Small Mersenne Prime Factors (page 5440/5445)

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
414037325099	828074650199	12	~2022
414147703883	828295407767	12	~2022
414149939891	828299879783	12	~2022
414174872159	828349744319	12	~2022
414218586251	828437172503	12	~2022
414223284551	828446569103	12	~2022
414244630619	828489261239	12	~2022
414252577943	828505155887	12	~2022
414277757423	828555514847	12	~2022
414309385043	828618770087	12	~2022
414314288831	828628577663	12	~2022
414345671111	828691342223	12	~2022
414375065171	828750130343	12	~2022
414378695999	828757391999	12	~2022
414382667519	828765335039	12	~2022
414446478263	828892956527	12	~2022
414479164103	828958328207	12	~2022
414526451303	829052902607	12	~2022
414529426931	829058853863	12	~2022
414545036183	829090072367	12	~2022
414592755587	2363...684591	15	2025
414614482259	829228964519	12	~2022
414666897731	829333795463	12	~2022
414684081863	829368163727	12	~2022
414696510491	829393020983	12	~2022

Exponent	Prime Factor	Dig.	Year
414699734171	7049...809071	14	2025
414782649059	829565298119	12	~2022
414784269061	5434...237223	16	2025
414788242079	829576484159	12	~2022
414795262223	829590524447	12	~2022
414804621323	829609242647	12	~2022
414880053767	1194...484897	15	2025
414890422283	829780844567	12	~2022
414898233383	829796466767	12	~2022
414926068103	829852136207	12	~2022
414931824563	829863649127	12	~2022
414944189459	829888378919	12	~2022
414951993083	829903986167	12	~2022
415021358651	830042717303	12	~2022
415118720099	830237440199	12	~2022
415143082019	830286164039	12	~2022
415144406291	830288812583	12	~2022
415150983899	830301967799	12	~2022
415202591357	9300...463969	14	2025
415250436803	830500873607	12	~2022
415278543551	830557087103	12	~2022
415286439299	830572878599	12	~2022
415305441959	830610883919	12	~2022
415338664541	3688...112409	15	2025
415405403219	830810806439	12	~2022

Exponent	Prime Factor	Dig.	Year
415509168383	831018336767	12	~2022
415576082591	831152165183	12	~2022
415590884339	831181768679	12	~2022
415632688391	831265376783	12	~2022
415641693359	831283386719	12	~2022
415693147763	831386295527	12	~2022
415728604943	831457209887	12	~2022
415744139099	831488278199	12	~2022
415763259239	831526518479	12	~2022
415774937423	831549874847	12	~2022
415792531523	831585063047	12	~2022
415802880263	831605760527	12	~2022
415815075983	831630151967	12	~2022
415903874431	6987...904409	14	2025
415949598563	831899197127	12	~2022
415973642603	831947285207	12	~2022
416021233703	832042467407	12	~2022
416030314571	832060629143	12	~2022
416060561783	832121123567	12	~2022
416076348119	832152696239	12	~2022
416084174183	832168348367	12	~2022
416096932799	832193865599	12	~2022
416119973537	7240...395439	14	2025
416224006151	832448012303	12	~2022
416228382803	832456765607	12	~2022

Exponent	Prime Factor	Dig.	Year
416244633011	832489266023	12	~2022
416251425539	832502851079	12	~2022
416258959163	832517918327	12	~2022
416307675383	832615350767	12	~2022
416307992231	832615984463	12	~2022
416312133371	832624266743	12	~2022
416334657743	832669315487	12	~2022
416348209883	832696419767	12	~2022
416352604403	832705208807	12	~2022
416372861771	832745723543	12	~2022
416405751431	832811502863	12	~2022
416433977699	832867955399	12	~2022
416437095419	832874190839	12	~2022
416438142551	832876285103	12	~2022
416464766051	832929532103	12	~2022
416465453843	832930907687	12	~2022
416468297291	832936594583	12	~2022
416476728911	832953457823	12	~2022
416524002431	833048004863	12	~2022
416543283263	833086566527	12	~2022
416552743391	833105486783	12	~2022
416556435023	833112870047	12	~2022
416578516703	833157033407	12	~2022
416593722851	833187445703	12	~2022
416598042803	833196085607	12	~2022

5.142.307 digits

25-10-26