Small Mersenne Prime Factors (page 5312/5745)

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
55536294659	111072589319	12	~2015
55544794691	111089589383	12	~2015
55547210063	111094420127	12	~2015
55548514943	111097029887	12	~2015
55552216211	111104432423	12	~2015
55552223819	111104447639	12	~2015
55553446127	444427569017	12	~2016
55553919539	111107839079	12	~2015
55554926461	333329558767	12	~2016
55556635643	111113271287	12	~2015
55561378583	111122757167	12	~2015
55564631159	111129262319	12	~2015
55568361791	444546894329	12	~2016
55568684323	889098949169	12	~2017
55569709619	111139419239	12	~2015
55570086959	111140173919	12	~2015
55571588603	111143177207	12	~2015
55575040019	111150080039	12	~2015
55577210519	111154421039	12	~2015
55581653279	111163306559	12	~2015
55583494997	333500969983	12	~2016
55583626877	444669015017	12	~2016
55583928359	111167856719	12	~2015
55586601443	111173202887	12	~2015
55589771999	111179543999	12	~2015

Exponent	Prime Factor	Dig.	Year
55590089057	333540534343	12	~2016
55590993917	333545963503	12	~2016
55594248323	111188496647	12	~2015
55596974099	111193948199	12	~2015
55597372763	111194745527	12	~2015
55597598123	111195196247	12	~2015
55597721219	111195442439	12	~2015
55598856403	555988564031	12	~2017
55600006327	556000063271	12	~2017
55600514759	111201029519	12	~2015
55603797239	111207594479	12	~2015
55604192183	111208384367	12	~2015
55604424719	111208849439	12	~2015
55606462559	111212925119	12	~2015
55606764287	444854114297	12	~2016
55615181123	111230362247	12	~2015
55615503431	111231006863	12	~2015
55620333551	111240667103	12	~2015
55625610959	111251221919	12	~2015
55626014243	111252028487	12	~2015
55626161933	333756971599	12	~2016
55633984463	111267968927	12	~2015
55634557091	111269114183	12	~2015
55634622623	111269245247	12	~2015
55635465383	111270930767	12	~2015

Exponent	Prime Factor	Dig.	Year
55635504959	111271009919	12	~2015
55635718199	111271436399	12	~2015
55636216379	111272432759	12	~2015
55644375491	111288750983	12	~2015
55644422177	445155377417	12	~2016
55645960451	111291920903	12	~2015
55646334257	779048679599	12	~2017
55647597431	111295194863	12	~2015
55650506183	111301012367	12	~2015
55654116491	111308232983	12	~2015
55654410863	111308821727	12	~2015
55659059531	111318119063	12	~2015
55662610583	111325221167	12	~2015
55664964233	333989785399	12	~2016
55668856583	111337713167	12	~2015
55677794891	111355589783	12	~2015
55681067891	111362135783	12	~2015
55686361883	111372723767	12	~2015
55686862943	111373725887	12	~2015
55687962023	111375924047	12	~2015
55688952383	111377904767	12	~2015
55689949921	334139699527	12	~2016
55691202821	334147216927	12	~2016
55691939591	111383879183	12	~2015
55693970063	111387940127	12	~2015

Exponent	Prime Factor	Dig.	Year
55697045267	445576362137	12	~2016
55698264877	334189589263	12	~2016
55698377219	111396754439	12	~2015
55700728679	111401457359	12	~2015
55702767779	111405535559	12	~2015
55708414481	334250486887	12	~2016
55711063643	111422127287	12	~2015
55715333519	111430667039	12	~2015
55716425351	111432850703	12	~2015
55717396043	111434792087	12	~2015
55717665313	334305991879	12	~2016
55717720703	111435441407	12	~2015
55718463791	111436927583	12	~2015
55721879711	111443759423	12	~2015
55725211799	111450423599	12	~2015
55726435211	111452870423	12	~2015
55727127539	111454255079	12	~2015
55728231803	111456463607	12	~2015
55730120483	111460240967	12	~2015
55730478281	445843826249	12	~2016
55731122339	111462244679	12	~2015
55732987991	111465975983	12	~2015
55733574341	334401446047	12	~2016
55737475873	334424855239	12	~2016
55739306999	111478613999	12	~2015

5.441.361 digits

26-03-15