Small Mersenne Prime Factors (page 4115/5025)

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
6416384291	12832768583	11	~2008
6416475839	12832951679	11	~2008
6416625779	12833251559	11	~2008
6417308351	12834616703	11	~2008
6417490577	51339924617	11	~2009
6417534863	12835069727	11	~2008
6417886571	51343092569	11	~2009
6417921563	12835843127	11	~2008
6418086971	12836173943	11	~2008
6418101731	12836203463	11	~2008
6418255619	12836511239	11	~2008
6418500743	12837001487	11	~2008
6418537319	12837074639	11	~2008
6418554683	12837109367	11	~2008
6418905599	12837811199	11	~2008
6419141483	12838282967	11	~2008
6419154733	38514928399	11	~2009
6419403239	12838806479	11	~2008
6419544419	12839088839	11	~2008
6419642639	12839285279	11	~2008
6419644139	12839288279	11	~2008
6419812823	12839625647	11	~2008
6419825939	12839651879	11	~2008
6420090023	12840180047	11	~2008
6420460691	12840921383	11	~2008

Exponent	Prime Factor	Dig.	Year
6420727259	12841454519	11	~2008
6420917819	12841835639	11	~2008
6421032011	12842064023	11	~2008
6421058801	51368470409	11	~2009
6421112099	115580017783	12	~2010
6421752131	12843504263	11	~2008
6421753841	38530523047	11	~2009
6422095943	12844191887	11	~2008
6422113343	12844226687	11	~2008
6422436037	38534616223	11	~2009
6422474111	12844948223	11	~2008
6422530811	12845061623	11	~2008
6422715779	12845431559	11	~2008
6423054959	12846109919	11	~2008
6423182399	12846364799	11	~2008
6423243899	12846487799	11	~2008
6423594503	12847189007	11	~2008
6423832631	12847665263	11	~2008
6424024091	12848048183	11	~2008
6424278743	12848557487	11	~2008
6424406921	51395255369	11	~2009
6424587727	64245877271	11	~2009
6424743179	12849486359	11	~2008
6425106923	12850213847	11	~2008
6425126699	12850253399	11	~2008

Exponent	Prime Factor	Dig.	Year
6425449313	38552695879	11	~2009
6425854063	154220497513	12	~2010
6425938591	102815017457	12	~2010
6426278279	12852556559	11	~2008
6426330923	12852661847	11	~2008
6426634163	12853268327	11	~2008
6426733283	12853466567	11	~2008
6426816299	12853632599	11	~2008
6426995557	38561973343	11	~2009
6427030223	12854060447	11	~2008
6427367339	12854734679	11	~2008
6427407803	12854815607	11	~2008
6428319251	12856638503	11	~2008
6428418761	38570512567	11	~2009
6428484677	38570908063	11	~2009
6428596259	12857192519	11	~2008
6428711657	90001963199	11	~2010
6428755379	12857510759	11	~2008
6428869439	12857738879	11	~2008
6429022519	64290225191	11	~2009
6429223811	51433790489	11	~2009
6429328901	38575973407	11	~2009
6429547613	38577285679	11	~2009
6429836519	12859673039	11	~2008
6429855623	12859711247	11	~2008

Exponent	Prime Factor	Dig.	Year
6430038143	12860076287	11	~2008
6430191539	12860383079	11	~2008
6430288979	12860577959	11	~2008
6430411583	12860823167	11	~2008
6430515683	12861031367	11	~2008
6430920959	12861841919	11	~2008
6430971779	12861943559	11	~2008
6430978523	12861957047	11	~2008
6431013791	12862027583	11	~2008
6431014091	12862028183	11	~2008
6431369051	12862738103	11	~2008
6431610743	12863221487	11	~2008
6431765843	12863531687	11	~2008
6431824801	38590948807	11	~2009
6432255443	12864510887	11	~2008
6432591779	12865183559	11	~2008
6433397423	12866794847	11	~2008
6433488599	12866977199	11	~2008
6433521299	12867042599	11	~2008
6433607197	38601643183	11	~2009
6433680161	38602080967	11	~2009
6433819883	12867639767	11	~2008
6434026111	102944417777	12	~2010
6434157683	12868315367	11	~2008
6434262899	12868525799	11	~2008

4.724.182 digits

25-04-13