Small Mersenne Prime Factors (page 5224/5745)

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
40222647791	80445295583	11	~2014
40224964379	80449928759	11	~2014
40227328331	80454656663	11	~2014
40228314239	80456628479	11	~2014
40228946759	80457893519	11	~2014
40230141299	80460282599	11	~2014
40230853511	80461707023	11	~2014
40233901553	241403409319	12	~2015
40234190057	241405140343	12	~2015
40234474921	885158448263	12	~2016
40235226637	643763626193	12	~2016
40236524423	80473048847	11	~2014
40237866791	321902934329	12	~2015
40238097083	80476194167	11	~2014
40239901211	80479802423	11	~2014
40240602359	80481204719	11	~2014
40243607857	241461647143	12	~2015
40243657271	80487314543	11	~2014
40244295719	80488591439	11	~2014
40244955251	80489910503	11	~2014
40247955437	241487732623	12	~2015
40248519499	724473350983	12	~2016
40250065811	80500131623	11	~2014
40251645851	80503291703	11	~2014
40258473791	80516947583	11	~2014

Exponent	Prime Factor	Dig.	Year
40259155991	80518311983	11	~2014
40260004259	80520008519	11	~2014
40261621919	80523243839	11	~2014
40263712691	80527425383	11	~2014
40264857203	80529714407	11	~2014
40265456531	80530913063	11	~2014
40265488691	80530977383	11	~2014
40267655723	80535311447	11	~2014
40270466777	241622800663	12	~2015
40271591231	80543182463	11	~2014
40271887499	80543774999	11	~2014
40272736979	80545473959	11	~2014
40272879203	80545758407	11	~2014
40274602477	241647614863	12	~2015
40279136351	80558272703	11	~2014
40281454877	241688729263	12	~2015
40282661411	80565322823	11	~2014
40283572859	80567145719	11	~2014
40285603961	322284831689	12	~2015
40285769651	322286157209	12	~2015
40286111051	322288888409	12	~2015
40286879351	80573758703	11	~2014
40290520349	322324162793	12	~2015
40291558451	80583116903	11	~2014
40291758011	80583516023	11	~2014

Exponent	Prime Factor	Dig.	Year
40292426281	241754557687	12	~2015
40294657003	402946570031	12	~2016
40295571553	241773429319	12	~2015
40297908071	322383264569	12	~2015
40299250583	80598501167	11	~2014
40301314583	80602629167	11	~2014
40303415423	80606830847	11	~2014
40304686619	80609373239	11	~2014
40304898157	241829388943	12	~2015
40305304223	80610608447	11	~2014
40309561031	80619122063	11	~2014
40312218731	80624437463	11	~2014
40315846463	80631692927	11	~2014
40321732943	80643465887	11	~2014
40322367859	725802621463	12	~2016
40323163271	80646326543	11	~2014
40323914429	322591315433	12	~2015
40324403219	1943...351559	14	2023
40324438019	80648876039	11	~2014
40325026139	80650052279	11	~2014
40326178883	80652357767	11	~2014
40328996753	241973980519	12	~2015
40329922163	80659844327	11	~2014
40331143981	241986863887	12	~2015
40332454619	80664909239	11	~2014

Exponent	Prime Factor	Dig.	Year
40334510897	564683152559	12	~2016
40335850463	80671700927	11	~2014
40335941207	322687529657	12	~2015
40337676719	80675353439	11	~2014
40338819173	242032915039	12	~2015
40343103071	80686206143	11	~2014
40344996959	80689993919	11	~2014
40346766563	80693533127	11	~2014
40346995397	322775963177	12	~2015
40349954003	80699908007	11	~2014
40350574123	403505741231	12	~2016
40351785431	80703570863	11	~2014
40353088439	80706176879	11	~2014
40354752071	80709504143	11	~2014
40354985233	242129911399	12	~2015
40357134613	242142807679	12	~2015
40359444539	80718889079	11	~2014
40360269163	403602691631	12	~2016
40361861231	80723722463	11	~2014
40362418121	322899344969	12	~2015
40363577591	80727155183	11	~2014
40369522463	80739044927	11	~2014
40369530121	242217180727	12	~2015
40371408659	80742817319	11	~2014
40373693051	80747386103	11	~2014

5.441.361 digits

26-03-15