Small Mersenne Prime Factors (page 4498/5130)

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
18162678983	36325357967	11	~2011
18162882341	108977294047	12	~2012
18164055109	399609212399	12	~2014
18165128783	36330257567	11	~2011
18165419843	36330839687	11	~2011
18167150531	36334301063	11	~2011
18167538553	109005231319	12	~2012
18167755379	36335510759	11	~2011
18168110531	36336221063	11	~2011
18168280523	36336561047	11	~2011
18168558143	36337116287	11	~2011
18169327499	36338654999	11	~2011
18169663021	109017978127	12	~2012
18170453699	36340907399	11	~2011
18170871611	36341743223	11	~2011
18171159179	36342318359	11	~2011
18171189623	36342379247	11	~2011
18171586019	36343172039	11	~2011
18172124413	109032746479	12	~2012
18172309619	36344619239	11	~2011
18173588903	36347177807	11	~2011
18175715399	36351430799	11	~2011
18176373119	36352746239	11	~2011
18176469673	109058818039	12	~2012
18176657399	36353314799	11	~2011

Exponent	Prime Factor	Dig.	Year
18176681903	36353363807	11	~2011
18177874391	36355748783	11	~2011
18178945363	290863125809	12	~2013
18179102423	36358204847	11	~2011
18179636963	36359273927	11	~2011
18180689711	36361379423	11	~2011
18180874421	109085246527	12	~2012
18181267679	36362535359	11	~2011
18182540513	109095243079	12	~2012
18182770883	36365541767	11	~2011
18184721231	36369442463	11	~2011
18185078843	36370157687	11	~2011
18185401153	109112406919	12	~2012
18185905403	36371810807	11	~2011
18186173909	145489391273	12	~2013
18187030753	109122184519	12	~2012
18188317471	291013079537	12	~2013
18188898011	36377796023	11	~2011
18189467963	36378935927	11	~2011
18190626851	36381253703	11	~2011
18191159681	145529277449	12	~2013
18192281759	36384563519	11	~2011
18193936597	436654478329	12	~2014
18193947539	36387895079	11	~2011
18194810729	145558485833	12	~2013

Exponent	Prime Factor	Dig.	Year
18198088619	36396177239	11	~2011
18198370163	36396740327	11	~2011
18199770371	36399540743	11	~2011
18199887791	36399775583	11	~2011
18199942837	291199085393	12	~2013
18201486683	36402973367	11	~2011
18202655951	36405311903	11	~2011
18202978499	36405956999	11	~2011
18203117281	291249876497	12	~2013
18204439811	36408879623	11	~2011
18204792251	36409584503	11	~2011
18205348457	109232090743	12	~2012
18206132647	182061326471	12	~2013
18206235851	36412471703	11	~2011
18206899883	36413799767	11	~2011
18207556583	582641810657	12	~2014
18207689977	436984559449	12	~2014
18208969871	36417939743	11	~2011
18208974863	36417949727	11	~2011
18209854483	291357671729	12	~2013
18210388439	36420776879	11	~2011
18210562003	437053488073	12	~2014
18210776351	36421552703	11	~2011
18211692743	36423385487	11	~2011
18212639579	36425279159	11	~2011

Exponent	Prime Factor	Dig.	Year
18213222073	109279332439	12	~2012
18213558983	36427117967	11	~2011
18213674411	36427348823	11	~2011
18214257311	36428514623	11	~2011
18216065951	1096...702503	14	2023
18216072793	109296436759	12	~2012
18216373211	36432746423	11	~2011
18216857837	109301147023	12	~2012
18217333583	36434667167	11	~2011
18217404911	36434809823	11	~2011
18217458719	36434917439	11	~2011
18219655577	255075178079	12	~2013
18220115951	36440231903	11	~2011
18220147391	36440294783	11	~2011
18220655231	36441310463	11	~2011
18221158147	182211581471	12	~2013
18221524333	109329145999	12	~2012
18225038939	36450077879	11	~2011
18225095099	36450190199	11	~2011
18226465613	255170518583	12	~2013
18226969703	36453939407	11	~2011
18228347777	109370086663	12	~2012
18228575711	328114362799	12	~2013
18229472843	36458945687	11	~2011
18229716917	255216036839	12	~2013

4.828.532 digits

25-06-01