Small Mersenne Prime Factors (page 5502/5790)

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
100554092533	603324555199	12	~2018
100557765359	201115530719	12	~2017
100562545859	201125091719	12	~2017
100564158659	201128317319	12	~2017
100564465103	201128930207	12	~2017
100570965641	603425793847	12	~2018
100588932683	201177865367	12	~2017
100596730439	201193460879	12	~2017
100599133247	804793065977	12	~2018
100601087141	603606522847	12	~2018
100612965203	201225930407	12	~2017
100614322271	201228644543	12	~2017
100616757011	201233514023	12	~2017
100619737811	201239475623	12	~2017
100620766331	201241532663	12	~2017
100620922799	201241845599	12	~2017
100622845451	201245690903	12	~2017
100623919441	603743516647	12	~2018
100624474199	201248948399	12	~2017
100631678123	201263356247	12	~2017
100636069799	201272139599	12	~2017
100647692213	603886153279	12	~2018
100650026977	7649...502521	14	2025
100650830711	201301661423	12	~2017
100651346303	201302692607	12	~2017

Exponent	Prime Factor	Dig.	Year
100660162919	201320325839	12	~2017
100663085267	805304682137	12	~2018
100664236943	201328473887	12	~2017
100665760931	201331521863	12	~2017
100666024691	201332049383	12	~2017
100667071331	201334142663	12	~2017
100668655151	201337310303	12	~2017
100670435759	201340871519	12	~2017
100670573831	201341147663	12	~2017
100683561659	201367123319	12	~2017
100688348297	805506786377	12	~2018
100691555291	201383110583	12	~2017
100693127651	201386255303	12	~2017
100693492391	201386984783	12	~2017
100693841569	2295...777321	15	2025
100698555323	201397110647	12	~2017
100699278539	201398557079	12	~2017
100701310937	805610487497	12	~2018
100702739987	805621919897	12	~2018
100703331803	1450...779633	14	2024
100716176027	805729408217	12	~2018
100719294721	604315768327	12	~2018
100720841003	201441682007	12	~2017
100721888279	201443776559	12	~2017
100725287129	805802297033	12	~2018

Exponent	Prime Factor	Dig.	Year
100738890671	201477781343	12	~2017
100738906259	201477812519	12	~2017
100739256911	201478513823	12	~2017
100749233771	201498467543	12	~2017
100755765179	201511530359	12	~2017
100758473723	201516947447	12	~2017
100759539623	201519079247	12	~2017
100760369519	201520739039	12	~2017
100770194939	806161559513	12	~2018
100775324579	201550649159	12	~2017
100775777009	806206216073	12	~2018
100786607879	201573215759	12	~2017
100789830289	9413...489927	14	2026
100790207099	201580414199	12	~2017
100795424351	201590848703	12	~2017
100804960889	806439687113	12	~2018
100812671051	201625342103	12	~2017
100815257051	201630514103	12	~2017
100827417479	201654834959	12	~2017
100831291031	201662582063	12	~2017
100843005803	201686011607	12	~2017
100849749131	201699498263	12	~2017
100851986663	201703973327	12	~2017
100853804423	201707608847	12	~2017
100868197739	201736395479	12	~2017

Exponent	Prime Factor	Dig.	Year
100877908739	201755817479	12	~2017
100879402979	201758805959	12	~2017
100881901091	201763802183	12	~2017
100894611743	201789223487	12	~2017
100902119711	201804239423	12	~2017
100903881251	201807762503	12	~2017
100909768643	201819537287	12	~2017
100912271723	201824543447	12	~2017
100917730541	807341844329	12	~2018
100924769459	807398155673	12	~2018
100927129871	201854259743	12	~2017
100938832931	201877665863	12	~2017
100945454471	201890908943	12	~2017
100948724699	201897449399	12	~2017
100950190811	201900381623	12	~2017
100954809119	3573...428127	14	2023
100968878639	201937757279	12	~2017
100973116177	605838697063	12	~2018
100978299419	201956598839	12	~2017
100979879111	201959758223	12	~2017
100982253623	201964507247	12	~2017
100985418899	201970837799	12	~2017
100985682443	201971364887	12	~2017
100990260419	201980520839	12	~2017
100992805223	201985610447	12	~2017

5.486.313 digits

26-04-05