IF `n` is a natural number, then `(9^(2n)-4^(2n))` is always divisible by:

If n is a natural numbers then 25^(2n)-9^(2n) is always divisible by

If n is any natural number then n^(2)(n^(2)-1) is always divisible

If n is any natural number, then 5^(2n)-1 is always divisible by how many natural numbers ?

If n is an odd natural number 3^(2n)+2^(2n) is always divisible by

If n is any natural number, then 9^(n)-5^(n) ends with

5^(n)-1 is always divisible by (n in N)

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 n is any even number, then n(n^(2)+20) 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.