Small Mersenne Prime Factors (page 4486/5025)

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
23746754483	47493508967	11	~2012
23747403019	237474030191	12	~2014
23749366799	47498733599	11	~2012
23749838093	142499028559	12	~2013
23749975553	569999413273	12	~2015
23750032717	142500196303	12	~2013
23750395859	47500791719	11	~2012
23752461983	47504923967	11	~2012
23753373971	47506747943	11	~2012
23754861983	47509723967	11	~2012
23754995531	47509991063	11	~2012
23755785743	47511571487	11	~2012
23756152499	47512304999	11	~2012
23756851691	47513703383	11	~2012
23757358223	760235463137	12	~2015
23758450643	47516901287	11	~2012
23759380943	47518761887	11	~2012
23759453639	47518907279	11	~2012
23761855919	47523711839	11	~2012
23761880081	712856402431	12	~2015
23762993483	47525986967	11	~2012
23763172309	712895169271	12	~2015
23765080523	47530161047	11	~2012
23765309699	47530619399	11	~2012
23767379819	47534759639	11	~2012

Exponent	Prime Factor	Dig.	Year
23768238083	47536476167	11	~2012
23769954001	142619724007	12	~2013
23771359883	47542719767	11	~2012
23771538671	47543077343	11	~2012
23772515771	47545031543	11	~2012
23772656651	47545313303	11	~2012
23773646441	142641878647	12	~2013
23774346311	190194770489	12	~2014
23775153377	190201227017	12	~2014
23776466711	190211733689	12	~2014
23776489031	47552978063	11	~2012
23777169023	570652056553	12	~2015
23778125477	190225003817	12	~2014
23781258071	47562516143	11	~2012
23781356663	570752559913	12	~2015
23783710021	380539360337	12	~2014
23783905283	47567810567	11	~2012
23784203539	237842035391	12	~2014
23785626659	47571253319	11	~2012
23785721051	47571442103	11	~2012
23786730179	47573460359	11	~2012
23792096807	190336774457	12	~2014
23792311583	47584623167	11	~2012
23792369663	47584739327	11	~2012
23792541637	380680666193	12	~2014

Exponent	Prime Factor	Dig.	Year
23795503871	47591007743	11	~2012
23798193457	142789160743	12	~2013
23798739121	142792434727	12	~2013
23798820911	47597641823	11	~2012
23799132941	190393063529	12	~2014
23799906503	47599813007	11	~2012
23800319759	47600639519	11	~2012
23800350611	47600701223	11	~2012
23800503821	190404030569	12	~2014
23801077799	47602155599	11	~2012
23801463817	142808782903	12	~2013
23801959211	47603918423	11	~2012
23802288539	47604577079	11	~2012
23804564753	142827388519	12	~2013
23805123347	190440986777	12	~2014
23805223259	47610446519	11	~2012
23805743393	142834460359	12	~2013
23805840251	47611680503	11	~2012
23806100233	142836601399	12	~2013
23806678367	571360280809	12	~2015
23806697363	47613394727	11	~2012
23808596111	47617192223	11	~2012
23810000843	47620001687	11	~2012
23810877371	47621754743	11	~2012
23812671191	47625342383	11	~2012

Exponent	Prime Factor	Dig.	Year
23812736021	142876416127	12	~2013
23813866691	47627733383	11	~2012
23813869451	47627738903	11	~2012
23814184703	47628369407	11	~2012
23814586297	381033380753	12	~2014
23814722579	47629445159	11	~2012
23816087723	47632175447	11	~2012
23817191729	190537533833	12	~2014
23819900759	47639801519	11	~2012
23820355343	47640710687	11	~2012
23821451639	47642903279	11	~2012
23821738469	190573907753	12	~2014
23822905979	47645811959	11	~2012
23823127283	47646254567	11	~2012
23823841079	190590728633	12	~2014
23825011361	142950068167	12	~2013
23826216539	47652433079	11	~2012
23828599799	47657199599	11	~2012
23828930341	142973582047	12	~2013
23829049511	190632396089	12	~2014
23829695783	47659391567	11	~2012
23832715139	47665430279	11	~2012
23834385131	47668770263	11	~2012
23835694651	238356946511	12	~2014
23836520489	190692163913	12	~2014

4.724.182 digits

25-04-13