If n(A) = 3 and n(B) = 4, then the number of injective mapping that can be defined from A to B (a)144 (b)12 (c)24 (d)64

Set A has 3 elements and the set B has 4 elements. Then the number of injective mapping that can be defined from A to B is

Let n(A)=5 and n(B)=3 then find the number of injective functions and onto functions from A to B

The number of equivalence relations that can be defined on set {a, b, c}, is

Let A be a finite set containing n distinct elements. The number of relations that can be defined from A to A is (a) 2^n (b) n^2 (c) 2^(n^2) (d) None of these

The number of bijective functions from A to B if n(A)=n(B)=4

Fill in the blank: The number of relations that can be defined from set A = (1,2,3) to the set B = (a,b,c) is ______