Small Mersenne Prime Factors (page 2982/5025)

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
326649517	5226392273	10	~2000
326663807	2613310457	10	~1999
326684531	653369063	9	~1997
326685239	653370479	9	~1997
326696603	653393207	9	~1997
326697443	653394887	9	~1997
326700973	1960205839	10	~1999
326719559	653439119	9	~1997
326722139	653444279	9	~1997
326726297	2613810377	10	~1999
326730119	653460239	9	~1997
326736793	7841683033	10	~2000
326764079	653528159	9	~1997
326787731	653575463	9	~1997
326808203	653616407	9	~1997
326808899	653617799	9	~1997
326811941	2614495529	10	~1999
326814623	653629247	9	~1997
326825039	653650079	9	~1997
326828279	653656559	9	~1997
326828783	653657567	9	~1997
326837531	653675063	9	~1997
326841551	653683103	9	~1997
326841953	106550476679	12	~2003
326850203	653700407	9	~1997

Exponent	Prime Factor	Digits	Year
326850911	653701823	9	~1997
326851939	3268519391	10	~1999
326853071	653706143	9	~1997
326857259	653714519	9	~1997
326858723	653717447	9	~1997
326865839	653731679	9	~1997
326868551	653737103	9	~1997
326881483	5230103729	10	~2000
326889011	653778023	9	~1997
326907877	1961447263	10	~1999
326908031	653816063	9	~1997
326912951	653825903	9	~1997
326917057	5230672913	10	~2000
326921291	653842583	9	~1997
326932721	1961596327	10	~1999
326949743	653899487	9	~1997
326955983	653911967	9	~1997
326956433	1961738599	10	~1999
326956439	653912879	9	~1997
326957303	653914607	9	~1997
326960141	1961760847	10	~1999
326960351	2615682809	10	~1999
326978243	653956487	9	~1997
326981243	653962487	9	~1997
326983021	13079320841	11	~2001

Exponent	Prime Factor	Digits	Year
326999297	2615994377	10	~1999
327007151	654014303	9	~1997
327017351	2616138809	10	~1999
327021731	654043463	9	~1997
327024443	654048887	9	~1997
327032171	654064343	9	~1997
327043823	654087647	9	~1997
327044287	5886797167	10	~2000
327047951	654095903	9	~1997
327056657	1962339943	10	~1999
327065351	5887176319	10	~2000
327075263	654150527	9	~1997
327077099	654154199	9	~1997
327082391	654164783	9	~1997
327094193	1962565159	10	~1999
327095077	5233521233	10	~2000
327103379	654206759	9	~1997
327108011	654216023	9	~1997
327142031	654284063	9	~1997
327149219	654298439	9	~1997
327153479	654306959	9	~1997
327153779	654307559	9	~1997
327160583	654321167	9	~1997
327162371	654324743	9	~1997
327163751	654327503	9	~1997

Exponent	Prime Factor	Digits	Year
327169211	654338423	9	~1997
327169919	654339839	9	~1997
327176797	1963060783	10	~1999
327200317	7852807609	10	~2000
327203399	654406799	9	~1997
327215459	654430919	9	~1997
327215573	7853173753	10	~2000
327223751	654447503	9	~1997
327225179	654450359	9	~1997
327226181	1963357087	10	~1999
327229271	654458543	9	~1997
327245543	654491087	9	~1997
327248303	654496607	9	~1997
327250139	654500279	9	~1997
327274109	4581837527	10	~2000
327275363	654550727	9	~1997
327278177	2618225417	10	~1999
327278771	2618230169	10	~1999
327281861	2618254889	10	~1999
327283919	654567839	9	~1997
327284539	20946210497	11	~2001
327287963	654575927	9	~1997
327294809	2618358473	10	~1999
327296111	654592223	9	~1997
327309431	2618475449	10	~1999

4.724.182 digits

25-04-13