let A, B be set ; for R being Relation holds R | (A \ B) = (R | A) \ [:B,(rng R):]
let R be Relation; R | (A \ B) = (R | A) \ [:B,(rng R):]
set lh = R | (A \ B);
set rh = (R | A) \ [:B,(rng R):];
R | (A \ B) =
(R | A) \ (R | B)
by RELAT_1:80
.=
(R | A) \ (R /\ [:B,(rng R):])
by RELAT_1:67
.=
(((R | A) null R) \ R) \/ ((R | A) \ [:B,(rng R):])
by XBOOLE_1:54
.=
{} \/ ((R | A) \ [:B,(rng R):])
;
hence
R | (A \ B) = (R | A) \ [:B,(rng R):]
; verum