Small Mersenne Prime Factors (page 4723/5235)

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
30439946363	60879892727	11	~2013
30442143503	60884287007	11	~2013
30442444559	60884889119	11	~2013
30442706971	304427069711	12	~2015
30442895599	304428955991	12	~2015
30443991863	60887983727	11	~2013
30444470999	60888941999	11	~2013
30444586631	60889173263	11	~2013
30445580489	243564643913	12	~2014
30447078983	60894157967	11	~2013
30447204283	730732902793	12	~2016
30448778803	487180460849	12	~2015
30448802999	60897605999	11	~2013
30449627051	60899254103	11	~2013
30449861723	60899723447	11	~2013
30450331559	60900663119	11	~2013
30451347131	60902694263	11	~2013
30452986859	60905973719	11	~2013
30456951599	60913903199	11	~2013
30456992339	60913984679	11	~2013
30457606463	60915212927	11	~2013
30457930157	243663441257	12	~2014
30458491631	60916983263	11	~2013
30459498431	60918996863	11	~2013
30460356779	60920713559	11	~2013

Exponent	Prime Factor	Dig.	Year
30463379339	60926758679	11	~2013
30463532471	60927064943	11	~2013
30463590863	60927181727	11	~2013
30465705197	182794231183	12	~2014
30465837719	60931675439	11	~2013
30469778771	60939557543	11	~2013
30470293151	60940586303	11	~2013
30474826817	426647575439	12	~2015
30475326923	60950653847	11	~2013
30476078461	182856470767	12	~2014
30477783737	243822269897	12	~2014
30477996203	60955992407	11	~2013
30480704279	60961408559	11	~2013
30481736891	60963473783	11	~2013
30483494351	60966988703	11	~2013
30483986293	182903917759	12	~2014
30484356491	60968712983	11	~2013
30485402897	182912417383	12	~2014
30487204211	60974408423	11	~2013
30488537951	60977075903	11	~2013
30490939799	60981879599	11	~2013
30491454611	60982909223	11	~2013
30492674111	60985348223	11	~2013
30493475723	60986951447	11	~2013
30497930051	60995860103	11	~2013

Exponent	Prime Factor	Dig.	Year
30498076643	60996153287	11	~2013
30498600257	182991601543	12	~2014
30500058299	61000116599	11	~2013
30500834009	244006672073	12	~2014
30501204179	61002408359	11	~2013
30502817183	61005634367	11	~2013
30503445383	61006890767	11	~2013
30503777539	549067995703	12	~2015
30504680639	61009361279	11	~2013
30504882179	61009764359	11	~2013
30508029179	61016058359	11	~2013
30508030919	61016061839	11	~2013
30508240751	61016481503	11	~2013
30508292543	61016585087	11	~2013
30508511591	61017023183	11	~2013
30512261917	183073571503	12	~2014
30512776661	183076659967	12	~2014
30513021503	61026043007	11	~2013
30513399179	61026798359	11	~2013
30515154181	488242466897	12	~2015
30515776259	244126210073	12	~2014
30516585521	183099513127	12	~2014
30516874523	61033749047	11	~2013
30517916711	61035833423	11	~2013
30518712599	244149700793	12	~2014

Exponent	Prime Factor	Dig.	Year
30521993561	183131961367	12	~2014
30522146939	244177175513	12	~2014
30523355519	61046711039	11	~2013
30523682933	183142097599	12	~2014
30526445683	488423130929	12	~2015
30529733651	61059467303	11	~2013
30533536811	61067073623	11	~2013
30537709817	183226258903	12	~2014
30537826391	61075652783	11	~2013
30542611751	61085223503	11	~2013
30542977273	183257863639	12	~2014
30547573867	733141772809	12	~2016
30547660601	1788...479457	15	2023
30548446673	183290680039	12	~2014
30550409003	61100818007	11	~2013
30554095343	61108190687	11	~2013
30554194889	244433559113	12	~2014
30554749559	61109499119	11	~2013
30556743683	61113487367	11	~2013
30558127837	183348767023	12	~2014
30559383083	61118766167	11	~2013
30560192423	61120384847	11	~2013
30561902531	61123805063	11	~2013
30562257251	244498058009	12	~2014
30562438463	61124876927	11	~2013

4.933.056 digits

25-07-20