,144,187,198,208,214,218,222,225,240,243,247,253,276,101,269,272,2845,285,284,112,158,170,182,211,223,228,231,236,250,296,298,262,259,281,2882,98,148,161,190,275,173,172,255,2726,2798,2818,2929,2944,3102,3119,3122,3133,3151,3184,3186,299,2790,2813,2936,2941,2955,2967,2985,2997,3011,3069,3106,3138,3189,116,181,207,226,230,234,241,266,164,167,194,195,233,160,189,120,301,100,204,128,209,109,125,175,229,192,108,178,279,2909,3087,105,261,268,103,124,168,260,267,201,152,288,96,159,191,165,107,97,162,200,254,274,104,258,294,188,127,283,256,171,106,102,257,151,150,2560,2808,2922,2952,3146,2091,2793,2317,2607,2074,2068,2042,2060,2070,2028,2020,2048,2287,2046,2609,1959,2224,2250,2144,2116,2197,2226,2002,1324,2281,2647,2774,2777,1057,3113,2366,2720,2723,2805,2916,2919,2165,1405,2615,2543,976,1380,2083,2617,2149,1812,1129,2632,2691,1594,1957,2203,2514,2686,2272,2574,1372,2248,2671,1101,2975,2221,3056,2293,3053,2641,1909,2389,2741,2832,2866,1903,2734,1091,2848,1901,2333,2839,1228,2469,2784,3024,3136,2350,1088,2510,3021,1055,1127,1179,2677,1720,2384,1784,2359,2495,2313,2489,2324,2475,2549,2665,1152,1573,2258,3129,2260,2439,2624,1234,3248,2578,2525,2562,2840,1698,2585,2462,1460,2445,3251,2100,2472,2328,1000,1147,1931,1740,1322,1692,974,1316,3033,1320,2714,1028,1141,1318,1907,1098,2968,1919,1611,1752,1657,894,678,677,855,795,867,770,806,745,829,803,830,697,864,828,635,663,645,92,90,89,88,84,79,76,74,73,72,68,67,61,60,54,53,51,49,48,44,40,39,35,375,621,933,532,778,736,752,75,456,856,520,962,527,805,668,577,417,411,545,963,528,614,804,679,618,866,558,541,865,381,473,624,403,735,833,825,568,826,643,491,373,556,91,87,86,85,82,81,80,78,77,71,69,66,65,63,59,58,57,56,50,46,439,459,553,387,932,525,573,378,743,787,685,683,834,45,451,622,494,530,326,572,564,407,738,841,410,578,64,454,374,615,531,733,570,791,739,453,448,418,707,477,529,831,676,657,967,960,734,782,781,661,639,619,616,793,836,579,388,383,754,779,653,651,650,646,642,837,627,510,961,789,609,626,634,862,394,490,492,602,402,684,737,397,638,406,571,750,741,705,930,838,21,656,682,576,458,462,760,753,641,617,565,612,506,526,474,755,557,709,965,780,2,24,43,42,41,25,36,38,37,3,751,742,700,681,630,637,468,495,598,547,691,382,623,832,763,628,521,771,601,827,512,839,648,690,848,620,649,647])).
% 10.00/9.82  cnf(3284,plain,
% 10.00/9.82     (P8(f3(a12),f10(x32841,x32841,a12),a12)),
% 10.00/9.82     inference(rename_variables,[],[1320])).
% 10.00/9.82  cnf(3289,plain,
% 10.00/9.82     (~P8(x32891,f5(f6(f3(a12),f7(f10(f16(a24,a23),f10(f17(f2(f11(a1)),a12),a19,a12),a12),f16(a25,a23),a12),a12),x32891,a12),a12)),
% 10.00/9.82     inference(rename_variables,[],[2989])).
% 10.00/9.82  cnf(3292,plain,
% 10.00/9.82     (P38(f5(f10(f6(x32921,x32921,a12),x32922,a12),a13,a12))),
% 10.00/9.82     inference(rename_variables,[],[2767])).
% 10.00/9.82  cnf(3298,plain,
% 10.00/9.82     (E(x32981,f4(f4(x32981,a12),a12))),
% 10.00/9.82     inference(rename_variables,[],[1692])).
% 10.00/9.82  cnf(3300,plain,
% 10.00/9.82     (E(x33001,f4(f4(x33001,a12),a12))),
% 10.00/9.82     inference(rename_variables,[],[1692])).
% 10.00/9.82  cnf(3302,plain,
% 10.00/9.82     (~P8(f5(f17(f2(f2(f11(a1))),a12),f7(f10(x33021,a19,a12),a19,a12),a12),x33021,a12)),
% 10.00/9.82     inference(rename_variables,[],[3005])).
% 10.00/9.82  cnf(3303,plain,
% 10.00/9.82     (P8(f3(a12),f10(x33031,x33031,a12),a12)),
% 10.00/9.82     inference(rename_variables,[],[1320])).
