Small Mersenne Prime Factors (page 4808/5670)

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
12611159651	25222319303	11	~2010
12611405123	25222810247	11	~2010
12611407079	25222814159	11	~2010
12611550239	25223100479	11	~2010
12611605631	25223211263	11	~2010
12612775459	227029958263	12	~2012
12612792431	25225584863	11	~2010
12612981599	25225963199	11	~2010
12613567859	25227135719	11	~2010
12614311331	25228622663	11	~2010
12614410373	75686462239	11	~2011
12615469859	25230939719	11	~2010
12615593513	75693561079	11	~2011
12615879361	201854069777	12	~2012
12616379603	25232759207	11	~2010
12617867237	176650141319	12	~2012
12617922557	100943380457	12	~2011
12619256423	25238512847	11	~2010
12620270893	75721625359	11	~2011
12620456161	75722736967	11	~2011
12620713883	25241427767	11	~2010
12621272093	75727632559	11	~2011
12622092503	25244185007	11	~2010
12622541843	25245083687	11	~2010
12622596851	25245193703	11	~2010

Exponent	Prime Factor	Dig.	Year
12622673143	126226731431	12	~2012
12622919843	25245839687	11	~2010
12623186291	25246372583	11	~2010
12623368217	100986945737	12	~2011
12623828053	75742968319	11	~2011
12623938913	75743633479	11	~2011
12624407963	25248815927	11	~2010
12624461303	25248922607	11	~2010
12624507277	75747043663	11	~2011
12625434673	378763040191	12	~2013
12625511471	25251022943	11	~2010
12625597343	25251194687	11	~2010
12625742771	25251485543	11	~2010
12625861693	75755170159	11	~2011
12626601023	25253202047	11	~2010
12626921893	75761531359	11	~2011
12627224593	75763347559	11	~2011
12627337991	25254675983	11	~2010
12627676513	75766059079	11	~2011
12627689197	75766135183	11	~2011
12628016371	833449080487	12	~2014
12628327919	25256655839	11	~2010
12628672321	75772033927	11	~2011
12628985879	25257971759	11	~2010
12629385959	25258771919	11	~2010

Exponent	Prime Factor	Dig.	Year
12629597819	25259195639	11	~2010
12629791667	101038333337	12	~2011
12629871623	25259743247	11	~2010
12630402971	25260805943	11	~2010
12630461297	1059...281831	15	2023
12630596623	530485058167	12	~2013
12631366823	25262733647	11	~2010
12631813511	25263627023	11	~2010
12632951893	75797711359	11	~2011
12633498203	25266996407	11	~2010
12633513923	25267027847	11	~2010
12634068983	25268137967	11	~2010
12634649759	25269299519	11	~2010
12634669199	25269338399	11	~2010
12634823711	25269647423	11	~2010
12634958411	25269916823	11	~2010
12635010131	25270020263	11	~2010
12635209211	25270418423	11	~2010
12635439757	75812638543	11	~2011
12636022823	25272045647	11	~2010
12636755471	25273510943	11	~2010
12637131863	25274263727	11	~2010
12637263707	101098109657	12	~2011
12637636751	25275273503	11	~2010
12637668853	75826013119	11	~2011

Exponent	Prime Factor	Dig.	Year
12637834283	25275668567	11	~2010
12637861919	25275723839	11	~2010
12638426303	25276852607	11	~2010
12638773463	25277546927	11	~2010
12639087899	25278175799	11	~2010
12640112591	25280225183	11	~2010
12640139773	75840838639	11	~2011
12640421071	202246737137	12	~2012
12640437191	25280874383	11	~2010
12640528931	25281057863	11	~2010
12640648523	25281297047	11	~2010
12640750957	75844505743	11	~2011
12640795619	25281591239	11	~2010
12641285879	25282571759	11	~2010
12641472667	126414726671	12	~2012
12641510099	25283020199	11	~2010
12641730719	25283461439	11	~2010
12642152297	75852913783	11	~2011
12642241669	278129316719	12	~2012
12642406151	227563310719	12	~2012
12642489371	25284978743	11	~2010
12643193939	25286387879	11	~2010
12643299059	25286598119	11	~2010
12644376383	25288752767	11	~2010
12644514277	75867085663	11	~2011

5.366.787 digits

26-02-08