Small Mersenne Prime Factors (page 5574/5850)

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
108127584263	216255168527	12	~2017
108136220723	216272441447	12	~2017
108146855171	216293710343	12	~2017
108159692219	216319384439	12	~2017
108170633591	216341267183	12	~2017
108174573803	216349147607	12	~2017
108186167951	216372335903	12	~2017
108195185783	216390371567	12	~2017
108195419831	216390839663	12	~2017
108195996911	865567975289	12	~2019
108201986957	2661...791423	14	2024
108205525163	216411050327	12	~2017
108211555223	216423110447	12	~2017
108212799323	216425598647	12	~2017
108218420603	216436841207	12	~2017
108219908701	4309...291223	16	2023
108220730291	216441460583	12	~2017
108221021999	216442043999	12	~2017
108224785199	216449570399	12	~2017
108225029351	216450058703	12	~2017
108225401233	649352407399	12	~2018
108227493191	216454986383	12	~2017
108232934063	216465868127	12	~2017
108235372919	216470745839	12	~2017
108238197491	216476394983	12	~2017

Exponent	Prime Factor	Dig.	Year
108238596419	216477192839	12	~2017
108239295863	216478591727	12	~2017
108242628937	649455773623	12	~2018
108243866183	216487732367	12	~2017
108248623409	865988987273	12	~2019
108255015023	216510030047	12	~2017
108257302949	6820...857871	14	2025
108268233323	216536466647	12	~2017
108275947583	216551895167	12	~2017
108280640399	216561280799	12	~2017
108280900319	216561800639	12	~2017
108282488843	216564977687	12	~2017
108283116971	216566233943	12	~2017
108288711599	216577423199	12	~2017
108293570531	3614...432479	15	2025
108295123379	216590246759	12	~2017
108302488993	649814933959	12	~2018
108319359503	216638719007	12	~2017
108321324491	216642648983	12	~2017
108327758459	216655516919	12	~2017
108330037661	649980225967	12	~2018
108336444971	216672889943	12	~2017
108337444619	216674889239	12	~2017
108343009871	216686019743	12	~2017
108343757279	216687514559	12	~2017

Exponent	Prime Factor	Dig.	Year
108344159507	866753276057	12	~2019
108347878571	216695757143	12	~2017
108353000663	216706001327	12	~2017
108354730277	866837842217	12	~2019
108356082683	216712165367	12	~2017
108365691443	216731382887	12	~2017
108369793751	216739587503	12	~2017
108387983579	216775967159	12	~2017
108389041283	216778082567	12	~2017
108390716243	216781432487	12	~2017
108401727233	650410363399	12	~2018
108402786539	216805573079	12	~2017
108407112941	867256903529	12	~2019
108407399879	216814799759	12	~2017
108409914083	216819828167	12	~2017
108412176563	216824353127	12	~2017
108413081039	216826162079	12	~2017
108420497459	216840994919	12	~2017
108427177871	216854355743	12	~2017
108431579699	216863159399	12	~2017
108433303619	216866607239	12	~2017
108435530513	650613183079	12	~2018
108437012197	650622073183	12	~2018
108439340881	650636045287	12	~2018
108449807413	650698844479	12	~2018

Exponent	Prime Factor	Dig.	Year
108451548587	867612388697	12	~2019
108455472803	216910945607	12	~2017
108455692679	216911385359	12	~2017
108457217399	216914434799	12	~2017
108458637383	216917274767	12	~2017
108459223571	216918447143	12	~2017
108461553923	216923107847	12	~2017
108463682303	216927364607	12	~2017
108466404941	650798429647	12	~2018
108469484219	216938968439	12	~2017
108470896343	216941792687	12	~2017
108485713499	216971426999	12	~2017
108495614231	216991228463	12	~2017
108495697031	216991394063	12	~2017
108506763143	217013526287	12	~2017
108511177139	217022354279	12	~2017
108514254503	217028509007	12	~2017
108520033883	217040067767	12	~2017
108520743673	651124462039	12	~2018
108521770079	217043540159	12	~2017
108523388177	868187105417	12	~2019
108528048851	868224390809	12	~2019
108529960139	217059920279	12	~2017
108530181803	217060363607	12	~2017
108532674311	2682...896793	15	2025

5.546.121 digits

26-05-03