% 10.00/9.82  cnf(3309,plain,
% 10.00/9.82     (P8(x33091,x33091,a12)),
% 10.00/9.82     inference(rename_variables,[],[255])).
% 10.00/9.82  cnf(3325,plain,
% 10.00/9.82     (P7(f5(f6(f3(a12),a19,a12),f5(f10(f6(x33251,x33251,a12),x33252,a12),x33253,a12),a12),x33253,a12)),
% 10.00/9.82     inference(rename_variables,[],[2728])).
% 10.00/9.82  cnf(3327,plain,
% 10.00/9.82     (P7(f7(f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),f5(a19,f3(a12),a12),a12),f3(a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[255,194,126,232,122,129,200,283,153,106,102,257,151,150,2860,3008,3018,2112,3098,2767,3292,2904,2989,2728,3071,3005,3239,3266,2966,3263,2931,1179,2197,1028,1320,3284,1692,3298,1657,678,847,555,355,485,47,62,55,677,745,868,846,354,484,688,537,382,635,663])).
% 10.00/9.82  cnf(3332,plain,
% 10.00/9.82     (E(f5(x33321,a1,x33322),f5(x33321,f2(a1),x33322))),
% 10.00/9.82     inference(rename_variables,[],[3131])).
% 10.00/9.82  cnf(3334,plain,
% 10.00/9.82     (~P7(a19,f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[255,194,126,110,232,122,129,300,268,165,200,283,153,106,102,257,151,150,2860,3008,3018,2112,3131,3098,2767,3292,2904,2989,2728,3071,3005,3239,3266,2966,3263,2931,1179,2197,1028,1320,3284,1692,3298,1657,678,847,555,355,485,47,62,55,677,745,868,846,354,484,688,537,382,635,663,645,933,532])).
% 10.00/9.82  cnf(3350,plain,
% 10.00/9.82     (~P7(x33501,f5(f10(f6(x33502,x33502,a13),x33503,a13),x33501,a13),a13)),
% 10.00/9.82     inference(rename_variables,[],[3082])).
% 10.00/9.82  cnf(3353,plain,
% 10.00/9.82     (P8(f5(x33531,f4(f4(x33532,f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12)),f5(x33531,x33532,f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12))),
% 10.00/9.82     inference(rename_variables,[],[2792])).
% 10.00/9.82  cnf(3361,plain,
% 10.00/9.82     (~P8(f10(f17(f2(f11(a1)),a12),a19,a12),f3(a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[155,272,255,194,163,172,126,181,110,232,193,209,279,122,129,105,168,300,268,165,200,283,258,153,106,102,257,151,150,2792,2860,2346,3008,3018,2112,3131,3098,2682,2767,3292,2904,2989,3115,3082,2728,3071,3005,2393,2826,3239,3200,3266,2966,3263,2931,2074,1179,2578,2197,1028,1320,3284,3303,1692,3298,3300,1657,678,847,555,355,485,47,62,55,677,745,868,846,354,484,688,537,382,635,663,645,933,532,621,845,844,70,966,736,520,963,962,528,614,618,669])).
% 10.00/9.82  cnf(3362,plain,
% 10.00/9.82     (P8(f3(a12),f10(x33621,x33621,a12),a12)),
% 10.00/9.82     inference(rename_variables,[],[1320])).
% 10.00/9.82  cnf(3368,plain,
% 10.00/9.82     (P8(f3(a12),f5(f5(f3(a12),f5(a19,f5(f10(f6(x33681,x33681,a12),x33682,a12),f3(a12),a12),a12),a12),f3(a12),a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[244,155,272,298,255,194,163,172,126,181,110,232,193,209,279,122,129,105,168,300,268,165,200,283,258,153,106,102,257,151,150,2792,3094,2860,2346,3008,3018,2112,3131,3098,2682,2767,3292,2904,2989,3115,3082,2728,3071,3005,3225,2393,2826,3239,3200,3266,2966,3263,2931,2040,2074,1179,2624,2578,2197,1028,1320,3284,3303,1692,3298,3300,1657,678,847,555,355,485,47,62,55,677,745,868,846,354,484,688,537,382,635,663,645,933,532,621,845,844,70,966,736,520,963,962,528,614,618,669,456,545,697])).
% 10.00/9.82  cnf(3369,plain,
% 10.00/9.82     (~P8(f5(f5(f3(a12),f5(a19,f5(f10(f6(x33691,x33691,a12),x33692,a12),x33693,a12),a12),a12),f3(a12),a12),x33693,a12)),
% 10.00/9.82     inference(rename_variables,[],[3225])).
% 10.00/9.82  cnf(3373,plain,
% 10.00/9.82     (P8(x33731,x33731,a23)),
% 10.00/9.82     inference(rename_variables,[],[1273])).
% 10.00/9.82  cnf(3376,plain,
% 10.00/9.82     (P7(f5(f6(f3(a12),a19,a12),f5(f10(f6(x33761,x33761,a12),x33762,a12),x33763,a12),a12),x33763,a12)),
% 10.00/9.82     inference(rename_variables,[],[2728])).
