Using mathematical induction prove that `d/(dx)(x^n)=n x^(n-1)` for all positive integers n.

Using mathematical induction prove that d/(d x)(x^n)=n x^(n-1) for all positive integers n .

Using mathematical induction prove that (d)/(dx)(x^(n))=nx^(n-1) for all positive integers n.

Using mathematical induction prove that (d)/(dx)(x^n)= nx^(n-1) for all positive integers n.

Using mathematical induction prove that d(x^n)/dx = nx^(n-1) for all positive integers n.

Using mathematical induction prove that : d/(dx)(x^n)=n x^(n-1) for all n in NN .

Using mathematical induction prove that : (d)/(dx)(x^(n))=nx^(n-1)f or backslash all n in N

By mathematical induction, show that 49^n+16n-1 is divisible by 64 for all positive integer n.

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

Using mathematical induction prove that x^(2n)-y^(2n) is divisible by x+y for all n in N

Using the formula of differentiation of product functions show that (d)/(dx)(x^(n))=nx^(n-1) , where n is a positive integer.