thus
( X = Y implies for n being Nat holds
( n in X iff n in Y ) )
; ( ( for n being Nat holds
( n in X iff n in Y ) ) implies X = Y )
assume
for n being Nat holds
( n in X iff n in Y )
; X = Y
then
( X c= Y & Y c= X )
by Def12;
hence
X = Y
by XBOOLE_0:def 10; verum