The number of functions f from `{1,2,3,…,20}` onto `{1,2,3,…….20}` such that f (k) is a multiple of 3 whenever k is a multiple of 4 is:

If set A={1, 2, 3, ...,20 }, then the find the number of onto functions from A to A such that f(k) is a multiple of 3, whenever k is a multiple of 4. (A) 6^5xx15! (B) 5^6xx15! (C) 6!xx5! (D) 6!xx15!

The number of onto function f:A rarr B where {1,2,3,4,5,6) and B={1,2,3 is

Statement-1: The number of onto function f from A={1,2,3,4,5,6} to B={7,8,9} such that f(i)<=f(j) for ' i

If the number of onto functions from [1,2,3,4}rarr{2,3,4} such that f(1)!=i for i=1,2,3,4 is k then (k)/(4) is equal to

The total number of function f from the set (1,2,3) into the set (1,2,3,4,5) such that f(i)<=f(j)AA i

The total number of onto functions from the set {1,2,3,4) to the set (3,4,7) is

Find the probability that a number selected at random from the numbers 1,2,3,...35 is a prime number (ii) multiple of 7 (iii) a multiple of 3 or 5

Consider all function f: {1,2,3,4} to {1,2,3,4} which are one-one, onto and satisfy the following property : If f (k) is odd then f (k+1) is even, K=1,2,3. The number of such function is :