let X be set ; for O being Operation of X holds dom (O OR (NOT O)) = X
let O be Operation of X; dom (O OR (NOT O)) = X
thus dom (O OR (NOT O)) =
(dom O) OR (dom (NOT O))
by XTUPLE_0:23
.=
(dom O) \/ (dom (id (X \ (dom O))))
by Th37
.=
(dom O) OR (X \ (dom O))
by RELAT_1:45
.=
(dom O) \/ X
by XBOOLE_1:39
.=
X
by XBOOLE_1:12
; verum