% 10.00/9.82  cnf(3384,plain,
% 10.00/9.82     (~P7(x33841,f5(f10(f6(x33842,x33842,a13),x33843,a13),x33841,a13),a13)),
% 10.00/9.82     inference(rename_variables,[],[3082])).
% 10.00/9.82  cnf(3389,plain,
% 10.00/9.82     (P8(x33891,x33891,a23)),
% 10.00/9.82     inference(rename_variables,[],[1273])).
% 10.00/9.82  cnf(3409,plain,
% 10.00/9.82     (E(f6(f5(x34091,f5(x34092,x34093,a12),a12),f5(x34091,x34093,a12),a12),x34092)),
% 10.00/9.82     inference(rename_variables,[],[3142])).
% 10.00/9.82  cnf(3412,plain,
% 10.00/9.82     (~P8(f5(f5(f3(a12),f5(a19,f5(f10(f6(x34121,x34121,a12),x34122,a12),x34123,a12),a12),a12),f3(a12),a12),x34123,a12)),
% 10.00/9.82     inference(rename_variables,[],[3225])).
% 10.00/9.82  cnf(3425,plain,
% 10.00/9.82     (~P7(x34251,x34251,a12)),
% 10.00/9.82     inference(rename_variables,[],[299])).
% 10.00/9.82  cnf(3437,plain,
% 10.00/9.82     (~P8(x34371,f5(f6(f3(a12),f7(f10(f16(a24,a23),f10(f17(f2(f11(a1)),a12),a19,a12),a12),f16(a25,a23),a12),a12),x34371,a12),a12)),
% 10.00/9.82     inference(rename_variables,[],[2989])).
% 10.00/9.82  cnf(3447,plain,
% 10.00/9.82     (~P7(x34471,x34471,a12)),
% 10.00/9.82     inference(rename_variables,[],[299])).
% 10.00/9.82  cnf(3450,plain,
% 10.00/9.82     (P7(f5(f6(f3(a12),a19,a12),f5(f10(f6(x34501,x34501,a12),x34502,a12),x34503,a12),a12),x34503,a12)),
% 10.00/9.82     inference(rename_variables,[],[2728])).
% 10.00/9.82  cnf(3459,plain,
% 10.00/9.82     (P7(f5(f6(f3(a12),a19,a12),f5(f10(f6(x34591,x34591,a12),x34592,a12),x34593,a12),a12),x34593,a12)),
% 10.00/9.82     inference(rename_variables,[],[2728])).
% 10.00/9.82  cnf(3462,plain,
% 10.00/9.82     (P7(f5(f6(f3(a12),a19,a12),f5(f10(f6(x34621,x34621,a12),x34622,a12),x34623,a12),a12),x34623,a12)),
% 10.00/9.82     inference(rename_variables,[],[2728])).
% 10.00/9.82  cnf(3464,plain,
% 10.00/9.82     (~P7(x34641,x34641,a12)),
% 10.00/9.82     inference(rename_variables,[],[299])).
% 10.00/9.82  cnf(3483,plain,
% 10.00/9.82     (P8(f5(x34831,f4(x34831,f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12)),f3(f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12))),
% 10.00/9.82     inference(scs_inference,[],[145,215,219,244,117,155,272,270,298,255,299,3425,3447,170,194,234,161,163,172,126,181,110,164,232,193,209,173,279,122,129,261,105,267,288,260,168,174,300,268,177,165,107,162,97,254,200,283,104,256,304,258,171,153,106,102,257,151,150,2807,2792,2921,3094,2860,2346,3092,3008,3018,2112,2321,2801,1342,3142,3112,3131,3332,1816,3058,3098,3218,2725,2252,2682,2428,2767,3292,2904,2177,2989,3289,3115,3082,3350,3384,2728,3325,3376,3450,3459,3071,3005,3225,3369,1069,2393,2826,3239,3200,3124,3266,2804,2966,3263,3110,2190,1750,2931,2040,994,2074,1101,1179,2624,2578,2287,1667,1273,3373,2197,1028,1320,3284,3303,2060,1740,1692,3298,3300,1657,678,847,555,355,485,47,62,55,677,745,868,846,354,484,688,537,382,635,663,645,933,532,621,845,844,70,966,736,520,963,962,528,614,618,669,456,545,697,865,577,417,411,512,489,864,861,770,478,735,553,387,932,375,778,407,451,622,494,685,527,863,556,374,733,781,619,616,683,558,418,623,620,529,738,837,477,961,450,967,381,439,624,568])).
% 10.00/9.82  cnf(3487,plain,
% 10.00/9.82     (P8(x34871,x34871,a12)),
% 10.00/9.82     inference(rename_variables,[],[255])).
