Let n(A) = m, n(B) = n, then the total number of relations between A and B is `K^(mn)`, find K.

Let n(A)=4 and n(B)=6 ,then the number of one one functions from A to B must be M. Then sqrt(M/10) is equal to ?

Let S={a,b,c} , the total number of binary operations on S be K^(9) . Find the value of K.

What is the difference between mN and N . M?

Let n(A) = 4 and n(B) = 5 and if in the case of one-one mapping A to B n(A) = 3,n(B) = 4, then the value of n(AxxAxxB) = 6K. Find K.

If the ratio of the total number of combinations of 2n different things to the total number of combinations of n different things be 1025 : 1 , find n .

Two finite sets A and B are having m and n elements.The total number of subsets of the first set is 56 more than the total number of subsets of the second set.The value of m and n ae respectively.

Let f(n)=sum_(r=0)^nsum_(k=r)^n(kC r) Find the total number of divisors of f(9)dot

If a^m a^n =a^(mn) , then express m in terms of n.

Let f(n)= sum_(k=1)^(n) k^2 ^"(n )C_k)^ 2 then the value of f(5) equals

Let N N be the set of natural numbers and R be a relation on N NxxN N defined by, (a,b) R (c,d) to a+d=b+c, for all (a,b) and (c,d) iN N NxxN N . prove that R is an equivalence relation on N NxxN N .