Small Mersenne Prime Factors (page 3792/5025)

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
2397074759	43147345663	11	~2007
2397153719	4794307439	10	~2004
2397326683	153428907713	12	~2008
2397358541	14384151247	11	~2005
2397372199	23973721991	11	~2006
2397380291	4794760583	10	~2004
2397388699	43152996583	11	~2007
2397472607	119873630351	12	~2008
2397532019	4795064039	10	~2004
2397581951	4795163903	10	~2004
2397586871	4795173743	10	~2004
2397588779	4795177559	10	~2004
2397650891	4795301783	10	~2004
2397680063	4795360127	10	~2004
2397708359	4795416719	10	~2004
2397775823	4795551647	10	~2004
2397796651	23977966511	11	~2006
2397828659	4795657319	10	~2004
2397831959	4795663919	10	~2004
2397947753	71938432591	11	~2007
2398081801	14388490807	11	~2005
2398156337	19185250697	11	~2006
2398363999	23983639991	11	~2006
2398386323	4796772647	10	~2004
2398399141	38374386257	11	~2006

Exponent	Prime Factor	Digits	Year
2398456331	4796912663	10	~2004
2398711151	4797422303	10	~2004
2398777523	4797555047	10	~2004
2398845989	19190767913	11	~2006
2398985339	4797970679	10	~2004
2398999357	14393996143	11	~2005
2399102063	4798204127	10	~2004
2399102159	4798204319	10	~2004
2399148371	4798296743	10	~2004
2399280899	4798561799	10	~2004
2399308859	57583412617	11	~2007
2399315197	14395891183	11	~2005
2399384171	4798768343	10	~2004
2399466437	14396798623	11	~2005
2399467043	4798934087	10	~2004
2399582401	115179955249	12	~2008
2399748119	4799496239	10	~2004
2399809571	364771054793	12	~2009
2399862599	4799725199	10	~2004
2399868481	14399210887	11	~2005
2400015203	4800030407	10	~2004
2400167303	4800334607	10	~2004
2400170093	14401020559	11	~2005
2400380243	4800760487	10	~2004
2400555491	4801110983	10	~2004

Exponent	Prime Factor	Digits	Year
2400638711	4801277423	10	~2004
2400720743	4801441487	10	~2004
2400733453	14404400719	11	~2005
2400782003	4801564007	10	~2004
2400856897	14405141383	11	~2005
2400893639	4801787279	10	~2004
2400901463	4801802927	10	~2004
2400914273	14405485639	11	~2005
2400968543	4801937087	10	~2004
2401001591	4802003183	10	~2004
2401052399	4802104799	10	~2004
2401342687	43224168367	11	~2007
2401440071	4802880143	10	~2004
2401447511	4802895023	10	~2004
2401462433	14408774599	11	~2005
2401482071	4802964143	10	~2004
2401541413	57636993913	11	~2007
2401625651	4803251303	10	~2004
2401642979	4803285959	10	~2004
2401806551	4803613103	10	~2004
2401822583	4803645167	10	~2004
2401827383	4803654767	10	~2004
2401828201	168127974071	12	~2008
2401848479	4803696959	10	~2004
2401855739	19214845913	11	~2006

Exponent	Prime Factor	Digits	Year
2401952411	4803904823	10	~2004
2401974611	4803949223	10	~2004
2401997723	4803995447	10	~2004
2402050087	24020500871	11	~2006
2402066321	14412397927	11	~2005
2402206061	14413236367	11	~2005
2402385851	4804771703	10	~2004
2402426891	4804853783	10	~2004
2402679491	19221435929	11	~2006
2402703059	4805406119	10	~2004
2402876831	4805753663	10	~2004
2402921639	4805843279	10	~2004
2403074111	4806148223	10	~2004
2403372599	4806745199	10	~2004
2403553283	4807106567	10	~2004
2403629339	4807258679	10	~2004
2403646871	19229174969	11	~2006
2403710411	4807420823	10	~2004
2403715883	4807431767	10	~2004
2403907931	4807815863	10	~2004
2403979223	4807958447	10	~2004
2404072919	19232583353	11	~2006
2404109423	4808218847	10	~2004
2404398911	4808797823	10	~2004
2404691351	4809382703	10	~2004

4.724.182 digits

25-04-13