Let n(A) = 4, n(B) = 4. Find number of possible bijective functions from A to B.

Similar Questions

Explore conceptually related problems

Let n(A) = 4 and n(B) = k. The number of all possible injections from A to B is 120 then k =

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

Let n(A) = 4 and n(B) = 5. The number of all possible many-one functions from A to B is

Let n(A)=4 and n(B)=5 . The number of all possible many-one functions from A to B is

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

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

If A, B are two sets such that n(A) = 100, n(B) = 150, then the number of bijections from A onto B is

Let n(A)=3 and n(B)=5 , then the number of one - one functions 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