Small Mersenne Prime Factors (page 2598/5040)

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
144119267	1152954137	10	~1996
144123437	1152987497	10	~1996
144124031	288248063	9	~1995
144127391	288254783	9	~1995
144130849	6918280753	10	~1998
144134519	288269039	9	~1995
144138443	288276887	9	~1995
144139883	288279767	9	~1995
144140693	864844159	9	~1996
144141131	2594540359	10	~1997
144143477	864860863	9	~1996
144144491	288288983	9	~1995
144145931	288291863	9	~1995
144147299	288294599	9	~1995
144148883	288297767	9	~1995
144156371	288312743	9	~1995
144160781	864964687	9	~1996
144162071	288324143	9	~1995
144166031	288332063	9	~1995
144167237	1153337897	10	~1996
144167549	1153340393	10	~1996
144169211	288338423	9	~1995
144175463	288350927	9	~1995
144176783	288353567	9	~1995
144184151	288368303	9	~1995

Exponent	Prime Factor	Digits	Year
144186233	865117399	9	~1996
144187583	288375167	9	~1995
144189667	1441896671	10	~1996
144194111	288388223	9	~1995
144194411	288388823	9	~1995
144196051	2595528919	10	~1997
144196319	288392639	9	~1995
144198863	288397727	9	~1995
144201017	865206103	9	~1996
144201443	288402887	9	~1995
144205751	288411503	9	~1995
144207971	288415943	9	~1995
144209003	288418007	9	~1995
144209789	1153678313	10	~1996
144210373	3461048953	10	~1997
144210799	3461059177	10	~1997
144211043	288422087	9	~1995
144213071	288426143	9	~1995
144216599	288433199	9	~1995
144221303	288442607	9	~1995
144222251	288444503	9	~1995
144223511	288447023	9	~1995
144225359	288450719	9	~1995
144230231	288460463	9	~1995
144233003	288466007	9	~1995

Exponent	Prime Factor	Digits	Year
144237479	288474959	9	~1995
144239519	288479039	9	~1995
144240757	865444543	9	~1996
144244343	288488687	9	~1995
144245219	288490439	9	~1995
144251491	1442514911	10	~1996
144255689	1154045513	10	~1996
144274283	288548567	9	~1995
144275951	288551903	9	~1995
144278257	865669543	9	~1996
144278483	288556967	9	~1995
144279251	288558503	9	~1995
144281171	288562343	9	~1995
144283031	288566063	9	~1995
144283039	1442830391	10	~1996
144285917	865715503	9	~1996
144288719	288577439	9	~1995
144290903	288581807	9	~1995
144294659	288589319	9	~1995
144294719	288589439	9	~1995
144295741	865774447	9	~1996
144297403	1442974031	10	~1996
144300899	288601799	9	~1995
144303319	1443033191	10	~1996
144303437	1154427497	10	~1996

Exponent	Prime Factor	Digits	Year
144308201	865849207	9	~1996
144310571	288621143	9	~1995
144318539	1154548313	10	~1996
144320999	1154567993	10	~1996
144323513	865941079	9	~1996
144330299	288660599	9	~1995
144331559	288663119	9	~1995
144332117	865992703	9	~1996
144333743	288667487	9	~1995
144338543	288677087	9	~1995
144345437	1154763497	10	~1996
144348731	288697463	9	~1995
144352511	2598345199	10	~1997
144353123	288706247	9	~1995
144353879	288707759	9	~1995
144358559	288717119	9	~1995
144377231	288754463	9	~1995
144385523	288771047	9	~1995
144392159	288784319	9	~1995
144393311	288786623	9	~1995
144395159	288790319	9	~1995
144397523	288795047	9	~1995
144402277	866413663	9	~1996
144402877	866417263	9	~1996
144403139	288806279	9	~1995

4.739.325 digits

25-04-20