let it1, it2 be Subset of G; :: thesis: ( ( for e being set holds
( e in it1 iff ( e in G & card e = 2 ) ) ) & ( for e being set holds
( e in it2 iff ( e in G & card e = 2 ) ) ) implies it1 = it2 )
assume that
A2: for e being set holds
( e in it1 iff ( e in G & card e = 2 ) ) and
A3: for e being set holds
( e in it2 iff ( e in G & card e = 2 ) ) ; :: thesis: it1 = it2
now :: thesis: for x being object holds
( x in it1 iff x in it2 )
let x be object ; :: thesis: ( x in it1 iff x in it2 )
reconsider xx = x as set by TARSKI:1;
( x in it2 iff ( x in G & card xx = 2 ) ) by A3;
hence ( x in it1 iff x in it2 ) by A2; :: thesis: verum
end;
hence it1 = it2 by TARSKI:2; :: thesis: verum