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erdos_1065b

Specification

Are there infinitely many primes $p$ such that $p = 2^k 3^l q + 1$ for some prime $q$ and $k ≥ 0$, $l ≥ 0$?

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Lean 4 Statement 
theorem erdos_1065b : answer(sorry) ↔
    Set.Infinite {p | ∃ q k l, p.Prime ∧ q.Prime ∧ p = 2^k * 3^l * q + 1}
ID: ErdosProblems__1065__erdos_1065b
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