If m and n are two integers such that `m = n^(2) - n`, then `(m^(2) - 2m)` is always divisible by

If m and n are +ve integers and ( m-n) is an even number , then (m^(2) - n^(2)) will be always divisible by.

If m and n are positive integers and (m – n) is an even number, then (m^(2) - n^(2)) will be always divisible by

If m=n^(2)-n , where n is an integer , then m^(2)-2m is divisible by

If m and n are positive integers such that (m-n)^(2)=(4mn)/((m+n-1)) , then how many pairs (m, n) are possible?

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 and n are +ve integers such that (m+n)P_(2)=90 and m-np_(2)=30, the number of ordered pairs (m,n) of such integers is

If a^m .a^n = a^(mn) , then m(n - 2) + n(m- 2) is :