Small Mersenne Prime Factors (page 5131/5745)

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
29139252599	58278505199	11	~2013
29139284099	58278568199	11	~2013
29139298703	58278597407	11	~2013
29140095923	58280191847	11	~2013
29140276703	58280553407	11	~2013
29141619443	58283238887	11	~2013
29142893159	58285786319	11	~2013
29143346723	58286693447	11	~2013
29145054443	58290108887	11	~2013
29145273121	174871638727	12	~2014
29145365321	174872191927	12	~2014
29145467843	58290935687	11	~2013
29145474779	233163798233	12	~2014
29145548111	58291096223	11	~2013
29146367903	58292735807	11	~2013
29147381723	58294763447	11	~2013
29147805983	58295611967	11	~2013
29149381091	58298762183	11	~2013
29149855019	58299710039	11	~2013
29151067331	58302134663	11	~2013
29152300811	58304601623	11	~2013
29153366279	58306732559	11	~2013
29153829899	58307659799	11	~2013
29154754931	233238039449	12	~2014
29157234971	58314469943	11	~2013

Exponent	Prime Factor	Dig.	Year
29158164097	174948984583	12	~2014
29159010659	58318021319	11	~2013
29159611583	58319223167	11	~2013
29159697419	58319394839	11	~2013
29160468059	58320936119	11	~2013
29161110193	174966661159	12	~2014
29162787061	174976722367	12	~2014
29163648119	58327296239	11	~2013
29166731381	175000388287	12	~2014
29167487773	175004926639	12	~2014
29169200519	58338401039	11	~2013
29170352639	58340705279	11	~2013
29171184599	58342369199	11	~2013
29171218931	58342437863	11	~2013
29172761339	58345522679	11	~2013
29173035263	58346070527	11	~2013
29173249927	291732499271	12	~2014
29174396857	466790349713	12	~2015
29175146543	58350293087	11	~2013
29175798719	58351597439	11	~2013
29178101063	58356202127	11	~2013
29179277111	58358554223	11	~2013
29180282819	58360565639	11	~2013
29181296351	525263334319	12	~2015
29182245791	58364491583	11	~2013

Exponent	Prime Factor	Dig.	Year
29183009483	58366018967	11	~2013
29183430911	58366861823	11	~2013
29184436901	175106621407	12	~2014
29185989323	58371978647	11	~2013
29186458919	58372917839	11	~2013
29186528639	58373057279	11	~2013
29187196463	58374392927	11	~2013
29187976283	58375952567	11	~2013
29189072923	291890729231	12	~2014
29189521399	291895213991	12	~2014
29190872723	58381745447	11	~2013
29194448819	58388897639	11	~2013
29195513279	58391026559	11	~2013
29198532059	58397064119	11	~2013
29200625281	175203751687	12	~2014
29203878659	58407757319	11	~2013
29204604083	58409208167	11	~2013
29204774173	642505031807	12	~2015
29205209003	58410418007	11	~2013
29206608047	233652864377	12	~2014
29207826671	58415653343	11	~2013
29208904859	58417809719	11	~2013
29209937723	58419875447	11	~2013
29210552303	58421104607	11	~2013
29211331451	3996...424969	14	2023

Exponent	Prime Factor	Dig.	Year
29211737783	58423475567	11	~2013
29213587393	175281524359	12	~2014
29215367143	292153671431	12	~2014
29216964851	58433929703	11	~2013
29218604099	58437208199	11	~2013
29219489339	58438978679	11	~2013
29223812669	233790501353	12	~2014
29224724183	58449448367	11	~2013
29226380159	58452760319	11	~2013
29229911519	58459823039	11	~2013
29230934977	175385609863	12	~2014
29231557213	175389343279	12	~2014
29232532739	233860261913	12	~2014
29232788159	58465576319	11	~2013
29233064519	58466129039	11	~2013
29234588039	58469176079	11	~2013
29235035411	58470070823	11	~2013
29238097943	58476195887	11	~2013
29240003711	58480007423	11	~2013
29240261639	58480523279	11	~2013
29241359183	58482718367	11	~2013
29242774271	58485548543	11	~2013
29243187119	58486374239	11	~2013
29244257831	58488515663	11	~2013
29245236959	58490473919	11	~2013

5.441.361 digits

26-03-15