set A = (dom f) /\ (dom g);
let IT1, IT2 be Function; :: thesis: ( dom IT1 = (dom f) /\ (dom g) & ( for x being set st x in dom IT1 holds
IT1 . x = (f . x) . (g . x) ) & dom IT2 = (dom f) /\ (dom g) & ( for x being set st x in dom IT2 holds
IT2 . x = (f . x) . (g . x) ) implies IT1 = IT2 )
assume B1: ( dom IT1 = (dom f) /\ (dom g) & ( for x being set st x in dom IT1 holds
IT1 . x = (f . x) . (g . x) ) ) ; :: thesis: ( not dom IT2 = (dom f) /\ (dom g) or ex x being set st
( x in dom IT2 & not IT2 . x = (f . x) . (g . x) ) or IT1 = IT2 )
assume B2: ( dom IT2 = (dom f) /\ (dom g) & ( for x being set st x in dom IT2 holds
IT2 . x = (f . x) . (g . x) ) ) ; :: thesis: IT1 = IT2
now
let x be set ; :: thesis: ( x in dom IT1 implies IT1 . x = IT2 . x )
assume C1: x in dom IT1 ; :: thesis: IT1 . x = IT2 . x
thus IT1 . x = (f . x) . (g . x) by B1, C1
.= IT2 . x by B2, C1, B1 ; :: thesis: verum
end;
hence IT1 = IT2 by B1, B2, FUNCT_1:2; :: thesis: verum