Small Mersenne Prime Factors (page 2954/5070)

Small Mersenne Prime Factors
Prime numbers of the form M_p= 2^p − 1 are called Mersenne primes. For M_p to be prime, p must also be prime.
Any factor q of a Mersenne number 2^p − 1 must be of the form 2kp + 1, where integer k ≥ 0. Furthermore, q must be 1 or 7 mod 8.

Exponent	Prime Factor	Digits	Year
292668791	585337583	9	~1997
292672511	585345023	9	~1997
292686851	585373703	9	~1997
292716577	1756299463	10	~1998
292727219	585454439	9	~1997
292735277	2341882217	10	~1999
292735739	585471479	9	~1997
292754699	585509399	9	~1997
292774151	585548303	9	~1997
292776299	585552599	9	~1997
292778459	585556919	9	~1997
292780643	585561287	9	~1997
292781243	585562487	9	~1997
292785071	585570143	9	~1997
292803011	585606023	9	~1997
292804597	4684873553	10	~1999
292821143	585642287	9	~1997
292826953	1756961719	10	~1998
292836119	585672239	9	~1997
292837991	585675983	9	~1997
292845481	1757072887	10	~1998
292848071	585696143	9	~1997
292849523	585699047	9	~1997
292857791	585715583	9	~1997
292864553	1757187319	10	~1998

Exponent	Prime Factor	Digits	Year
292873979	585747959	9	~1997
292890677	1757344063	10	~1998
292890803	585781607	9	~1997
292892819	585785639	9	~1997
292899731	2343197849	10	~1999
292910363	585820727	9	~1997
292910393	1757462359	10	~1998
292945223	585890447	9	~1997
292947311	585894623	9	~1997
292961579	5273308423	10	~1999
292963991	585927983	9	~1997
292965671	585931343	9	~1997
292968551	585937103	9	~1997
292989863	585979727	9	~1997
292993769	2343950153	10	~1999
292999013	7031976313	10	~2000
292999937	1757999623	10	~1998
293016931	344587910857	12	~2004
293016959	586033919	9	~1997
293043677	1758262063	10	~1998
293048927	2344391417	10	~1999
293049607	5274892927	10	~1999
293063711	2344509689	10	~1999
293065631	586131263	9	~1997
293079659	586159319	9	~1997

Exponent	Prime Factor	Digits	Year
293086259	586172519	9	~1997
293101079	586202159	9	~1997
293119019	586238039	9	~1997
293125097	1758750583	10	~1998
293125223	586250447	9	~1997
293128267	4690052273	10	~1999
293133173	9380261537	10	~2000
293151011	586302023	9	~1997
293152991	586305983	9	~1997
293161007	14071728337	11	~2000
293166983	586333967	9	~1997
293172371	586344743	9	~1997
293172443	586344887	9	~1997
293174839	5277147103	10	~1999
293180831	586361663	9	~1997
293181737	1759090423	10	~1998
293188823	586377647	9	~1997
293196979	2931969791	10	~1999
293214503	586429007	9	~1997
293218769	2345750153	10	~1999
293218979	586437959	9	~1997
293224583	586449167	9	~1997
293230481	32255352911	11	~2001
293236271	586472543	9	~1997
293238551	586477103	9	~1997

Exponent	Prime Factor	Digits	Year
293255051	586510103	9	~1997
293257271	586514543	9	~1997
293266931	586533863	9	~1997
293271059	586542119	9	~1997
293274203	586548407	9	~1997
293275919	586551839	9	~1997
293278703	586557407	9	~1997
293285243	586570487	9	~1997
293287751	586575503	9	~1997
293290007	54551941303	11	~2002
293293943	586587887	9	~1997
293304131	586608263	9	~1997
293308451	12318954943	11	~2000
293309759	586619519	9	~1997
293310971	586621943	9	~1997
293314709	2346517673	10	~1999
293321333	1759927999	10	~1998
293323873	1759943239	10	~1998
293330183	586660367	9	~1997
293330827	4693293233	10	~1999
293332439	586664879	9	~1997
293338091	586676183	9	~1997
293348389	7040361337	10	~2000
293348459	586696919	9	~1997
293374811	586749623	9	~1997

4.768.925 digits

25-05-04