Small Mersenne Prime Factors (page 5226/5790)

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
35443777997	283550223977	12	~2015
35444205493	212665232959	12	~2015
35445568097	212673408583	12	~2015
35448951661	212693709967	12	~2015
35449095373	212694572239	12	~2015
35449687547	283597500377	12	~2015
35452274183	70904548367	11	~2013
35452328459	70904656919	11	~2013
35453858399	70907716799	11	~2013
35456554481	212739326887	12	~2015
35457501161	283660009289	12	~2015
35457602819	70915205639	11	~2013
35460142439	70920284879	11	~2013
35460319319	851047663657	12	~2016
35462558123	70925116247	11	~2013
35462920271	70925840543	11	~2013
35463822133	212782932799	12	~2015
35465107903	354651079031	12	~2015
35466827723	70933655447	11	~2013
35468208871	354682088711	12	~2015
35472905003	70945810007	11	~2013
35473681559	70947363119	11	~2013
35474123759	70948247519	11	~2013
35474547359	70949094719	11	~2013
35474884103	70949768207	11	~2013

Exponent	Prime Factor	Dig.	Year
35474924951	70949849903	11	~2013
35478184523	70956369047	11	~2013
35481142883	70962285767	11	~2013
35483064131	70966128263	11	~2013
35484472343	70968944687	11	~2013
35484498299	70968996599	11	~2013
35487618281	212925709687	12	~2015
35488272983	70976545967	11	~2013
35489051711	70978103423	11	~2013
35490614039	70981228079	11	~2013
35491641359	70983282719	11	~2013
35493344063	70986688127	11	~2013
35496240683	70992481367	11	~2013
35496292763	70992585527	11	~2013
35497867631	70995735263	11	~2013
35501257619	284010060953	12	~2015
35503194371	71006388743	11	~2013
35503803539	71007607079	11	~2013
35507455979	71014911959	11	~2013
35509536421	213057218527	12	~2015
35511783757	213070702543	12	~2015
35512200089	284097600713	12	~2015
35513959571	71027919143	11	~2013
35514580051	639262440919	12	~2016
35514836369	6222...318489	14	2023

Exponent	Prime Factor	Dig.	Year
35517218003	71034436007	11	~2013
35518609859	71037219719	11	~2013
35519593391	71039186783	11	~2013
35521690943	71043381887	11	~2013
35522914991	71045829983	11	~2013
35524822051	355248220511	12	~2015
35525929811	71051859623	11	~2013
35526839837	213161039023	12	~2015
35527230971	71054461943	11	~2013
35528571671	71057143343	11	~2013
35530544111	71061088223	11	~2013
35530723331	71061446663	11	~2013
35532754811	71065509623	11	~2013
35533062263	71066124527	11	~2013
35533900637	3354...201329	14	2023
35535844919	71071689839	11	~2013
35536330483	355363304831	12	~2015
35540331371	71080662743	11	~2013
35540733097	568651729553	12	~2016
35540884697	284327077577	12	~2015
35541057481	213246344887	12	~2015
35541481691	71082963383	11	~2013
35543114723	71086229447	11	~2013
35544067319	71088134639	11	~2013
35545244123	71090488247	11	~2013

Exponent	Prime Factor	Dig.	Year
35545481099	71090962199	11	~2013
35545999403	71091998807	11	~2013
35547289691	284378317529	12	~2015
35550342203	71100684407	11	~2013
35550569591	71101139183	11	~2013
35552684257	213316105543	12	~2015
35552896859	71105793719	11	~2013
35553769463	71107538927	11	~2013
35558351123	71116702247	11	~2013
35561816711	71123633423	11	~2013
35562085931	71124171863	11	~2013
35563898611	355638986111	12	~2015
35565053123	71130106247	11	~2013
35565833531	71131667063	11	~2013
35567026199	71134052399	11	~2013
35570067293	213420403759	12	~2015
35570844311	71141688623	11	~2013
35571515879	71143031759	11	~2013
35573070241	213438421447	12	~2015
35573749697	213442498183	12	~2015
35573802431	71147604863	11	~2013
35576366159	71152732319	11	~2013
35576466239	71152932479	11	~2013
35577281357	213463688143	12	~2015
35577940771	640402933879	12	~2016

5.486.313 digits

26-04-05