Small Mersenne Prime Factors (page 4326/5130)

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
9993878579	19987757159	11	~2009
9994192979	19988385959	11	~2009
9994324357	59965946143	11	~2010
9994904651	19989809303	11	~2009
9995085671	19990171343	11	~2009
9995288837	139934043719	12	~2011
9995408639	19990817279	11	~2009
9995572157	59973432943	11	~2010
9995574203	19991148407	11	~2009
9995896123	99958961231	11	~2011
9996341639	19992683279	11	~2009
9996368881	59978213287	11	~2010
9996775031	19993550063	11	~2009
9996832271	19993664543	11	~2009
9997318679	19994637359	11	~2009
9997880111	19995760223	11	~2009
9997955447	79983643577	11	~2011
9997967051	19995934103	11	~2009
9998179703	19996359407	11	~2009
9998443003	99984430031	11	~2011
9999286859	19998573719	11	~2009
9999677279	19999354559	11	~2009
10000088699	20000177399	11	~2009
10000478651	20000957303	11	~2009
10000825823	20001651647	11	~2009

Exponent	Prime Factor	Dig.	Year
10000828027	1517...793807	15	2024
10000930847	80007446777	11	~2011
10000954823	20001909647	11	~2009
10001018831	20002037663	11	~2009
10001290709	80010325673	11	~2011
10001498099	20002996199	11	~2009
10001770151	20003540303	11	~2009
10002378131	20004756263	11	~2009
10002589763	20005179527	11	~2009
10002773723	20005547447	11	~2009
10002840781	60017044687	11	~2010
10002900431	20005800863	11	~2009
10003737239	20007474479	11	~2009
10003739467	160059831473	12	~2011
10004117999	20008235999	11	~2009
10004166853	60025001119	11	~2010
10005213551	20010427103	11	~2009
10006009859	20012019719	11	~2009
10006910951	20013821903	11	~2009
10006913897	80055311177	11	~2011
10006937419	100069374191	12	~2011
10007112721	60042676327	11	~2010
10007369171	20014738343	11	~2009
10007453369	80059626953	11	~2011
10007919671	20015839343	11	~2009

Exponent	Prime Factor	Dig.	Year
10008546937	240205126489	12	~2012
10008753959	20017507919	11	~2009
10009148753	140128082543	12	~2011
10009762463	20019524927	11	~2009
10010369483	20020738967	11	~2009
10010591603	20021183207	11	~2009
10010649841	60063899047	11	~2010
10010827019	20021654039	11	~2009
10011114083	20022228167	11	~2009
10011539101	60069234607	11	~2010
10012136891	20024273783	11	~2009
10012828583	20025657167	11	~2009
10013021153	60078126919	11	~2010
10013104103	20026208207	11	~2009
10013141051	20026282103	11	~2009
10013624531	20027249063	11	~2009
10013984819	20027969639	11	~2009
10014077743	100140777431	12	~2011
10014324569	80114596553	11	~2011
10014345791	20028691583	11	~2009
10014539039	20029078079	11	~2009
10014553931	20029107863	11	~2009
10014574403	20029148807	11	~2009
10015128083	20030256167	11	~2009
10015203239	20030406479	11	~2009

Exponent	Prime Factor	Dig.	Year
10015639759	100156397591	12	~2011
10015928999	20031857999	11	~2009
10016733941	80133871529	11	~2011
10017088979	20034177959	11	~2009
10017150653	320548820897	12	~2012
10017291143	20034582287	11	~2009
10017933683	20035867367	11	~2009
10018015523	20036031047	11	~2009
10018328231	20036656463	11	~2009
10018361219	20036722439	11	~2009
10018394663	20036789327	11	~2009
10018398361	60110390167	11	~2010
10018485299	20036970599	11	~2009
10018520243	20037040487	11	~2009
10018702607	80149620857	11	~2011
10018970651	20037941303	11	~2009
10019251211	20038502423	11	~2009
10019469437	60116816623	11	~2010
10019738231	20039476463	11	~2009
10019989379	20039978759	11	~2009
10020147121	60120882727	11	~2010
10020639683	20041279367	11	~2009
10020745151	20041490303	11	~2009
10021017709	240504425017	12	~2012
10021434539	20042869079	11	~2009

4.828.532 digits

25-06-01