Prove that the number A= [tex]20^{8^{2014} } }+113 is composite

Question

asked Jul 25, 2023 90.1k views

1 Answer

Laxmikant Dange · Answer 1 · 2023-07-29T17:51:53+0000

Cheese proof:

We can just prove that it is divisible by 3, which means that it is composite. We can use modular exponentiation, where if
$a \equiv b \pmod{n}$ then
$a^x \equiv b^x \pmod{n}$ . In this case,
${-1}^{8^(2014)} \equiv 20^{8^(2014)} \pmod{3}$ . This is much easier to calculate! Since
is even,
$-1^{8^(2014)}=1$ , meaning that now we only need to prove that
$0\equiv(1+113) \pmod{3}$ , which is obviously true.