let X1, X2 be Subset of F1(); ( ( for y being set holds
( y in X1 iff P1[y] ) ) & ( for y being set holds
( y in X2 iff P1[y] ) ) implies X1 = X2 )
assume that
A1:
for y being set holds
( y in X1 iff P1[y] )
and
A2:
for y being set holds
( y in X2 iff P1[y] )
; X1 = X2
for x being set holds
( x in X1 iff x in X2 )
proof
let x be
set ;
( x in X1 iff x in X2 )
hereby ( x in X2 implies x in X1 )
assume
x in X1
;
x in X2then
P1[
x]
by A1;
hence
x in X2
by A2;
verum
end;
assume
x in X2
;
x in X1
then
P1[
x]
by A2;
hence
x in X1
by A1;
verum
end;
hence
X1 = X2
by TARSKI:2; verum