Let `U` be the universal set and `AuuBuuC=uu` then `{(A-B)uu(B-C)uu(C-A)}'` is equal to

If A and B are two sets ,then (A-B)uu(B-A)uu(AnnB) equals

Given n(U) = 20, n(A) = 12, n(B) = 9, n(AnnB) = 4, where U is the universal set, A and B are subsets of U, then n(AuuB)' equals.

The set (A cap B')' cup (B cap C) is equal to

Statement-1 If U is universal set and B = U - A, then n(B) = n(U) - n(A) . Statement-2 For any three arbitrary sets A, B and C, if C = A - B, then n(C ) = n(A) - n(B).

If A={2,3},B={4,5}andC={5,6} , then n{(AxxB)uu(BxxC)} is

If a, b and c are in GP, then the value of (a-b)/(b-c) is equal to……..

If A and B are subsets of the universal set cup , then show that, A sub B iff A cup B = B

For all sets A, B and C, A - (B - C) = (A - B) - C .

The value of the determinant |{:(-a, b, c), (a,-b, c), (a, b,-c):}| is equal to.

If A and B are subsets of the universal set cup , then show that, (A cap B) sub A