Small Mersenne Prime Factors (page 4423/5025)

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
18763126211	150105009689	12	~2013
18763888981	112583333887	12	~2012
18764751611	37529503223	11	~2011
18764797763	37529595527	11	~2011
18765057719	37530115439	11	~2011
18765677939	37531355879	11	~2011
18767178803	37534357607	11	~2011
18767194703	37534389407	11	~2011
18768011749	450432281977	12	~2014
18768410123	37536820247	11	~2011
18768411743	37536823487	11	~2011
18770319479	37540638959	11	~2011
18770557031	37541114063	11	~2011
18770719091	150165752729	12	~2013
18771142337	112626854023	12	~2012
18771308393	112627850359	12	~2012
18771508319	37543016639	11	~2011
18772808969	450547415257	12	~2014
18773439131	37546878263	11	~2011
18773607851	37547215703	11	~2011
18773974559	37547949119	11	~2011
18773983499	37547966999	11	~2011
18774172919	37548345839	11	~2011
18774339431	37548678863	11	~2011
18774498359	337940970463	12	~2014

Exponent	Prime Factor	Dig.	Year
18774685511	150197484089	12	~2013
18775434539	37550869079	11	~2011
18775571231	37551142463	11	~2011
18775996091	37551992183	11	~2011
18776281543	300420504689	12	~2013
18778082051	37556164103	11	~2011
18778480859	37556961719	11	~2011
18778486511	37556973023	11	~2011
18779320499	150234563993	12	~2013
18780212663	37560425327	11	~2011
18780593099	37561186199	11	~2011
18781366451	37562732903	11	~2011
18782818037	112696908223	12	~2012
18784801319	37569602639	11	~2011
18786262763	37572525527	11	~2011
18786529103	37573058207	11	~2011
18790957441	112745744647	12	~2012
18792056711	37584113423	11	~2011
18792300011	37584600023	11	~2011
18793546679	37587093359	11	~2011
18795391871	37590783743	11	~2011
18795580871	150364646969	12	~2013
18796362191	37592724383	11	~2011
18797365397	112784192383	12	~2012
18797720069	150381760553	12	~2013

Exponent	Prime Factor	Dig.	Year
18798989939	37597979879	11	~2011
18799366511	37598733023	11	~2011
18799600199	37599200399	11	~2011
18799638779	37599277559	11	~2011
18799992803	37599985607	11	~2011
18802067723	37604135447	11	~2011
18802149811	188021498111	12	~2013
18803137949	263243931287	12	~2013
18803152013	112818912079	12	~2012
18803380283	37606760567	11	~2011
18803380447	188033804471	12	~2013
18804103151	37608206303	11	~2011
18804527699	37609055399	11	~2011
18804656291	37609312583	11	~2011
18805901281	112835407687	12	~2012
18806079419	37612158839	11	~2011
18806691671	37613383343	11	~2011
18808072091	37616144183	11	~2011
18808733051	150469864409	12	~2013
18810691499	37621382999	11	~2011
18811475843	37622951687	11	~2011
18812415059	37624830119	11	~2011
18812828291	37625656583	11	~2011
18812975117	112877850703	12	~2012
18813401597	112880409583	12	~2012

Exponent	Prime Factor	Dig.	Year
18813619691	37627239383	11	~2011
18813753971	37627507943	11	~2011
18813839399	37627678799	11	~2011
18816015299	37632030599	11	~2011
18817906333	301086501329	12	~2013
18818064659	37636129319	11	~2011
18818243183	37636486367	11	~2011
18819053999	37638107999	11	~2011
18819678023	37639356047	11	~2011
18819946337	150559570697	12	~2013
18820121189	150560969513	12	~2013
18820665863	37641331727	11	~2011
18821715377	112930292263	12	~2012
18821746451	37643492903	11	~2011
18821955143	37643910287	11	~2011
18822881699	37645763399	11	~2011
18824355479	37648710959	11	~2011
18824534279	37649068559	11	~2011
18824703479	37649406959	11	~2011
18824857871	37649715743	11	~2011
18825568523	37651137047	11	~2011
18826792717	112960756303	12	~2012
18828526583	37657053167	11	~2011
18828908159	37657816319	11	~2011
18829011059	37658022119	11	~2011

4.724.182 digits

25-04-13