Small Mersenne Prime Factors (page 5191/5340)

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
164983211579	329966423159	12	~2019
164987429723	329974859447	12	~2019
164997266699	329994533399	12	~2019
165002243183	330004486367	12	~2019
165004124171	330008248343	12	~2019
165051048251	330102096503	12	~2019
165051778943	330103557887	12	~2019
165067939979	330135879959	12	~2019
165071898923	330143797847	12	~2019
165075558359	330151116719	12	~2019
165081162899	330162325799	12	~2019
165092164043	330184328087	12	~2019
165107049251	330214098503	12	~2019
165114746063	330229492127	12	~2019
165119086753	2873...095023	14	2024
165120278159	330240556319	12	~2019
165129799867	2774...377657	14	2024
165133143551	330266287103	12	~2019
165152941823	330305883647	12	~2019
165154104179	330308208359	12	~2019
165154228087	2774...318617	14	2024
165156752591	330313505183	12	~2019
165162190211	330324380423	12	~2019
165175911083	330351822167	12	~2019
165184732283	330369464567	12	~2019

Exponent	Prime Factor	Dig.	Year
165189345791	330378691583	12	~2019
165191220851	330382441703	12	~2019
165194235491	330388470983	12	~2019
165195712691	330391425383	12	~2019
165207681659	330415363319	12	~2019
165208097039	330416194079	12	~2019
165215105903	330430211807	12	~2019
165230076359	330460152719	12	~2019
165233267531	7746...185329	15	2023
165236399123	330472798247	12	~2019
165276322691	330552645383	12	~2019
165285124523	330570249047	12	~2019
165303642863	330607285727	12	~2019
165306361799	330612723599	12	~2019
165312277979	330624555959	12	~2019
165318182279	330636364559	12	~2019
165320040191	330640080383	12	~2019
165348856979	330697713959	12	~2019
165355219979	330710439959	12	~2019
165360778799	330721557599	12	~2019
165388833023	330777666047	12	~2019
165391065239	330782130479	12	~2019
165403948343	330807896687	12	~2019
165404797403	330809594807	12	~2019
165416598059	330833196119	12	~2019

Exponent	Prime Factor	Dig.	Year
165416787383	330833574767	12	~2019
165431421251	330862842503	12	~2019
165432365699	330864731399	12	~2019
165433799543	330867599087	12	~2019
165452518919	330905037839	12	~2019
165453383003	330906766007	12	~2019
165466893563	330933787127	12	~2019
165469653383	330939306767	12	~2019
165473022551	330946045103	12	~2019
165482665619	330965331239	12	~2019
165495244823	330990489647	12	~2019
165499035491	330998070983	12	~2019
165518594063	331037188127	12	~2019
165539506703	331079013407	12	~2019
165560646431	331121292863	12	~2019
165575276843	331150553687	12	~2019
165578504939	331157009879	12	~2019
165589786163	331179572327	12	~2019
165590908079	331181816159	12	~2019
165595278659	331190557319	12	~2019
165595564523	331191129047	12	~2019
165608449679	331216899359	12	~2019
165608792423	331217584847	12	~2019
165609080519	331218161039	12	~2019
165626442491	331252884983	12	~2019

Exponent	Prime Factor	Dig.	Year
165643976111	331287952223	12	~2019
165654554399	331309108799	12	~2019
165655056851	331310113703	12	~2019
165656502359	331313004719	12	~2019
165664238699	331328477399	12	~2019
165664729619	331329459239	12	~2019
165666818279	331333636559	12	~2019
165673369139	331346738279	12	~2019
165679800323	331359600647	12	~2019
165679822151	331359644303	12	~2019
165690806063	331381612127	12	~2019
165693550019	331387100039	12	~2019
165714806051	331429612103	12	~2019
165746617703	331493235407	12	~2019
165773733971	331547467943	12	~2019
165791612351	331583224703	12	~2019
165840000971	331680001943	12	~2019
165860566463	331721132927	12	~2019
165866707631	331733415263	12	~2019
165869436671	331738873343	12	~2019
165878322397	1141...809137	15	2025
165897042743	331794085487	12	~2019
165900432479	3706...158087	15	2025
165939623099	331879246199	12	~2019
165973682291	331947364583	12	~2019

5.037.460 digits

25-09-07