let IT, IT9 be BinOp of (Fin A); :: thesis: ( ( for x, y being Element of Fin A holds IT . (x,y) = x \/ y ) & ( for x, y being Element of Fin A holds IT9 . (x,y) = x \/ y ) implies IT = IT9 )
assume that
A1: for x, y being Element of Fin A holds IT . (x,y) = x \/ y and
A2: for x, y being Element of Fin A holds IT9 . (x,y) = x \/ y ; :: thesis: IT = IT9
now :: thesis: for x, y being Element of Fin A holds IT . (x,y) = IT9 . (x,y)
let x, y be Element of Fin A; :: thesis: IT . (x,y) = IT9 . (x,y)
thus IT . (x,y) = x \/ y by A1
.= IT9 . (x,y) by A2 ; :: thesis: verum
end;
hence IT = IT9 ; :: thesis: verum