Small Mersenne Prime Factors (page 5004/5340)

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
66190108343	132380216687	12	~2016
66190616231	132381232463	12	~2016
66192800081	397156800487	12	~2017
66193005251	132386010503	12	~2016
66193451903	132386903807	12	~2016
66197379239	132394758479	12	~2016
66198518651	132397037303	12	~2016
66201016163	132402032327	12	~2016
66203821447	662038214471	12	~2017
66207489479	132414978959	12	~2016
66207516671	132415033343	12	~2016
66208955243	132417910487	12	~2016
66210279983	132420559967	12	~2016
66210410723	132420821447	12	~2016
66210620939	132421241879	12	~2016
66211400771	132422801543	12	~2016
66212048531	132424097063	12	~2016
66215060291	132430120583	12	~2016
66220216537	397321299223	12	~2017
66222008033	397332048199	12	~2017
66223035503	132446071007	12	~2016
66226036411	662260364111	12	~2017
66228924323	132457848647	12	~2016
66236047799	132472095599	12	~2016
66236991323	132473982647	12	~2016

Exponent	Prime Factor	Dig.	Year
66238500371	132477000743	12	~2016
66238829483	132477658967	12	~2016
66241062551	132482125103	12	~2016
66244901111	132489802223	12	~2016
66245419763	132490839527	12	~2016
66247530137	2424...030143	14	2023
66248747219	132497494439	12	~2016
66250596299	132501192599	12	~2016
66251225459	132502450919	12	~2016
66251244959	132502489919	12	~2016
66252060071	132504120143	12	~2016
66254347079	132508694159	12	~2016
66254437391	132508874783	12	~2016
66263360701	397580164207	12	~2017
66267409843	662674098431	12	~2017
66270119849	530160958793	12	~2017
66271141933	397626851599	12	~2017
66271371443	132542742887	12	~2016
66271460063	132542920127	12	~2016
66271505039	132543010079	12	~2016
66272453579	530179628633	12	~2017
66273897671	530191181369	12	~2017
66275065691	132550131383	12	~2016
66277082051	132554164103	12	~2016
66284462591	132568925183	12	~2016

Exponent	Prime Factor	Dig.	Year
66286138559	132572277119	12	~2016
66287304431	132574608863	12	~2016
66293026979	132586053959	12	~2016
66295405357	397772432143	12	~2017
66295459151	132590918303	12	~2016
66296285459	132592570919	12	~2016
66297432581	397784595487	12	~2017
66298619339	132597238679	12	~2016
66301487591	5091...469889	14	2023
66301730197	397810381183	12	~2017
66307540417	397845242503	12	~2017
66308641163	132617282327	12	~2016
66312012037	397872072223	12	~2017
66315127643	132630255287	12	~2016
66320896259	132641792519	12	~2016
66322572259	663225722591	12	~2017
66327345839	132654691679	12	~2016
66329014211	530632113689	12	~2017
66330311279	132660622559	12	~2016
66333289019	132666578039	12	~2016
66334117163	132668234327	12	~2016
66334173421	398005040527	12	~2017
66335194031	132670388063	12	~2016
66337527131	132675054263	12	~2016
66339453421	398036720527	12	~2017

Exponent	Prime Factor	Dig.	Year
66342000743	132684001487	12	~2016
66349833419	132699666839	12	~2016
66351802463	132703604927	12	~2016
66360411059	132720822119	12	~2016
66364204133	398185224799	12	~2017
66364336859	132728673719	12	~2016
66364981211	132729962423	12	~2016
66366391691	132732783383	12	~2016
66368969519	132737939039	12	~2016
66375800891	132751601783	12	~2016
66375971891	132751943783	12	~2016
66378500477	398271002863	12	~2017
66383120249	1210...139271	16	2025
66387506617	2111...104207	14	2023
66390875953	398345255719	12	~2017
66392336183	132784672367	12	~2016
66392490383	132784980767	12	~2016
66402283439	132804566879	12	~2016
66408274979	132816549959	12	~2016
66409608959	132819217919	12	~2016
66410614901	4622...971097	14	2025
66415231523	132830463047	12	~2016
66416133263	132832266527	12	~2016
66424859077	398549154463	12	~2017
66425530033	398553180199	12	~2017

5.037.460 digits

25-09-07