Using mathematical induction prove that `n^2 -n+41` is prime.

By Mathematical Induction, prove that : n! 1 .

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

By using mathematical induction prove that 3^(2n)-8n-1 is divisible by 64 when n is an integer.

Using mathematical induction prove that 10^(2n-1)+1 is divisible by 11 for all n in N

Using mathematical induction prove that n^(3)-7n+3 is divisible by 3, AA n in N

Using mathematical induction prove that 41^n-14^n is a multiple of 27 for all n in N

Using mathematical induction prove that (2n+7) lt (n+3)^2 for all n in N

using Mathematical induction,prove that 3^(2n)+7 is divisible by 8.

Using principle of mathematical induction , prove that n^(3) - 7n +3 is divisible by 3 , for all n belongs to N .

Using mathematical induction prove that P(n) = 1+3+5+........... +2n-1=n^(2)