Small Mersenne Prime Factors (page 4723/5190)

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
35122753343	70245506687	11	~2013
35123308859	70246617719	11	~2013
35123550719	70247101439	11	~2013
35124240071	70248480143	11	~2013
35125407623	70250815247	11	~2013
35127235571	70254471143	11	~2013
35127482839	351274828391	12	~2015
35131846199	632373231583	12	~2016
35133221381	210799328287	12	~2015
35133926651	70267853303	11	~2013
35137347383	70274694767	11	~2013
35140066763	70280133527	11	~2013
35140157231	70280314463	11	~2013
35142806519	70285613039	11	~2013
35142910939	351429109391	12	~2015
35143637159	70287274319	11	~2013
35143751579	70287503159	11	~2013
35144184787	562306956593	12	~2016
35144365211	70288730423	11	~2013
35144419901	281155359209	12	~2015
35145420119	70290840239	11	~2013
35146529531	70293059063	11	~2013
35147233031	70294466063	11	~2013
35147955971	70295911943	11	~2013
35149529543	70299059087	11	~2013

Exponent	Prime Factor	Dig.	Year
35150214383	70300428767	11	~2013
35151416903	70302833807	11	~2013
35152445359	351524453591	12	~2015
35153296679	70306593359	11	~2013
35154460223	70308920447	11	~2013
35155149761	281241198089	12	~2015
35155734671	70311469343	11	~2013
35157231731	70314463463	11	~2013
35159876099	70319752199	11	~2013
35161058711	70322117423	11	~2013
35161436111	70322872223	11	~2013
35161904263	351619042631	12	~2015
35163127319	70326254639	11	~2013
35165396459	70330792919	11	~2013
35165959151	70331918303	11	~2013
35168001551	70336003103	11	~2013
35168009707	2510...930799	14	2024
35168012063	70336024127	11	~2013
35170209803	70340419607	11	~2013
35170571939	70341143879	11	~2013
35171872387	351718723871	12	~2015
35171943791	70343887583	11	~2013
35173405979	70346811959	11	~2013
35174132041	211044792247	12	~2015
35175135563	70350271127	11	~2013

Exponent	Prime Factor	Dig.	Year
35177549003	70355098007	11	~2013
35178042491	70356084983	11	~2013
35179914323	70359828647	11	~2013
35182437317	211094623903	12	~2015
35183512499	70367024999	11	~2013
35185278119	70370556239	11	~2013
35185486331	70370972663	11	~2013
35185967137	211115802823	12	~2015
35186689379	70373378759	11	~2013
35188712731	563019403697	12	~2016
35189510171	70379020343	11	~2013
35191456403	70382912807	11	~2013
35192767439	281542139513	12	~2015
35192860739	70385721479	11	~2013
35192867471	70385734943	11	~2013
35193805799	70387611599	11	~2013
35194473263	70388946527	11	~2013
35196668711	70393337423	11	~2013
35198003297	492772046159	12	~2015
35203462247	281627697977	12	~2015
35205285673	211231714039	12	~2015
35207633711	70415267423	11	~2013
35208873923	70417747847	11	~2013
35210911451	70421822903	11	~2013
35211113033	211266678199	12	~2015

Exponent	Prime Factor	Dig.	Year
35211186721	774646107863	12	~2016
35215018621	211290111727	12	~2015
35215146503	70430293007	11	~2013
35216125163	70432250327	11	~2013
35217148277	211302889663	12	~2015
35221003663	563536058609	12	~2016
35223729311	70447458623	11	~2013
35231668319	70463336639	11	~2013
35235240311	281881922489	12	~2015
35236116119	70472232239	11	~2013
35236985099	70473970199	11	~2013
35238582061	211431492367	12	~2015
35238703133	211432218799	12	~2015
35239232243	70478464487	11	~2013
35239351811	70478703623	11	~2013
35239436483	70478872967	11	~2013
35239648919	70479297839	11	~2013
35239877219	70479754439	11	~2013
35241596303	70483192607	11	~2013
35242066507	352420665071	12	~2015
35245931939	70491863879	11	~2013
35246726699	70493453399	11	~2013
35249009051	70498018103	11	~2013
35250161333	211500967999	12	~2015
35250701039	70501402079	11	~2013

4.888.230 digits

25-06-29