Small Mersenne Prime Factors (page 4452/5025)

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
20868898931	41737797863	11	~2012
20868972437	125213834623	12	~2013
20870377739	41740755479	11	~2012
20870475623	41740951247	11	~2012
20870603723	41741207447	11	~2012
20870921761	125225530567	12	~2013
20871461783	1669...426401	14	2023
20872331917	125233991503	12	~2013
20872932959	41745865919	11	~2012
20874016283	41748032567	11	~2012
20874647243	41749294487	11	~2012
20875561433	125253368599	12	~2013
20876599691	167012797529	12	~2013
20877833843	41755667687	11	~2012
20877873143	41755746287	11	~2012
20880440237	125282641423	12	~2013
20883174359	41766348719	11	~2012
20883862817	125303176903	12	~2013
20884740647	167077925177	12	~2013
20887081801	334193308817	12	~2014
20887201213	125323207279	12	~2013
20887639511	41775279023	11	~2012
20888150617	125328903703	12	~2013
20889237851	41778475703	11	~2012
20891132611	208911326111	12	~2013

Exponent	Prime Factor	Dig.	Year
20891885243	41783770487	11	~2012
20891914517	125351487103	12	~2013
20892462743	41784925487	11	~2012
20892510413	125355062479	12	~2013
20892876731	41785753463	11	~2012
20893922873	125363537239	12	~2013
20894391191	41788782383	11	~2012
20895220441	125371322647	12	~2013
20896558979	41793117959	11	~2012
20897741951	41795483903	11	~2012
20898022319	41796044639	11	~2012
20898023903	41796047807	11	~2012
20898845941	334381535057	12	~2014
20900923559	41801847119	11	~2012
20901636191	41803272383	11	~2012
20902396321	334438341137	12	~2014
20902830419	41805660839	11	~2012
20904205919	41808411839	11	~2012
20904486503	41808973007	11	~2012
20904958799	167239670393	12	~2013
20905878551	41811757103	11	~2012
20906885339	167255082713	12	~2013
20907597211	334521555377	12	~2014
20908686131	41817372263	11	~2012
20908927313	501814255513	12	~2014

Exponent	Prime Factor	Dig.	Year
20909738281	125458429687	12	~2013
20910028631	41820057263	11	~2012
20910397091	167283176729	12	~2013
20912438159	41824876319	11	~2012
20913230813	292785231383	12	~2014
20914240517	167313924137	12	~2013
20915908997	292822725959	12	~2014
20917532711	41835065423	11	~2012
20917555537	125505333223	12	~2013
20917777451	41835554903	11	~2012
20918570171	41837140343	11	~2012
20919310019	41838620039	11	~2012
20919439319	41838878639	11	~2012
20919469619	41838939239	11	~2012
20920493999	41840987999	11	~2012
20921245463	41842490927	11	~2012
20921931683	41843863367	11	~2012
20923296731	41846593463	11	~2012
20923479197	167387833577	12	~2013
20923799417	125542796503	12	~2013
20924293163	41848586327	11	~2012
20924465651	41848931303	11	~2012
20924771293	334796340689	12	~2014
20925064631	41850129263	11	~2012
20925366191	41850732383	11	~2012

Exponent	Prime Factor	Dig.	Year
20925410963	41850821927	11	~2012
20925786179	41851572359	11	~2012
20926592759	41853185519	11	~2012
20926894211	41853788423	11	~2012
20927709851	41855419703	11	~2012
20927765123	41855530247	11	~2012
20928762863	41857525727	11	~2012
20928820163	502291683913	12	~2014
20928913297	125573479783	12	~2013
20929451099	41858902199	11	~2012
20929597679	41859195359	11	~2012
20930926883	41861853767	11	~2012
20934158233	334946531729	12	~2014
20934613211	41869226423	11	~2012
20935339319	41870678639	11	~2012
20936709119	41873418239	11	~2012
20937131639	41874263279	11	~2012
20937737003	41875474007	11	~2012
20939211203	41878422407	11	~2012
20939282333	125635693999	12	~2013
20939441279	41878882559	11	~2012
20940051749	293160724487	12	~2014
20941135331	41882270663	11	~2012
20943532271	41887064543	11	~2012
20945689559	41891379119	11	~2012

4.724.182 digits

25-04-13