Let X be a set containing n elements. Two subsets A and B of X are chosen at random. Find the probability that `AcupB=X

Let X be a set containing n elements. Two subsets A and B of X are chosen at random, the probability that AuuB=X is

A set contains n elements. The Power set contains

A is a set containing n elements. A subset P of A is chosen. The set A is reconstructed by replacing the elements of P. A subset Q of A is again chosen, the number of ways of choosing so that (P cup Q) is a proper subset of A, is

A is a set containing n elements. A subset P of A is chosen . The set A is reconstructed by replacing the elements of P.A subset Q of A is again chosen . The number of ways of choosing P and Q so that P cap Q = phi is :

A is a set containing n elements. A subset P_1 of A is chosen. The set A is reconstructed by replacing the elements P Next, a of subset P_2 of A is chosen and again the set is reconstructed by replacing the elements of P_2 , In this way, m subsets P_1, P_2....,P_m of A are chosen. The number of ways of choosing P_1,P_2,P_3,P_4...P_m

A book contains 1000 pages. A page is chosen at random. Find the probability that the sum of the digits of the marked number on the page is equal to 9.

Two positive real numbers x and y satisfying xle1 and yle1 are chosen at random. The probability that x+yle1 , given that x^2+y^2le(1)/(4) , is

A set contains (2 n+1) elements. The number of subsets of this set containing more than n elements is equal to

If two of the 64 squares are chosen at random on a chess board, the probability that they have a side in common is

If a set has n elements then the total number of subsets of A is