% 10.00/9.82  cnf(3491,plain,
% 10.00/9.82     (P8(f4(f4(f4(f4(x34911,f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12)),f4(f4(a13,a12),a12)),x34911,f4(f4(a13,a12),a12))),
% 10.00/9.82     inference(scs_inference,[],[145,215,219,244,117,155,272,270,298,255,3309,299,3425,3447,170,194,234,161,163,172,126,181,110,164,232,193,209,173,279,122,129,261,105,267,288,260,168,174,300,268,177,165,107,162,97,254,200,283,104,256,304,258,171,153,106,102,257,151,150,2807,2792,2921,3094,2860,2346,3092,3008,3018,2112,2321,2801,1342,3142,3112,3131,3332,1816,3058,3098,3218,2725,2252,2682,2428,2767,3292,2904,2177,2989,3289,3115,3082,3350,3384,2728,3325,3376,3450,3459,3071,3005,3225,3369,1069,2393,2826,3239,3200,3124,3266,2804,2966,3263,3110,2190,1750,2931,2040,994,2172,2074,1101,1179,2624,2578,2287,1667,1273,3373,2197,1028,1320,3284,3303,2060,1740,1692,3298,3300,1657,678,847,555,355,485,47,62,55,677,745,868,846,354,484,688,537,382,635,663,645,933,532,621,845,844,70,966,736,520,963,962,528,614,618,669,456,545,697,865,577,417,411,512,489,864,861,770,478,735,553,387,932,375,778,407,451,622,494,685,527,863,556,374,733,781,619,616,683,558,418,623,620,529,738,837,477,961,450,967,381,439,624,568,862,579,510])).
% 10.00/9.82  cnf(3496,plain,
% 10.00/9.82     (~P8(f3(a12),f7(f10(f16(a24,a23),f10(f17(f2(f11(a1)),a12),a19,a12),a12),f4(a19,a12),a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[145,215,219,244,117,155,272,270,298,255,3309,299,3425,3447,170,194,234,161,163,172,126,181,110,164,232,193,209,173,279,122,129,261,105,267,288,260,168,174,300,268,177,165,107,162,97,254,200,283,104,256,304,258,171,153,106,102,257,151,150,2807,2792,2921,3094,2860,2346,3092,3008,3018,2112,2321,2801,1342,3142,3112,3131,3332,1816,3058,3098,3218,2725,2252,2682,2428,2767,3292,2904,2177,2989,3289,3115,3082,3350,3384,2728,3325,3376,3450,3459,3071,3005,3225,3369,1069,2393,2826,2754,3239,3200,3124,3266,2804,2966,3263,3110,2190,1750,2931,2040,994,2172,2074,1101,1179,2624,2578,2287,1667,1273,3373,2197,1028,1320,3284,3303,2060,1740,1692,3298,3300,1657,678,847,555,355,485,47,62,55,677,745,868,846,354,484,688,537,382,635,663,645,933,532,621,845,844,70,966,736,520,963,962,528,614,618,669,456,545,697,865,577,417,411,512,489,864,861,770,478,735,553,387,932,375,778,407,451,622,494,685,527,863,556,374,733,781,619,616,683,558,418,623,620,529,738,837,477,961,450,967,381,439,624,568,862,579,510,602,628])).
% 10.00/9.82  cnf(3505,plain,
% 10.00/9.82     (P8(x35051,x35051,a12)),
% 10.00/9.82     inference(rename_variables,[],[255])).
% 10.00/9.82  cnf(3507,plain,
% 10.00/9.82     (~P7(x35071,x35071,a12)),
% 10.00/9.82     inference(rename_variables,[],[299])).
% 10.00/9.82  cnf(3511,plain,
% 10.00/9.82     (~P8(f7(f5(f5(f3(a12),f5(a19,f5(f10(f6(x35111,x35111,a12),x35112,a12),f3(a12),a12),a12),a12),f3(a12),a12),f5(f5(f3(a12),f5(a19,f5(f10(f6(x35111,x35111,a12),x35112,a12),f3(a12),a12),a12),a12),f3(a12),a12),a12),f3(a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[145,215,219,244,117,155,272,270,298,255,3309,3487,299,3425,3447,3464,170,194,234,161,163,172,126,181,110,164,232,193,209,173,279,122,129,261,105,267,288,260,168,159,174,300,268,177,165,107,162,97,254,200,283,104,256,304,258,171,153,106,102,257,151,150,2807,2792,2921,3094,2860,2346,3092,3008,3018,2112,2321,2801,1342,2465,3142,3112,3131,3332,1816,3058,3098,3218,2725,2252,2682,2428,2767,3292,2904,2177,2989,3289,3115,3082,3350,3384,2728,3325,3376,3450,3459,3071,3005,3225,3369,3412,1069,2393,2826,2754,3239,3200,3124,3266,2804,2966,3263,3110,2190,1750,2931,2040,994,2172,2074,1101,1179,2624,2578,2287,1667,1273,3373,2197,1028,1320,3284,3303,2060,1740,1692,3298,3300,1657,678,847,555,355,485,47,62,55,677,745,868,846,354,484,688,537,382,635,663,645,933,532,621,845,844,70,966,736,520,963,962,528,614,618,669,456,545,697,865,577,417,411,512,489,864,861,770,478,735,553,387,932,375,778,407,451,622,494,685,527,863,556,374,733,781,619,616,683,558,418,623,620,529,738,837,477,961,450,967,381,439,624,568,862,579,510,602,628,394,490,737,684,627,686])).
