Small Mersenne Prime Factors (page 4839/5610)

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
16067341049	128538728393	12	~2012
16069548779	32139097559	11	~2011
16069565047	289252170847	12	~2013
16069782251	128558258009	12	~2012
16070321843	32140643687	11	~2011
16070551643	32141103287	11	~2011
16072107503	32144215007	11	~2011
16072720523	32145441047	11	~2011
16072861481	96437168887	11	~2012
16073420171	32146840343	11	~2011
16073437753	257175004049	12	~2013
16073644591	160736445911	12	~2012
16074242147	128593937177	12	~2012
16075026491	32150052983	11	~2011
16075097063	32150194127	11	~2011
16075738901	128605911209	12	~2012
16076449919	675210896599	12	~2014
16076612399	32153224799	11	~2011
16076988311	32153976623	11	~2011
16077217703	32154435407	11	~2011
16077438977	128619511817	12	~2012
16078466483	32156932967	11	~2011
16078531783	257256508529	12	~2013
16078540733	96471244399	11	~2012
16079285407	160792854071	12	~2012

Exponent	Prime Factor	Dig.	Year
16081123511	32162247023	11	~2011
16081462591	257303401457	12	~2013
16081608457	96489650743	11	~2012
16081614779	32163229559	11	~2011
16082322017	385975728409	12	~2013
16082347763	32164695527	11	~2011
16082530679	32165061359	11	~2011
16082575871	32165151743	11	~2011
16082761091	32165522183	11	~2011
16082774651	32165549303	11	~2011
16083220493	482496614791	12	~2014
16083303011	32166606023	11	~2011
16083578039	32167156079	11	~2011
16084284053	96505704319	11	~2012
16084679879	32169359759	11	~2011
16085164559	32170329119	11	~2011
16085348963	32170697927	11	~2011
16086255803	32172511607	11	~2011
16086398543	32172797087	11	~2011
16086523247	128692185977	12	~2012
16087028159	32174056319	11	~2011
16087346533	257397544529	12	~2013
16088356463	32176712927	11	~2011
16089184379	32178368759	11	~2011
16089345383	32178690767	11	~2011

Exponent	Prime Factor	Dig.	Year
16090493063	32180986127	11	~2011
16090657559	32181315119	11	~2011
16090878239	32181756479	11	~2011
16090895363	32181790727	11	~2011
16091033663	32182067327	11	~2011
16091109539	32182219079	11	~2011
16092792899	32185585799	11	~2011
16093691641	3680...212953	15	2026
16093983097	96563898583	11	~2012
16094824303	386275783273	12	~2013
16094977609	386279462617	12	~2013
16095514691	32191029383	11	~2011
16095922259	32191844519	11	~2011
16096139771	32192279543	11	~2011
16097000651	32194001303	11	~2011
16097673497	96586040983	11	~2012
16098771929	225382807007	12	~2013
16099695761	96598174567	11	~2012
16100246699	32200493399	11	~2011
16100639747	289811515447	12	~2013
16100909651	32201819303	11	~2011
16101166121	128809328969	12	~2012
16101423509	128811388073	12	~2012
16101890999	32203781999	11	~2011
16103541383	32207082767	11	~2011

Exponent	Prime Factor	Dig.	Year
16104155351	32208310703	11	~2011
16104407219	32208814439	11	~2011
16104979739	32209959479	11	~2011
16105033891	289890610039	12	~2013
16106208617	96637251703	11	~2012
16106767679	32213535359	11	~2011
16106909939	32213819879	11	~2011
16106988119	32213976239	11	~2011
16107187139	128857497113	12	~2012
16108396511	32216793023	11	~2011
16108754303	32217508607	11	~2011
16109700059	128877600473	12	~2012
16109790197	96658741183	11	~2012
16112242261	96673453567	11	~2012
16113599423	32227198847	11	~2011
16113705743	32227411487	11	~2011
16114419787	257830716593	12	~2013
16114654079	32229308159	11	~2011
16115865599	32231731199	11	~2011
16115887831	161158878311	12	~2012
16116176711	32232353423	11	~2011
16117462703	32234925407	11	~2011
16117632857	128941062857	12	~2012
16117972421	96707834527	11	~2012
16117974401	128943795209	12	~2012

5.307.017 digits

26-01-11