ADDITIONAL IDENTITIES INVOLVING MERSENNE PRIMES There are numerous point functions which can be used to generate prime numbers.
![(PDF) A Novel Deterministic Mersenne Prime Numbers Test: Aouessare-El Haddouchi-Essaaidi Primality Test | Abdeslam El haddouchi - Academia.edu (PDF) A Novel Deterministic Mersenne Prime Numbers Test: Aouessare-El Haddouchi-Essaaidi Primality Test | Abdeslam El haddouchi - Academia.edu](https://0.academia-photos.com/attachment_thumbnails/81828045/mini_magick20220307-29365-13g50wq.png?1646643161)
(PDF) A Novel Deterministic Mersenne Prime Numbers Test: Aouessare-El Haddouchi-Essaaidi Primality Test | Abdeslam El haddouchi - Academia.edu
![dℝ∅ℕ∋ on X: "Double Mersenne prime = 2^(Mersenne prime) – 1 Triple Mersenne prime = 2^(double Mersenne prime) – 1 2^(2^(2² – 1) – 1) – 1 = 127 and 2^(2^(2³ – dℝ∅ℕ∋ on X: "Double Mersenne prime = 2^(Mersenne prime) – 1 Triple Mersenne prime = 2^(double Mersenne prime) – 1 2^(2^(2² – 1) – 1) – 1 = 127 and 2^(2^(2³ –](https://pbs.twimg.com/media/EPnRwJNWsAA9vva.png)
dℝ∅ℕ∋ on X: "Double Mersenne prime = 2^(Mersenne prime) – 1 Triple Mersenne prime = 2^(double Mersenne prime) – 1 2^(2^(2² – 1) – 1) – 1 = 127 and 2^(2^(2³ –
![1 Mersenne Primes How to generate more prime numbers? Mersenne (1588-1648) generated primes using formula: where p is a prime M 2 = 3; M 3 = 7, M 5 = 31, - ppt download 1 Mersenne Primes How to generate more prime numbers? Mersenne (1588-1648) generated primes using formula: where p is a prime M 2 = 3; M 3 = 7, M 5 = 31, - ppt download](https://slideplayer.com/6262781/21/images/slide_1.jpg)