Small Mersenne Prime Factors (page 5395/5745)

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
76757053403	153514106807	12	~2016
76757869763	153515739527	12	~2016
76763696699	153527393399	12	~2016
76765251851	153530503703	12	~2016
76768757953	460612547719	12	~2017
76769846519	153539693039	12	~2016
76771854023	153543708047	12	~2016
76773427823	153546855647	12	~2016
76774764551	153549529103	12	~2016
76779790823	153559581647	12	~2016
76783254389	614266035113	12	~2018
76786787741	460720726447	12	~2017
76787650487	614301203897	12	~2018
76788921719	153577843439	12	~2016
76791964643	153583929287	12	~2016
76797812363	153595624727	12	~2016
76806528497	460839170983	12	~2017
76812958637	460877751823	12	~2017
76814890079	153629780159	12	~2016
76818122099	153636244199	12	~2016
76826894099	153653788199	12	~2016
76827887957	1167...694641	15	2025
76829768651	153659537303	12	~2016
76831790831	153663581663	12	~2016
76838668223	153677336447	12	~2016

Exponent	Prime Factor	Dig.	Year
76839558563	153679117127	12	~2016
76841797139	153683594279	12	~2016
76851681911	153703363823	12	~2016
76853388961	461120333767	12	~2017
76855250981	614842007849	12	~2018
76861133939	153722267879	12	~2016
76861157377	461166944263	12	~2017
76861246151	153722492303	12	~2016
76862977403	153725954807	12	~2016
76875913703	153751827407	12	~2016
76877392139	615019137113	12	~2018
76881377123	153762754247	12	~2016
76885271219	153770542439	12	~2016
76889121059	153778242119	12	~2016
76902728879	153805457759	12	~2016
76904257691	153808515383	12	~2016
76904942063	153809884127	12	~2016
76905267623	153810535247	12	~2016
76908674663	153817349327	12	~2016
76908755437	461452532623	12	~2017
76910241563	153820483127	12	~2016
76919004971	153838009943	12	~2016
76924788131	153849576263	12	~2016
76926037439	153852074879	12	~2016
76927399061	461564394367	12	~2017

Exponent	Prime Factor	Dig.	Year
76927788611	153855577223	12	~2016
76928781029	615430248233	12	~2018
76931026979	153862053959	12	~2016
76931404691	153862809383	12	~2016
76937344943	153874689887	12	~2016
76943162183	153886324367	12	~2016
76943697923	153887395847	12	~2016
76947342863	153894685727	12	~2016
76951710611	153903421223	12	~2016
76954575443	153909150887	12	~2016
76954929959	153909859919	12	~2016
76955523731	153911047463	12	~2016
76956046691	153912093383	12	~2016
76956869831	153913739663	12	~2016
76959135479	153918270959	12	~2016
76971367289	615770938313	12	~2018
76976488931	153952977863	12	~2016
76977663443	153955326887	12	~2016
76979829431	153959658863	12	~2016
76997599043	153995198087	12	~2016
76998103993	461988623959	12	~2017
76999823167	3649...181159	14	2023
77000428487	2541...400711	14	2025
77002841879	154005683759	12	~2016
77003082791	616024662329	12	~2018

Exponent	Prime Factor	Dig.	Year
77008829231	154017658463	12	~2016
77011753631	154023507263	12	~2016
77013427951	770134279511	12	~2018
77024498561	616195988489	12	~2018
77024846891	154049693783	12	~2016
77025430739	154050861479	12	~2016
77039840243	154079680487	12	~2016
77042525051	616340200409	12	~2018
77044264079	154088528159	12	~2016
77054254019	154108508039	12	~2016
77062809311	154125618623	12	~2016
77062920419	154125840839	12	~2016
77065401251	154130802503	12	~2016
77066056283	154132112567	12	~2016
77067488977	462404933863	12	~2017
77071322831	154142645663	12	~2016
77073686069	616589488553	12	~2018
77074487351	154148974703	12	~2016
77075819063	154151638127	12	~2016
77080241351	154160482703	12	~2016
77081114969	616648919753	12	~2018
77082162011	154164324023	12	~2016
77086730879	154173461759	12	~2016
77091839183	154183678367	12	~2016
77096855603	154193711207	12	~2016

5.441.361 digits

26-03-15