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

The number of bijective functions from the set A to itsef, if A contains 108 elements is

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

Let A={1,\ 2,\ ,\ n} and B={a ,\ b} . Then the number of subjections from A into B is \ ^n P_2 (b) 2^n-2 (c) 2^n-1 (d) \ ^n C_2

Let A and B be two sets containing 3 and 4 elements respectively. The number of functions from A to B is :

Let L denotes the number of subjective functions f : A -> B , where set A contains 4 elementset B contains 3 elements. M denotes number of elements in the range of the function f(x) = sec^-1(sgmx) + cosec^-1(sgn x) where sg n x denotes signum function of x. And N denotes coefficient of t^5 in (1+t^2)^5(1+t^3)^8 . The value of (LM+N) is lambda , then the value of lambda/19 is

Let n(P) = 4 and n(Q) = 5. The number of all possible injections from P to Q is :

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

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