% 10.00/9.82  cnf(3515,plain,
% 10.00/9.82     (~E(f5(f4(f3(a12),a12),f5(x35151,a19,a12),a12),x35151)),
% 10.00/9.82     inference(rename_variables,[],[2366])).
% 10.00/9.82  cnf(3525,plain,
% 10.00/9.82     (P8(x35251,x35251,a12)),
% 10.00/9.82     inference(rename_variables,[],[255])).
% 10.00/9.82  cnf(3542,plain,
% 10.00/9.82     (~P7(x35421,x35421,a12)),
% 10.00/9.82     inference(rename_variables,[],[299])).
% 10.00/9.82  cnf(3549,plain,
% 10.00/9.82     (~P8(x35491,f5(f6(f3(a12),f7(f10(f16(a24,a23),f10(f17(f2(f11(a1)),a12),a19,a12),a12),f16(a25,a23),a12),a12),x35491,a12),a12)),
% 10.00/9.82     inference(rename_variables,[],[2989])).
% 10.00/9.82  cnf(3550,plain,
% 10.00/9.82     (P8(x35501,x35501,a12)),
% 10.00/9.82     inference(rename_variables,[],[255])).
% 10.00/9.82  cnf(3569,plain,
% 10.00/9.82     (P8(x35691,x35691,a12)),
% 10.00/9.82     inference(rename_variables,[],[255])).
% 10.00/9.82  cnf(3572,plain,
% 10.00/9.82     (~P8(f5(f17(f2(f2(f11(a1))),a12),f7(f10(x35721,a19,a12),a19,a12),a12),x35721,a12)),
% 10.00/9.82     inference(rename_variables,[],[3005])).
% 10.00/9.82  cnf(3587,plain,
% 10.00/9.82     (P7(f10(f3(a12),f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),a12),f17(f2(f11(a1)),a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[145,215,219,244,117,155,272,270,286,284,298,255,3309,3487,3505,3525,3550,299,3425,3447,3464,3507,3542,170,194,234,161,163,172,126,181,167,189,110,164,232,193,301,209,173,279,122,129,261,105,267,288,260,168,159,174,300,268,96,177,165,107,162,302,97,254,200,283,104,256,188,304,258,171,153,106,102,257,151,150,2807,2792,3353,2921,3094,2583,2860,2346,3092,2169,3008,3018,2112,2321,2801,1342,2465,3142,3409,3112,3131,3332,3216,1816,3058,3098,3218,2725,3073,2252,3150,2682,2650,2428,2767,3292,2904,2177,2989,3289,3437,3115,3082,3350,3384,2728,3325,3376,3450,3459,3071,3005,3302,3225,3369,3412,3261,1069,2393,2826,2754,3239,3200,3124,2884,3035,3266,2804,2966,3263,3110,2190,1750,2931,2040,994,2172,2074,2366,1101,1179,2624,2578,1788,2287,1667,1273,3373,2197,1028,1320,3284,3303,2060,1141,1740,1692,3298,3300,1657,678,847,555,355,485,47,62,55,677,745,868,846,354,484,688,537,382,635,663,645,933,532,621,845,844,70,966,736,520,963,962,528,614,618,669,456,545,697,865,577,417,411,512,489,864,861,770,478,735,553,387,932,375,778,407,451,622,494,685,527,863,556,374,733,781,619,616,683,558,418,623,620,529,738,837,477,961,450,967,381,439,624,568,862,579,510,602,628,394,490,737,684,627,686,373,459,573,525,834,705,617,410,454,458,615,530,572,676,453,639,612,578,448,388,960,531,564,836,646,642,779,739,609,492,626,397])).
% 10.00/9.82  cnf(3591,plain,
% 10.00/9.82     (P8(f4(f7(a19,f17(f2(f11(a1)),a12),a12),a12),f4(f3(a12),a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[145,215,219,244,117,155,272,270,286,284,298,255,3309,3487,3505,3525,3550,299,3425,3447,3464,3507,3542,170,194,234,161,163,172,126,181,167,189,110,164,232,193,301,209,173,279,122,129,261,105,267,288,260,168,159,174,300,268,96,177,165,107,162,302,97,254,200,283,104,256,188,304,258,171,153,106,102,257,151,150,2807,2792,3353,2921,3094,2583,2860,2346,3092,2169,3008,2713,3018,2112,2321,2801,1342,2465,3142,3409,3112,3131,3332,3216,1816,3058,3098,3218,2725,3073,2252,3150,2682,2650,2428,2767,3292,2904,2177,2989,3289,3437,3115,3082,3350,3384,2728,3325,3376,3450,3459,3071,3005,3302,3225,3369,3412,3261,1069,2393,2826,2754,3239,3200,3124,2884,3035,3266,2804,2966,3263,3110,2190,1750,2931,2040,994,2172,2074,2366,1101,1179,2624,2578,1788,2287,1667,1273,3373,2197,1028,1320,3284,3303,2060,1141,1740,1692,3298,3300,1657,678,847,555,355,485,47,62,55,677,745,868,846,354,484,688,537,382,635,663,645,933,532,621,845,844,70,966,736,520,963,962,528,614,618,669,456,545,697,865,577,417,411,512,489,864,861,770,478,735,553,387,932,375,778,407,451,622,494,685,527,863,556,374,733,781,619,616,683,558,418,623,620,529,738,837,477,961,450,967,381,439,624,568,862,579,510,602,628,394,490,737,684,627,686,373,459,573,525,834,705,617,410,454,458,615,530,572,676,453,639,612,578,448,388,960,531,564,836,646,642,779,739,609,492,626,397,406,576])).
