Let X and Y be the sets of all positive divisors of 400 and 1000 respectively (including 1 and the number), Then , `n(X nnY)=`

Let X and Y be the sets of all positive divisions of400 and 1000 respectively (including 1 and the number). Then n(X cap Y) is T, then (T)/(4) is-

Product of all the even divisors of N=1000, is

Let n=180. Find the number of positive integral divisors of n^(2), which do not divide n

A positive integer n is of the form n=2^(alpha)3^(beta) , where alpha ge 1 , beta ge 1 . If n has 12 positive divisors and 2n has 15 positive divisors, then the number of positive divisors of 3n is

A ={1,2,3,"……..", 184} and two of its subsets are X and Y. X is set of all multiples of 2 and Y is the set of all the multiples of 3. Find n (X nn Y) .

If x is a finite set. Let P(X) denote the set of all subsets of X and let n(X) denote the number of elements in X. If for two finite subsets A, B, n(P(A)) = n(P(B)) + 15 then n(B) = , n(A) = 6,2 8,4 4,0 0,1