Let A be a set containing 10 distinct elements . Then the total number of distinct functions from A to A is :

A is a set having 6 distinct elements. The number of distinct functions from A to A which are not bijections is

A is a set having 6 distinct elements . The number of distinct functions from A to A which are not bijections is

Let A be the set with n elements. The number of onto functions from A to A is

Let A and B be two finite sets having m and n elements respectively. If mlen , the total number of injective functions from A to B is :

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

If a set A has 4 elements , then the total number of proper subsets of set A is :

Let A and B be two sets containing four and two elements respectively. Then the number of subsets of the set A x B , each having at least three elements is :

A set contains n elements. The Power set contains

Let A and B be two sets consisting of m and n elements respectively (n ge m) . The number of one-one functions from A to B is

Let A be a set of n (>=3) distinct elements. The number of triplets (x, y, z) of the A elements in which at least two coordinates is equal to