% 10.00/9.82  cnf(3597,plain,
% 10.00/9.82     (~P7(x35971,x35971,a12)),
% 10.00/9.82     inference(rename_variables,[],[299])).
% 10.00/9.82  cnf(3612,plain,
% 10.00/9.82     (~P7(x36121,x36121,a12)),
% 10.00/9.82     inference(rename_variables,[],[299])).
% 10.00/9.82  cnf(3617,plain,
% 10.00/9.82     (E(f5(f6(x36171,x36172,a12),x36172,a12),x36171)),
% 10.00/9.82     inference(rename_variables,[],[265])).
% 10.00/9.82  cnf(3619,plain,
% 10.00/9.82     (E(f5(f6(x36191,x36192,a12),x36192,a12),x36191)),
% 10.00/9.82     inference(rename_variables,[],[265])).
% 10.00/9.82  cnf(3628,plain,
% 10.00/9.82     (~P7(x36281,x36281,a12)),
% 10.00/9.82     inference(rename_variables,[],[299])).
% 10.00/9.82  cnf(3632,plain,
% 10.00/9.82     (P7(f5(f6(f3(a12),a19,a12),f5(f10(f6(x36321,x36321,a12),x36322,a12),x36323,a12),a12),x36323,a12)),
% 10.00/9.82     inference(rename_variables,[],[2728])).
% 10.00/9.82  cnf(3634,plain,
% 10.00/9.82     (P8(x36341,x36341,a12)),
% 10.00/9.82     inference(rename_variables,[],[255])).
% 10.00/9.82  cnf(3638,plain,
% 10.00/9.82     (P8(x36381,x36381,a12)),
% 10.00/9.82     inference(rename_variables,[],[255])).
% 10.00/9.82  cnf(3639,plain,
% 10.00/9.82     (P8(x36391,x36391,a12)),
% 10.00/9.82     inference(rename_variables,[],[255])).
% 10.00/9.82  cnf(3641,plain,
% 10.00/9.82     (P8(f7(f10(f3(a12),x36411,a12),x36411,a12),f3(a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[145,215,219,244,280,117,155,272,270,286,284,298,265,3617,255,3309,3487,3505,3525,3550,3569,3634,3639,3638,299,3425,3447,3464,3507,3542,3597,3612,170,230,194,234,161,163,172,126,181,167,189,110,164,232,193,301,209,173,279,122,129,261,105,267,288,260,168,159,174,300,268,96,177,165,107,162,302,97,254,200,283,104,256,188,304,258,171,153,106,102,257,151,150,2807,2792,3353,2921,3094,2583,2860,2346,3092,2169,3008,2713,3018,2112,2321,2801,1342,2465,3142,3409,3112,3131,3332,3216,2924,1816,3058,3098,3218,2722,2725,3073,2252,3150,2682,2650,2276,2428,2767,3292,2904,2177,2989,3289,3437,3549,3115,3082,3350,3384,2728,3325,3376,3450,3459,3462,3632,3071,3005,3302,3572,3225,3369,3412,3261,2858,1066,1069,2393,2826,2754,3239,3200,3124,2884,3035,3266,2804,2966,3263,3110,2190,1750,2931,2040,994,2172,2074,2366,3515,1101,1179,2624,2578,1788,2287,1667,1273,3373,3389,2197,1028,1320,3284,3303,2060,1141,1740,1692,3298,3300,1657,678,847,555,355,485,47,62,55,677,745,868,846,354,484,688,537,382,635,663,645,933,532,621,845,844,70,966,736,520,963,962,528,614,618,669,456,545,697,865,577,417,411,512,489,864,861,770,478,735,553,387,932,375,778,407,451,622,494,685,527,863,556,374,733,781,619,616,683,558,418,623,620,529,738,837,477,961,450,967,381,439,624,568,862,579,510,602,628,394,490,737,684,627,686,373,459,573,525,834,705,617,410,454,458,615,530,572,676,453,639,612,578,448,388,960,531,564,836,646,642,779,739,609,492,626,397,406,576,571,682,506,656,557,965,755,36,25,21,43,38,3,2,42,41,37,893,917,914,919])).
