I noticed that for any integer $n>0$, $14^n+11$ would not be prime for up to $n=4$. Does this hold for all $n$? Is there a way to prove this or is this something that only works for some $n$?
2025-01-13 02:11:44.1736734304
Prove that a set of numbers can never consist of prime numbers
68 Views Asked by nfc https://math.techqa.club/user/nfc/detail AtRelated Questions in NUMBER-THEORY
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