Small Mersenne Prime Factors (page 4997/5610)

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
26962685531	53925371063	11	~2012
26963171549	808895146471	12	~2015
26966089861	161796539167	12	~2014
26967151109	215737208873	12	~2014
26967333923	53934667847	11	~2012
26967338303	647216119273	12	~2015
26968199431	269681994311	12	~2014
26969616983	53939233967	11	~2012
26969869403	53939738807	11	~2012
26970084059	53940168119	11	~2012
26971666861	161830001167	12	~2014
26971734781	161830408687	12	~2014
26975157239	53950314479	11	~2012
26976034543	269760345431	12	~2014
26976327871	269763278711	12	~2014
26977549283	53955098567	11	~2012
26978347477	161870084863	12	~2014
26979790703	53959581407	11	~2012
26979860339	53959720679	11	~2012
26980348319	53960696639	11	~2012
26981067671	53962135343	11	~2012
26981132351	53962264703	11	~2012
26981224453	3036...994063	15	2025
26984605643	53969211287	11	~2012
26984946491	53969892983	11	~2012

Exponent	Prime Factor	Dig.	Year
26987076757	161922460543	12	~2014
26987255759	53974511519	11	~2012
26987431511	53974863023	11	~2012
26987802851	53975605703	11	~2012
26987956559	53975913119	11	~2012
26989606327	269896063271	12	~2014
26990427683	53980855367	11	~2012
26991039487	431856631793	12	~2015
26991442319	53982884639	11	~2012
26993379431	53986758863	11	~2012
26995860011	53991720023	11	~2013
26997499271	53994998543	11	~2013
26997579431	53995158863	11	~2013
26999431619	53998863239	11	~2013
27002768951	54005537903	11	~2013
27002788259	54005576519	11	~2013
27003011153	162018066919	12	~2014
27004421159	54008842319	11	~2013
27007038203	54014076407	11	~2013
27007193723	54014387447	11	~2013
27008366291	216066930329	12	~2014
27009213377	648221121049	12	~2015
27010727951	54021455903	11	~2013
27011175151	432178802417	12	~2015
27011764991	54023529983	11	~2013

Exponent	Prime Factor	Dig.	Year
27011860391	54023720783	11	~2013
27011950817	216095606537	12	~2014
27013673003	54027346007	11	~2013
27015143219	54030286439	11	~2013
27015680501	162094083007	12	~2014
27016325579	54032651159	11	~2013
27017329739	54034659479	11	~2013
27018999263	54037998527	11	~2013
27019405157	378271672199	12	~2015
27020124203	54040248407	11	~2013
27020651159	54041302319	11	~2013
27021589631	54043179263	11	~2013
27021996377	216175971017	12	~2014
27022295189	216178361513	12	~2014
27023118971	54046237943	11	~2013
27023800799	54047601599	11	~2013
27024582503	54049165007	11	~2013
27024827513	162148965079	12	~2014
27025605863	54051211727	11	~2013
27026574803	54053149607	11	~2013
27027189493	162163136959	12	~2014
27028172939	54056345879	11	~2013
27029034899	54058069799	11	~2013
27029311163	54058622327	11	~2013
27029516999	54059033999	11	~2013

Exponent	Prime Factor	Dig.	Year
27029950393	162179702359	12	~2014
27030896777	216247174217	12	~2014
27031402379	54062804759	11	~2013
27036217387	432579478193	12	~2015
27037381433	162224288599	12	~2014
27037565759	54075131519	11	~2013
27038587223	54077174447	11	~2013
27039148511	54078297023	11	~2013
27040306439	54080612879	11	~2013
27040412621	162242475727	12	~2014
27041967191	216335737529	12	~2014
27042726383	54085452767	11	~2013
27043632481	162261794887	12	~2014
27043683377	162262100263	12	~2014
27043696499	54087392999	11	~2013
27043929487	432702871793	12	~2015
27044157083	54088314167	11	~2013
27044685719	54089371439	11	~2013
27045891731	54091783463	11	~2013
27046031819	54092063639	11	~2013
27046229519	54092459039	11	~2013
27046520051	54093040103	11	~2013
27048121151	54096242303	11	~2013
27048227039	54096454079	11	~2013
27048550093	162291300559	12	~2014

5.307.017 digits

26-01-11