% 10.00/9.82  cnf(3642,plain,
% 10.00/9.82     (P8(x36421,x36421,a12)),
% 10.00/9.82     inference(rename_variables,[],[255])).
% 10.00/9.82  cnf(3644,plain,
% 10.00/9.82     (P8(x36441,x36441,a12)),
% 10.00/9.82     inference(rename_variables,[],[255])).
% 10.00/9.82  cnf(3651,plain,
% 10.00/9.82     (P8(x36511,x36511,a12)),
% 10.00/9.82     inference(rename_variables,[],[255])).
% 10.00/9.82  cnf(3653,plain,
% 10.00/9.82     (P8(f3(a12),f10(f3(a12),f4(a19,a12),a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[145,215,219,244,280,117,155,272,270,286,284,298,265,3617,255,3309,3487,3505,3525,3550,3569,3634,3639,3642,3638,299,3425,3447,3464,3507,3542,3597,3612,170,230,194,234,161,163,172,126,181,167,189,110,164,232,193,301,209,173,279,122,129,261,105,267,264,288,260,168,159,174,300,268,96,177,165,107,162,302,97,254,200,283,104,256,188,304,258,171,153,106,102,257,151,150,2807,2792,3353,2921,3094,2583,2860,2346,3092,2169,3008,2713,3018,2112,2321,2801,1342,2465,3142,3409,3112,3131,3332,3216,2924,1816,3058,3098,3218,2722,2725,3073,2252,3150,2682,2650,2276,2428,2767,3292,2904,2177,2989,3289,3437,3549,3115,3082,3350,3384,2728,3325,3376,3450,3459,3462,3632,3071,3005,3302,3572,3225,3369,3412,3261,2858,1066,1069,2393,2826,2754,3239,3200,3124,2884,3035,3266,2804,2966,3263,3110,2190,1750,2931,2040,994,1937,2172,1899,2074,2366,3515,1101,1179,2624,2578,1788,2287,1667,1034,1273,3373,3389,2197,1028,1320,3284,3303,2060,1141,1740,1692,3298,3300,1657,678,847,555,355,485,47,62,55,677,745,868,846,354,484,688,537,382,635,663,645,933,532,621,845,844,70,966,736,520,963,962,528,614,618,669,456,545,697,865,577,417,411,512,489,864,861,770,478,735,553,387,932,375,778,407,451,622,494,685,527,863,556,374,733,781,619,616,683,558,418,623,620,529,738,837,477,961,450,967,381,439,624,568,862,579,510,602,628,394,490,737,684,627,686,373,459,573,525,834,705,617,410,454,458,615,530,572,676,453,639,612,578,448,388,960,531,564,836,646,642,779,739,609,492,626,397,406,576,571,682,506,656,557,965,755,36,25,21,43,38,3,2,42,41,37,893,917,914,919,566,681,869,700])).
% 10.00/9.82  cnf(3661,plain,
% 10.00/9.82     (P8(f3(a12),f7(f10(f3(a12),x36611,a12),x36611,a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[145,215,219,244,280,117,155,272,270,286,284,298,265,3617,255,3309,3487,3505,3525,3550,3569,3634,3639,3642,3651,3638,3644,299,3425,3447,3464,3507,3542,3597,3612,3628,170,230,194,234,161,163,172,126,181,167,189,110,164,232,193,301,209,173,279,122,129,261,105,267,264,288,260,103,168,159,174,300,268,96,177,165,107,162,302,97,254,200,283,104,256,188,304,258,171,153,106,102,257,151,150,2807,2792,3353,2921,3094,2583,2860,2346,3092,2169,3008,2713,3018,2112,2321,2801,1342,2465,3142,3409,3112,3131,3332,3216,2924,1816,3058,3098,3218,2722,2725,3073,2252,3150,2682,2650,2276,2428,2767,3292,2904,2177,2989,3289,3437,3549,3115,3082,3350,3384,2728,3325,3376,3450,3459,3462,3632,3071,3005,3302,3572,3225,3369,3412,3261,2858,1066,1069,2393,2826,2754,3239,3200,3124,2884,3035,3266,2804,2966,3263,3110,2190,1750,2931,2040,994,1937,2172,1899,1780,1634,2074,2366,3515,1101,1179,2624,2578,1788,2287,1667,1034,1273,3373,3389,2197,1028,1320,3284,3303,2060,1141,1740,1692,3298,3300,1657,678,847,555,355,485,47,62,55,677,745,868,846,354,484,688,537,382,635,663,645,933,532,621,845,844,70,966,736,520,963,962,528,614,618,669,456,545,697,865,577,417,411,512,489,864,861,770,478,735,553,387,932,375,778,407,451,622,494,685,527,863,556,374,733,781,619,616,683,558,418,623,620,529,738,837,477,961,450,967,381,439,624,568,862,579,510,602,628,394,490,737,684,627,686,373,459,573,525,834,705,617,410,454,458,615,530,572,676,453,639,612,578,448,388,960,531,564,836,646,642,779,739,609,492,626,397,406,576,571,682,506,656,557,965,755,36,25,21,43,38,3,2,42,41,37,893,917,914,919,566,681,869,700,835,803,913])).
