% Mizar ND problem: t10_binari_3,binari_3,263,23 fof(dh_c1_10__binari_3,definition, ( ( m2_subset_1(c1_10__binari_3,k1_numbers,k5_numbers) => ! [A] : ( m2_finseq_2(A,k6_margrel1,k4_finseq_2(c1_10__binari_3,k6_margrel1)) => ( A = k5_euclid(c1_10__binari_3) => k4_finseq_5(k6_margrel1,k6_binarith(c1_10__binari_3,A)) = k6_binarith(c1_10__binari_3,A) ) ) ) => ! [B] : ( m2_subset_1(B,k1_numbers,k5_numbers) => ! [C] : ( m2_finseq_2(C,k6_margrel1,k4_finseq_2(B,k6_margrel1)) => ( C = k5_euclid(B) => k4_finseq_5(k6_margrel1,k6_binarith(B,C)) = k6_binarith(B,C) ) ) ) ), introduced(definition,[new_symbol(c1_10__binari_3),file(binari_3,c1_10__binari_3)]), [interesting(0.8),axiom,file(binari_3,c1_10__binari_3)]). fof(dh_c2_10__binari_3,definition, ( ( m2_finseq_2(c2_10__binari_3,k6_margrel1,k4_finseq_2(c1_10__binari_3,k6_margrel1)) => ( c2_10__binari_3 = k5_euclid(c1_10__binari_3) => k4_finseq_5(k6_margrel1,k6_binarith(c1_10__binari_3,c2_10__binari_3)) = k6_binarith(c1_10__binari_3,c2_10__binari_3) ) ) => ! [A] : ( m2_finseq_2(A,k6_margrel1,k4_finseq_2(c1_10__binari_3,k6_margrel1)) => ( A = k5_euclid(c1_10__binari_3) => k4_finseq_5(k6_margrel1,k6_binarith(c1_10__binari_3,A)) = k6_binarith(c1_10__binari_3,A) ) ) ), introduced(definition,[new_symbol(c2_10__binari_3),file(binari_3,c2_10__binari_3)]), [interesting(0.8),axiom,file(binari_3,c2_10__binari_3)]). fof(e1_10__binari_3,assumption,( c2_10__binari_3 = k5_euclid(c1_10__binari_3) ), introduced(assumption,[file(binari_3,e1_10__binari_3)]), [interesting(0.8),axiom,file(binari_3,e1_10__binari_3)]). fof(existence_m1_relset_1,axiom,( ! [A,B] : ? [C] : m1_relset_1(C,A,B) ), file(relset_1,m1_relset_1), [interesting(0.9),axiom,file(relset_1,m1_relset_1)]). fof(dt_k2_zfmisc_1,axiom,( $true ), file(zfmisc_1,k2_zfmisc_1), [interesting(0.9),axiom,file(zfmisc_1,k2_zfmisc_1)]). fof(dt_m1_relset_1,axiom,( $true ), file(relset_1,m1_relset_1), [interesting(0.9),axiom,file(relset_1,m1_relset_1)]). fof(cc1_relset_1,theorem,( ! [A,B,C] : ( m1_subset_1(C,k1_zfmisc_1(k2_zfmisc_1(A,B))) => v1_relat_1(C) ) ), file(relset_1,cc1_relset_1), [interesting(0.9),axiom,file(relset_1,cc1_relset_1)]). fof(fc14_membered,theorem,( ! [A,B] : ( ( v1_rat_1(A) & v1_rat_1(B) ) => ( v1_membered(k2_tarski(A,B)) & v2_membered(k2_tarski(A,B)) & v3_membered(k2_tarski(A,B)) ) ) ), file(membered,fc14_membered), [interesting(0.9),axiom,file(membered,fc14_membered)]). fof(fc15_membered,theorem,( ! [A,B] : ( ( v1_int_1(A) & v1_int_1(B) ) => ( v1_membered(k2_tarski(A,B)) & v2_membered(k2_tarski(A,B)) & v3_membered(k2_tarski(A,B)) & v4_membered(k2_tarski(A,B)) ) ) ), file(membered,fc15_membered), [interesting(0.9),axiom,file(membered,fc15_membered)]). fof(rc1_margrel1,theorem,( ? [A] : v1_margrel1(A) ), file(margrel1,rc1_margrel1), [interesting(0.9),axiom,file(margrel1,rc1_margrel1)]). fof(reflexivity_r1_tarski,theorem,( ! [A,B] : r1_tarski(A,A) ), file(tarski,r1_tarski), [interesting(0.9),axiom,file(tarski,r1_tarski)]). fof(existence_m1_finseq_2,axiom,( ! [A] : ? [B] : m1_finseq_2(B,A) ), file(finseq_2,m1_finseq_2), [interesting(0.9),axiom,file(finseq_2,m1_finseq_2)]). fof(existence_m2_relset_1,axiom,( ! [A,B] : ? [C] : m2_relset_1(C,A,B) ), file(relset_1,m2_relset_1), [interesting(0.9),axiom,file(relset_1,m2_relset_1)]). fof(redefinition_m2_relset_1,definition,( ! [A,B,C] : ( m2_relset_1(C,A,B) <=> m1_relset_1(C,A,B) ) ), file(relset_1,m2_relset_1), [interesting(0.9),axiom,file(relset_1,m2_relset_1)]). fof(dt_k1_xboole_0,axiom,( $true ), file(xboole_0,k1_xboole_0), [interesting(0.9),axiom,file(xboole_0,k1_xboole_0)]). fof(dt_m1_finseq_2,axiom,( $true ), file(finseq_2,m1_finseq_2), [interesting(0.9),axiom,file(finseq_2,m1_finseq_2)]). fof(dt_m2_relset_1,axiom,( ! [A,B,C] : ( m2_relset_1(C,A,B) => m1_subset_1(C,k1_zfmisc_1(k2_zfmisc_1(A,B))) ) ), file(relset_1,m2_relset_1), [interesting(0.9),axiom,file(relset_1,m2_relset_1)]). fof(cc12_membered,theorem,( ! [A] : ( v3_membered(A) => ! [B] : ( m1_subset_1(B,A) => ( v1_xcmplx_0(B) & v1_xreal_0(B) & v1_rat_1(B) ) ) ) ), file(membered,cc12_membered), [interesting(0.9),axiom,file(membered,cc12_membered)]). fof(cc13_membered,theorem,( ! [A] : ( v4_membered(A) => ! [B] : ( m1_subset_1(B,A) => ( v1_xcmplx_0(B) & v1_xreal_0(B) & v1_int_1(B) & v1_rat_1(B) ) ) ) ), file(membered,cc13_membered), [interesting(0.9),axiom,file(membered,cc13_membered)]). fof(cc14_membered,theorem,( ! [A] : ( v5_membered(A) => ! [B] : ( m1_subset_1(B,A) => ( v1_xcmplx_0(B) & v4_ordinal2(B) & v1_xreal_0(B) & v1_int_1(B) & v1_rat_1(B) ) ) ) ), file(membered,cc14_membered), [interesting(0.9),axiom,file(membered,cc14_membered)]). fof(cc18_membered,theorem,( ! [A] : ( v3_membered(A) => ! [B] : ( m1_subset_1(B,k1_zfmisc_1(A)) => ( v1_membered(B) & v2_membered(B) & v3_membered(B) ) ) ) ), file(membered,cc18_membered), [interesting(0.9),axiom,file(membered,cc18_membered)]). fof(cc19_membered,theorem,( ! [A] : ( v4_membered(A) => ! [B] : ( m1_subset_1(B,k1_zfmisc_1(A)) => ( v1_membered(B) & v2_membered(B) & v3_membered(B) & v4_membered(B) ) ) ) ), file(membered,cc19_membered), [interesting(0.9),axiom,file(membered,cc19_membered)]). fof(cc1_membered,theorem,( ! [A] : ( v5_membered(A) => v4_membered(A) ) ), file(membered,cc1_membered), [interesting(0.9),axiom,file(membered,cc1_membered)]). fof(cc20_membered,theorem,( ! [A] : ( v5_membered(A) => ! [B] : ( m1_subset_1(B,k1_zfmisc_1(A)) => ( v1_membered(B) & v2_membered(B) & v3_membered(B) & v4_membered(B) & v5_membered(B) ) ) ) ), file(membered,cc20_membered), [interesting(0.9),axiom,file(membered,cc20_membered)]). fof(cc2_membered,theorem,( ! [A] : ( v4_membered(A) => v3_membered(A) ) ), file(membered,cc2_membered), [interesting(0.9),axiom,file(membered,cc2_membered)]). fof(cc3_membered,theorem,( ! [A] : ( v3_membered(A) => v2_membered(A) ) ), file(membered,cc3_membered), [interesting(0.9),axiom,file(membered,cc3_membered)]). fof(cc3_nat_1,theorem,( ! [A] : ( v4_ordinal2(A) => ( v4_ordinal2(A) & v1_xcmplx_0(A) & v1_xreal_0(A) & ~ v3_xreal_0(A) ) ) ), file(nat_1,cc3_nat_1), [interesting(0.9),axiom,file(nat_1,cc3_nat_1)]). fof(fc12_membered,theorem,( ! [A,B] : ( ( v1_xcmplx_0(A) & v1_xcmplx_0(B) ) => v1_membered(k2_tarski(A,B)) ) ), file(membered,fc12_membered), [interesting(0.9),axiom,file(membered,fc12_membered)]). fof(fc13_membered,theorem,( ! [A,B] : ( ( v1_xreal_0(A) & v1_xreal_0(B) ) => ( v1_membered(k2_tarski(A,B)) & v2_membered(k2_tarski(A,B)) ) ) ), file(membered,fc13_membered), [interesting(0.9),axiom,file(membered,fc13_membered)]). fof(fc16_membered,theorem,( ! [A,B] : ( ( v4_ordinal2(A) & v4_ordinal2(B) ) => ( v1_membered(k2_tarski(A,B)) & v2_membered(k2_tarski(A,B)) & v3_membered(k2_tarski(A,B)) & v4_membered(k2_tarski(A,B)) & v5_membered(k2_tarski(A,B)) ) ) ), file(membered,fc16_membered), [interesting(0.9),axiom,file(membered,fc16_membered)]). fof(fc1_margrel1,theorem, ( v1_xboole_0(k1_xboole_0) & v1_margrel1(k1_xboole_0) ), file(margrel1,fc1_margrel1), [interesting(0.9),axiom,file(margrel1,fc1_margrel1)]). fof(fc6_membered,theorem, ( v1_xboole_0(k1_xboole_0) & v1_membered(k1_xboole_0) & v2_membered(k1_xboole_0) & v3_membered(k1_xboole_0) & v4_membered(k1_xboole_0) & v5_membered(k1_xboole_0) ), file(membered,fc6_membered), [interesting(0.9),axiom,file(membered,fc6_membered)]). fof(rc1_membered,theorem,( ? [A] : ( ~ v1_xboole_0(A) & v1_membered(A) & v2_membered(A) & v3_membered(A) & v4_membered(A) & v5_membered(A) ) ), file(membered,rc1_membered), [interesting(0.9),axiom,file(membered,rc1_membered)]). fof(rc1_nat_1,theorem,( ? [A] : ( ~ v1_xboole_0(A) & v4_ordinal2(A) & v1_xcmplx_0(A) & v1_xreal_0(A) ) ), file(nat_1,rc1_nat_1), [interesting(0.9),axiom,file(nat_1,rc1_nat_1)]). fof(rc2_margrel1,theorem,( ? [A] : v2_margrel1(A) ), file(margrel1,rc2_margrel1), [interesting(0.9),axiom,file(margrel1,rc2_margrel1)]). fof(rc2_nat_1,theorem,( ? [A] : ( m1_subset_1(A,k1_zfmisc_1(k1_numbers)) & ~ v1_xboole_0(A) & v3_ordinal1(A) ) ), file(nat_1,rc2_nat_1), [interesting(0.9),axiom,file(nat_1,rc2_nat_1)]). fof(rc3_nat_1,theorem,( ? [A] : ( m1_subset_1(A,k5_numbers) & ~ v1_xboole_0(A) & v1_ordinal1(A) & v2_ordinal1(A) & v3_ordinal1(A) & v4_ordinal2(A) & v1_xcmplx_0(A) & v1_xreal_0(A) ) ), file(nat_1,rc3_nat_1), [interesting(0.9),axiom,file(nat_1,rc3_nat_1)]). fof(commutativity_k2_tarski,theorem,( ! [A,B] : k2_tarski(A,B) = k2_tarski(B,A) ), file(tarski,k2_tarski), [interesting(0.9),axiom,file(tarski,k2_tarski)]). fof(existence_m1_finseq_1,axiom,( ! [A] : ? [B] : m1_finseq_1(B,A) ), file(finseq_1,m1_finseq_1), [interesting(0.9),axiom,file(finseq_1,m1_finseq_1)]). fof(existence_m1_subset_1,axiom,( ! [A] : ? [B] : m1_subset_1(B,A) ), file(subset_1,m1_subset_1), [interesting(0.9),axiom,file(subset_1,m1_subset_1)]). fof(existence_m2_finseq_1,axiom,( ! [A] : ? [B] : m2_finseq_1(B,A) ), file(finseq_1,m2_finseq_1), [interesting(0.9),axiom,file(finseq_1,m2_finseq_1)]). fof(existence_m2_finseq_2,axiom,( ! [A,B] : ( ( ~ v1_xboole_0(B) & m1_finseq_2(B,A) ) => ? [C] : m2_finseq_2(C,A,B) ) ), file(finseq_2,m2_finseq_2), [interesting(0.9),axiom,file(finseq_2,m2_finseq_2)]). fof(redefinition_m2_finseq_1,definition,( ! [A,B] : ( m2_finseq_1(B,A) <=> m1_finseq_1(B,A) ) ), file(finseq_1,m2_finseq_1), [interesting(0.9),axiom,file(finseq_1,m2_finseq_1)]). fof(redefinition_m2_finseq_2,definition,( ! [A,B] : ( ( ~ v1_xboole_0(B) & m1_finseq_2(B,A) ) => ! [C] : ( m2_finseq_2(C,A,B) <=> m1_subset_1(C,B) ) ) ), file(finseq_2,m2_finseq_2), [interesting(0.9),axiom,file(finseq_2,m2_finseq_2)]). fof(dt_k1_relat_1,axiom,( $true ), file(relat_1,k1_relat_1), [interesting(0.9),axiom,file(relat_1,k1_relat_1)]). fof(dt_k1_zfmisc_1,axiom,( $true ), file(zfmisc_1,k1_zfmisc_1), [interesting(0.9),axiom,file(zfmisc_1,k1_zfmisc_1)]). fof(dt_k2_tarski,axiom,( $true ), file(tarski,k2_tarski), [interesting(0.9),axiom,file(tarski,k2_tarski)]). fof(dt_k3_finseq_5,axiom,( ! [A] : ( ( v1_relat_1(A) & v1_funct_1(A) & v1_finseq_1(A) ) => ( v1_relat_1(k3_finseq_5(A)) & v1_funct_1(k3_finseq_5(A)) & v1_finseq_1(k3_finseq_5(A)) ) ) ), file(finseq_5,k3_finseq_5), [interesting(0.9),axiom,file(finseq_5,k3_finseq_5)]). fof(dt_k4_finseq_2,axiom,( ! [A,B] : ( v4_ordinal2(A) => m1_finseq_2(k4_finseq_2(A,B),B) ) ), file(finseq_2,k4_finseq_2), [interesting(0.9),axiom,file(finseq_2,k4_finseq_2)]). fof(dt_k5_ordinal2,axiom,( $true ), file(ordinal2,k5_ordinal2), [interesting(0.9),axiom,file(ordinal2,k5_ordinal2)]). fof(dt_m1_finseq_1,axiom,( ! [A,B] : ( m1_finseq_1(B,A) => ( v1_relat_1(B) & v1_funct_1(B) & v1_finseq_1(B) ) ) ), file(finseq_1,m1_finseq_1), [interesting(0.9),axiom,file(finseq_1,m1_finseq_1)]). fof(dt_m1_subset_1,axiom,( $true ), file(subset_1,m1_subset_1), [interesting(0.9),axiom,file(subset_1,m1_subset_1)]). fof(dt_m2_finseq_1,axiom,( ! [A,B] : ( m2_finseq_1(B,A) => ( v1_funct_1(B) & v1_finseq_1(B) & m2_relset_1(B,k5_numbers,A) ) ) ), file(finseq_1,m2_finseq_1), [interesting(0.9),axiom,file(finseq_1,m2_finseq_1)]). fof(dt_m2_finseq_2,axiom,( ! [A,B] : ( ( ~ v1_xboole_0(B) & m1_finseq_2(B,A) ) => ! [C] : ( m2_finseq_2(C,A,B) => m2_finseq_1(C,A) ) ) ), file(finseq_2,m2_finseq_2), [interesting(0.9),axiom,file(finseq_2,m2_finseq_2)]). fof(cc10_membered,theorem,( ! [A] : ( v1_membered(A) => ! [B] : ( m1_subset_1(B,A) => v1_xcmplx_0(B) ) ) ), file(membered,cc10_membered), [interesting(0.9),axiom,file(membered,cc10_membered)]). fof(cc11_membered,theorem,( ! [A] : ( v2_membered(A) => ! [B] : ( m1_subset_1(B,A) => ( v1_xcmplx_0(B) & v1_xreal_0(B) ) ) ) ), file(membered,cc11_membered), [interesting(0.9),axiom,file(membered,cc11_membered)]). fof(cc15_membered,theorem,( ! [A] : ( v1_xboole_0(A) => ( v1_membered(A) & v2_membered(A) & v3_membered(A) & v4_membered(A) & v5_membered(A) ) ) ), file(membered,cc15_membered), [interesting(0.9),axiom,file(membered,cc15_membered)]). fof(cc16_membered,theorem,( ! [A] : ( v1_membered(A) => ! [B] : ( m1_subset_1(B,k1_zfmisc_1(A)) => v1_membered(B) ) ) ), file(membered,cc16_membered), [interesting(0.9),axiom,file(membered,cc16_membered)]). fof(cc17_membered,theorem,( ! [A] : ( v2_membered(A) => ! [B] : ( m1_subset_1(B,k1_zfmisc_1(A)) => ( v1_membered(B) & v2_membered(B) ) ) ) ), file(membered,cc17_membered), [interesting(0.9),axiom,file(membered,cc17_membered)]). fof(cc1_margrel1,theorem,( ! [A] : ( m1_subset_1(A,k6_margrel1) => v2_margrel1(A) ) ), file(margrel1,cc1_margrel1), [interesting(0.9),axiom,file(margrel1,cc1_margrel1)]). fof(cc1_nat_1,theorem,( ! [A] : ( m1_subset_1(A,k5_numbers) => ( v1_ordinal1(A) & v2_ordinal1(A) & v3_ordinal1(A) & v4_ordinal2(A) & v1_xcmplx_0(A) & v1_xreal_0(A) ) ) ), file(nat_1,cc1_nat_1), [interesting(0.9),axiom,file(nat_1,cc1_nat_1)]). fof(cc2_nat_1,theorem,( ! [A] : ( m1_subset_1(A,k5_numbers) => ( v1_ordinal1(A) & v2_ordinal1(A) & v3_ordinal1(A) & v4_ordinal2(A) & v1_xcmplx_0(A) & v1_xreal_0(A) & ~ v3_xreal_0(A) ) ) ), file(nat_1,cc2_nat_1), [interesting(0.9),axiom,file(nat_1,cc2_nat_1)]). fof(cc4_membered,theorem,( ! [A] : ( v2_membered(A) => v1_membered(A) ) ), file(membered,cc4_membered), [interesting(0.9),axiom,file(membered,cc4_membered)]). fof(cc6_membered,theorem,( ! [A] : ( m1_subset_1(A,k1_zfmisc_1(k1_numbers)) => ( v1_membered(A) & v2_membered(A) ) ) ), file(membered,cc6_membered), [interesting(0.9),axiom,file(membered,cc6_membered)]). fof(cc9_membered,theorem,( ! [A] : ( m1_subset_1(A,k1_zfmisc_1(k5_numbers)) => ( v1_membered(A) & v2_membered(A) & v3_membered(A) & v4_membered(A) & v5_membered(A) ) ) ), file(membered,cc9_membered), [interesting(0.9),axiom,file(membered,cc9_membered)]). fof(fc5_membered,theorem, ( v1_membered(k5_ordinal2) & v2_membered(k5_ordinal2) & v3_membered(k5_ordinal2) & v4_membered(k5_ordinal2) & v5_membered(k5_ordinal2) ), file(membered,fc5_membered), [interesting(0.9),axiom,file(membered,fc5_membered)]). fof(spc0_boole,theorem,( v1_xboole_0(0) ), file(boole,spc0_boole), [interesting(0.9),axiom,file(boole,spc0_boole)]). fof(spc1_boole,theorem,( ~ v1_xboole_0(1) ), file(boole,spc1_boole), [interesting(0.9),axiom,file(boole,spc1_boole)]). fof(t1_numerals,theorem,( m1_subset_1(0,k5_numbers) ), file(numerals,t1_numerals), [interesting(0.9),axiom,file(numerals,t1_numerals)]). fof(t2_subset,theorem,( ! [A,B] : ( m1_subset_1(A,B) => ( v1_xboole_0(B) | r2_hidden(A,B) ) ) ), file(subset,t2_subset), [interesting(0.9),axiom,file(subset,t2_subset)]). fof(t3_subset,theorem,( ! [A,B] : ( m1_subset_1(A,k1_zfmisc_1(B)) <=> r1_tarski(A,B) ) ), file(subset,t3_subset), [interesting(0.9),axiom,file(subset,t3_subset)]). fof(t4_subset,theorem,( ! [A,B,C] : ( ( r2_hidden(A,B) & m1_subset_1(B,k1_zfmisc_1(C)) ) => m1_subset_1(A,C) ) ), file(subset,t4_subset), [interesting(0.9),axiom,file(subset,t4_subset)]). fof(t5_subset,theorem,( ! [A,B,C] : ~ ( r2_hidden(A,B) & m1_subset_1(B,k1_zfmisc_1(C)) & v1_xboole_0(C) ) ), file(subset,t5_subset), [interesting(0.9),axiom,file(subset,t5_subset)]). fof(t6_boole,theorem,( ! [A] : ( v1_xboole_0(A) => A = k1_xboole_0 ) ), file(boole,t6_boole), [interesting(0.9),axiom,file(boole,t6_boole)]). fof(t8_boole,theorem,( ! [A,B] : ~ ( v1_xboole_0(A) & A != B & v1_xboole_0(B) ) ), file(boole,t8_boole), [interesting(0.9),axiom,file(boole,t8_boole)]). fof(spc0_numerals,theorem, ( v2_xreal_0(0) & m2_subset_1(0,k1_numbers,k5_numbers) & m1_subset_1(0,k5_numbers) & m1_subset_1(0,k1_numbers) ), file(numerals,spc0_numerals), [interesting(0.9),axiom,file(numerals,spc0_numerals)]). fof(spc1_numerals,theorem, ( v2_xreal_0(1) & m2_subset_1(1,k1_numbers,k5_numbers) & m1_subset_1(1,k5_numbers) & m1_subset_1(1,k1_numbers) ), file(numerals,spc1_numerals), [interesting(0.9),axiom,file(numerals,spc1_numerals)]). fof(antisymmetry_r2_hidden,theorem,( ! [A,B] : ( r2_hidden(A,B) => ~ r2_hidden(B,A) ) ), file(hidden,r2_hidden), [interesting(0.9),axiom,file(hidden,r2_hidden)]). fof(existence_m2_subset_1,axiom,( ! [A,B] : ( ( ~ v1_xboole_0(A) & ~ v1_xboole_0(B) & m1_subset_1(B,k1_zfmisc_1(A)) ) => ? [C] : m2_subset_1(C,A,B) ) ), file(subset_1,m2_subset_1), [interesting(0.9),axiom,file(subset_1,m2_subset_1)]). fof(redefinition_k4_finseq_1,definition,( ! [A] : ( ( v1_relat_1(A) & v1_funct_1(A) & v1_finseq_1(A) ) => k4_finseq_1(A) = k1_relat_1(A) ) ), file(finseq_1,k4_finseq_1), [interesting(0.9),axiom,file(finseq_1,k4_finseq_1)]). fof(redefinition_k4_finseq_5,definition,( ! [A,B] : ( ( ~ v1_xboole_0(A) & m1_finseq_1(B,A) ) => k4_finseq_5(A,B) = k3_finseq_5(B) ) ), file(finseq_5,k4_finseq_5), [interesting(0.9),axiom,file(finseq_5,k4_finseq_5)]). fof(redefinition_k5_numbers,definition,( k5_numbers = k5_ordinal2 ), file(numbers,k5_numbers), [interesting(0.9),axiom,file(numbers,k5_numbers)]). fof(redefinition_m2_subset_1,definition,( ! [A,B] : ( ( ~ v1_xboole_0(A) & ~ v1_xboole_0(B) & m1_subset_1(B,k1_zfmisc_1(A)) ) => ! [C] : ( m2_subset_1(C,A,B) <=> m1_subset_1(C,B) ) ) ), file(subset_1,m2_subset_1), [interesting(0.9),axiom,file(subset_1,m2_subset_1)]). fof(dt_k1_funct_1,axiom,( $true ), file(funct_1,k1_funct_1), [interesting(0.9),axiom,file(funct_1,k1_funct_1)]). fof(dt_k1_numbers,axiom,( $true ), file(numbers,k1_numbers), [interesting(0.9),axiom,file(numbers,k1_numbers)]). fof(dt_k4_finseq_1,axiom,( ! [A] : ( ( v1_relat_1(A) & v1_funct_1(A) & v1_finseq_1(A) ) => m1_subset_1(k4_finseq_1(A),k1_zfmisc_1(k5_numbers)) ) ), file(finseq_1,k4_finseq_1), [interesting(0.9),axiom,file(finseq_1,k4_finseq_1)]). fof(dt_k4_finseq_5,axiom,( ! [A,B] : ( ( ~ v1_xboole_0(A) & m1_finseq_1(B,A) ) => m2_finseq_1(k4_finseq_5(A,B),A) ) ), file(finseq_5,k4_finseq_5), [interesting(0.9),axiom,file(finseq_5,k4_finseq_5)]). fof(dt_k5_numbers,axiom,( m1_subset_1(k5_numbers,k1_zfmisc_1(k1_numbers)) ), file(numbers,k5_numbers), [interesting(0.9),axiom,file(numbers,k5_numbers)]). fof(dt_k6_binarith,axiom,( ! [A,B] : ( ( m1_subset_1(A,k5_numbers) & m1_subset_1(B,k4_finseq_2(A,k6_margrel1)) ) => m2_finseq_2(k6_binarith(A,B),k6_margrel1,k4_finseq_2(A,k6_margrel1)) ) ), file(binarith,k6_binarith), [interesting(0.9),axiom,file(binarith,k6_binarith)]). fof(dt_k6_margrel1,axiom,( $true ), file(margrel1,k6_margrel1), [interesting(0.9),axiom,file(margrel1,k6_margrel1)]). fof(dt_m2_subset_1,axiom,( ! [A,B] : ( ( ~ v1_xboole_0(A) & ~ v1_xboole_0(B) & m1_subset_1(B,k1_zfmisc_1(A)) ) => ! [C] : ( m2_subset_1(C,A,B) => m1_subset_1(C,A) ) ) ), file(subset_1,m2_subset_1), [interesting(0.9),axiom,file(subset_1,m2_subset_1)]). fof(dt_c1_10__binari_3,assumption,( m2_subset_1(c1_10__binari_3,k1_numbers,k5_numbers) ), introduced(assumption,[file(binari_3,c1_10__binari_3)]), [interesting(0.8),axiom,file(binari_3,c1_10__binari_3)]). fof(dt_c2_10__binari_3,assumption,( m2_finseq_2(c2_10__binari_3,k6_margrel1,k4_finseq_2(c1_10__binari_3,k6_margrel1)) ), introduced(assumption,[file(binari_3,c2_10__binari_3)]), [interesting(0.8),axiom,file(binari_3,c2_10__binari_3)]). fof(fc2_membered,theorem, ( ~ v1_xboole_0(k1_numbers) & v1_membered(k1_numbers) & v2_membered(k1_numbers) ), file(membered,fc2_membered), [interesting(0.9),axiom,file(membered,fc2_membered)]). fof(fc3_margrel1,theorem,( ~ v1_xboole_0(k6_margrel1) ), file(margrel1,fc3_margrel1), [interesting(0.9),axiom,file(margrel1,fc3_margrel1)]). fof(t1_subset,theorem,( ! [A,B] : ( r2_hidden(A,B) => m1_subset_1(A,B) ) ), file(subset,t1_subset), [interesting(0.9),axiom,file(subset,t1_subset)]). fof(t7_boole,theorem,( ! [A,B] : ~ ( r2_hidden(A,B) & v1_xboole_0(B) ) ), file(boole,t7_boole), [interesting(0.9),axiom,file(boole,t7_boole)]). fof(d12_margrel1,definition,( k6_margrel1 = k2_tarski(0,1) ), file(margrel1,d12_margrel1), [interesting(0.9),axiom,file(margrel1,d12_margrel1)]). fof(dh_c1_10_2__binari_3,definition, ( ( m2_subset_1(c1_10_2__binari_3,k1_numbers,k5_numbers) => ( r2_hidden(c1_10_2__binari_3,k4_finseq_1(k6_binarith(c1_10__binari_3,c2_10__binari_3))) => k1_funct_1(k4_finseq_5(k6_margrel1,k6_binarith(c1_10__binari_3,c2_10__binari_3)),c1_10_2__binari_3) = k1_funct_1(k6_binarith(c1_10__binari_3,c2_10__binari_3),c1_10_2__binari_3) ) ) => ! [A] : ( m2_subset_1(A,k1_numbers,k5_numbers) => ( r2_hidden(A,k4_finseq_1(k6_binarith(c1_10__binari_3,c2_10__binari_3))) => k1_funct_1(k4_finseq_5(k6_margrel1,k6_binarith(c1_10__binari_3,c2_10__binari_3)),A) = k1_funct_1(k6_binarith(c1_10__binari_3,c2_10__binari_3),A) ) ) ), introduced(definition,[new_symbol(c1_10_2__binari_3),file(binari_3,c1_10_2__binari_3)]), [interesting(0.65),axiom,file(binari_3,c1_10_2__binari_3)]). fof(e1_10_2__binari_3,assumption,( r2_hidden(c1_10_2__binari_3,k4_finseq_1(k6_binarith(c1_10__binari_3,c2_10__binari_3))) ), introduced(assumption,[file(binari_3,e1_10_2__binari_3)]), [interesting(0.65),axiom,file(binari_3,e1_10_2__binari_3)]). fof(fc1_nat_1,theorem,( ! [A,B] : ( ( v4_ordinal2(A) & v4_ordinal2(B) ) => ( v4_ordinal2(k2_xcmplx_0(A,B)) & v1_xcmplx_0(k2_xcmplx_0(A,B)) & v1_xreal_0(k2_xcmplx_0(A,B)) ) ) ), file(nat_1,fc1_nat_1), [interesting(0.9),axiom,file(nat_1,fc1_nat_1)]). fof(fc3_nat_1,theorem,( ! [A,B] : ( ( v4_ordinal2(A) & ~ v1_xboole_0(B) & v4_ordinal2(B) ) => ( ~ v1_xboole_0(k2_xcmplx_0(A,B)) & v4_ordinal2(k2_xcmplx_0(A,B)) & v1_xcmplx_0(k2_xcmplx_0(A,B)) & v1_xreal_0(k2_xcmplx_0(A,B)) ) ) ), file(nat_1,fc3_nat_1), [interesting(0.9),axiom,file(nat_1,fc3_nat_1)]). fof(fc4_nat_1,theorem,( ! [A,B] : ( ( v4_ordinal2(A) & ~ v1_xboole_0(B) & v4_ordinal2(B) ) => ( ~ v1_xboole_0(k2_xcmplx_0(B,A)) & v4_ordinal2(k2_xcmplx_0(B,A)) & v1_xcmplx_0(k2_xcmplx_0(B,A)) & v1_xreal_0(k2_xcmplx_0(B,A)) ) ) ), file(nat_1,fc4_nat_1), [interesting(0.9),axiom,file(nat_1,fc4_nat_1)]). fof(dt_k1_card_1,axiom,( ! [A] : v1_card_1(k1_card_1(A)) ), file(card_1,k1_card_1), [interesting(0.9),axiom,file(card_1,k1_card_1)]). fof(rqRealAdd__k2_xcmplx_0__r0_r0_r0,theorem,( k2_xcmplx_0(0,0) = 0 ), file(arithm,rqRealAdd__k2_xcmplx_0__r0_r0_r0), [interesting(0.9),axiom,file(arithm,rqRealAdd__k2_xcmplx_0__r0_r0_r0)]). fof(rqRealAdd__k2_xcmplx_0__r0_r1_r1,theorem,( k2_xcmplx_0(0,1) = 1 ), file(arithm,rqRealAdd__k2_xcmplx_0__r0_r1_r1), [interesting(0.9),axiom,file(arithm,rqRealAdd__k2_xcmplx_0__r0_r1_r1)]). fof(rqRealAdd__k2_xcmplx_0__r0_rm1_rm1,theorem,( k2_xcmplx_0(0,k4_xcmplx_0(1)) = k4_xcmplx_0(1) ), file(arithm,rqRealAdd__k2_xcmplx_0__r0_rm1_rm1), [interesting(0.9),axiom,file(arithm,rqRealAdd__k2_xcmplx_0__r0_rm1_rm1)]). fof(rqRealAdd__k2_xcmplx_0__r1_r0_r1,theorem,( k2_xcmplx_0(1,0) = 1 ), file(arithm,rqRealAdd__k2_xcmplx_0__r1_r0_r1), [interesting(0.9),axiom,file(arithm,rqRealAdd__k2_xcmplx_0__r1_r0_r1)]). fof(rqRealAdd__k2_xcmplx_0__r1_rm1_r0,theorem,( k2_xcmplx_0(1,k4_xcmplx_0(1)) = 0 ), file(arithm,rqRealAdd__k2_xcmplx_0__r1_rm1_r0), [interesting(0.9),axiom,file(arithm,rqRealAdd__k2_xcmplx_0__r1_rm1_r0)]). fof(rqRealAdd__k2_xcmplx_0__rm1_r0_rm1,theorem,( k2_xcmplx_0(k4_xcmplx_0(1),0) = k4_xcmplx_0(1) ), file(arithm,rqRealAdd__k2_xcmplx_0__rm1_r0_rm1), [interesting(0.9),axiom,file(arithm,rqRealAdd__k2_xcmplx_0__rm1_r0_rm1)]). fof(rqRealAdd__k2_xcmplx_0__rm1_r1_r0,theorem,( k2_xcmplx_0(k4_xcmplx_0(1),1) = 0 ), file(arithm,rqRealAdd__k2_xcmplx_0__rm1_r1_r0), [interesting(0.9),axiom,file(arithm,rqRealAdd__k2_xcmplx_0__rm1_r1_r0)]). fof(rqRealDiff__k6_xcmplx_0__r0_r0_r0,theorem,( k6_xcmplx_0(0,0) = 0 ), file(arithm,rqRealDiff__k6_xcmplx_0__r0_r0_r0), [interesting(0.9),axiom,file(arithm,rqRealDiff__k6_xcmplx_0__r0_r0_r0)]). fof(rqRealDiff__k6_xcmplx_0__r0_r1_rm1,theorem,( k6_xcmplx_0(0,1) = k4_xcmplx_0(1) ), file(arithm,rqRealDiff__k6_xcmplx_0__r0_r1_rm1), [interesting(0.9),axiom,file(arithm,rqRealDiff__k6_xcmplx_0__r0_r1_rm1)]). fof(rqRealDiff__k6_xcmplx_0__r0_rm1_r1,theorem,( k6_xcmplx_0(0,k4_xcmplx_0(1)) = 1 ), file(arithm,rqRealDiff__k6_xcmplx_0__r0_rm1_r1), [interesting(0.9),axiom,file(arithm,rqRealDiff__k6_xcmplx_0__r0_rm1_r1)]). fof(rqRealDiff__k6_xcmplx_0__r1_r0_r1,theorem,( k6_xcmplx_0(1,0) = 1 ), file(arithm,rqRealDiff__k6_xcmplx_0__r1_r0_r1), [interesting(0.9),axiom,file(arithm,rqRealDiff__k6_xcmplx_0__r1_r0_r1)]). fof(rqRealDiff__k6_xcmplx_0__r1_r1_r0,theorem,( k6_xcmplx_0(1,1) = 0 ), file(arithm,rqRealDiff__k6_xcmplx_0__r1_r1_r0), [interesting(0.9),axiom,file(arithm,rqRealDiff__k6_xcmplx_0__r1_r1_r0)]). fof(rqRealDiff__k6_xcmplx_0__rm1_r0_rm1,theorem,( k6_xcmplx_0(k4_xcmplx_0(1),0) = k4_xcmplx_0(1) ), file(arithm,rqRealDiff__k6_xcmplx_0__rm1_r0_rm1), [interesting(0.9),axiom,file(arithm,rqRealDiff__k6_xcmplx_0__rm1_r0_rm1)]). fof(rqRealDiff__k6_xcmplx_0__rm1_rm1_r0,theorem,( k6_xcmplx_0(k4_xcmplx_0(1),k4_xcmplx_0(1)) = 0 ), file(arithm,rqRealDiff__k6_xcmplx_0__rm1_rm1_r0), [interesting(0.9),axiom,file(arithm,rqRealDiff__k6_xcmplx_0__rm1_rm1_r0)]). fof(rqRealNeg__k4_xcmplx_0__r0_r0,theorem,( k4_xcmplx_0(0) = 0 ), file(arithm,rqRealNeg__k4_xcmplx_0__r0_r0), [interesting(0.9),axiom,file(arithm,rqRealNeg__k4_xcmplx_0__r0_r0)]). fof(spc1_arithm,theorem,( ! [A,B] : ( ( v1_xcmplx_0(A) & v1_xcmplx_0(B) ) => k2_xcmplx_0(A,k4_xcmplx_0(B)) = k6_xcmplx_0(A,B) ) ), file(arithm,spc1_arithm), [interesting(0.9),axiom,file(arithm,spc1_arithm)]). fof(spc6_arithm,theorem,( ! [A,B,C] : ( ( v1_xcmplx_0(A) & v1_xcmplx_0(B) & v1_xcmplx_0(C) ) => k2_xcmplx_0(k2_xcmplx_0(A,B),C) = k2_xcmplx_0(A,k2_xcmplx_0(B,C)) ) ), file(arithm,spc6_arithm), [interesting(0.9),axiom,file(arithm,spc6_arithm)]). fof(spc8_arithm,theorem,( ! [A,B] : ( ( v1_xcmplx_0(A) & v1_xcmplx_0(B) ) => k2_xcmplx_0(k4_xcmplx_0(A),k4_xcmplx_0(B)) = k4_xcmplx_0(k2_xcmplx_0(A,B)) ) ), file(arithm,spc8_arithm), [interesting(0.9),axiom,file(arithm,spc8_arithm)]). fof(spc9_arithm,theorem,( ! [A,B] : ( ( v1_xcmplx_0(A) & v1_xcmplx_0(B) ) => k6_xcmplx_0(k4_xcmplx_0(A),k4_xcmplx_0(B)) = k6_xcmplx_0(B,A) ) ), file(arithm,spc9_arithm), [interesting(0.9),axiom,file(arithm,spc9_arithm)]). fof(t1_arithm,theorem,( ! [A] : ( v1_xcmplx_0(A) => k2_xcmplx_0(A,0) = A ) ), file(arithm,t1_arithm), [interesting(0.9),axiom,file(arithm,t1_arithm)]). fof(t4_arithm,theorem,( ! [A] : ( v1_xcmplx_0(A) => k6_xcmplx_0(A,0) = A ) ), file(arithm,t4_arithm), [interesting(0.9),axiom,file(arithm,t4_arithm)]). fof(commutativity_k2_xcmplx_0,theorem,( ! [A,B] : ( ( v1_xcmplx_0(A) & v1_xcmplx_0(B) ) => k2_xcmplx_0(A,B) = k2_xcmplx_0(B,A) ) ), file(xcmplx_0,k2_xcmplx_0), [interesting(0.9),axiom,file(xcmplx_0,k2_xcmplx_0)]). fof(commutativity_k3_real_1,theorem,( ! [A,B] : ( ( m1_subset_1(A,k1_numbers) & m1_subset_1(B,k1_numbers) ) => k3_real_1(A,B) = k3_real_1(B,A) ) ), file(real_1,k3_real_1), [interesting(0.9),axiom,file(real_1,k3_real_1)]). fof(involutiveness_k4_xcmplx_0,theorem,( ! [A] : ( v1_xcmplx_0(A) => k4_xcmplx_0(k4_xcmplx_0(A)) = A ) ), file(xcmplx_0,k4_xcmplx_0), [interesting(0.9),axiom,file(xcmplx_0,k4_xcmplx_0)]). fof(redefinition_k3_finseq_1,definition,( ! [A] : ( ( v1_relat_1(A) & v1_funct_1(A) & v1_finseq_1(A) ) => k3_finseq_1(A) = k1_card_1(A) ) ), file(finseq_1,k3_finseq_1), [interesting(0.9),axiom,file(finseq_1,k3_finseq_1)]). fof(redefinition_k3_real_1,definition,( ! [A,B] : ( ( m1_subset_1(A,k1_numbers) & m1_subset_1(B,k1_numbers) ) => k3_real_1(A,B) = k2_xcmplx_0(A,B) ) ), file(real_1,k3_real_1), [interesting(0.9),axiom,file(real_1,k3_real_1)]). fof(redefinition_k5_real_1,definition,( ! [A,B] : ( ( m1_subset_1(A,k1_numbers) & m1_subset_1(B,k1_numbers) ) => k5_real_1(A,B) = k6_xcmplx_0(A,B) ) ), file(real_1,k5_real_1), [interesting(0.9),axiom,file(real_1,k5_real_1)]). fof(dt_k2_xcmplx_0,axiom,( $true ), file(xcmplx_0,k2_xcmplx_0), [interesting(0.9),axiom,file(xcmplx_0,k2_xcmplx_0)]). fof(dt_k3_finseq_1,axiom,( ! [A] : ( ( v1_relat_1(A) & v1_funct_1(A) & v1_finseq_1(A) ) => m2_subset_1(k3_finseq_1(A),k1_numbers,k5_numbers) ) ), file(finseq_1,k3_finseq_1), [interesting(0.9),axiom,file(finseq_1,k3_finseq_1)]). fof(dt_k3_real_1,axiom,( ! [A,B] : ( ( m1_subset_1(A,k1_numbers) & m1_subset_1(B,k1_numbers) ) => m1_subset_1(k3_real_1(A,B),k1_numbers) ) ), file(real_1,k3_real_1), [interesting(0.9),axiom,file(real_1,k3_real_1)]). fof(dt_k4_xcmplx_0,axiom,( ! [A] : ( v1_xcmplx_0(A) => v1_xcmplx_0(k4_xcmplx_0(A)) ) ), file(xcmplx_0,k4_xcmplx_0), [interesting(0.9),axiom,file(xcmplx_0,k4_xcmplx_0)]). fof(dt_k5_real_1,axiom,( ! [A,B] : ( ( m1_subset_1(A,k1_numbers) & m1_subset_1(B,k1_numbers) ) => m1_subset_1(k5_real_1(A,B),k1_numbers) ) ), file(real_1,k5_real_1), [interesting(0.9),axiom,file(real_1,k5_real_1)]). fof(dt_k6_xcmplx_0,axiom,( $true ), file(xcmplx_0,k6_xcmplx_0), [interesting(0.9),axiom,file(xcmplx_0,k6_xcmplx_0)]). fof(dt_c1_10_2__binari_3,assumption,( m2_subset_1(c1_10_2__binari_3,k1_numbers,k5_numbers) ), introduced(assumption,[file(binari_3,c1_10_2__binari_3)]), [interesting(0.65),axiom,file(binari_3,c1_10_2__binari_3)]). fof(rqRealNeg__k4_xcmplx_0__rm1_r1,theorem,( k4_xcmplx_0(k4_xcmplx_0(1)) = 1 ), file(arithm,rqRealNeg__k4_xcmplx_0__rm1_r1), [interesting(0.9),axiom,file(arithm,rqRealNeg__k4_xcmplx_0__rm1_r1)]). fof(t61_finseq_5,theorem,( ! [A] : ( m2_subset_1(A,k1_numbers,k5_numbers) => ! [B] : ( ( v1_relat_1(B) & v1_funct_1(B) & v1_finseq_1(B) ) => ( r2_hidden(A,k4_finseq_1(B)) => k1_funct_1(k3_finseq_5(B),A) = k1_funct_1(B,k2_xcmplx_0(k6_xcmplx_0(k3_finseq_1(B),A),1)) ) ) ) ), file(finseq_5,t61_finseq_5), [interesting(0.9),axiom,file(finseq_5,t61_finseq_5)]). fof(rqRealNeg__k4_xcmplx_0__r1_rm1,theorem,( k4_xcmplx_0(1) = k4_xcmplx_0(1) ), file(arithm,rqRealNeg__k4_xcmplx_0__r1_rm1), [interesting(0.9),axiom,file(arithm,rqRealNeg__k4_xcmplx_0__r1_rm1)]). fof(e1_10_2_1__binari_3,plain,( k1_funct_1(k4_finseq_5(k6_margrel1,k6_binarith(c1_10__binari_3,c2_10__binari_3)),c1_10_2__binari_3) = k1_funct_1(k6_binarith(c1_10__binari_3,c2_10__binari_3),k3_real_1(k5_real_1(k3_finseq_1(k6_binarith(c1_10__binari_3,c2_10__binari_3)),c1_10_2__binari_3),1)) ), inference(mizar_by,[status(thm),assumptions([dt_c1_10__binari_3,dt_c1_10_2__binari_3,dt_c2_10__binari_3,e1_10_2__binari_3])],[existence_m1_relset_1,dt_k2_zfmisc_1,dt_m1_relset_1,cc1_relset_1,fc14_membered,fc15_membered,rc1_margrel1,reflexivity_r1_tarski,existence_m1_finseq_2,existence_m2_relset_1,redefinition_m2_relset_1,dt_k1_xboole_0,dt_m1_finseq_2,dt_m2_relset_1,cc12_membered,cc13_membered,cc14_membered,cc18_membered,cc19_membered,cc1_membered,cc20_membered,cc2_membered,cc3_membered,cc3_nat_1,fc13_membered,fc16_membered,fc1_margrel1,fc1_nat_1,fc3_nat_1,fc4_nat_1,fc6_membered,rc1_membered,rc1_nat_1,rc2_margrel1,rc2_nat_1,rc3_nat_1,commutativity_k2_tarski,existence_m1_finseq_1,existence_m1_subset_1,existence_m2_finseq_1,existence_m2_finseq_2,redefinition_m2_finseq_1,redefinition_m2_finseq_2,dt_k1_card_1,dt_k1_relat_1,dt_k1_zfmisc_1,dt_k2_tarski,dt_k4_finseq_2,dt_k5_ordinal2,dt_m1_finseq_1,dt_m1_subset_1,dt_m2_finseq_1,dt_m2_finseq_2,cc10_membered,cc11_membered,cc15_membered,cc16_membered,cc17_membered,cc1_margrel1,cc1_nat_1,cc2_nat_1,cc4_membered,cc6_membered,cc9_membered,fc12_membered,fc5_membered,rqRealAdd__k2_xcmplx_0__r0_r0_r0,rqRealAdd__k2_xcmplx_0__r0_r1_r1,rqRealAdd__k2_xcmplx_0__r0_rm1_rm1,rqRealAdd__k2_xcmplx_0__r1_r0_r1,rqRealAdd__k2_xcmplx_0__r1_rm1_r0,rqRealAdd__k2_xcmplx_0__rm1_r0_rm1,rqRealAdd__k2_xcmplx_0__rm1_r1_r0,rqRealDiff__k6_xcmplx_0__r0_r0_r0,rqRealDiff__k6_xcmplx_0__r0_r1_rm1,rqRealDiff__k6_xcmplx_0__r0_rm1_r1,rqRealDiff__k6_xcmplx_0__r1_r0_r1,rqRealDiff__k6_xcmplx_0__r1_r1_r0,rqRealDiff__k6_xcmplx_0__rm1_r0_rm1,rqRealDiff__k6_xcmplx_0__rm1_rm1_r0,rqRealNeg__k4_xcmplx_0__r0_r0,spc0_boole,spc0_numerals,spc1_arithm,spc6_arithm,spc8_arithm,spc9_arithm,t1_arithm,t1_numerals,t2_subset,t3_subset,t4_arithm,t4_subset,t5_subset,t6_boole,t8_boole,spc0_numerals,spc0_boole,commutativity_k2_xcmplx_0,commutativity_k3_real_1,involutiveness_k4_xcmplx_0,antisymmetry_r2_hidden,existence_m2_subset_1,redefinition_k3_finseq_1,redefinition_k3_real_1,redefinition_k4_finseq_1,redefinition_k4_finseq_5,redefinition_k5_numbers,redefinition_k5_real_1,redefinition_m2_subset_1,dt_k1_funct_1,dt_k1_numbers,dt_k2_xcmplx_0,dt_k3_finseq_1,dt_k3_finseq_5,dt_k3_real_1,dt_k4_finseq_1,dt_k4_finseq_5,dt_k4_xcmplx_0,dt_k5_numbers,dt_k5_real_1,dt_k6_binarith,dt_k6_margrel1,dt_k6_xcmplx_0,dt_m2_subset_1,dt_c1_10__binari_3,dt_c1_10_2__binari_3,dt_c2_10__binari_3,fc2_membered,fc3_margrel1,rqRealNeg__k4_xcmplx_0__rm1_r1,t1_subset,t7_boole,d12_margrel1,spc1_numerals,spc1_boole,e1_10_2__binari_3,t61_finseq_5,rqRealNeg__k4_xcmplx_0__r1_rm1]), [interesting(0.5),file(binari_3,e1_10_2_1__binari_3),[file(binari_3,e1_10_2_1__binari_3)]]). fof(dt_k1_euclid,axiom,( ! [A] : ( m1_subset_1(A,k5_numbers) => ( ~ v1_xboole_0(k1_euclid(A)) & m1_finseq_2(k1_euclid(A),k1_numbers) ) ) ), file(euclid,k1_euclid), [interesting(0.9),axiom,file(euclid,k1_euclid)]). fof(dt_k2_finseq_2,axiom,( ! [A,B] : ( v4_ordinal2(A) => ( v1_relat_1(k2_finseq_2(A,B)) & v1_funct_1(k2_finseq_2(A,B)) & v1_finseq_1(k2_finseq_2(A,B)) ) ) ), file(finseq_2,k2_finseq_2), [interesting(0.9),axiom,file(finseq_2,k2_finseq_2)]). fof(dt_k4_euclid,axiom,( ! [A] : ( m1_subset_1(A,k5_numbers) => m2_finseq_1(k4_euclid(A),k1_numbers) ) ), file(euclid,k4_euclid), [interesting(0.9),axiom,file(euclid,k4_euclid)]). fof(redefinition_k4_finseqop,definition,( ! [A,B,C] : ( ( ~ v1_xboole_0(A) & m1_subset_1(B,k5_numbers) & m1_subset_1(C,A) ) => k4_finseqop(A,B,C) = k2_finseq_2(B,C) ) ), file(finseqop,k4_finseqop), [interesting(0.9),axiom,file(finseqop,k4_finseqop)]). fof(redefinition_k5_euclid,definition,( ! [A] : ( m1_subset_1(A,k5_numbers) => k5_euclid(A) = k4_euclid(A) ) ), file(euclid,k5_euclid), [interesting(0.9),axiom,file(euclid,k5_euclid)]). fof(dt_k4_finseqop,axiom,( ! [A,B,C] : ( ( ~ v1_xboole_0(A) & m1_subset_1(B,k5_numbers) & m1_subset_1(C,A) ) => m2_finseq_2(k4_finseqop(A,B,C),A,k4_finseq_2(B,A)) ) ), file(finseqop,k4_finseqop), [interesting(0.9),axiom,file(finseqop,k4_finseqop)]). fof(dt_k5_euclid,axiom,( ! [A] : ( m1_subset_1(A,k5_numbers) => m2_finseq_2(k5_euclid(A),k1_numbers,k1_euclid(A)) ) ), file(euclid,k5_euclid), [interesting(0.9),axiom,file(euclid,k5_euclid)]). fof(t6_binari_3,theorem,( ! [A] : ( m2_subset_1(A,k1_numbers,k5_numbers) => ! [B] : ( m2_finseq_2(B,k6_margrel1,k4_finseq_2(A,k6_margrel1)) => ( B = k5_euclid(A) => k6_binarith(A,B) = k4_finseqop(k1_numbers,A,1) ) ) ) ), file(binari_3,t6_binari_3), [interesting(0.9),axiom,file(binari_3,t6_binari_3)]). fof(e2_10_2_1__binari_3,plain,( k1_funct_1(k6_binarith(c1_10__binari_3,c2_10__binari_3),k3_real_1(k5_real_1(k3_finseq_1(k6_binarith(c1_10__binari_3,c2_10__binari_3)),c1_10_2__binari_3),1)) = k1_funct_1(k4_finseqop(k1_numbers,c1_10__binari_3,1),k3_real_1(k5_real_1(k3_finseq_1(k6_binarith(c1_10__binari_3,c2_10__binari_3)),c1_10_2__binari_3),1)) ), inference(mizar_by,[status(thm),assumptions([dt_c1_10__binari_3,dt_c1_10_2__binari_3,dt_c2_10__binari_3,e1_10__binari_3])],[existence_m1_relset_1,dt_k2_zfmisc_1,dt_m1_relset_1,cc1_relset_1,fc14_membered,fc15_membered,rc1_margrel1,reflexivity_r1_tarski,antisymmetry_r2_hidden,existence_m1_finseq_1,existence_m2_relset_1,redefinition_m2_relset_1,dt_k1_xboole_0,dt_m1_finseq_1,dt_m2_relset_1,cc12_membered,cc13_membered,cc14_membered,cc18_membered,cc19_membered,cc1_membered,cc20_membered,cc2_membered,cc3_membered,fc13_membered,fc1_margrel1,fc6_membered,rc1_membered,rc1_nat_1,rc2_margrel1,rc2_nat_1,rc3_nat_1,t1_subset,t4_subset,t5_subset,commutativity_k2_tarski,commutativity_k2_xcmplx_0,existence_m1_finseq_2,existence_m1_subset_1,existence_m2_finseq_1,redefinition_m2_finseq_1,dt_k1_card_1,dt_k1_euclid,dt_k1_zfmisc_1,dt_k2_finseq_2,dt_k2_tarski,dt_k2_xcmplx_0,dt_k4_euclid,dt_k5_ordinal2,dt_k6_xcmplx_0,dt_m1_finseq_2,dt_m1_subset_1,dt_m2_finseq_1,cc10_membered,cc11_membered,cc15_membered,cc16_membered,cc17_membered,cc1_margrel1,cc1_nat_1,cc2_nat_1,cc3_nat_1,cc4_membered,cc6_membered,cc9_membered,fc12_membered,fc16_membered,fc1_nat_1,fc3_nat_1,fc4_nat_1,fc5_membered,rqRealAdd__k2_xcmplx_0__r0_r0_r0,rqRealAdd__k2_xcmplx_0__r0_r1_r1,rqRealAdd__k2_xcmplx_0__r0_rm1_rm1,rqRealAdd__k2_xcmplx_0__r1_r0_r1,rqRealAdd__k2_xcmplx_0__r1_rm1_r0,rqRealAdd__k2_xcmplx_0__rm1_r0_rm1,rqRealAdd__k2_xcmplx_0__rm1_r1_r0,rqRealDiff__k6_xcmplx_0__r0_r0_r0,rqRealDiff__k6_xcmplx_0__r0_r1_rm1,rqRealDiff__k6_xcmplx_0__r0_rm1_r1,rqRealDiff__k6_xcmplx_0__r1_r0_r1,rqRealDiff__k6_xcmplx_0__r1_r1_r0,rqRealDiff__k6_xcmplx_0__rm1_r0_rm1,rqRealDiff__k6_xcmplx_0__rm1_rm1_r0,rqRealNeg__k4_xcmplx_0__r0_r0,spc0_boole,spc0_numerals,spc1_arithm,spc6_arithm,spc8_arithm,spc9_arithm,t1_arithm,t1_numerals,t2_subset,t3_subset,t4_arithm,t6_boole,t7_boole,t8_boole,spc0_numerals,spc0_boole,commutativity_k3_real_1,involutiveness_k4_xcmplx_0,existence_m2_finseq_2,existence_m2_subset_1,redefinition_k3_finseq_1,redefinition_k3_real_1,redefinition_k4_finseqop,redefinition_k5_euclid,redefinition_k5_numbers,redefinition_k5_real_1,redefinition_m2_finseq_2,redefinition_m2_subset_1,dt_k1_funct_1,dt_k1_numbers,dt_k3_finseq_1,dt_k3_real_1,dt_k4_finseq_2,dt_k4_finseqop,dt_k4_xcmplx_0,dt_k5_euclid,dt_k5_numbers,dt_k5_real_1,dt_k6_binarith,dt_k6_margrel1,dt_m2_finseq_2,dt_m2_subset_1,dt_c1_10__binari_3,dt_c1_10_2__binari_3,dt_c2_10__binari_3,fc2_membered,fc3_margrel1,rqRealNeg__k4_xcmplx_0__rm1_r1,d12_margrel1,spc1_numerals,spc1_boole,e1_10__binari_3,t6_binari_3,rqRealNeg__k4_xcmplx_0__r1_rm1]), [interesting(0.5),file(binari_3,e2_10_2_1__binari_3),[file(binari_3,e2_10_2_1__binari_3)]]). fof(dt_k1_finseq_1,axiom,( $true ), file(finseq_1,k1_finseq_1), [interesting(0.9),axiom,file(finseq_1,k1_finseq_1)]). fof(redefinition_k2_finseq_1,definition,( ! [A] : ( v4_ordinal2(A) => k2_finseq_1(A) = k1_finseq_1(A) ) ), file(finseq_1,k2_finseq_1), [interesting(0.9),axiom,file(finseq_1,k2_finseq_1)]). fof(dt_k2_finseq_1,axiom,( ! [A] : ( v4_ordinal2(A) => m1_subset_1(k2_finseq_1(A),k1_zfmisc_1(k5_numbers)) ) ), file(finseq_1,k2_finseq_1), [interesting(0.9),axiom,file(finseq_1,k2_finseq_1)]). fof(d3_finseq_1,definition,( ! [A] : ( ( v1_relat_1(A) & v1_funct_1(A) & v1_finseq_1(A) ) => ! [B] : ( m2_subset_1(B,k1_numbers,k5_numbers) => ( B = k3_finseq_1(A) <=> k2_finseq_1(B) = k1_relat_1(A) ) ) ) ), file(finseq_1,d3_finseq_1), [interesting(0.9),axiom,file(finseq_1,d3_finseq_1)]). fof(e2_10_2__binari_3,plain,( r2_hidden(c1_10_2__binari_3,k2_finseq_1(k3_finseq_1(k6_binarith(c1_10__binari_3,c2_10__binari_3)))) ), inference(mizar_by,[status(thm),assumptions([dt_c1_10__binari_3,dt_c1_10_2__binari_3,dt_c2_10__binari_3,e1_10_2__binari_3])],[existence_m1_relset_1,dt_k2_zfmisc_1,dt_m1_relset_1,cc1_relset_1,existence_m1_finseq_1,existence_m2_relset_1,redefinition_m2_relset_1,dt_m1_finseq_1,dt_m2_relset_1,fc14_membered,fc15_membered,rc1_margrel1,commutativity_k2_tarski,reflexivity_r1_tarski,existence_m1_finseq_2,existence_m2_finseq_1,redefinition_m2_finseq_1,dt_k1_xboole_0,dt_k2_tarski,dt_m1_finseq_2,dt_m2_finseq_1,cc12_membered,cc13_membered,cc14_membered,cc18_membered,cc19_membered,cc1_membered,cc20_membered,cc2_membered,cc3_membered,fc12_membered,fc13_membered,fc16_membered,fc1_margrel1,fc6_membered,rc1_membered,rc1_nat_1,rc2_margrel1,rc2_nat_1,rc3_nat_1,spc0_boole,spc1_boole,t1_numerals,spc0_numerals,spc1_numerals,spc0_boole,spc1_boole,existence_m1_subset_1,existence_m2_finseq_2,redefinition_m2_finseq_2,dt_k1_card_1,dt_k1_finseq_1,dt_k1_zfmisc_1,dt_k4_finseq_2,dt_k5_ordinal2,dt_k6_margrel1,dt_m1_subset_1,dt_m2_finseq_2,cc10_membered,cc11_membered,cc15_membered,cc16_membered,cc17_membered,cc1_margrel1,cc1_nat_1,cc2_nat_1,cc3_nat_1,cc4_membered,cc6_membered,cc9_membered,fc3_margrel1,fc5_membered,t2_subset,t3_subset,t4_subset,t5_subset,t6_boole,t8_boole,d12_margrel1,antisymmetry_r2_hidden,existence_m2_subset_1,redefinition_k2_finseq_1,redefinition_k3_finseq_1,redefinition_k4_finseq_1,redefinition_k5_numbers,redefinition_m2_subset_1,dt_k1_numbers,dt_k1_relat_1,dt_k2_finseq_1,dt_k3_finseq_1,dt_k4_finseq_1,dt_k5_numbers,dt_k6_binarith,dt_m2_subset_1,dt_c1_10__binari_3,dt_c1_10_2__binari_3,dt_c2_10__binari_3,fc2_membered,t1_subset,t7_boole,e1_10_2__binari_3,d3_finseq_1]), [interesting(0.65),file(binari_3,e2_10_2__binari_3),[file(binari_3,e2_10_2__binari_3)]]). fof(t109_finseq_2,theorem,( ! [A] : ( m2_subset_1(A,k1_numbers,k5_numbers) => ! [B] : ( ~ v1_xboole_0(B) => ! [C] : ( m2_finseq_2(C,B,k4_finseq_2(A,B)) => k3_finseq_1(C) = A ) ) ) ), file(finseq_2,t109_finseq_2), [interesting(0.9),axiom,file(finseq_2,t109_finseq_2)]). fof(e3_10_2__binari_3,plain,( r2_hidden(c1_10_2__binari_3,k2_finseq_1(c1_10__binari_3)) ), inference(mizar_by,[status(thm),assumptions([dt_c1_10__binari_3,dt_c1_10_2__binari_3,dt_c2_10__binari_3,e1_10_2__binari_3])],[existence_m1_relset_1,dt_k2_zfmisc_1,dt_m1_relset_1,cc1_relset_1,commutativity_k2_tarski,reflexivity_r1_tarski,existence_m1_finseq_1,existence_m2_relset_1,redefinition_m2_relset_1,dt_k2_tarski,dt_m1_finseq_1,dt_m2_relset_1,fc12_membered,fc13_membered,fc14_membered,fc15_membered,fc16_membered,rc1_margrel1,rc1_nat_1,rc2_margrel1,rc2_nat_1,rc3_nat_1,spc0_boole,spc1_boole,t1_numerals,spc0_numerals,spc1_numerals,spc0_boole,spc1_boole,existence_m1_finseq_2,existence_m1_subset_1,existence_m2_finseq_1,redefinition_m2_finseq_1,dt_k1_card_1,dt_k1_finseq_1,dt_k1_xboole_0,dt_k1_zfmisc_1,dt_k5_ordinal2,dt_k6_margrel1,dt_m1_finseq_2,dt_m1_subset_1,dt_m2_finseq_1,cc10_membered,cc11_membered,cc12_membered,cc13_membered,cc14_membered,cc16_membered,cc17_membered,cc18_membered,cc19_membered,cc1_margrel1,cc1_membered,cc1_nat_1,cc20_membered,cc2_membered,cc2_nat_1,cc3_membered,cc3_nat_1,cc4_membered,cc6_membered,cc9_membered,fc1_margrel1,fc3_margrel1,fc5_membered,fc6_membered,rc1_membered,t2_subset,t3_subset,t4_subset,t5_subset,d12_margrel1,antisymmetry_r2_hidden,existence_m2_finseq_2,existence_m2_subset_1,redefinition_k2_finseq_1,redefinition_k3_finseq_1,redefinition_k5_numbers,redefinition_m2_finseq_2,redefinition_m2_subset_1,dt_k1_numbers,dt_k2_finseq_1,dt_k3_finseq_1,dt_k4_finseq_2,dt_k5_numbers,dt_k6_binarith,dt_m2_finseq_2,dt_m2_subset_1,dt_c1_10__binari_3,dt_c1_10_2__binari_3,dt_c2_10__binari_3,cc15_membered,fc2_membered,t1_subset,t6_boole,t7_boole,t8_boole,e2_10_2__binari_3,t109_finseq_2]), [interesting(0.65),file(binari_3,e3_10_2__binari_3),[file(binari_3,e3_10_2__binari_3)]]). fof(t2_finseq_5,theorem,( ! [A] : ( m2_subset_1(A,k1_numbers,k5_numbers) => ! [B] : ( m2_subset_1(B,k1_numbers,k5_numbers) => ( r2_hidden(A,k2_finseq_1(B)) => r2_hidden(k2_xcmplx_0(k6_xcmplx_0(B,A),1),k2_finseq_1(B)) ) ) ) ), file(finseq_5,t2_finseq_5), [interesting(0.9),axiom,file(finseq_5,t2_finseq_5)]). fof(e4_10_2__binari_3,plain,( r2_hidden(k3_real_1(k5_real_1(c1_10__binari_3,c1_10_2__binari_3),1),k2_finseq_1(c1_10__binari_3)) ), inference(mizar_by,[status(thm),assumptions([dt_c1_10__binari_3,dt_c1_10_2__binari_3,dt_c2_10__binari_3,e1_10_2__binari_3])],[rc1_margrel1,reflexivity_r1_tarski,dt_k1_xboole_0,cc12_membered,cc13_membered,cc14_membered,cc18_membered,cc19_membered,cc1_membered