let A, B be set ; for X1, X2 being Subset of A
for R being Subset of [:A,B:] st (.: R) .: {_{X1}_} = {} holds
R .:^ (X1 \/ X2) = R .:^ X2
let X1, X2 be Subset of A; for R being Subset of [:A,B:] st (.: R) .: {_{X1}_} = {} holds
R .:^ (X1 \/ X2) = R .:^ X2
let R be Subset of [:A,B:]; ( (.: R) .: {_{X1}_} = {} implies R .:^ (X1 \/ X2) = R .:^ X2 )
A1:
{_{(X1 \/ X2)}_} = {_{X1}_} \/ {_{X2}_}
by Th3;
assume A2:
(.: R) .: {_{X1}_} = {}
; R .:^ (X1 \/ X2) = R .:^ X2
R .:^ (X1 \/ X2) =
Intersect (((.: R) .: {_{X1}_}) \/ ((.: R) .: {_{X2}_}))
by A1, RELAT_1:120
.=
R .:^ X2
by A2
;
hence
R .:^ (X1 \/ X2) = R .:^ X2
; verum