Small Mersenne Prime Factors (page 4531/5025)

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
28243306571	56486613143	11	~2013
28243657223	56487314447	11	~2013
28244814791	56489629583	11	~2013
28244820581	225958564649	12	~2014
28244915821	169469494927	12	~2014
28246605791	56493211583	11	~2013
28248276071	56496552143	11	~2013
28248965819	56497931639	11	~2013
28248990817	169493944903	12	~2014
28249876283	56499752567	11	~2013
28250418659	56500837319	11	~2013
28250499983	56500999967	11	~2013
28250632523	56501265047	11	~2013
28250690459	56501380919	11	~2013
28251748439	56503496879	11	~2013
28251972011	56503944023	11	~2013
28252440791	56504881583	11	~2013
28253033617	452048537873	12	~2015
28256299991	226050399929	12	~2014
28256413319	56512826639	11	~2013
28258106399	56516212799	11	~2013
28258351193	169550107159	12	~2014
28258425479	56516850959	11	~2013
28260211823	56520423647	11	~2013
28261165343	56522330687	11	~2013

Exponent	Prime Factor	Dig.	Year
28261294247	226090353977	12	~2014
28263731543	56527463087	11	~2013
28266651241	169599907447	12	~2014
28267478303	56534956607	11	~2013
28268043131	56536086263	11	~2013
28268373383	56536746767	11	~2013
28269633793	169617802759	12	~2014
28270946783	56541893567	11	~2013
28271451053	169628706319	12	~2014
28272065467	508897178407	12	~2015
28273290443	56546580887	11	~2013
28274469131	56548938263	11	~2013
28276061201	169656367207	12	~2014
28277252099	56554504199	11	~2013
28277918789	226223350313	12	~2014
28278284543	56556569087	11	~2013
28278367571	56556735143	11	~2013
28281401303	56562802607	11	~2013
28281879623	56563759247	11	~2013
28282497247	282824972471	12	~2014
28283194931	56566389863	11	~2013
28283283097	169699698583	12	~2014
28288359313	169730155879	12	~2014
28288599263	56577198527	11	~2013
28290799343	56581598687	11	~2013

Exponent	Prime Factor	Dig.	Year
28290911423	735563696999	12	~2015
28291505243	56583010487	11	~2013
28294329443	56588658887	11	~2013
28294453511	226355628089	12	~2014
28294897283	56589794567	11	~2013
28296551831	226372414649	12	~2014
28297176623	56594353247	11	~2013
28298202547	282982025471	12	~2014
28298221151	56596442303	11	~2013
28298431543	452774904689	12	~2015
28304427383	56608854767	11	~2013
28306951499	56613902999	11	~2013
28309827137	396337579919	12	~2015
28310471927	226483775417	12	~2014
28314932543	56629865087	11	~2013
28317942397	679630617529	12	~2015
28317980939	226543847513	12	~2014
28318627091	56637254183	11	~2013
28318945871	56637891743	11	~2013
28319841911	226558735289	12	~2014
28320871583	56641743167	11	~2013
28320873239	56641746479	11	~2013
28322706983	56645413967	11	~2013
28323741163	283237411631	12	~2014
28324720631	56649441263	11	~2013

Exponent	Prime Factor	Dig.	Year
28325039531	56650079063	11	~2013
28325486237	169952917423	12	~2014
28325900579	56651801159	11	~2013
28328009953	453248159249	12	~2015
28329469991	56658939983	11	~2013
28330765091	56661530183	11	~2013
28330843259	56661686519	11	~2013
28331425693	169988554159	12	~2014
28334893393	170009360359	12	~2014
28337059823	56674119647	11	~2013
28340656979	56681313959	11	~2013
28340969159	56681938319	11	~2013
28341029291	56682058583	11	~2013
28341178163	56682356327	11	~2013
28341192001	170047152007	12	~2014
28341972863	56683945727	11	~2013
28342084139	56684168279	11	~2013
28343237603	56686475207	11	~2013
28345379399	56690758799	11	~2013
28345823357	170074940143	12	~2014
28345890187	283458901871	12	~2014
28346446559	226771572473	12	~2014
28346715359	56693430719	11	~2013
28347214457	226777715657	12	~2014
28347359941	170084159647	12	~2014

4.724.182 digits

25-04-13