If `x!= y`, then for every natural number n, `x^n - y^n` is divisible by

Prove that for any natural numbers n, 7^(n)-2^(n) is divisible by 5.

For all natural number of n, 2^(2n).3^(2n)-1-35n is divisible by

Statement -1 For each natural number n,(n+1)^(7)-n^7-1 is divisible by 7. Statement -2 For each natural number n,n^7-n is divisible by 7.

Statement -1 for all natural numbers n , 2.7^(n)+3.5^(n)-5 is divisible by 24. Statement -2 if f(x) is divisible by x, then f(x+1)-f(x) is divisible by x+1,forall x in N .

Show that 27! Is divisible by 2^12 . What is the largest natural number n such that 27 ! Is divisible by 2^n ?

Prove by the mathematical induction x^(2n)-y^(2n) is divisible by x+y

The product of n consecutive natural numbers is always divisible by

Prove the following by using the principle of mathematical induction for all n in N : x^(2n)-y^(2n) is divisible by x + y .

Prove, by mathematical induction, that x^n +y^n is divisible by x +y for any positive odd integer n.

Using principle of mathematical induction , prove that , (x^(2n)-y^(2n)) is divisible by (x+y) fpr all n in N .