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

If n(U)=50, n(A)=24, and n(B)= 30 where U is the universal set, then find (i) The greatest value of n(A cup B) (ii) The least value of n(A cap B)

If n(U) = 700, n(A) = 200, n(B) = 240, n (A cap B) = 100, then n(A' cup B') equals

If n(U)=1200, n(A)=900 and n(B)=700 where U is the universal set then find: (i) The greatest value of n(A cup B) (ii) The least value of n(A cap B) .

If n(U)=60, n(A)=26 and n(B)=36 where U is the universal set then find: (i) The greatest Value of n(A cup B) (ii) The least value of n(A cap B) .

If n(U)=50,n(A)=20,n(A uu B)=18 then n(B-A) is

Let U be the universal set B, C are sub-sets of U. If A = B cup C , then U -(U - ((U-A')))) is equal to