,cc20_membered,cc2_membered,cc3_membered,fc1_margrel1,fc6_membered,rc1_membered,rc1_nat_1,rc2_nat_1,rc3_nat_1,existence_m1_subset_1,dt_k1_finseq_1,dt_k1_zfmisc_1,dt_k5_ordinal2,dt_m1_subset_1,cc10_membered,cc11_membered,cc15_membered,cc16_membered,cc17_membered,cc1_nat_1,cc2_nat_1,cc3_nat_1,cc4_membered,cc6_membered,cc9_membered,fc1_nat_1,fc3_nat_1,fc4_nat_1,fc5_membered,spc1_arithm,spc6_arithm,spc8_arithm,spc9_arithm,t2_subset,t3_subset,t4_subset,t5_subset,t6_boole,t8_boole,commutativity_k2_xcmplx_0,commutativity_k3_real_1,involutiveness_k4_xcmplx_0,antisymmetry_r2_hidden,existence_m2_subset_1,redefinition_k2_finseq_1,redefinition_k3_real_1,redefinition_k5_numbers,redefinition_k5_real_1,redefinition_m2_subset_1,dt_k1_numbers,dt_k2_finseq_1,dt_k2_xcmplx_0,dt_k3_real_1,dt_k4_xcmplx_0,dt_k5_numbers,dt_k5_real_1,dt_k6_xcmplx_0,dt_m2_subset_1,dt_c1_10__binari_3,dt_c1_10_2__binari_3,fc2_membered,rqRealNeg__k4_xcmplx_0__rm1_r1,t1_subset,t7_boole,spc1_numerals,spc1_boole,e3_10_2__binari_3,t2_finseq_5,rqRealNeg__k4_xcmplx_0__r1_rm1]), [interesting(0.65),file(binari_3,e4_10_2__binari_3),[file(binari_3,e4_10_2__binari_3)]]). fof(e5_10_2__binari_3,plain,( r2_hidden(k3_real_1(k5_real_1(k3_finseq_1(k6_binarith(c1_10__binari_3,c2_10__binari_3)),c1_10_2__binari_3),1),k2_finseq_1(c1_10__binari_3)) ), inference(mizar_by,[status(thm),assumptions([dt_c1_10__binari_3,dt_c1_10_2__binari_3,dt_c2_10__binari_3,e1_10_2__binari_3])],[existence_m1_relset_1,dt_k2_zfmisc_1,dt_m1_relset_1,cc1_relset_1,commutativity_k2_tarski,reflexivity_r1_tarski,existence_m1_finseq_1,existence_m2_relset_1,redefinition_m2_relset_1,dt_k2_tarski,dt_m1_finseq_1,dt_m2_relset_1,fc12_membered,fc13_membered,fc14_membered,fc15_membered,fc16_membered,rc1_margrel1,rc1_nat_1,rc2_margrel1,rc2_nat_1,rc3_nat_1,rqRealAdd__k2_xcmplx_0__r0_r0_r0,rqRealAdd__k2_xcmplx_0__r0_r1_r1,rqRealAdd__k2_xcmplx_0__r0_rm1_rm1,rqRealAdd__k2_xcmplx_0__r1_r0_r1,rqRealAdd__k2_xcmplx_0__r1_rm1_r0,rqRealAdd__k2_xcmplx_0__rm1_r0_rm1,rqRealAdd__k2_xcmplx_0__rm1_r1_r0,rqRealDiff__k6_xcmplx_0__r0_r0_r0,rqRealDiff__k6_xcmplx_0__r0_r1_rm1,rqRealDiff__k6_xcmplx_0__r0_rm1_r1,rqRealDiff__k6_xcmplx_0__r1_r0_r1,rqRealDiff__k6_xcmplx_0__r1_r1_r0,rqRealDiff__k6_xcmplx_0__rm1_r0_rm1,rqRealDiff__k6_xcmplx_0__rm1_rm1_r0,rqRealNeg__k4_xcmplx_0__r0_r0,spc0_boole,spc0_numerals,t1_arithm,t1_numerals,t4_arithm,spc0_numerals,spc0_boole,commutativity_k2_xcmplx_0,existence_m1_finseq_2,existence_m1_subset_1,existence_m2_finseq_1,redefinition_m2_finseq_1,dt_k1_card_1,dt_k1_finseq_1,dt_k1_xboole_0,dt_k1_zfmisc_1,dt_k2_xcmplx_0,dt_k5_ordinal2,dt_k6_margrel1,dt_k6_xcmplx_0,dt_m1_finseq_2,dt_m1_subset_1,dt_m2_finseq_1,cc10_membered,cc11_membered,cc12_membered,cc13_membered,cc14_membered,cc16_membered,cc17_membered,cc18_membered,cc19_membered,cc1_margrel1,cc1_membered,cc1_nat_1,cc20_membered,cc2_membered,cc2_nat_1,cc3_membered,cc3_nat_1,cc4_membered,cc6_membered,cc9_membered,fc1_margrel1,fc1_nat_1,fc3_margrel1,fc3_nat_1,fc4_nat_1,fc5_membered,fc6_membered,rc1_membered,spc1_arithm,spc6_arithm,spc8_arithm,spc9_arithm,t2_subset,t3_subset,t4_subset,t5_subset,d12_margrel1,commutativity_k3_real_1,involutiveness_k4_xcmplx_0,antisymmetry_r2_hidden,existence_m2_finseq_2,existence_m2_subset_1,redefinition_k2_finseq_1,redefinition_k3_finseq_1,redefinition_k3_real_1,redefinition_k5_numbers,redefinition_k5_real_1,redefinition_m2_finseq_2,redefinition_m2_subset_1,dt_k1_numbers,dt_k2_finseq_1,dt_k3_finseq_1,dt_k3_real_1,dt_k4_finseq_2,dt_k4_xcmplx_0,dt_k5_numbers,dt_k5_real_1,dt_k6_binarith,dt_m2_finseq_2,dt_m2_subset_1,dt_c1_10__binari_3,dt_c1_10_2__binari_3,dt_c2_10__binari_3,cc15_membered,fc2_membered,rqRealNeg__k4_xcmplx_0__rm1_r1,spc1_boole,t1_subset,t6_boole,t7_boole,t8_boole,spc1_numerals,spc1_boole,e4_10_2__binari_3,t109_finseq_2,rqRealNeg__k4_xcmplx_0__r1_rm1]), [interesting(0.65),file(binari_3,e5_10_2__binari_3),[file(binari_3,e5_10_2__binari_3)]]). fof(t70_finseq_2,theorem,( ! [A] : ( v4_ordinal2(A) => ! [B,C] : ( r2_hidden(B,k2_finseq_1(A)) => k1_funct_1(k2_finseq_2(A,C),B) = C ) ) ), file(finseq_2,t70_finseq_2), [interesting(0.9),axiom,file(finseq_2,t70_finseq_2)]). fof(e3_10_2_1__binari_3,plain,( k1_funct_1(k4_finseqop(k1_numbers,c1_10__binari_3,1),k3_real_1(k5_real_1(k3_finseq_1(k6_binarith(c1_10__binari_3,c2_10__binari_3)),c1_10_2__binari_3),1)) = 1 ), inference(mizar_by,[status(thm),assumptions([dt_c1_10__binari_3,dt_c1_10_2__binari_3,dt_c2_10__binari_3,e1_10_2__binari_3])],[existence_m1_relset_1,dt_k2_zfmisc_1,dt_m1_relset_1,cc1_relset_1,existence_m1_finseq_1,existence_m2_relset_1,redefinition_m2_relset_1,dt_m1_finseq_1,dt_m2_relset_1,fc14_membered,fc15_membered,rc1_margrel1,commutativity_k2_tarski,reflexivity_r1_tarski,existence_m1_finseq_2,existence_m2_finseq_1,redefinition_m2_finseq_1,dt_k1_xboole_0,dt_k2_tarski,dt_k5_ordinal2,dt_m1_finseq_2,dt_m2_finseq_1,cc12_membered,cc13_membered,cc14_membered,cc18_membered,cc19_membered,cc1_membered,cc20_membered,cc2_membered,cc3_membered,fc12_membered,fc13_membered,fc16_membered,fc1_margrel1,fc5_membered,fc6_membered,rc1_membered,rc2_margrel1,rc2_nat_1,rc3_nat_1,rqRealAdd__k2_xcmplx_0__r0_r0_r0,rqRealAdd__k2_xcmplx_0__r0_r1_r1,rqRealAdd__k2_xcmplx_0__r0_rm1_rm1,rqRealAdd__k2_xcmplx_0__r1_r0_r1,rqRealAdd__k2_xcmplx_0__r1_rm1_r0,rqRealAdd__k2_xcmplx_0__rm1_r0_rm1,rqRealAdd__k2_xcmplx_0__rm1_r1_r0,rqRealDiff__k6_xcmplx_0__r0_r0_r0,rqRealDiff__k6_xcmplx_0__r0_r1_rm1,rqRealDiff__k6_xcmplx_0__r0_rm1_r1,rqRealDiff__k6_xcmplx_0__r1_r0_r1,rqRealDiff__k6_xcmplx_0__r1_r1_r0,rqRealDiff__k6_xcmplx_0__rm1_r0_rm1,rqRealDiff__k6_xcmplx_0__rm1_rm1_r0,rqRealNeg__k4_xcmplx_0__r0_r0,spc0_boole,spc0_numerals,t1_arithm,t1_numerals,t4_arithm,spc0_numerals,spc0_boole,commutativity_k2_xcmplx_0,existence_m1_subset_1,existence_m2_finseq_2,existence_m2_subset_1,redefinition_k5_numbers,redefinition_m2_finseq_2,redefinition_m2_subset_1,dt_k1_card_1,dt_k1_finseq_1,dt_k1_zfmisc_1,dt_k2_xcmplx_0,dt_k4_finseq_2,dt_k5_numbers,dt_k6_margrel1,dt_k6_xcmplx_0,dt_m1_subset_1,dt_m2_finseq_2,dt_m2_subset_1,cc10_membered,cc11_membered,cc15_membered,cc16_membered,cc17_membered,cc1_margrel1,cc1_nat_1,cc2_nat_1,cc4_membered,cc6_membered,cc9_membered,fc1_nat_1,fc3_margrel1,fc3_nat_1,fc4_nat_1,rc1_nat_1,spc1_arithm,spc6_arithm,spc8_arithm,spc9_arithm,t2_subset,t3_subset,t4_subset,t5_subset,t6_boole,t8_boole,d12_margrel1,commutativity_k3_real_1,involutiveness_k4_xcmplx_0,antisymmetry_r2_hidden,redefinition_k2_finseq_1,redefinition_k3_finseq_1,redefinition_k3_real_1,redefinition_k4_finseqop,redefinition_k5_real_1,dt_k1_funct_1,dt_k1_numbers,dt_k2_finseq_1,dt_k2_finseq_2,dt_k3_finseq_1,dt_k3_real_1,dt_k4_finseqop,dt_k4_xcmplx_0,dt_k5_real_1,dt_k6_binarith,dt_c1_10__binari_3,dt_c1_10_2__binari_3,dt_c2_10__binari_3,cc3_nat_1,fc2_membered,rqRealNeg__k4_xcmplx_0__rm1_r1,t1_subset,t7_boole,spc1_numerals,spc1_boole,e5_10_2__binari_3,t70_finseq_2,rqRealNeg__k4_xcmplx_0__r1_rm1]), [interesting(0.5),file(binari_3,e3_10_2_1__binari_3),[file(binari_3,e3_10_2_1__binari_3)]]). fof(e4_10_2_1__binari_3,plain,( 1 = k1_funct_1(k4_finseqop(k1_numbers,c1_10__binari_3,1),c1_10_2__binari_3) ), inference(mizar_by,[status(thm),assumptions([dt_c1_10__binari_3,dt_c1_10_2__binari_3,dt_c2_10__binari_3,e1_10_2__binari_3])],[existence_m1_relset_1,dt_k2_zfmisc_1,dt_m1_relset_1,cc1_relset_1,existence_m1_finseq_1,existence_m2_relset_1,redefinition_m2_relset_1,dt_m1_finseq_1,dt_m2_relset_1,rc1_margrel1,reflexivity_r1_tarski,existence_m1_finseq_2,existence_m2_finseq_1,redefinition_m2_finseq_1,dt_k1_xboole_0,dt_k5_ordinal2,dt_m1_finseq_2,dt_m2_finseq_1,cc12_membered,cc13_membered,cc14_membered,cc18_membered,cc19_membered,cc1_membered,cc20_membered,cc2_membered,cc3_membered,fc1_margrel1,fc5_membered,fc6_membered,rc1_membered,rc2_nat_1,rc3_nat_1,existence_m1_subset_1,existence_m2_finseq_2,existence_m2_subset_1,redefinition_k5_numbers,redefinition_m2_finseq_2,redefinition_m2_subset_1,dt_k1_finseq_1,dt_k1_zfmisc_1,dt_k4_finseq_2,dt_k5_numbers,dt_m1_subset_1,dt_m2_finseq_2,dt_m2_subset_1,cc10_membered,cc11_membered,cc15_membered,cc16_membered,cc17_membered,cc1_nat_1,cc2_nat_1,cc4_membered,cc6_membered,cc9_membered,rc1_nat_1,t2_subset,t3_subset,t4_subset,t5_subset,t6_boole,t8_boole,antisymmetry_r2_hidden,redefinition_k2_finseq_1,redefinition_k4_finseqop,dt_k1_funct_1,dt_k1_numbers,dt_k2_finseq_1,dt_k2_finseq_2,dt_k4_finseqop,dt_c1_10__binari_3,dt_c1_10_2__binari_3,cc3_nat_1,fc2_membered,t1_subset,t7_boole,spc1_numerals,spc1_boole,e3_10_2__binari_3,t70_finseq_2]), [interesting