Small Mersenne Prime Factors (page 5153/5340)

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
132200865311	264401730623	12	~2018
132202206971	264404413943	12	~2018
132216856619	264433713239	12	~2018
132222210803	3199...014327	14	2024
132228942253	793373653519	12	~2019
132238663321	793431979927	12	~2019
132245845499	264491690999	12	~2018
132246532823	264493065647	12	~2018
132259379711	264518759423	12	~2018
132273276203	264546552407	12	~2018
132293482613	793760895679	12	~2019
132296597123	264593194247	12	~2018
132301286291	264602572583	12	~2018
132323242631	264646485263	12	~2018
132329646479	264659292959	12	~2018
132334381717	794006290303	12	~2019
132339439643	264678879287	12	~2018
132340987979	264681975959	12	~2018
132342564551	264685129103	12	~2018
132349730393	794098382359	12	~2019
132357228623	264714457247	12	~2018
132361053719	264722107439	12	~2018
132364624499	264729248999	12	~2018
132366458663	264732917327	12	~2018
132367355531	264734711063	12	~2018

Exponent	Prime Factor	Dig.	Year
132377653697	794265922183	12	~2019
132392359013	794354154079	12	~2019
132400858223	264801716447	12	~2018
132400959263	264801918527	12	~2018
132431393771	264862787543	12	~2018
132445569541	794673417247	12	~2019
132451934339	264903868679	12	~2018
132452634169	3814...640673	14	2024
132472390619	264944781239	12	~2018
132483158063	264966316127	12	~2018
132506557481	795039344887	12	~2019
132514463111	265028926223	12	~2018
132516781619	265033563239	12	~2018
132524208841	795145253047	12	~2019
132527023763	265054047527	12	~2018
132529502711	265059005423	12	~2018
132538768751	265077537503	12	~2018
132539076419	265078152839	12	~2018
132545199173	795271195039	12	~2019
132548375171	265096750343	12	~2018
132556332983	265112665967	12	~2018
132558457931	265116915863	12	~2018
132560530691	265121061383	12	~2018
132562556017	795375336103	12	~2019
132564642923	265129285847	12	~2018

Exponent	Prime Factor	Dig.	Year
132567623291	265135246583	12	~2018
132569362811	265138725623	12	~2018
132571064771	265142129543	12	~2018
132574817801	795448906807	12	~2019
132586400581	795518403487	12	~2019
132595173731	265190347463	12	~2018
132599045651	265198091303	12	~2018
132605363117	795632178703	12	~2019
132607048391	265214096783	12	~2018
132609651059	265219302119	12	~2018
132610073903	265220147807	12	~2018
132632735363	265265470727	12	~2018
132639483191	265278966383	12	~2018
132647233331	265294466663	12	~2018
132660679499	265321358999	12	~2018
132661913231	265323826463	12	~2018
132670613057	796023678343	12	~2019
132691149191	265382298383	12	~2018
132702995963	265405991927	12	~2018
132712677029	3822...984353	14	2024
132712777559	265425555119	12	~2018
132718406231	265436812463	12	~2018
132762680201	796576081207	12	~2019
132766097039	265532194079	12	~2018
132788253841	796729523047	12	~2019

Exponent	Prime Factor	Dig.	Year
132804526691	265609053383	12	~2018
132817815059	265635630119	12	~2018
132820521503	265641043007	12	~2018
132824992763	265649985527	12	~2018
132825627743	265651255487	12	~2018
132830064359	265660128719	12	~2018
132852692941	797116157647	12	~2019
132862198717	797173192303	12	~2019
132875235131	265750470263	12	~2018
132885116363	265770232727	12	~2018
132912432623	265824865247	12	~2018
132918299939	265836599879	12	~2018
132921168599	265842337199	12	~2018
132925691183	265851382367	12	~2018
132928402151	265856804303	12	~2018
132930548819	265861097639	12	~2018
132932631011	265865262023	12	~2018
132938050433	797628302599	12	~2019
132951579671	265903159343	12	~2018
132977122703	265954245407	12	~2018
132987131603	265974263207	12	~2018
132992125151	265984250303	12	~2018
133000193279	266000386559	12	~2018
133006859039	266013718079	12	~2018
133008912521	798053475127	12	~2019

5.037.460 digits

25-09-07