set X = Morphs V;
defpred S₁[ Element of Morphs V, Element of Morphs V] means dom' $1 = cod' $2;
let c1, c2 be PartFunc of [:(Morphs V),(Morphs V):],(Morphs V); :: thesis:
assume that
A3: for g, f being Element of Morphs V holds
( [g,f] in dom c1 iff S₁[g,f] ) and
A4: for g, f being Element of Morphs V st [g,f] in dom c1 holds
c1 . g,f = g * f and
A5: for g, f being Element of Morphs V holds
( [g,f] in dom c2 iff S₁[g,f] ) and
A6: for g, f being Element of Morphs V st [g,f] in dom c2 holds
c2 . g,f = g * f ; :: thesis:
set V0 = dom c1;
A7: dom c1 c= [:(Morphs V),(Morphs V):] by RELAT_1:def 18;

let x be set ; :: thesis:
assume A8: x in dom c1 ; :: thesis:
then consider g, f being Element of Morphs V such that
A9: x = [g,f] by A7, SUBSET_1:65;
S₁[g,f] by A3, A8, A9;
hence x in dom c2 by A5, A9; :: thesis:

end;

let x, y be set ; :: thesis:
assume A12: [x,y] in dom c1 ; :: thesis:
then reconsider x = x, y = y as Element of Morphs V by A7, ZFMISC_1:106;
c1 . x,y = x * y by A4, A12;
hence c1 . x,y = c2 . x,y by A6, A10, A12; :: thesis:

end;

end;