(0.5),file(binari_3,e4_10_2_1__binari_3),[file(binari_3,e4_10_2_1__binari_3)]]). fof(e5_10_2_1__binari_3,plain,( k1_funct_1(k4_finseqop(k1_numbers,c1_10__binari_3,1),c1_10_2__binari_3) = k1_funct_1(k6_binarith(c1_10__binari_3,c2_10__binari_3),c1_10_2__binari_3) ), inference(mizar_by,[status(thm),assumptions([dt_c1_10__binari_3,dt_c1_10_2__binari_3,dt_c2_10__binari_3,e1_10__binari_3])],[existence_m1_relset_1,dt_k2_zfmisc_1,dt_m1_relset_1,cc1_relset_1,fc14_membered,fc15_membered,rc1_margrel1,reflexivity_r1_tarski,antisymmetry_r2_hidden,existence_m1_finseq_1,existence_m2_relset_1,redefinition_m2_relset_1,dt_k1_xboole_0,dt_m1_finseq_1,dt_m2_relset_1,cc12_membered,cc13_membered,cc14_membered,cc18_membered,cc19_membered,cc1_membered,cc20_membered,cc2_membered,cc3_membered,fc12_membered,fc13_membered,fc1_margrel1,fc6_membered,rc1_membered,rc1_nat_1,rc2_margrel1,rc2_nat_1,rc3_nat_1,t1_subset,t4_subset,t5_subset,commutativity_k2_tarski,existence_m1_finseq_2,existence_m1_subset_1,existence_m2_finseq_1,redefinition_m2_finseq_1,dt_k1_euclid,dt_k1_zfmisc_1,dt_k2_finseq_2,dt_k2_tarski,dt_k4_euclid,dt_k5_ordinal2,dt_m1_finseq_2,dt_m1_subset_1,dt_m2_finseq_1,cc10_membered,cc11_membered,cc15_membered,cc16_membered,cc17_membered,cc1_margrel1,cc1_nat_1,cc2_nat_1,cc3_nat_1,cc4_membered,cc6_membered,cc9_membered,fc16_membered,fc5_membered,spc0_boole,spc0_numerals,t1_numerals,t2_subset,t3_subset,t6_boole,t7_boole,t8_boole,spc0_numerals,spc0_boole,existence_m2_finseq_2,existence_m2_subset_1,redefinition_k4_finseqop,redefinition_k5_euclid,redefinition_k5_numbers,redefinition_m2_finseq_2,redefinition_m2_subset_1,dt_k1_funct_1,dt_k1_numbers,dt_k4_finseq_2,dt_k4_finseqop,dt_k5_euclid,dt_k5_numbers,dt_k6_binarith,dt_k6_margrel1,dt_m2_finseq_2,dt_m2_subset_1,dt_c1_10__binari_3,dt_c1_10_2__binari_3,dt_c2_10__binari_3,fc2_membered,fc3_margrel1,d12_margrel1,spc1_numerals,spc1_boole,e1_10__binari_3,t6_binari_3]), [interesting(0.5),file(binari_3,e5_10_2_1__binari_3),[file(binari_3,e5_10_2_1__binari_3)]]). fof(e6_10_2__binari_3,plain,( k1_funct_1(k4_finseq_5(k6_margrel1,k6_binarith(c1_10__binari_3,c2_10__binari_3)),c1_10_2__binari_3) = k1_funct_1(k6_binarith(c1_10__binari_3,c2_10__binari_3),c1_10_2__binari_3) ), inference(iterative_eq,[status(thm),assumptions([e1_10_2__binari_3,dt_c1_10__binari_3,dt_c1_10_2__binari_3,dt_c2_10__binari_3,e1_10__binari_3])],[e1_10_2_1__binari_3,e2_10_2_1__binari_3,e3_10_2_1__binari_3,e4_10_2_1__binari_3,e5_10_2_1__binari_3]), [interesting(0.65),file(binari_3,e6_10_2__binari_3),[file(binari_3,e6_10_2__binari_3)]]). fof(i3_10_2__binari_3,theorem,( $true ), introduced(tautology,[file(binari_3,i3_10_2__binari_3)]), [interesting(0.65),trivial,file(binari_3,i3_10_2__binari_3)]). fof(i2_10_2__binari_3,plain,( k1_funct_1(k4_finseq_5(k6_margrel1,k6_binarith(c1_10__binari_3,c2_10__binari_3)),c1_10_2__binari_3) = k1_funct_1(k6_binarith(c1_10__binari_3,c2_10__binari_3),c1_10_2__binari_3) ), inference(conclusion,[status(thm),assumptions([e1_10_2__binari_3,dt_c1_10__binari_3,dt_c1_10_2__binari_3,dt_c2_10__binari_3,e1_10__binari_3])],[e6_10_2__binari_3,i3_10_2__binari_3]), [interesting(0.65),file(binari_3,i2_10_2__binari_3),[file(binari_3,i2_10_2__binari_3)]]). fof(i1_10_2__binari_3,plain, ( r2_hidden(c1_10_2__binari_3,k4_finseq_1(k6_binarith(c1_10__binari_3,c2_10__binari_3))) => k1_funct_1(k4_finseq_5(k6_margrel1,k6_binarith(c1_10__binari_3,c2_10__binari_3)),c1_10_2__binari_3) = k1_funct_1(k6_binarith(c1_10__binari_3,c2_10__binari_3),c1_10_2__binari_3) ), inference(discharge_asm,[status(thm),assumptions([dt_c1_10__binari_3,dt_c1_10_2__binari_3,dt_c2_10__binari_3,e1_10__binari_3]),discharge_asm(discharge,[e1_10_2__binari_3])],[e1_10_2__binari_3,i2_10_2__binari_3]), [interesting(0.65),file(binari_3,i1_10_2__binari_3),[file(binari_3,i1_10_2__binari_3)]]). fof(i1_10_2_tmp__binari_3,plain, ( m2_subset_1(c1_10_2__binari_3,k1_numbers,k5_numbers) => ( r2_hidden(c1_10_2__binari_3,k4_finseq_1(k6_binarith(c1_10__binari_3,c2_10__binari_3))) => k1_funct_1(k4_finseq_5(k6_margrel1,k6_binarith(c1_10__binari_3,c2_10__binari_3)),c1_10_2__binari_3) = k1_funct_1(k6_binarith(c1_10__binari_3,c2_10__binari_3),c1_10_2__binari_3) ) ), inference(discharge_asm,[status(thm),assumptions([dt_c1_10__binari_3,dt_c2_10__binari_3,e1_10__binari_3]),discharge_asm(discharge,[dt_c1_10_2__binari_3])],[dt_c1_10_2__binari_3,i1_10_2__binari_3]), [interesting(0.8),e3_10__binari_3]). fof(e3_10__binari_3,plain,( ! [A] : ( m2_subset_1(A,k1_numbers,k5_numbers) => ( r2_hidden(A,k4_finseq_1(k6_binarith(c1_10__binari_3,c2_10__binari_3))) => k1_funct_1(k4_finseq_5(k6_margrel1,k6_binarith(c1_10__binari_3,c2_10__binari_3)),A) = k1_funct_1(k6_binarith(c1_10__binari_3,c2_10__binari_3),A) ) ) ), inference(let,[status(thm),assumptions([dt_c1_10__binari_3,dt_c2_10__binari_3,e1_10__binari_3])],[i1_10_2_tmp__binari_3,dh_c1_10_2__binari_3]), [interesting(0.8),file(binari_3,e3_10__binari_3),[file(binari_3,e3_10__binari_3)]]). fof(e1_10_1__binari_3,plain,( k4_finseq_1(k4_finseq_5(k6_margrel1,k6_binarith(c1_10__binari_3,c2_10__binari_3))) = k2_finseq_1(k3_finseq_1(k4_finseq_5(k6_margrel1,k6_binarith(c1_10__binari_3,c2_10__binari_3)))) ), inference(mizar_by,[status(thm),assumptions([dt_c1_10__binari_3,dt_c2_10__binari_3])],[existence_m1_relset_1,dt_k2_zfmisc_1,dt_m1_relset_1,cc1_relset_1,fc14_membered,fc15_membered,rc1_margrel1,reflexivity_r1_tarski,antisymmetry_r2_hidden,existence_m1_finseq_2,existence_m2_relset_1,redefinition_m2_relset_1,dt_k1_xboole_0,dt_m1_finseq_2,dt_m2_relset_1,cc12_membered,cc13_membered,cc14_membered,cc18_membered,cc19_membered,cc1_membered,cc20_membered,cc2_membered,cc3_membered,fc12_membered,fc13_membered,fc1_margrel1,fc6_membered,rc1_membered,rc1_nat_1,rc2_margrel1,rc2_nat_1,rc3_nat_1,t1_subset,t4_subset,t5_subset,commutativity_k2_tarski,existence_m1_finseq_1,existence_m1_subset_1,existence_m2_finseq_1,existence_m2_finseq_2,redefinition_m2_finseq_1,redefinition_m2_finseq_2,dt_k1_card_1,dt_k1_finseq_1,dt_k1_zfmisc_1,dt_k2_tarski,dt_k3_finseq_5,dt_k4_finseq_2,dt_k5_ordinal2,dt_m1_finseq_1,dt_m1_subset_1,dt_m2_finseq_1,dt_m2_finseq_2,cc10_membered,cc11_membered,cc15_membered,cc16_membered,cc17_membered,cc1_margrel1,cc1_nat_1,cc2_nat_1,cc3_nat_1,cc4_membered,cc6_membered,cc9_membered,fc16_membered,fc5_membered,spc0_boole,spc1_boole,t1_numerals,t2_subset,t3_subset,t6_boole,t7_boole,t8_boole,spc0_numerals,spc1_numerals,spc0_boole,spc1_boole,existence_m2_subset_1,redefinition_k2_finseq_1,redefinition_k3_finseq_1,redefinition_k4_finseq_1,redefinition_k4_finseq_5,redefinition_k5_numbers,redefinition_m2_subset_1,dt_k1_numbers,dt_k1_relat_1,dt_k2_finseq_1,dt_k3_finseq_1,dt_k4_finseq_1,dt_k4_finseq_5,dt_k5_numbers,dt_k6_binarith,dt_k6_margrel1,dt_m2_subset_1,dt_c1_10__binari_3,dt_c2_10__binari_3,fc2_membered,fc3_margrel1,d12_margrel1,d3_finseq_1]), [interesting(0.65),file(binari_3,e1_10_1__binari_3),[file(binari_3,e1_10_1__binari_3)]]). fof(d3_finseq_5,definition,( ! [A] : ( ( v1_relat_1(A) & v1_funct_1(A) & v1_finseq_1(A) ) => ! [B] : ( ( v1_relat_1(B) & v1_funct_1(B) & v1_finseq_1(B) ) => ( B = k3_finseq_5(A) <=> ( k3_finseq_1(B) = k3_finseq_1(A) & ! [C] : ( m2_subset_1(C,k1_numbers,k5_numbers) => ( r2_hidden(C,k4_finseq_1(B)) => k1_funct_1(B,C) = k1_funct_1(A,k2_xcmplx_0(k6_xcmplx_0(k3_finseq_1(A),C),1)) ) ) ) ) ) ) ), file(finseq_5,d3_finseq_5), [interesting(0.9),axiom,file(finseq_5,d3_finseq_5)]). fof(e2_10_1__binari_3,plain,( k2_finseq_1(k3_finseq_1(k4_finseq_5(k6_margrel1,k6_binarith(c1_10__binari_3,c2_10__binari_3)))) = k2_finseq_1(k3_finseq_1(k6_binarith(c1_10__binari_3,c2_10__binari_3))) ), inference(mizar_by,[status(thm),assumptions([dt_c1_10__binari_3,dt_c2_10__binari_3])],[existence_m1_relset_1,dt_k2_zfmisc_1,dt_m1_relset_1,cc1_relset_1,fc14_membered,fc15_membered,rc1_margrel1,reflexivity_r1_tarski,existence_m1_finseq_2,existence_m2_relset_1,redefinition_m2_relset_1,dt_k1_xboole_0,dt_m1_finseq_2,dt_m2_relset_1,cc12_membered,cc13_membered,cc14_membered,cc18_membered,cc19_membered,cc1_membered,cc20_membered,cc2_membered,cc3_membered,fc13_membered,fc1_margrel1,fc6_membered,rc1_membered,rc1_nat_1,rc2_margrel1,rc2_nat_1,rc3_nat_1,commutativity_k2_tarski,existence_m1_finseq_1,existence_m1_subset_1,existence_m2_finseq_1,existence_m2_finseq_2,redefinition_m2_finseq_1,redefinition_m2_finseq_2,dt_k1_card_1,dt_k1_finseq_1,dt_k1_relat_1,dt_k1_zfmisc_1,dt_k2_tarski,dt_k4_finseq_2,dt_k5_ordinal2,dt_m1_finseq_1,dt_m1_subset_1,dt_m2_finseq_1,dt_m2_finseq_2,cc10_membered,cc11_membered,cc15_membered,cc16_membered,cc17_membered,cc1_margrel1,cc1_nat_1,cc2_nat_1,cc3_nat_1,cc4_membered,cc6_membered,cc9_membered,fc12_membered,fc16_membered,fc1_nat_1,fc3_nat_1,fc4_nat_1,fc5_membered,rqRealAdd__k2_xcmplx_0__r0_r0_r0,rqRealAdd__k2_xcmplx_0__r0_r1_r1,rqRealAdd__k2_xcmplx_0__r1_r0_r1,rqRealDiff__k6_xcmplx_0__r0_r0_r0,rqRealDiff__k6_xcmplx_0__r1_r0_r1,rqRealDiff__k6_xcmplx_0__r1_r1_r0,spc0_boole,spc0_numerals,spc6_arithm,t1_arithm,t1_numerals,t2_subset,t3_subset,t4_arithm,t4_subset,t5_subset,t6_boole,t8_boole,spc0_numerals,spc0_boole,commutativity_k2_xcmplx_0,antisymmetry_r2_hidden,existence_m2_subset_1,redefinition_k2_finseq_1,redefinition_k3_finseq_1,redefinition_k4_finseq_1,redefinition_k4_finseq_5,redefinition_k5_numbers,redefinition_m2_subset_1,dt_k1_funct_1,dt_k1_numbers,dt_k2_finseq_1,dt_k2_xcmplx_0,dt_k3_finseq_1,dt_k3_finseq_5,dt_k4_finseq_1,dt_k4_finseq_5,dt_k5_numbers,dt_k6_binarith,dt_k6_margrel1,dt_k6_xcmplx_0,dt_m2_subset_1,dt_c1_10__binari_3,dt_c2_10__binari_3,fc2_membered,fc3_margrel1,t1_subset,t7_boole,d12_margrel1,spc1_numerals,spc1_boole,d3_finseq_5]), [interesting(0.65),file(binari_3,e2_10_1__binari_3),[file(binari_3,e2_10_1__binari_3)]]). fof(e3_10_1__binari_3,plain,( k2_finseq_1(k3_finseq_1(k6_binarith(c1_10__binari_3,c2_10__binari_3))) = k4_finseq_1(k6_binarith(c1_10__binari_3,c2_10__binari_3)) ), inference(mizar_by,[status(thm),assumptions([dt_c1_10__binari_3,dt_c2_10__binari_3])],[existence_m1_relset_1,dt_k2_zfmisc_1,dt_m1_relset_1,cc1_relset_1,existence_m1_finseq_1,existence_m2_relset_1,redefinition_m2_relset_1,dt_m1_finseq_1,dt_m2_relset_1,fc14_membered,fc15_membered,rc1_margrel1,commutativity_k2_tarski,reflexivity_r1_tarski,antisymmetry_r2_hidden,existence_m1_finseq_2,existence_m2_finseq_1,redefinition_m2_finseq_1,dt_k1_xboole_0,dt_k2_tarski,dt_m1_finseq_2,dt_m2_finseq_1,cc12_membered,cc13_membered,cc14_membered,cc18_membered,cc19_membered,cc1_membered,cc20_membered,cc2_membered,cc3_membered,fc12_membered,fc13_membered,fc16_membered,fc1_margrel1,fc6_membered,rc1_membered,rc1_nat_1,rc2_margrel1,rc2_nat_1,rc3_nat_1,spc0_boole,spc1_boole,t1_numerals,t1_subset,t4_subset,t5_subset,spc0_numerals,spc1_numerals,spc0_boole,spc1_boole,existence_m1_subset_1,existence_m2_finseq_2,redefinition_m2_finseq_2,dt_k1_card_1,dt_k1_finseq_1,dt_k1_zfmisc_1,dt_k4_finseq_2,dt_k5_ordinal2,dt_k6_margrel1,dt_m1_subset_1,dt_m2_finseq_2,cc10_membered,cc11_membered,cc15_membered,cc16_membered,cc17_membered,cc1_margrel1,cc1_nat_1,cc2_nat_1,cc3_nat_1,cc4_membered,cc6_membered,cc9_membered,fc3_margrel1,fc5_membered,t2_subset,t3_subset,t6_boole,t7_boole,t8_boole,d12_margrel1,existence_m2_subset_1,redefinition_k2_finseq_1,redefinition_k3_finseq_1,redefinition_k4_finseq_1,redefinition_k5_numbers,redefinition_m2_subset_1,dt_k1_numbers,dt_k1_relat_1,dt_k2_finseq_1,dt_k3_finseq_1,dt_k4_finseq_1,dt_k5_numbers,dt_k6_binarith,dt_m2_subset_1,dt_c1_10__binari_3,dt_c2_10__binari_3,fc2_membered,d3_finseq_1]), [interesting(0.65),file(binari_3,e3_10_1__binari_3),[file(binari_3,e3_10_1__binari_3)]]). fof(e2_10__binari_3,plain,( k4_finseq_1(k4_finseq_5(k6_margrel1,k6_binarith(c1_10__binari_3,c2_10__binari_3))) = k4_finseq_1(k6_binarith(c1_10__binari_3,c2_10__binari_3)) ), inference(iterative_eq,[status(thm),assumptions([dt_c1_10__binari_3,dt_c2_10__binari_3])],[e1_10_1__binari_3,e2_10_1__binari_3,e3_10_1__binari_3]), [interesting(0.8),file(binari_3,e2_10__binari_3),[file(binari_3,e2_10__binari_3)]]). fof(t17_finseq_1,theorem,( ! [A] : ( ( v1_relat_1(A) & v1_funct_1(A) & v1_finseq_1(A) ) => ! [B] : ( ( v1_relat_1(B) & v1_funct_1(B) & v1_finseq_1(B) ) => ( ( k4_finseq_1(A) = k4_finseq_1(B) & ! [C] : ( m2_subset_1(C,k1_numbers,k5_numbers) => ( r2_hidden(C,k4_finseq_1(A)) => k1_funct_1(A,C) = k1_funct_1(B,C) ) ) ) => A = B ) ) ) ), file(finseq_1,t17_finseq_1), [interesting(0.9),axiom,file(finseq_1,t17_finseq_1)]). fof(e4_10__binari_3,plain,( k4_finseq_5(k6_margrel1,k6_binarith(c1_10__binari_3,c2_10__binari_3)) = k6_binarith(c1_10__binari_3,c2_10__binari_3) ), inference(mizar_by,[status(thm),assumptions([e1_10__binari_3,dt_c1_10__binari_3,dt_c2_10__binari_3])],[existence_m1_relset_1,dt_k2_zfmisc_1,dt_m1_relset_1,cc1_relset_1,fc14_membered,fc15_membered,rc1_margrel1,reflexivity_r1_tarski,existence_m1_finseq_2,existence_m2_relset_1,redefinition_m2_relset_1,dt_k1_xboole_0,dt_m1_finseq_2,dt_m2_relset_1,cc12_membered,cc13_membered,cc14_membered,cc18_membered,cc19_membered,cc1_membered,cc20_membered,cc2_membered,cc3_membered,cc3_nat_1,fc12_membered,fc13_membered,fc16_membered,fc1_margrel1,fc6_membered,rc1_membered,rc1_nat_1,rc2_margrel1,rc2_nat_1,rc3_nat_1,commutativity_k2_tarski,existence_m1_finseq_1,existence_m1_subset_1,existence_m2_finseq_1,existence_m2_finseq_2,redefinition_m2_finseq_1,redefinition_m2_finseq_2,dt_k1_relat_1,dt_k1_zfmisc_1,dt_k2_tarski,dt_k3_finseq_5,dt_k4_finseq_2,dt_k5_ordinal2,dt_m1_finseq_1,dt_m1_subset_1,dt_m2_finseq_1,dt_m2_finseq_2,cc10_membered,cc11_membered,cc15_membered,cc16_membered,cc17_membered,cc1_margrel1,cc1_nat_1,cc2_nat_1,cc4_membered,cc6_membered,cc9_membered,fc5_membered,spc0_boole,spc1_boole,t1_numerals,t2_subset,t3_subset,t4_subset,t5_subset,t6_boole,t8_boole,spc0_numerals,spc1_numerals,spc0_boole,spc1_boole,antisymmetry_r2_hidden,existence_m2_subset_1,redefinition_k4_finseq_1,redefinition_k4_finseq_5,redefinition_k5_numbers,redefinition_m2_subset_1,dt_k1_funct_1,dt_k1_numbers,dt_k4_finseq_1,dt_k4_finseq_5,dt_k5_numbers,dt_k6_binarith,dt_k6_margrel1,dt_m2_subset_1,dt_c1_10__binari_3,dt_c2_10__binari_3,fc2_membered,fc3_margrel1,t1_subset,t7_boole,d12_margrel1,e3_10__binari_3,e2_10__binari_3,t17_finseq_1]), [interesting(0.8),file(binari_3,e4_10__binari_3),[file(binari_3,e4_10__binari_3)]]). fof(i4_10__binari_3,theorem,( $true ), introduced(tautology,[file(binari_3,i4_10__binari_3)]), [interesting(0.8),trivial,file(binari_3,i4_10__binari_3)]). fof(i3_10__binari_3,plain,( k4_finseq_5(k6_margrel1,k6_binarith(c1_10__binari_3,c2_10__binari_3)) = k6_binarith(c1_10__binari_3,c2_10__binari_3) ), inference(conclusion,[status(thm),assumptions([e1_10__binari_3,dt_c1_10__binari_3,dt_c2_10__binari_3])],[e4_10__binari_3,i4_10__binari_3]), [interesting(0.8),file(binari_3,i3_10__binari_3),[file(binari_3,i3_10__binari_3)]]). fof(i2_10__binari_3,plain, ( c2_10__binari_3 = k5_euclid(c1_10__binari_3) => k4_finseq_5(k6_margrel1,k6_binarith(c1_10__binari_3,c2_10__binari_3)) = k6_binarith(c1_10__binari_3,c2_10__binari_3) ), inference(discharge_asm,[status(thm),assumptions([dt_c1_10__binari_3,dt_c2_10__binari_3]),discharge_asm(discharge,[e1_10__binari_3])],[e1_10__binari_3,i3_10__binari_3]), [interesting(0.8),file(binari_3,i2_10__binari_3),[file(binari_3,i2_10__binari_3)]]). fof(i2_10_tmp__binari_3,plain, ( m2_finseq_2(c2_10__binari_3,k6_margrel1,k4_finseq_2(c1_10__binari_3,k6_margrel1)) => ( c2_10__binari_3 = k5_euclid(c1_10__binari_3) => k4_finseq_5(k6_margrel1,k6_binarith(c1_10__binari_3,c2_10__binari_3)) = k6_binarith(c1_10__binari_3,c2_10__binari_3) ) ), inference(discharge_asm,[status(thm),assumptions([dt_c1_10__binari_3]),discharge_asm(discharge,[dt_c2_10__binari_3])],[dt_c2_10__binari_3,i2_10__binari_3]), [interesting(0.8),i1_10__binari_3]). fof(i1_10__binari_3,plain,( ! [A] : ( m2_finseq_2(A,k6_margrel1,k4_finseq_2(c1_10__binari_3,k6_margrel1)) => ( A = k5_euclid(c1_10__binari_3) => k4_finseq_5(k6_margrel1,k6_binarith(c1_10__binari_3,A)) = k6_binarith(c1_10__binari_3,A) ) ) ), inference(let,[status(thm),assumptions([dt_c1_10__binari_3])],[i2_10_tmp__binari_3,dh_c2_10__binari_3]), [interesting(0.8),file(binari_3,i1_10__binari_3),[file(binari_3,i1_10__binari_3)]]). fof(i1_10_tmp__binari_3,plain, ( m2_subset_1(c1_10__binari_3,k1_numbers,k5_numbers) => ! [A] : ( m2_finseq_2(A,k6_margrel1,k4_finseq_2(c1_10__binari_3,k6_margrel1)) => ( A = k5_euclid(c1_10__binari_3) => k4_finseq_5(k6_margrel1,k6_binarith(c1_10__binari_3,A)) = k6_binarith(c1_10__binari_3,A) ) ) ), inference(discharge_asm,[status(thm),assumptions([]),discharge_asm(discharge,[dt_c1_10__binari_3])],[dt_c1_10__binari_3,i1_10__binari_3]), [interesting(1),t10_binari_3]). fof(t10_binari_3,theorem,( ! [A] : ( m2_subset_1(A,k1_numbers,k5_numbers) => ! [B] : ( m2_finseq_2(B,k6_margrel1,k4_finseq_2(A,k6_margrel1)) => ( B = k5_euclid(A) => k4_finseq_5(k6_margrel1,k6_binarith(A,B)) = k6_binarith(A,B) ) ) ) ), inference(let,[status(thm),assumptions([])],[i1_10_tmp__binari_3,dh_c1_10__binari_3]), [interesting(1),file(binari_3,t10_binari_3),[file(binari_3,t10_binari_3)]]).