The Artin's conjecture says that for any non-squre positive integer $n$, there exist infinitely many prime $p$ such that $n$ is a primitive root mod $p$. So, what can we said about existence of one prime.
2026-04-12 03:53:12.1775965992
For given odd prime $q$, does there exist a prime $p$ such that $q$ is a primitive root mod $p$?
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