let f1, f2 be Function of [:A,A:],REAL ; ( ( for a, b being Element of A holds f1 . a,b = (G . a,b) / (1 + (G . a,b)) ) & ( for a, b being Element of A holds f2 . a,b = (G . a,b) / (1 + (G . a,b)) ) implies f1 = f2 )
assume that
A2:
for a, b being Element of A holds f1 . a,b = (G . a,b) / (1 + (G . a,b))
and
A3:
for a, b being Element of A holds f2 . a,b = (G . a,b) / (1 + (G . a,b))
; f1 = f2
for a, b being Element of A holds f1 . a,b = f2 . a,b
proof
let a,
b be
Element of
A;
f1 . a,b = f2 . a,b
f1 . a,
b = (G . a,b) / (1 + (G . a,b))
by A2;
hence
f1 . a,
b = f2 . a,
b
by A3;
verum
end;
hence
f1 = f2
by BINOP_1:2; verum