Small Mersenne Prime Factors (page 4456/5850)

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	Digits	Year
3300670133	19804020799	11	~2007
3300687023	6601374047	10	~2005
3300747479	6601494959	10	~2005
3300772991	6601545983	10	~2005
3300787823	6601575647	10	~2005
3300848807	396101856841	12	~2010
3300929123	6601858247	10	~2005
3301208363	6602416727	10	~2005
3301296923	6602593847	10	~2005
3301360091	6602720183	10	~2005
3301380431	6602760863	10	~2005
3301747931	6603495863	10	~2005
3301806943	33018069431	11	~2007
3301849619	6603699239	10	~2005
3301852943	6603705887	10	~2005
3301871759	6603743519	10	~2005
3301891823	6603783647	10	~2005
3301957871	6603915743	10	~2005
3301974443	6603948887	10	~2005
3302101919	6604203839	10	~2005
3302142929	26417143433	11	~2007
3302166611	6604333223	10	~2005
3302213683	52835418929	11	~2008
3302403959	6604807919	10	~2005
3302422391	6604844783	10	~2005

Exponent	Prime Factor	Digits	Year
3302562359	6605124719	10	~2005
3302705093	19816230559	11	~2007
3302753171	6605506343	10	~2005
3302992369	231209465831	12	~2009
3303208763	6606417527	10	~2005
3303284459	6606568919	10	~2005
3303346751	26426774009	11	~2007
3303354961	19820129767	11	~2007
3303446351	6606892703	10	~2005
3303600199	33036001991	11	~2007
3303655871	6607311743	10	~2005
3303682979	6607365959	10	~2005
3303713771	6607427543	10	~2005
3303761633	19822569799	11	~2007
3303762743	6607525487	10	~2005
3303832799	6607665599	10	~2005
3303859439	6607718879	10	~2005
3303996413	19823978479	11	~2007
3304094231	6608188463	10	~2005
3304097519	6608195039	10	~2005
3304319411	6608638823	10	~2005
3304332719	6608665439	10	~2005
3304559579	6609119159	10	~2005
3304617139	33046171391	11	~2007
3304654319	6609308639	10	~2005

Exponent	Prime Factor	Digits	Year
3304700897	26437607177	11	~2007
3304728551	6609457103	10	~2005
3304848887	26438791097	11	~2007
3304890623	6609781247	10	~2005
3305037623	6610075247	10	~2005
3305044397	26440355177	11	~2007
3305083559	6610167119	10	~2005
3305128577	19830771463	11	~2007
3305434343	6610868687	10	~2005
3305567897	46277950559	11	~2007
3305662271	6611324543	10	~2005
3305781553	19834689319	11	~2007
3305836871	6611673743	10	~2005
3305851121	19835106727	11	~2007
3305974181	19835845087	11	~2007
3306186551	26449492409	11	~2007
3306458411	6612916823	10	~2005
3306472139	6612944279	10	~2005
3306518591	6613037183	10	~2005
3306648193	19839889159	11	~2007
3306932003	6613864007	10	~2005
3307047431	6614094863	10	~2005
3307099151	6614198303	10	~2005
3307152539	6614305079	10	~2005
3307268843	6614537687	10	~2005

Exponent	Prime Factor	Digits	Year
3307274851	52916397617	11	~2008
3307379953	72762358967	11	~2008
3307387997	19844327983	11	~2007
3307479613	72764551487	11	~2008
3307500551	6615001103	10	~2005
3307514603	6615029207	10	~2005
3307530701	19845184207	11	~2007
3307595393	19845572359	11	~2007
3307601579	6615203159	10	~2005
3307654799	26461238393	11	~2007
3307666223	6615332447	10	~2005
3307688231	6615376463	10	~2005
3307776971	6615553943	10	~2005
3307783751	6615567503	10	~2005
3307788457	310932114959	12	~2009
3307890143	6615780287	10	~2005
3307897921	231552854471	12	~2009
3307991279	6615982559	10	~2005
3308189999	6616379999	10	~2005
3308328251	6616656503	10	~2005
3308344463	6616688927	10	~2005
3308427071	6616854143	10	~2005
3308431271	6616862543	10	~2005
3308456297	19850737783	11	~2007
3308547433	19851284599	11	~2007

5.546.121 digits

26-05-03