Small Mersenne Prime Factors (page 4467/5025)

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
22107977051	44215954103	11	~2012
22108146299	44216292599	11	~2012
22108510631	44217021263	11	~2012
22108571879	44217143759	11	~2012
22109820913	132658925479	12	~2013
22111516151	44223032303	11	~2012
22112429063	44224858127	11	~2012
22112604851	44225209703	11	~2012
22113173591	44226347183	11	~2012
22113306443	44226612887	11	~2012
22114512971	44229025943	11	~2012
22114589291	44229178583	11	~2012
22114907819	44229815639	11	~2012
22115602139	44231204279	11	~2012
22115920199	44231840399	11	~2012
22116559919	44233119839	11	~2012
22116926291	44233852583	11	~2012
22117192213	486578228687	12	~2014
22117997351	44235994703	11	~2012
22118371841	132710231047	12	~2013
22119945923	44239891847	11	~2012
22120535771	44241071543	11	~2012
22121224523	44242449047	11	~2012
22121632157	176973057257	12	~2013
22123319227	398219746087	12	~2014

Exponent	Prime Factor	Dig.	Year
22124061419	44248122839	11	~2012
22125615131	44251230263	11	~2012
22126234919	44252469839	11	~2012
22128514097	309799197359	12	~2014
22128782723	44257565447	11	~2012
22129779011	44259558023	11	~2012
22130261911	398344714399	12	~2014
22130581199	44261162399	11	~2012
22130871131	44261742263	11	~2012
22132516379	44265032759	11	~2012
22132691123	44265382247	11	~2012
22133800583	44267601167	11	~2012
22134297431	44268594863	11	~2012
22134914771	44269829543	11	~2012
22136251139	44272502279	11	~2012
22140543731	44281087463	11	~2012
22141504211	44283008423	11	~2012
22141624391	44283248783	11	~2012
22142092691	44284185383	11	~2012
22142115371	44284230743	11	~2012
22142339621	132854037727	12	~2013
22142372557	132854235343	12	~2013
22146971831	44293943663	11	~2012
22147027739	44294055479	11	~2012
22147991711	44295983423	11	~2012

Exponent	Prime Factor	Dig.	Year
22149834143	531596019433	12	~2014
22152137879	44304275759	11	~2012
22154255723	44308511447	11	~2012
22156253963	44312507927	11	~2012
22156658483	44313316967	11	~2012
22159531643	44319063287	11	~2012
22159595561	132957573367	12	~2013
22159873943	44319747887	11	~2012
22160638679	44321277359	11	~2012
22160737691	44321475383	11	~2012
22161908603	44323817207	11	~2012
22162341101	132974046607	12	~2013
22162669541	132976017247	12	~2013
22162759051	221627590511	12	~2014
22162883531	44325767063	11	~2012
22163945879	531934701097	12	~2014
22164534773	132987208639	12	~2013
22166536877	132999221263	12	~2013
22167612851	44335225703	11	~2012
22167994031	44335988063	11	~2012
22170028757	177360230057	12	~2013
22170455771	44340911543	11	~2012
22170591143	44341182287	11	~2012
22170624617	177364996937	12	~2013
22170839783	44341679567	11	~2012

Exponent	Prime Factor	Dig.	Year
22171383373	532113200953	12	~2014
22171927103	44343854207	11	~2012
22172405819	44344811639	11	~2012
22172476511	399104577199	12	~2014
22173316391	44346632783	11	~2012
22174510957	133047065743	12	~2013
22175141369	177401130953	12	~2013
22175551091	177404408729	12	~2013
22176226511	44352453023	11	~2012
22176478559	44352957119	11	~2012
22178649371	44357298743	11	~2012
22178789291	44357578583	11	~2012
22179343643	44358687287	11	~2012
22181171017	133087026103	12	~2013
22181557667	177452461337	12	~2013
22183020383	44366040767	11	~2012
22183730957	177469847657	12	~2013
22183916257	133103497543	12	~2013
22184121721	133104730327	12	~2013
22184531393	133107188359	12	~2013
22184958827	532439011849	12	~2014
22186930523	44373861047	11	~2012
22187218139	44374436279	11	~2012
22187503931	44375007863	11	~2012
22188001259	44376002519	11	~2012

4.724.182 digits

25-04-13