Small Mersenne Prime Factors (page 4133/5025)

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
6805049819	13610099639	11	~2008
6805360223	13610720447	11	~2008
6806065223	13612130447	11	~2008
6806113871	54448910969	11	~2009
6806222099	13612444199	11	~2008
6806314043	13612628087	11	~2008
6806353919	13612707839	11	~2008
6806558711	13613117423	11	~2008
6806955803	13613911607	11	~2008
6807024839	13614049679	11	~2008
6807108461	40842650767	11	~2009
6807305651	13614611303	11	~2008
6808259219	13616518439	11	~2008
6808307903	13616615807	11	~2008
6808318103	13616636207	11	~2008
6808669559	13617339119	11	~2008
6808780889	54470247113	11	~2009
6808814339	13617628679	11	~2008
6808953719	13617907439	11	~2008
6809100719	13618201439	11	~2008
6809133491	13618266983	11	~2008
6809142731	13618285463	11	~2008
6809311757	95330364599	11	~2010
6809748557	54477988457	11	~2009
6809874959	13619749919	11	~2008

Exponent	Prime Factor	Dig.	Year
6810221347	68102213471	11	~2010
6810292253	217929352097	12	~2011
6810332411	13620664823	11	~2008
6810776099	13621552199	11	~2008
6810951359	13621902719	11	~2008
6811070611	122599270999	12	~2010
6811304057	54490432457	11	~2009
6811507739	13623015479	11	~2008
6811557563	13623115127	11	~2008
6811888511	13623777023	11	~2008
6811912637	40871475823	11	~2009
6812218403	13624436807	11	~2008
6812383079	13624766159	11	~2008
6812438579	13624877159	11	~2008
6812464199	13624928399	11	~2008
6812767991	13625535983	11	~2008
6813126011	13626252023	11	~2008
6813158479	163515803497	12	~2010
6813356519	13626713039	11	~2008
6813625751	13627251503	11	~2008
6813802117	40882812703	11	~2009
6813876011	13627752023	11	~2008
6814004831	13628009663	11	~2008
6814255829	54514046633	11	~2009
6814433917	40886603503	11	~2009

Exponent	Prime Factor	Dig.	Year
6814492673	40886956039	11	~2009
6814941293	40889647759	11	~2009
6814975859	13629951719	11	~2008
6815118671	13630237343	11	~2008
6815411723	13630823447	11	~2008
6815449271	13630898543	11	~2008
6815536319	13631072639	11	~2008
6815760443	13631520887	11	~2008
6816317939	13632635879	11	~2008
6816508463	13633016927	11	~2008
6816560843	13633121687	11	~2008
6816567119	54532536953	11	~2009
6816615779	13633231559	11	~2008
6817027291	286315146223	12	~2011
6817072631	13634145263	11	~2008
6817309123	272692364921	12	~2011
6817475479	272699019161	12	~2011
6817523567	163620565609	12	~2010
6818272931	13636545863	11	~2008
6818442899	13636885799	11	~2008
6818807483	13637614967	11	~2008
6819289859	13638579719	11	~2008
6819466463	13638932927	11	~2008
6819652601	204589578031	12	~2011
6819655691	13639311383	11	~2008

Exponent	Prime Factor	Dig.	Year
6819790259	13639580519	11	~2008
6819793451	13639586903	11	~2008
6820149599	13640299199	11	~2008
6820360523	13640721047	11	~2008
6820831883	13641663767	11	~2008
6821251949	54570015593	11	~2009
6821421161	40928526967	11	~2009
6821578343	13643156687	11	~2008
6822748187	163745956489	12	~2010
6822813083	13645626167	11	~2008
6822915191	13645830383	11	~2008
6823349243	13646698487	11	~2008
6824333819	13648667639	11	~2008
6824721863	13649443727	11	~2008
6824731181	40948387087	11	~2009
6824739899	13649479799	11	~2008
6824838281	54598706249	11	~2009
6824975411	13649950823	11	~2008
6825286319	54602290553	11	~2009
6825303839	13650607679	11	~2008
6825312553	40951875319	11	~2009
6825371783	13650743567	11	~2008
6825392219	13650784439	11	~2008
6825495251	13650990503	11	~2008
6825739643	13651479287	11	~2008

4.724.182 digits

25-04-13