Prove that $5^{3^n} + 1$ is divisible by $3^{n + 1}$ for all nonnegative integers $n.$

Question

I tried to use Proof by Induction, but I'm stuck on the case for when $n=k+1.$

Related: https://math.stackexchange.com/q/2411847/42969, https://math.stackexchange.com/q/1591176/42969. — Martin R, Jul 24 '20 at 04:30
Sorry guys. Didn't know that this question was already answered... — In-finite, Jul 24 '20 at 04:34

score 5 · Accepted Answer · answered Jul 24 '20 at 04:09

5

Hint:

$5^{3^{k+1}}+1=(5^{3^k})^3+1=(5^{3^k}+1)(5^{2\cdot3^k}-5^{3^k}+1)$

answered Jul 24 '20 at 04:09

J. W. Tanner

1 Answers1