% 10.00/9.82  cnf(3682,plain,
% 10.00/9.82     (~P8(f3(a12),f6(f3(a12),a19,a12),a12)),
% 10.00/9.82     inference(scs_inference,[],[145,215,219,244,280,117,155,272,270,286,284,298,265,3617,3619,255,3309,3487,3505,3525,3550,3569,3634,3639,3642,3651,3638,3644,299,3425,3447,3464,3507,3542,3597,3612,3628,170,230,194,234,161,163,172,126,181,167,195,189,110,164,232,193,301,209,173,279,122,129,261,105,267,264,288,260,103,168,159,174,300,268,96,177,165,107,162,302,97,254,200,283,104,256,188,304,258,171,153,106,102,257,151,150,2807,2792,3353,2921,3094,2583,2860,2346,3092,2169,3008,2713,3018,2112,2321,2801,1342,2465,3142,3409,3112,3131,3332,3216,2924,1816,3058,3098,3218,2722,2725,3073,2252,3150,2682,2650,2276,2428,2767,3292,2904,2177,2989,3289,3437,3549,3115,3082,3350,3384,2728,3325,3376,3450,3459,3462,3632,3071,3005,3302,3572,3225,3369,3412,3261,2858,1066,1069,2393,2826,2754,3239,3200,3124,2884,3035,3266,2804,2966,3263,3110,2190,2750,1750,2931,2040,994,1937,1744,2172,1899,1780,1634,2074,2366,3515,1101,1179,2624,2578,1788,2287,1667,1034,1273,3373,3389,2197,1028,1320,3284,3303,3362,996,2060,1141,1740,1692,3298,3300,1657,678,847,555,355,485,47,62,55,677,745,868,846,354,484,688,537,382,635,663,645,933,532,621,845,844,70,966,736,520,963,962,528,614,618,669,456,545,697,865,577,417,411,512,489,864,861,770,478,735,553,387,932,375,778,407,451,622,494,685,527,863,556,374,733,781,619,616,683,558,418,623,620,529,738,837,477,961,450,967,381,439,624,568,862,579,510,602,628,394,490,737,684,627,686,373,459,573,525,834,705,617,410,454,458,615,530,572,676,453,639,612,578,448,388,960,531,564,836,646,642,779,739,609,492,626,397,406,576,571,682,506,656,557,965,755,36,25,21,43,38,3,2,42,41,37,893,917,914,919,566,681,869,700,835,803,913,740,629,768,476,643,833,804,565])).
% 10.00/9.82  cnf(3698,plain,
% 10.00/9.82     (P8(f3(a12),f7(f10(f3(a12),x36981,a12),x36981,a12),a12)),
% 10.00/9.82     inference(rename_variables,[],[3661])).
% 10.00/9.82  cnf(3703,plain,
% 10.00/9.82     (~P7(x37031,x37031,a12)),
% 10.00/9.82     inference(rename_variables,[],[299])).
% 10.00/9.82  cnf(3708,plain,
% 10.00/9.82     (P8(f10(f4(f10(x37081,x37081,a12),a12),f3(a12),a12),f10(f10(x37082,x37082,a12),f3(a12),a12),a12)),
% 10.00/9.82     inference(rename_variables,[],[3118])).
% 10.00/9.82  cnf(3709,plain,
% 10.00/9.82     (P8(f10(f10(x37091,x37091,a12),f3(a12),a12),f10(f4(f10(x37092,x37092,a12),a12),f3(a12),a12),a12)),
% 10.00/9.82     inference(rename_variables,[],[3121])).
% 10.00/9.82  cnf(3731,plain,
% 10.00/9.82     (P8(x37311,x37311,a12)),
% 10.00/9.82     inference(rename_variables,[],[255])).
% 10.00/9.82  cnf(3784,plain,
% 10.00/9.82     ($false),
% 10.00/9.82     inference(scs_inference,[],[96,243,282,275,270,255,3731,299,3703,298,301,125,128,105,264,279,201,165,254,97,107,162,200,256,104,283,171,106,102,257,151,150,3491,3483,3361,2211,3591,3232,3334,2551,3587,3165,3235,2863,3653,3682,3118,3708,3327,3060,3496,3641,3661,3698,3511,3368,3121,3709,1887,2270,2410,1671,2754,3098,1824,2728,2562,2472,2574,1072,2074,2197,1320,1028,2060,1657,696,917,689,597,849,555,919,843,632,847,52,658,867,675,839,382,508,629,844,966,532,791,520,846,456,963,577,545,866,411,770,476,913,537,489,688,700,491]),
% 10.00/9.82     ['proof']).
% 10.00/9.83  % SZS output end Proof
% 10.00/9.83  % Total time :8.870000s
%------------------------------------------------------------------------------