If n is anodd integer greter than 3 but not a multiple of 3 prove that `[(x+y)^n-x^n-y^n]` is divisible by `xy(x+y)(x^2+xy+y^2).`

If n is n odd integer that is greater than or equal to 3 but not a multiple of 3, then prove that (x+1)^n-x^n-1 is divisible by x^3+x^2+xdot

If n is n odd integer that is greater than or equal to 3 but not a multiple of 3, then prove that (x+1)^n-x^n-1 is divisible by x^3+x^2+xdot

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

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

Using the principle of mathematical induction. Prove that (x^(n)-y^(n)) is divisible by (x-y) for all n in N .

Using the principle of mathematical induction. Prove that (x^(n)-y^(n)) is divisible by (x-y) for all n in N .

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

Using principle of mathematical induction prove that x^(2n)-y^(2n) is divisible by x+y for all n belongs to Ndot

(x+y)^(n) + (x-y)^(n) is equal to

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