Small Mersenne Prime Factors (page 5477/5745)

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
107370356531	214740713063	12	~2017
107375539277	644253235663	12	~2018
107375557391	859004459129	12	~2019
107379192049	9857...300983	14	2025
107397866819	214795733639	12	~2017
107401372103	214802744207	12	~2017
107413191023	214826382047	12	~2017
107415088139	214830176279	12	~2017
107419382123	214838764247	12	~2017
107421913331	214843826663	12	~2017
107423803439	214847606879	12	~2017
107427369601	644564217607	12	~2018
107427864443	214855728887	12	~2017
107437402463	214874804927	12	~2017
107438288663	214876577327	12	~2017
107438685821	644632114927	12	~2018
107439836963	214879673927	12	~2017
107442108239	214884216479	12	~2017
107449531391	214899062783	12	~2017
107453381177	644720287063	12	~2018
107454560701	2578...568241	14	2024
107460097403	214920194807	12	~2017
107462470757	644774824543	12	~2018
107470173659	214940347319	12	~2017
107477267291	859818138329	12	~2019

Exponent	Prime Factor	Dig.	Year
107500948871	215001897743	12	~2017
107501413931	215002827863	12	~2017
107501445503	215002891007	12	~2017
107520829499	215041658999	12	~2017
107521765811	215043531623	12	~2017
107522704277	860181634217	12	~2019
107525982359	215051964719	12	~2017
107531052851	215062105703	12	~2017
107532126133	645192756799	12	~2018
107535225893	645211355359	12	~2018
107537670743	215075341487	12	~2017
107539686599	215079373199	12	~2017
107556222359	215112444719	12	~2017
107567396771	215134793543	12	~2017
107569340953	645416045719	12	~2018
107581874219	215163748439	12	~2017
107585588639	215171177279	12	~2017
107594562781	645567376687	12	~2018
107602594691	215205189383	12	~2017
107605032911	215210065823	12	~2017
107606923811	215213847623	12	~2017
107611430639	215222861279	12	~2017
107616372719	215232745439	12	~2017
107620772243	215241544487	12	~2017
107623497781	645740986687	12	~2018

Exponent	Prime Factor	Dig.	Year
107624320151	860994561209	12	~2019
107626065923	215252131847	12	~2017
107630438759	215260877519	12	~2017
107630732459	215261464919	12	~2017
107650533251	861204266009	12	~2019
107657435999	215314871999	12	~2017
107660805803	215321611607	12	~2017
107665391699	215330783399	12	~2017
107672432183	215344864367	12	~2017
107678724431	215357448863	12	~2017
107679135587	861433084697	12	~2019
107684905379	215369810759	12	~2017
107685480923	215370961847	12	~2017
107686308011	3962...348049	14	2023
107687143103	215374286207	12	~2017
107689516043	215379032087	12	~2017
107689933619	215379867239	12	~2017
107690190851	215380381703	12	~2017
107694631223	215389262447	12	~2017
107710388531	215420777063	12	~2017
107711955563	215423911127	12	~2017
107725082123	215450164247	12	~2017
107726568959	215453137919	12	~2017
107733082511	215466165023	12	~2017
107739093941	646434563647	12	~2018

Exponent	Prime Factor	Dig.	Year
107742111083	215484222167	12	~2017
107746543451	215493086903	12	~2017
107755796591	215511593183	12	~2017
107757715981	646546295887	12	~2018
107758456607	862067652857	12	~2019
107762196071	215524392143	12	~2017
107764161779	215528323559	12	~2017
107764992677	646589956063	12	~2018
107766672599	215533345199	12	~2017
107768496683	215536993367	12	~2017
107771744891	215543489783	12	~2017
107777817923	215555635847	12	~2017
107779976471	215559952943	12	~2017
107782789511	215565579023	12	~2017
107788648871	215577297743	12	~2017
107794212083	215588424167	12	~2017
107801082913	646806497479	12	~2018
107801528651	215603057303	12	~2017
107805525923	215611051847	12	~2017
107805775523	215611551047	12	~2017
107805945059	215611890119	12	~2017
107806363271	215612726543	12	~2017
107809379177	646856275063	12	~2018
107814017123	215628034247	12	~2017
107830004153	646980024919	12	~2018

5.441.361 digits

26-03-15