let I be set ; :: thesis: for X, Y, Z being ManySortedSet of I holds (X \ Y) \ Z = X \ (Y \/ Z)
let X, Y, Z be ManySortedSet of I; :: thesis: (X \ Y) \ Z = X \ (Y \/ Z)
now
let i be set ; :: thesis: ( i in I implies ((X \ Y) \ Z) . i = (X \ (Y \/ Z)) . i )
assume A1: i in I ; :: thesis: ((X \ Y) \ Z) . i = (X \ (Y \/ Z)) . i
hence ((X \ Y) \ Z) . i = ((X \ Y) . i) \ (Z . i) by Def9
.= ((X . i) \ (Y . i)) \ (Z . i) by A1, Def9
.= (X . i) \ ((Y . i) \/ (Z . i)) by XBOOLE_1:41
.= (X . i) \ ((Y \/ Z) . i) by A1, Def7
.= (X \ (Y \/ Z)) . i by A1, Def9 ;
:: thesis: verum
end;
hence (X \ Y) \ Z = X \ (Y \/ Z) by Th3; :: thesis: verum