Small Mersenne Prime Factors (page 4499/5025)

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	Dig.	Year
24983361659	49966723319	11	~2012
24983596271	49967192543	11	~2012
24984948721	149909692327	12	~2013
24985333403	49970666807	11	~2012
24986208239	49972416479	11	~2012
24988435331	49976870663	11	~2012
24989014751	49978029503	11	~2012
24989415263	49978830527	11	~2012
24989660903	49979321807	11	~2012
24993358681	549853890983	12	~2015
24993413411	49986826823	11	~2012
24995419859	49990839719	11	~2012
24996165059	49992330119	11	~2012
24996484481	149978906887	12	~2013
24996495317	199971962537	12	~2014
24997018979	49994037959	11	~2012
24998078801	199984630409	12	~2014
24998773637	199990189097	12	~2014
24998850083	49997700167	11	~2012
25001586371	50003172743	11	~2012
25001953973	150011723839	12	~2013
25002065953	750061978591	12	~2015
25005660371	50011320743	11	~2012
25006074013	150036444079	12	~2013
25006528931	50013057863	11	~2012

Exponent	Prime Factor	Dig.	Year
25006595291	50013190583	11	~2012
25006954019	50013908039	11	~2012
25007566211	50015132423	11	~2012
25007880083	50015760167	11	~2012
25008289199	50016578399	11	~2012
25008762011	50017524023	11	~2012
25008868091	50017736183	11	~2012
25010779357	150064676143	12	~2013
25010789939	50021579879	11	~2012
25010805503	50021611007	11	~2012
25011274391	50022548783	11	~2012
25012326743	50024653487	11	~2012
25014302977	150085817863	12	~2013
25014316751	50028633503	11	~2012
25014643679	50029287359	11	~2012
25015580483	50031160967	11	~2012
25015739083	400251825329	12	~2014
25015991639	50031983279	11	~2012
25016208803	50032417607	11	~2012
25016824337	200134594697	12	~2014
25018459439	50036918879	11	~2012
25019809439	50039618879	11	~2012
25022835053	150137010319	12	~2013
25025849071	250258490711	12	~2014
25026121859	50052243719	11	~2012

Exponent	Prime Factor	Dig.	Year
25026892139	50053784279	11	~2012
25027265099	50054530199	11	~2012
25028050643	50056101287	11	~2012
25029169619	50058339239	11	~2012
25030099091	50060198183	11	~2012
25031242583	50062485167	11	~2012
25031928899	50063857799	11	~2012
25032661859	50065323719	11	~2012
25033872109	600812930617	12	~2015
25034072159	50068144319	11	~2012
25034078857	150204473143	12	~2013
25034629211	50069258423	11	~2012
25035172763	50070345527	11	~2012
25037342971	250373429711	12	~2014
25037706563	50075413127	11	~2012
25038191063	50076382127	11	~2012
25042743311	50085486623	11	~2012
25044763097	200358104777	12	~2014
25044895919	50089791839	11	~2012
25045507049	2224...259513	14	2024
25045559057	200364472457	12	~2014
25046186183	50092372367	11	~2012
25046849197	150281095183	12	~2013
25046922839	50093845679	11	~2012
25046990873	150281945239	12	~2013

Exponent	Prime Factor	Dig.	Year
25047791519	50095583039	11	~2012
25048439219	50096878439	11	~2012
25048990997	150293945983	12	~2013
25049550497	150297302983	12	~2013
25050526271	50101052543	11	~2012
25050753719	50101507439	11	~2012
25051664591	50103329183	11	~2012
25051808059	250518080591	12	~2014
25056932063	50113864127	11	~2012
25057661777	350807264879	12	~2014
25058094497	200464755977	12	~2014
25058275691	50116551383	11	~2012
25058744699	50117489399	11	~2012
25059445079	200475560633	12	~2014
25060023479	50120046959	11	~2012
25060406771	50120813543	11	~2012
25061791031	50123582063	11	~2012
25064535563	50129071127	11	~2012
25064709479	50129418959	11	~2012
25065958199	50131916399	11	~2012
25066253339	50132506679	11	~2012
25066622159	50133244319	11	~2012
25066891523	50133783047	11	~2012
25067127551	50134255103	11	~2012
25067628023	50135256047	11	~2012

4.724.182 digits

25-04-13