Let n(A) = n, then the number of all relations on A, is

Let X be any non-empty set containing n elements, then the number of relations on X is

If (n)^3 - (n)^(2) - n = n , then the number of values of n that satisfy the given relation is :

Let X be any non-empty set containing n elements. Then what is the number of relations on X ?

Consider the set A={3,4,5} and the number of null relations,identity relation, universal relations,reflexive relation on A are respectively n_(1),n_(2),n_(3),n_(4) ,Then the value of n_(1)+n_(2)+n_(3)+n_(4) is equal to

Let P_(n) denote the number of permutation of n distinct things taken all at a time and x_(n)=^(n+5)C_(4)-((143)/(96))((P_(n+5))/(P_(n+3))) (where n in N .The possible value of n for which x_(n) is negative,can be

Let n(A)=3 and n(B)=4 .The number of all possible many one functions from A to B is

Let n(A) = m and n(B) = n. The total number of non-empty relations that can defined from A to B is

Let n(A)=m and n(B)=n Then, the total number of non-empty relations that can be defined from A to B is: