Small Mersenne Prime Factors (page 4509/5025)

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
25937809979	51875619959	11	~2012
25938580931	51877161863	11	~2012
25939353911	51878707823	11	~2012
25939449143	51878898287	11	~2012
25940339063	51880678127	11	~2012
25940831051	51881662103	11	~2012
25940895499	622581491977	12	~2015
25940961311	51881922623	11	~2012
25941186443	51882372887	11	~2012
25941578963	51883157927	11	~2012
25942956491	51885912983	11	~2012
25945347671	51890695343	11	~2012
25945465811	51890931623	11	~2012
25945667399	51891334799	11	~2012
25946827619	51893655239	11	~2012
25947056753	363258794543	12	~2014
25950115151	51900230303	11	~2012
25951005779	51902011559	11	~2012
25952022623	51904045247	11	~2012
25954614239	51909228479	11	~2012
25955076431	51910152863	11	~2012
25955677763	51911355527	11	~2012
25956045317	155736271903	12	~2014
25956640139	207653121113	12	~2014
25959025907	207672207257	12	~2014

Exponent	Prime Factor	Dig.	Year
25959058577	155754351463	12	~2014
25959393841	155756363047	12	~2014
25959476843	51918953687	11	~2012
25959554849	207676438793	12	~2014
25959638879	623031333097	12	~2015
25959776939	51919553879	11	~2012
25962226091	51924452183	11	~2012
25962284507	207698276057	12	~2014
25962845933	155777075599	12	~2014
25963224493	155779346959	12	~2014
25963291331	207706330649	12	~2014
25964671391	51929342783	11	~2012
25965685307	467382335527	12	~2015
25967155211	207737241689	12	~2014
25968425243	51936850487	11	~2012
25969798061	207758384489	12	~2014
25970670839	51941341679	11	~2012
25971797399	207774379193	12	~2014
25972047037	155832282223	12	~2014
25973769203	51947538407	11	~2012
25978895903	51957791807	11	~2012
25979448941	155876693647	12	~2014
25981438211	51962876423	11	~2012
25981709111	51963418223	11	~2012
25982104223	51964208447	11	~2012

Exponent	Prime Factor	Dig.	Year
25982259599	51964519199	11	~2012
25982949593	155897697559	12	~2014
25983475943	51966951887	11	~2012
25989380699	51978761399	11	~2012
25990192859	51980385719	11	~2012
25993539179	51987078359	11	~2012
25994222339	51988444679	11	~2012
25995599219	51991198439	11	~2012
25998896873	623973524953	12	~2015
25999436051	51998872103	11	~2012
26001662663	52003325327	11	~2012
26002636601	208021092809	12	~2014
26002669859	52005339719	11	~2012
26003023019	52006046039	11	~2012
26003209151	468057764719	12	~2015
26004235871	52008471743	11	~2012
26005282151	208042257209	12	~2014
26008210379	52016420759	11	~2012
26008812239	52017624479	11	~2012
26009559899	52019119799	11	~2012
26010107999	52020215999	11	~2012
26010488039	52020976079	11	~2012
26012117291	52024234583	11	~2012
26012877899	52025755799	11	~2012
26013583919	52027167839	11	~2012

Exponent	Prime Factor	Dig.	Year
26014062251	52028124503	11	~2012
26015989859	52031979719	11	~2012
26016170407	260161704071	12	~2014
26016351239	52032702479	11	~2012
26016352163	52032704327	11	~2012
26016638987	208133111897	12	~2014
26018766437	156112598623	12	~2014
26018849819	52037699639	11	~2012
26019262403	52038524807	11	~2012
26019364919	52038729839	11	~2012
26020230539	52040461079	11	~2012
26021803679	52043607359	11	~2012
26022455639	52044911279	11	~2012
26026496399	52052992799	11	~2012
26027128079	52054256159	11	~2012
26027606051	52055212103	11	~2012
26027982221	156167893327	12	~2014
26030503511	52061007023	11	~2012
26030957531	52061915063	11	~2012
26031367139	52062734279	11	~2012
26033612567	208268900537	12	~2014
26033878991	208271031929	12	~2014
26034123023	52068246047	11	~2012
26035653911	52071307823	11	~2012
26038979243	52077958487	11	~2012

4.724.182 digits

25-04-13