2020-06-19, 21:12 | #1 |
Mar 2018
1000011010_{2} Posts |
Lcm(344,559) 331 and pg primes
Pg(215), pg(69660),pg(92020) pg(541456) are prp with 215, 69660, 92020 and 541456 multiple of 43.
215, 69660, 92020, 541456 are plus/minus 344 mod 559 lcm(344,559)=4472 4472=8*331+456*4 Pg(331259) is prp 331259=331+(8*331+456*4)*s with some integer s And 331259 leaves the same remainder 331 mod 344 and mod 559 215, 69660, 92020, 541456 are 10^m mod 41 multiple of 43 and congruent to (41*(10^2+1)+331)/13 mod (41*(10^2+1)+331)/8 Last fiddled with by enzocreti on 2020-06-20 at 11:32 |
Thread Tools | |
Similar Threads | ||||
Thread | Thread Starter | Forum | Replies | Last Post |
Mersenne Primes p which are in a set of twin primes is finite? | carpetpool | Miscellaneous Math | 4 | 2022-07-14 02:29 |
Patterns in primes that are primitive roots / Gaps in full-reptend primes | mart_r | Prime Gap Searches | 14 | 2020-06-30 12:42 |
Distribution of Mersenne primes before and after couples of primes found | emily | Math | 34 | 2017-07-16 18:44 |
A conjecture about Mersenne primes and non-primes | Unregistered | Information & Answers | 0 | 2011-01-31 15:41 |
possible primes (real primes & poss.prime products) | troels munkner | Miscellaneous Math | 4 | 2006-06-02 08:35 |