Small Mersenne Prime Factors (page 4155/5070)

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
6570861491	13141722983	11	~2008
6570897367	105134357873	12	~2010
6571469843	13142939687	11	~2008
6571592231	13143184463	11	~2008
6571650119	13143300239	11	~2008
6571666511	13143333023	11	~2008
6571679399	13143358799	11	~2008
6571919413	39431516479	11	~2009
6572255051	13144510103	11	~2008
6572475641	39434853847	11	~2009
6572783279	13145566559	11	~2008
6573000073	39438000439	11	~2009
6573036023	13146072047	11	~2008
6573328031	13146656063	11	~2008
6573484153	105175746449	12	~2010
6573579247	65735792471	11	~2009
6573603539	13147207079	11	~2008
6573620177	52588961417	11	~2009
6573823801	105181180817	12	~2010
6573930491	13147860983	11	~2008
6574296611	13148593223	11	~2008
6574308011	13148616023	11	~2008
6574487303	13148974607	11	~2008
6574561859	13149123719	11	~2008
6574631699	13149263399	11	~2008

Exponent	Prime Factor	Dig.	Year
6574707371	13149414743	11	~2008
6574713479	13149426959	11	~2008
6574786741	39448720447	11	~2009
6574971563	13149943127	11	~2008
6575071931	13150143863	11	~2008
6575269583	13150539167	11	~2008
6575292721	39451756327	11	~2009
6575445203	13150890407	11	~2008
6575565877	39453395263	11	~2009
6575819819	13151639639	11	~2008
6576097943	13152195887	11	~2008
6576285563	13152571127	11	~2008
6576554723	13153109447	11	~2008
6576619823	13153239647	11	~2008
6576981863	13153963727	11	~2008
6577084931	13154169863	11	~2008
6577103321	39462619927	11	~2009
6577270211	13154540423	11	~2008
6577501163	13155002327	11	~2008
6577581863	13155163727	11	~2008
6577744687	65777446871	11	~2009
6577942849	513079542223	12	~2012
6577965743	13155931487	11	~2008
6577978811	13155957623	11	~2008
6578021111	13156042223	11	~2008

Exponent	Prime Factor	Dig.	Year
6578308463	13156616927	11	~2008
6578520911	13157041823	11	~2008
6578527691	13157055383	11	~2008
6579085619	13158171239	11	~2008
6579845809	144756607799	12	~2010
6580118459	13160236919	11	~2008
6580443263	13160886527	11	~2008
6580581599	13161163199	11	~2008
6580602863	13161205727	11	~2008
6580832893	39484997359	11	~2009
6581831699	13163663399	11	~2008
6581913587	52655308697	11	~2009
6581917883	13163835767	11	~2008
6582079811	13164159623	11	~2008
6582184139	13164368279	11	~2008
6582297671	13164595343	11	~2008
6582717803	13165435607	11	~2008
6582726131	13165452263	11	~2008
6582824459	13165648919	11	~2008
6582827579	13165655159	11	~2008
6584235689	52673885513	11	~2009
6584344979	13168689959	11	~2008
6584611739	13169223479	11	~2008
6584654033	158031696793	12	~2010
6584937791	13169875583	11	~2008

Exponent	Prime Factor	Dig.	Year
6585416723	13170833447	11	~2008
6585518183	13171036367	11	~2008
6585639871	65856398711	11	~2009
6585845039	13171690079	11	~2008
6586063943	13172127887	11	~2008
6586108583	13172217167	11	~2008
6586502183	13173004367	11	~2008
6586527851	13173055703	11	~2008
6586602923	13173205847	11	~2008
6586903919	13173807839	11	~2008
6586957379	13173914759	11	~2008
6587109439	65871094391	11	~2009
6587424803	13174849607	11	~2008
6587526719	13175053439	11	~2008
6587979371	13175958743	11	~2008
6588028613	39528171679	11	~2009
6588065903	13176131807	11	~2008
6588298573	39529791439	11	~2009
6588378673	39530272039	11	~2009
6588524339	13177048679	11	~2008
6588562031	13177124063	11	~2008
6588625139	13177250279	11	~2008
6588649601	52709196809	11	~2009
6588914131	790669695721	12	~2012
6589213019	13178426039	11	~2008

4.768.925 digits

25-05-04