The number of all pairs (m, n), where m and n are positive integers, such that `1/(m)+1/(n)+1/(mn)=2/(5)` is

If (m)=64, where m and n are positive integers,find the value of n)^(mn)..

n|sin x|=m|cos|in[0,2 pi] where n>m and are positive integers

The number of ordered pairs (m,n), where m, n in {1,2,3, …..,50}, such that 6^(m)+9^(n) is a multiple of 5 is -

3.If m o* n are positive integers such that m^(2)+2n=n^(2)+2m+5, then the value of n is

If m,n are the positive integers (n gt 1) such that m^n = 121 , then value of (m-1)^(n +1) is :

The number of ordered pairs (m,n) where m , n in {1,2,3,…,50} , such that 6^(m)+9^(n) is a multiple of 5 is

The number of positive integer pairs (m,n) where n is odd,that satisfy (1)/(m)+(4)/(n)=(1)/(12) is

If (5+2sqrt(6))^(n)=m+f, where n and m are positive integers and 0<=f<=1, then (1)/(1-f)-f is equal to