Small Mersenne Prime Factors (page 5317/5340)

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
358164763919	716329527839	12	~2021
358217636099	716435272199	12	~2021
358221756911	716443513823	12	~2021
358238006939	716476013879	12	~2021
358277080019	716554160039	12	~2021
358320839473	3439...589409	14	2024
358350628739	716701257479	12	~2021
358357730579	716715461159	12	~2021
358407918443	716815836887	12	~2021
358414839577	2795...487007	14	2024
358423380803	716846761607	12	~2021
358429073543	716858147087	12	~2021
358429845131	716859690263	12	~2021
358453415843	716906831687	12	~2021
358471095299	716942190599	12	~2021
358480806923	716961613847	12	~2021
358522538399	717045076799	12	~2021
358584640391	717169280783	12	~2021
358625689679	717251379359	12	~2021
358648194851	717296389703	12	~2021
358694250643	7532...635031	14	2025
358752091319	717504182639	12	~2021
358783380311	717566760623	12	~2021
358892315231	717784630463	12	~2021
358905903179	717811806359	12	~2021

Exponent	Prime Factor	Dig.	Year
358935101579	717870203159	12	~2021
358977786971	717955573943	12	~2021
358993922051	717987844103	12	~2021
359095124159	718190248319	12	~2021
359112797843	718225595687	12	~2021
359113613951	718227227903	12	~2021
359124430919	718248861839	12	~2021
359152071059	718304142119	12	~2021
359159692439	718319384879	12	~2021
359165331923	718330663847	12	~2021
359171045423	718342090847	12	~2021
359203419671	718406839343	12	~2021
359221427291	718442854583	12	~2021
359269257779	718538515559	12	~2021
359295296233	1437...849321	14	2024
359312036623	2371...417119	14	2024
359384662271	718769324543	12	~2021
359395014983	718790029967	12	~2021
359406638867	1725...665617	14	2024
359503985783	719007971567	12	~2021
359520554831	719041109663	12	~2021
359533702943	719067405887	12	~2021
359534145059	719068290119	12	~2021
359553899951	719107799903	12	~2021
359556539399	719113078799	12	~2021

Exponent	Prime Factor	Dig.	Year
359584280459	719168560919	12	~2021
359595085331	719190170663	12	~2021
359598777491	719197554983	12	~2021
359687204423	719374408847	12	~2021
359715320771	719430641543	12	~2021
359760152519	719520305039	12	~2021
359765372699	719530745399	12	~2021
359797814171	719595628343	12	~2021
359841906491	719683812983	12	~2021
359869221851	719738443703	12	~2021
359882096771	719764193543	12	~2021
359900509259	1014...611039	15	2024
359926168139	719852336279	12	~2021
359959344287	5680...284887	15	2024
360015695783	720031391567	12	~2021
360021485051	720042970103	12	~2021
360028546859	720057093719	12	~2021
360038628667	8136...078743	14	2025
360055597199	720111194399	12	~2021
360085794143	720171588287	12	~2021
360093859523	720187719047	12	~2021
360134200763	720268401527	12	~2021
360135519239	720271038479	12	~2021
360233826191	720467652383	12	~2021
360270446831	720540893663	12	~2021

Exponent	Prime Factor	Dig.	Year
360281434339	8358...766649	14	2025
360296381699	720592763399	12	~2021
360353641883	8720...335687	14	2024
360387886717	1030...601063	15	2025
360401125037	6054...006217	14	2024
360405837067	7568...784071	14	2025
360413904413	9731...191511	14	2025
360424515131	720849030263	12	~2021
360454975897	2523...312791	14	2024
360463655291	720927310583	12	~2021
360545882051	721091764103	12	~2021
360618497303	721236994607	12	~2021
360662419919	721324839839	12	~2021
360664605551	721329211103	12	~2021
360681347891	721362695783	12	~2021
360703798571	721407597143	12	~2021
360706577123	721413154247	12	~2021
360712487339	721424974679	12	~2021
360725972279	721451944559	12	~2021
360734139791	7214...958201	14	2025
360788247563	721576495127	12	~2021
360791009963	721582019927	12	~2021
360791601143	721583202287	12	~2021
360793327883	721586655767	12	~2021
360823541951	721647083903	12	~2021

5.037.460 digits

25-09-07