Small Mersenne Prime Factors (page 2980/5025)

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
325264013	4553696183	10	~2000
325264403	650528807	9	~1997
325275299	650550599	9	~1997
325278893	1951673359	10	~1999
325312079	650624159	9	~1997
325314239	650628479	9	~1997
325315163	650630327	9	~1997
325320179	650640359	9	~1997
325322891	650645783	9	~1997
325332013	1951992079	10	~1999
325338659	650677319	9	~1997
325338899	650677799	9	~1997
325349819	2602798553	10	~1999
325357859	650715719	9	~1997
325364843	650729687	9	~1997
325367687	37091916319	11	~2002
325379819	650759639	9	~1997
325381117	1952286703	10	~1999
325382003	650764007	9	~1997
325382347	3253823471	10	~1999
325398851	650797703	9	~1997
325409041	1952454247	10	~1999
325413059	650826119	9	~1997
325414433	96322672169	11	~2003
325416491	650832983	9	~1997

Exponent	Prime Factor	Digits	Year
325422973	5206767569	10	~2000
325446371	650892743	9	~1997
325450199	650900399	9	~1997
325461337	1952768023	10	~1999
325462919	650925839	9	~1997
325464479	650928959	9	~1997
325468991	650937983	9	~1997
325473983	650947967	9	~1997
325503863	651007727	9	~1997
325506017	12369228647	11	~2001
325527011	651054023	9	~1997
325534271	651068543	9	~1997
325537643	651075287	9	~1997
325571651	651143303	9	~1997
325572671	651145343	9	~1997
325575863	651151727	9	~1997
325577471	651154943	9	~1997
325579817	1953478903	10	~1999
325579981	1953479887	10	~1999
325580483	651160967	9	~1997
325590899	651181799	9	~1997
325596599	651193199	9	~1997
325604093	4558457303	10	~2000
325608611	651217223	9	~1997
325617419	651234839	9	~1997

Exponent	Prime Factor	Digits	Year
325618883	651237767	9	~1997
325621573	1953729439	10	~1999
325629937	1953779623	10	~1999
325630859	651261719	9	~1997
325633043	651266087	9	~1997
325635083	651270167	9	~1997
325636321	1953817927	10	~1999
325639511	651279023	9	~1997
325658891	651317783	9	~1997
325661321	1953967927	10	~1999
325662611	651325223	9	~1997
325679303	651358607	9	~1997
325701611	651403223	9	~1997
325704443	651408887	9	~1997
325716899	651433799	9	~1997
325734163	11074961543	11	~2000
325735703	651471407	9	~1997
325736941	1954421647	10	~1999
325740419	651480839	9	~1997
325749731	651499463	9	~1997
325760297	1954561783	10	~1999
325765259	651530519	9	~1997
325773827	8470119503	10	~2000
325777499	651554999	9	~1997
325785359	651570719	9	~1997

Exponent	Prime Factor	Digits	Year
325791731	13683252703	11	~2001
325809443	651618887	9	~1997
325811963	651623927	9	~1997
325813583	651627167	9	~1997
325820639	651641279	9	~1997
325825823	651651647	9	~1997
325826729	10426455329	11	~2000
325830383	651660767	9	~1997
325832051	651664103	9	~1997
325832141	2606657129	10	~1999
325836971	651673943	9	~1997
325841531	651683063	9	~1997
325855199	651710399	9	~1997
325887371	651774743	9	~1997
325888379	651776759	9	~1997
325889891	2607119129	10	~1999
325896079	3258960791	10	~1999
325901671	3259016711	10	~1999
325904003	651808007	9	~1997
325908503	651817007	9	~1997
325915979	651831959	9	~1997
325920677	1955524063	10	~1999
325930763	651861527	9	~1997
325949411	651898823	9	~1997
325954463	651908927	9	~1997

4.724.182 digits

25-04-13