`(41^(3)+1)` is divisible by

If (2^(3n)-1) is divisible by 7, then prove that, [2^(3(n+1))-1] is also divisible by 7.

If (2^(2n)-1) is divisible by 3, then show that [2^(2(n+1))-1] is also divisible by. 3

If (2^(2n)-1) is divisible by 3, then show that, [2^(2(n+1))-1] is also divisible by 3.

If nge0 is an integer, prove by induction that 3*5^(2n+1)+2^(3n+1) is divisible by 17.

If (10^(2n-1)+1) is divisible by 11, then prove that (10^(2n+1)+1) is also divisible by 11.

If (15^(2n-1)+1) is divisible by 16, then show that (15^(2n+1)+1) is also divisible by 16.

Show that (17^(3)+7^(3)) is divisible by 24.

Prove that (x^(201)+1) is divisible by (x+1).

By mathematical induction prove that, (2^(2n)-1) is divisible by 3 where nge1 is an integer.

Show that by mathematical induction, 3.5^(2n+1) + 2^(3n+1) is divisible by 17, when n > =0 is an integer.