Prove that `log_n(n+1)>log_(n+1)(n+2)` for any natural number `n > 1.`

Prove that (1+x)^(n) ge (1+nx) for all natural number n where x gt -1

Use the principle of mathematical induction to show that 5^(2n+1)+3^(n+2).2^(n-1) divisible by 19 for all natural numbers n.

Show by using the principle of mathematical induction that for all natural number n gt 2, 2^(n) gt 2n+1

Prove that n + n is divisible by 2 for any positive integer n.

Prove that (n !) is divisible by (n !)^(n-1)!

Prove that .^(n-1)C_(3)+.^(n-1)C_(4) gt .^(n)C_(3) if n gt 7 .

If 1, alpha_(1), alpha_(2), …., alpha_(n-1) are the n^(text (th ) roots of unity and n is odd natural number, then (1+alpha_(1))(1+alpha_(2)) ... . .(1+alpha_(n-1))=

Statement-1 For all natural number n, 1+2+....+nlt (2n+1)^2 Statement -2 For all natural numbers , (2n+3)^2-7(n+1)lt (2n+3)^3 .

Statement-1: For every natural number nge2 , (1)/(sqrt(1))+(1)/(sqrt(2))+(1)/(sqrt(3))+...+(1)/(sqrt(n))gtsqrt(n) Statement-2: For every natural number nge2, sqrt(n(n+1))ltn+1

Let S_(n) denote the sum of the cubes of the first n natural numbers and s_(n) denote the sum of the first n natural numbers. Then sum_(r=1)^(n)(S_(r))/( S_(r )) equals :