Small Mersenne Prime Factors (page 5394/5745)

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
76427493617	458564961703	12	~2017
76427604479	152855208959	12	~2016
76434894521	458609367127	12	~2017
76435084031	152870168063	12	~2016
76439904899	152879809799	12	~2016
76449996299	152899992599	12	~2016
76451794631	152903589263	12	~2016
76453564079	152907128159	12	~2016
76453596599	152907193199	12	~2016
76463261183	152926522367	12	~2016
76463272019	152926544039	12	~2016
76464441541	458786649247	12	~2017
76467437099	152934874199	12	~2016
76470201611	152940403223	12	~2016
76475205563	152950411127	12	~2016
76477795463	152955590927	12	~2016
76486475423	152972950847	12	~2016
76487059331	152974118663	12	~2016
76488198071	152976396143	12	~2016
76493574301	458961445807	12	~2017
76494336419	152988672839	12	~2016
76494794641	458968767847	12	~2017
76496733779	152993467559	12	~2016
76497348491	152994696983	12	~2016
76498367171	152996734343	12	~2016

Exponent	Prime Factor	Dig.	Year
76498528679	152997057359	12	~2016
76499773481	458998640887	12	~2017
76501165043	153002330087	12	~2016
76501629313	459009775879	12	~2017
76506134123	153012268247	12	~2016
76508944283	153017888567	12	~2016
76516405321	459098431927	12	~2017
76521888119	153043776239	12	~2016
76522390621	459134343727	12	~2017
76526940131	153053880263	12	~2016
76528119911	153056239823	12	~2016
76539409319	153078818639	12	~2016
76539832091	153079664183	12	~2016
76540742819	153081485639	12	~2016
76548684623	153097369247	12	~2016
76549214459	153098428919	12	~2016
76553264387	612426115097	12	~2018
76555620203	153111240407	12	~2016
76560274991	153120549983	12	~2016
76560891389	3169...035047	14	2023
76564404503	153128809007	12	~2016
76565186981	459391121887	12	~2017
76566945131	153133890263	12	~2016
76569665759	153139331519	12	~2016
76575217403	153150434807	12	~2016

Exponent	Prime Factor	Dig.	Year
76578584051	153157168103	12	~2016
76580276183	153160552367	12	~2016
76580593751	153161187503	12	~2016
76581322379	153162644759	12	~2016
76585604731	765856047311	12	~2018
76598896499	153197792999	12	~2016
76599984421	459599906527	12	~2017
76600753193	459604519159	12	~2017
76602005171	153204010343	12	~2016
76602632231	153205264463	12	~2016
76603594031	153207188063	12	~2016
76606580969	612852647753	12	~2018
76606970831	153213941663	12	~2016
76608313513	459649881079	12	~2017
76609273493	459655640959	12	~2017
76611567803	153223135607	12	~2016
76612774631	153225549263	12	~2016
76614401939	153228803879	12	~2016
76615691969	612925535753	12	~2018
76617911603	153235823207	12	~2016
76620842891	153241685783	12	~2016
76621793123	153243586247	12	~2016
76643420543	153286841087	12	~2016
76646957339	153293914679	12	~2016
76648589711	153297179423	12	~2016

Exponent	Prime Factor	Dig.	Year
76650681671	153301363343	12	~2016
76656031877	459936191263	12	~2017
76672984799	153345969599	12	~2016
76674846673	460049080039	12	~2017
76677125263	2330...079953	14	2023
76686365183	153372730367	12	~2016
76687103303	153374206607	12	~2016
76689383339	153378766679	12	~2016
76692326003	153384652007	12	~2016
76698130139	153396260279	12	~2016
76706704703	153413409407	12	~2016
76708349581	460250097487	12	~2017
76712599031	153425198063	12	~2016
76712790131	153425580263	12	~2016
76713303659	153426607319	12	~2016
76726985603	153453971207	12	~2016
76729703581	460378221487	12	~2017
76738335539	153476671079	12	~2016
76746430583	153492861167	12	~2016
76747824311	153495648623	12	~2016
76750440059	153500880119	12	~2016
76750597571	153501195143	12	~2016
76751599019	153503198039	12	~2016
76753141499	153506282999	12	~2016
76755600539	153511201079	12	~2016

5.441.361 digits

26-03-15