let f be Function; for A, B being set holds f | (A \/ B) = (f | A) +* (f | B)
let A, B be set ; f | (A \/ B) = (f | A) +* (f | B)
A1: (f | (A \/ B)) | B =
f | ((A \/ B) /\ B)
by RELAT_1:71
.=
f | B
by XBOOLE_1:21
;
A2:
dom (f | (A \/ B)) c= A \/ B
by RELAT_1:58;
(f | (A \/ B)) | A =
f | ((A \/ B) /\ A)
by RELAT_1:71
.=
f | A
by XBOOLE_1:21
;
hence
f | (A \/ B) = (f | A) +* (f | B)
by A1, A2, Th74; verum