Small Mersenne Prime Factors (page 4537/5025)

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
28937346491	57874692983	11	~2013
28938645023	57877290047	11	~2013
28938721379	57877442759	11	~2013
28938888691	289388886911	12	~2014
28939168463	57878336927	11	~2013
28942501739	57885003479	11	~2013
28943130431	57886260863	11	~2013
28943308403	57886616807	11	~2013
28945397291	57890794583	11	~2013
28945427891	57890855783	11	~2013
28946133899	57892267799	11	~2013
28949758679	57899517359	11	~2013
28951586047	289515860471	12	~2014
28951932929	231615463433	12	~2014
28952511491	57905022983	11	~2013
28952537717	173715226303	12	~2014
28953512519	57907025039	11	~2013
28953808979	57907617959	11	~2013
28955183531	57910367063	11	~2013
28955613371	57911226743	11	~2013
28957777243	289577772431	12	~2014
28958316923	57916633847	11	~2013
28960413479	57920826959	11	~2013
28960485611	57920971223	11	~2013
28963680721	173782084327	12	~2014

Exponent	Prime Factor	Dig.	Year
28967884499	57935768999	11	~2013
28968176771	57936353543	11	~2013
28970479211	57940958423	11	~2013
28972052177	173832313063	12	~2014
28974389819	57948779639	11	~2013
28976415659	57952831319	11	~2013
28977339929	405682759007	12	~2015
28977385817	173864314903	12	~2014
28977781823	57955563647	11	~2013
28979457443	57958914887	11	~2013
28979642761	173877856567	12	~2014
28980640679	57961281359	11	~2013
28981672871	57963345743	11	~2013
28982236931	57964473863	11	~2013
28982899873	637623797207	12	~2015
28982917787	231863342297	12	~2014
28986888677	231895109417	12	~2014
28988536079	57977072159	11	~2013
28988790263	57977580527	11	~2013
28990993211	57981986423	11	~2013
28991377369	637810302119	12	~2015
28991965031	57983930063	11	~2013
28992471023	57984942047	11	~2013
28992611693	173955670159	12	~2014
28992981779	57985963559	11	~2013

Exponent	Prime Factor	Dig.	Year
28994013011	57988026023	11	~2013
28995824771	57991649543	11	~2013
28995866591	57991733183	11	~2013
28995909263	57991818527	11	~2013
28996187939	57992375879	11	~2013
28996565099	57993130199	11	~2013
28997691007	289976910071	12	~2014
28999203697	173995222183	12	~2014
29001682357	174010094143	12	~2014
29002294259	58004588519	11	~2013
29003277313	174019663879	12	~2014
29004967777	174029806663	12	~2014
29005512551	58011025103	11	~2013
29006141771	58012283543	11	~2013
29007364499	58014728999	11	~2013
29009139191	232073113529	12	~2014
29010052091	58020104183	11	~2013
29011184099	58022368199	11	~2013
29011335403	290113354031	12	~2014
29011895483	58023790967	11	~2013
29012558279	232100466233	12	~2014
29013845363	58027690727	11	~2013
29016761017	174100566103	12	~2014
29018167319	58036334639	11	~2013
29019958811	58039917623	11	~2013

Exponent	Prime Factor	Dig.	Year
29020290371	58040580743	11	~2013
29023011421	174138068527	12	~2014
29025173399	58050346799	11	~2013
29025888863	58051777727	11	~2013
29026100219	232208801753	12	~2014
29026396169	232211169353	12	~2014
29026463737	696635129689	12	~2015
29026644151	290266441511	12	~2014
29027874899	58055749799	11	~2013
29028819299	58057638599	11	~2013
29029923641	174179541847	12	~2014
29031484571	58062969143	11	~2013
29032274003	58064548007	11	~2013
29032316039	58064632079	11	~2013
29032565279	58065130559	11	~2013
29032868783	58065737567	11	~2013
29035726931	58071453863	11	~2013
29036760323	58073520647	11	~2013
29037232019	58074464039	11	~2013
29038137071	58076274143	11	~2013
29038916831	58077833663	11	~2013
29039287379	58078574759	11	~2013
29041561207	464664979313	12	~2015
29043774719	58087549439	11	~2013
29045252843	58090505687	11	~2013

4.724.182 digits

25-04-13