This note presents an observation on the distribution of prime numbers modulo 9. Every prime number p ≥ 5 is congruent to 1, 2, 4, 5, 7 or 8 modulo 9. These six classes form two distinct cycles: Cycle A: 1 → 7 → 4 → 1 Cycle B: 2 → 8 → 5 → 2 Two arithmetic properties are demonstrated: 1. Within the same class modulo 9, the gap between two consecutive primes is a multiple of 18: p₍+₁ = pₙ + 18k. 2. To move from one class to the next within the same cycle (1→7, 7→4, 4→1 or 2→8, 8→5, 5→2), the gap is a multiple of 6: q = p + 6k. A connection with famous prime families is also shown: - Mersenne primes (2ⁿ - 1) belong to Cycle A. - Fermat primes (2^ (2ⁿ) + 1) belong to Cycle B. An experimental validation on 18, 000 candidates (3, 000 per class) around 30, 000 confirms a uniform distribution of primes among the six classes (6, 051 primes found, maximum deviation of 0. 17% from uniformity).
MONIA DAOUDI (Tue,) studied this question.
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