Small Mersenne Prime Factors (page 4824/5190)

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
53291388791	106582777583	12	~2015
53291899943	106583799887	12	~2015
53292662963	106585325927	12	~2015
53294739119	106589478239	12	~2015
53297824799	106595649599	12	~2015
53298493751	106596987503	12	~2015
53305964759	106611929519	12	~2015
53309129551	533091295511	12	~2017
53309256719	106618513439	12	~2015
53310571871	106621143743	12	~2015
53312418617	426499348937	12	~2016
53313467843	106626935687	12	~2015
53315131223	106630262447	12	~2015
53316266543	106632533087	12	~2015
53319960989	426559687913	12	~2016
53329014131	106658028263	12	~2015
53331270983	106662541967	12	~2015
53331550991	106663101983	12	~2015
53332654883	106665309767	12	~2015
53335136639	106670273279	12	~2015
53337454739	106674909479	12	~2015
53339523551	106679047103	12	~2015
53340609779	106681219559	12	~2015
53341820951	106683641903	12	~2015
53344671251	106689342503	12	~2015

Exponent	Prime Factor	Dig.	Year
53345176319	426761410553	12	~2016
53347377491	106694754983	12	~2015
53349237719	106698475439	12	~2015
53349328133	320095968799	12	~2016
53351080691	106702161383	12	~2015
53351210771	106702421543	12	~2015
53353015871	106706031743	12	~2015
53355871319	106711742639	12	~2015
53357647751	106715295503	12	~2015
53358667079	106717334159	12	~2015
53358930503	106717861007	12	~2015
53359418543	106718837087	12	~2015
53360091299	106720182599	12	~2015
53362839953	320177039719	12	~2016
53367157643	106734315287	12	~2015
53370860639	106741721279	12	~2015
53376512531	106753025063	12	~2015
53380657919	106761315839	12	~2015
53382503773	320295022639	12	~2016
53384885531	106769771063	12	~2015
53385624503	106771249007	12	~2015
53387255699	106774511399	12	~2015
53388680339	427109442713	12	~2016
53389409987	427115279897	12	~2016
53392862639	106785725279	12	~2015

Exponent	Prime Factor	Dig.	Year
53393638037	320361828223	12	~2016
53393962019	106787924039	12	~2015
53404959911	106809919823	12	~2015
53405197883	106810395767	12	~2015
53410611851	106821223703	12	~2015
53412371231	106824742463	12	~2015
53413981693	320483890159	12	~2016
53414036471	106828072943	12	~2015
53416129043	106832258087	12	~2015
53416488263	106832976527	12	~2015
53418401581	320510409487	12	~2016
53420070337	320520422023	12	~2016
53426253913	320557523479	12	~2016
53428878983	106857757967	12	~2015
53438689631	106877379263	12	~2015
53442660449	427541283593	12	~2016
53446019339	106892038679	12	~2015
53451486551	106902973103	12	~2015
53460981779	106921963559	12	~2015
53463428477	748487998679	12	~2017
53466782441	427734259529	12	~2016
53467001051	106934002103	12	~2015
53472718283	106945436567	12	~2015
53475304979	106950609959	12	~2015
53476100399	427808803193	12	~2016

Exponent	Prime Factor	Dig.	Year
53476159931	106952319863	12	~2015
53476844819	106953689639	12	~2015
53477165459	106954330919	12	~2015
53480801039	106961602079	12	~2015
53484177611	106968355223	12	~2015
53492320991	106984641983	12	~2015
53492846471	106985692943	12	~2015
53493757211	106987514423	12	~2015
53493766211	106987532423	12	~2015
53494305731	3894...572169	14	2024
53495493923	106990987847	12	~2015
53497912271	106995824543	12	~2015
53499781931	106999563863	12	~2015
53500001917	321000011503	12	~2016
53500626527	428005012217	12	~2016
53507972879	107015945759	12	~2015
53510021783	107020043567	12	~2015
53510934101	428087472809	12	~2016
53514233303	107028466607	12	~2015
53515961591	107031923183	12	~2015
53518634287	535186342871	12	~2017
53518879061	321113274367	12	~2016
53519459641	321116757847	12	~2016
53523353399	107046706799	12	~2015
53525490143	107050980287	12	~2015

4.888.230 digits

25-06-29