Small Mersenne Prime Factors (page 4373/5190)

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
10033746623	20067493247	11	~2009
10033795049	80270360393	11	~2011
10034145743	20068291487	11	~2009
10035089699	20070179399	11	~2009
10036213919	20072427839	11	~2009
10036281901	60217691407	11	~2010
10036675139	20073350279	11	~2009
10036932463	100369324631	12	~2011
10036997651	20073995303	11	~2009
10037983573	60227901439	11	~2010
10038025331	20076050663	11	~2009
10038723089	381471477383	12	~2012
10038915353	60233492119	11	~2010
10039160353	60234962119	11	~2010
10039572551	20079145103	11	~2009
10039928981	783114460519	12	~2013
10039981097	60239886583	11	~2010
10040239021	220885258463	12	~2012
10040610953	60243665719	11	~2010
10040863979	20081727959	11	~2009
10041055859	80328446873	11	~2011
10041056339	20082112679	11	~2009
10041873203	20083746407	11	~2009
10042097909	80336783273	11	~2011
10042169843	20084339687	11	~2009

Exponent	Prime Factor	Dig.	Year
10042481783	20084963567	11	~2009
10042498573	60254991439	11	~2010
10042995779	20085991559	11	~2009
10043011523	20086023047	11	~2009
10043112239	20086224479	11	~2009
10043393189	80347145513	11	~2011
10043921411	20087842823	11	~2009
10043943683	20087887367	11	~2009
10044270311	20088540623	11	~2009
10045295171	482174168209	12	~2013
10045502063	20091004127	11	~2009
10045770023	20091540047	11	~2009
10045798043	20091596087	11	~2009
10046049061	60276294367	11	~2010
10046253803	20092507607	11	~2009
10046284481	60277706887	11	~2010
10046488451	20092976903	11	~2009
10046888303	20093776607	11	~2009
10046908583	20093817167	11	~2009
10046969903	20093939807	11	~2009
10047209279	20094418559	11	~2009
10047517057	60285102343	11	~2010
10047719063	20095438127	11	~2009
10047804419	20095608839	11	~2009
10048278923	20096557847	11	~2009

Exponent	Prime Factor	Dig.	Year
10048433149	301452994471	12	~2012
10048954033	401958161321	12	~2012
10049225999	20098451999	11	~2009
10049322911	20098645823	11	~2009
10049778311	20099556623	11	~2009
10049782763	20099565527	11	~2009
10050235211	80401881689	11	~2011
10050464531	321614864993	12	~2012
10050601811	20101203623	11	~2009
10050839699	20101679399	11	~2009
10051332359	20102664719	11	~2009
10052384819	20104769639	11	~2009
10052412323	20104824647	11	~2009
10053258263	20106516527	11	~2009
10053728759	20107457519	11	~2009
10054447993	60326687959	11	~2010
10054541363	20109082727	11	~2009
10054596037	60327576223	11	~2010
10054888549	301646656471	12	~2012
10054901231	20109802463	11	~2009
10056206159	20112412319	11	~2009
10056410339	80451282713	11	~2011
10056918563	20113837127	11	~2009
10056941519	20113883039	11	~2009
10057069313	140798970383	12	~2011

Exponent	Prime Factor	Dig.	Year
10057159513	60342957079	11	~2010
10057635383	20115270767	11	~2009
10058359889	80466879113	11	~2011
10058630843	20117261687	11	~2009
10058816279	80470530233	11	~2011
10058865611	20117731223	11	~2009
10059113293	301773398791	12	~2012
10059256703	20118513407	11	~2009
10059362231	20118724463	11	~2009
10059426131	20118852263	11	~2009
10059994271	80479954169	11	~2011
10060150703	20120301407	11	~2009
10060627867	100606278671	12	~2011
10060656521	60363939127	11	~2010
10061243321	80489946569	11	~2011
10061330063	20122660127	11	~2009
10061391029	140859474407	12	~2011
10061636423	20123272847	11	~2009
10062072739	100620727391	12	~2011
10062378563	20124757127	11	~2009
10062552299	20125104599	11	~2009
10062573239	20125146479	11	~2009
10063243031	20126486063	11	~2009
10063475111	20126950223	11	~2009
10063726391	20127452783	11	~2009

4.888.230 digits

25-06-29