Small Mersenne Prime Factors (page 3931/5025)

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
3591421831	35914218311	11	~2007
3591486551	7182973103	10	~2006
3591533381	21549200287	11	~2007
3591712511	7183425023	10	~2006
3591749261	28733994089	11	~2007
3591802691	7183605383	10	~2006
3591846367	57469541873	11	~2008
3591949213	21551695279	11	~2007
3592140053	21552840319	11	~2007
3592626431	7185252863	10	~2006
3592680671	7185361343	10	~2006
3592686731	7185373463	10	~2006
3592699217	21556195303	11	~2007
3592735799	7185471599	10	~2006
3592944227	86230661449	11	~2008
3592977859	64673601463	11	~2008
3593182139	7186364279	10	~2006
3593415643	57494650289	11	~2008
3593471351	7186942703	10	~2006
3593510419	172488500113	12	~2009
3593595563	7187191127	10	~2006
3593788391	7187576783	10	~2006
3593867171	7187734343	10	~2006
3593975579	7187951159	10	~2006
3594183899	7188367799	10	~2006

Exponent	Prime Factor	Digits	Year
3594334619	7188669239	10	~2006
3594352259	7188704519	10	~2006
3594618899	7189237799	10	~2006
3594784573	21568707439	11	~2007
3594898949	50328585287	11	~2008
3595030163	7190060327	10	~2006
3595044599	7190089199	10	~2006
3595416431	179770821551	12	~2009
3595510643	7191021287	10	~2006
3595512131	7191024263	10	~2006
3595649411	7191298823	10	~2006
3595973351	7191946703	10	~2006
3596070839	7192141679	10	~2006
3596274329	50347840607	11	~2008
3596418193	21578509159	11	~2007
3596525501	21579153007	11	~2007
3596574623	7193149247	10	~2006
3596774413	489161320169	12	~2010
3596782873	21580697239	11	~2007
3596797163	7193594327	10	~2006
3596807231	28774457849	11	~2007
3596864231	7193728463	10	~2006
3596884997	21581309983	11	~2007
3597108743	7194217487	10	~2006
3597132137	21582792823	11	~2007

Exponent	Prime Factor	Digits	Year
3597232313	21583393879	11	~2007
3597384121	143895364841	12	~2009
3597410813	21584464879	11	~2007
3597541943	7195083887	10	~2006
3597678827	28781430617	11	~2007
3597812579	7195625159	10	~2006
3597943031	7195886063	10	~2006
3598183313	21589099879	11	~2007
3598215757	21589294543	11	~2007
3598334501	115146704033	12	~2009
3598625003	7197250007	10	~2006
3598769903	7197539807	10	~2006
3598801163	7197602327	10	~2006
3598937813	50385129383	11	~2008
3599397803	86385547273	11	~2008
3599399939	7198799879	10	~2006
3599515103	7199030207	10	~2006
3599638319	172782639313	12	~2009
3599649359	7199298719	10	~2006
3599733617	21598401703	11	~2007
3599838023	7199676047	10	~2006
3599867543	7199735087	10	~2006
3599996663	7199993327	10	~2006
3600092579	7200185159	10	~2006
3600098839	36000988391	11	~2007

Exponent	Prime Factor	Digits	Year
3600250019	7200500039	10	~2006
3600334319	7200668639	10	~2006
3600481559	288038524721	12	~2010
3600513551	7201027103	10	~2006
3600593497	21603560983	11	~2007
3600629353	21603776119	11	~2007
3600763619	7201527239	10	~2006
3600922943	7201845887	10	~2006
3601607831	28812862649	11	~2007
3601657513	21609945079	11	~2007
3601771489	86442515737	11	~2008
3601962229	86447093497	11	~2008
3602362031	7204724063	10	~2006
3602853257	21617119543	11	~2007
3602905751	64852303519	11	~2008
3602911079	7205822159	10	~2006
3603165179	7206330359	10	~2006
3603175679	7206351359	10	~2006
3603191243	7206382487	10	~2006
3603244213	21619465279	11	~2007
3603296831	7206593663	10	~2006
3603309971	7206619943	10	~2006
3603490013	86483760313	11	~2008
3603509603	7207019207	10	~2006
3603975239	28831801913	11	~2007

4.724.182 digits

25-04-13