Small Mersenne Prime Factors (page 4504/5025)

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
25452390311	50904780623	11	~2012
25453562531	50907125063	11	~2012
25454172179	50908344359	11	~2012
25456119803	50912239607	11	~2012
25456147499	50912294999	11	~2012
25460428397	203683427177	12	~2014
25462035383	50924070767	11	~2012
25466053391	50932106783	11	~2012
25466157971	50932315943	11	~2012
25466561651	50933123303	11	~2012
25467699251	203741594009	12	~2014
25467924959	50935849919	11	~2012
25470145439	203761163513	12	~2014
25470592019	50941184039	11	~2012
25472707763	50945415527	11	~2012
25474049591	50948099183	11	~2012
25476225539	50952451079	11	~2012
25477133219	50954266439	11	~2012
25478329823	50956659647	11	~2012
25478511943	254785119431	12	~2014
25479052919	50958105839	11	~2012
25479108023	50958216047	11	~2012
25479350651	50958701303	11	~2012
25479934583	50959869167	11	~2012
25480563323	50961126647	11	~2012

Exponent	Prime Factor	Dig.	Year
25481620513	3113...266887	14	2024
25482476303	50964952607	11	~2012
25483138781	152898832687	12	~2013
25484961899	50969923799	11	~2012
25485170831	50970341663	11	~2012
25485207557	152911245343	12	~2013
25485453599	50970907199	11	~2012
25488491117	356838875639	12	~2014
25488833641	152933001847	12	~2013
25491307403	50982614807	11	~2012
25491534611	50983069223	11	~2012
25494028691	50988057383	11	~2012
25495480943	50990961887	11	~2012
25496256059	50992512119	11	~2012
25496836919	50993673839	11	~2012
25498983623	50997967247	11	~2012
25500487139	51000974279	11	~2012
25500597719	51001195439	11	~2012
25500894179	51001788359	11	~2012
25500973021	153005838127	12	~2013
25502289443	51004578887	11	~2012
25504211609	357058962527	12	~2014
25504448471	51008896943	11	~2012
25504723327	255047233271	12	~2014
25505464571	51010929143	11	~2012

Exponent	Prime Factor	Dig.	Year
25505535611	204044284889	12	~2014
25505858023	408093728369	12	~2014
25506783983	51013567967	11	~2012
25507665103	612183962473	12	~2015
25507924679	51015849359	11	~2012
25508594443	255085944431	12	~2014
25509040439	51018080879	11	~2012
25509642083	51019284167	11	~2012
25514385623	51028771247	11	~2012
25515592997	153093557983	12	~2013
25515836831	51031673663	11	~2012
25517507683	255175076831	12	~2014
25517788453	153106730719	12	~2013
25518556859	51037113719	11	~2012
25518794831	51037589663	11	~2012
25520123753	153120742519	12	~2013
25520995763	51041991527	11	~2012
25521539327	459387707887	12	~2015
25522460123	51044920247	11	~2012
25526679967	612640319209	12	~2015
25526960843	51053921687	11	~2012
25527216419	51054432839	11	~2012
25527593411	51055186823	11	~2012
25530460859	51060921719	11	~2012
25530869891	51061739783	11	~2012

Exponent	Prime Factor	Dig.	Year
25531114331	51062228663	11	~2012
25531200371	51062400743	11	~2012
25531325843	51062651687	11	~2012
25531907231	51063814463	11	~2012
25534188539	51068377079	11	~2012
25534207571	51068415143	11	~2012
25535516483	51071032967	11	~2012
25535697457	153214184743	12	~2013
25536956339	51073912679	11	~2012
25537298999	51074597999	11	~2012
25537561487	204300491897	12	~2014
25538090429	204304723433	12	~2014
25539994943	51079989887	11	~2012
25540272431	51080544863	11	~2012
25540518299	204324146393	12	~2014
25541675011	255416750111	12	~2014
25543219283	51086438567	11	~2012
25543712483	51087424967	11	~2012
25543838543	51087677087	11	~2012
25544068897	153264413383	12	~2013
25544604341	153267626047	12	~2013
25544661451	408714583217	12	~2015
25545283079	51090566159	11	~2012
25545751631	51091503263	11	~2012
25552162931	51104325863	11	~2012

4.724.182 digits

25-04-13