let X be set ; for R being Relation holds dom (R | ((dom R) \ X)) = (dom R) \ X
let R be Relation; dom (R | ((dom R) \ X)) = (dom R) \ X
thus dom (R | ((dom R) \ X)) =
(dom R) /\ ((dom R) \ X)
by Th55
.=
((dom R) /\ (dom R)) \ X
by XBOOLE_1:49
.=
(dom R) \ X
; verum