Using the principle of mathematical induction ,prove that `(1+x)^ngeq(1+n x)` for all `n in N`, where x>-1.

Prove that (1+x)^ngeq(1+n x), for all natural number n, where x >-1.

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 (2^(3n)-1) is divisible by 7 for all n in N

Using the principle of mathematical induction, prove that (2^(3n)-1) is divisible by 7 for all n in N

Using the principle of mathematical induction, prove that (2^(3n)-1) is divisible by 7 for all n in N

Using the principle of mathematical induction, prove that (2^(3n)-1) is divisible by 7 for all n in N

Using principle of mathematical induction prove that n(n+1)(n+5) is a multiple of 3 for all n in N .

Using the principle of mathematical induction, prove that n(n+1)(n+5) is a multiple of 3 for all ninN .

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 .