Small Mersenne Prime Factors (page 5576/5790)

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
139565555243	279131110487	12	~2018
139573073099	279146146199	12	~2018
139578609959	279157219919	12	~2018
139582587251	279165174503	12	~2018
139586797739	279173595479	12	~2018
139591442411	279182884823	12	~2018
139594577183	279189154367	12	~2018
139595441411	279190882823	12	~2018
139602060023	279204120047	12	~2018
139607474291	279214948583	12	~2018
139613142611	279226285223	12	~2018
139614174383	279228348767	12	~2018
139615592579	279231185159	12	~2018
139624244317	837745465903	12	~2019
139634069713	837804418279	12	~2019
139637931203	279275862407	12	~2018
139643704643	279287409287	12	~2018
139645193879	279290387759	12	~2018
139646248211	279292496423	12	~2018
139655791679	279311583359	12	~2018
139656132263	279312264527	12	~2018
139658135153	1642...939929	15	2026
139659215603	279318431207	12	~2018
139660763579	279321527159	12	~2018
139678029539	279356059079	12	~2018

Exponent	Prime Factor	Dig.	Year
139685304569	7235...766743	14	2025
139688663617	838131981703	12	~2019
139696900319	279393800639	12	~2018
139710707063	279421414127	12	~2018
139714905959	279429811919	12	~2018
139725376331	279450752663	12	~2018
139729769183	279459538367	12	~2018
139732517783	279465035567	12	~2018
139732774451	279465548903	12	~2018
139741447271	279482894543	12	~2018
139745684159	279491368319	12	~2018
139746380617	838478283703	12	~2019
139751261483	279502522967	12	~2018
139769985683	279539971367	12	~2018
139773244151	279546488303	12	~2018
139777244459	279554488919	12	~2018
139779633011	279559266023	12	~2018
139801180091	279602360183	12	~2018
139810529783	279621059567	12	~2018
139811143273	838866859639	12	~2019
139812292801	838873756807	12	~2019
139816010651	279632021303	12	~2018
139823759639	279647519279	12	~2018
139825119683	279650239367	12	~2018
139829014691	279658029383	12	~2018

Exponent	Prime Factor	Dig.	Year
139834494461	839006966767	12	~2019
139849426571	279698853143	12	~2018
139866124379	279732248759	12	~2018
139877895299	279755790599	12	~2018
139880368763	279760737527	12	~2018
139890035963	279780071927	12	~2018
139899161351	279798322703	12	~2018
139899426083	279798852167	12	~2018
139928225051	279856450103	12	~2018
139928853413	839573120479	12	~2019
139934663333	839607979999	12	~2019
139961328497	839767970983	12	~2019
139969401251	279938802503	12	~2018
139969535437	839817212623	12	~2019
139975258583	279950517167	12	~2018
139992026651	279984053303	12	~2018
139997552003	279995104007	12	~2018
139997590823	279995181647	12	~2018
140001069359	280002138719	12	~2018
140006873417	840041240503	12	~2019
140018039041	840108234247	12	~2019
140018821451	280037642903	12	~2018
140019899879	280039799759	12	~2018
140021689091	280043378183	12	~2018
140026718159	280053436319	12	~2018

Exponent	Prime Factor	Dig.	Year
140027394803	280054789607	12	~2018
140038663577	2352...480937	14	2024
140045428739	280090857479	12	~2018
140048756051	280097512103	12	~2018
140050733737	840304402423	12	~2019
140051398637	840308391823	12	~2019
140053234631	280106469263	12	~2018
140053452373	840320714239	12	~2019
140070503879	280141007759	12	~2018
140097408131	280194816263	12	~2018
140126546159	280253092319	12	~2018
140126608943	280253217887	12	~2018
140138028923	280276057847	12	~2018
140138776331	280277552663	12	~2018
140144607611	280289215223	12	~2018
140149013309	1051...981751	15	2025
140154832943	280309665887	12	~2018
140155211951	280310423903	12	~2018
140162218633	3588...970049	14	2023
140174478551	280348957103	12	~2018
140175739973	841054439839	12	~2019
140179505317	841077031903	12	~2019
140188177763	280376355527	12	~2018
140193701183	280387402367	12	~2018
140197152731	280394305463	12	~2018

5.486.313 digits

26-04-05