Small Mersenne Prime Factors (page 5113/5790)

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
24355468243	243554682431	12	~2014
24356445317	194851562537	12	~2014
24357607019	48715214039	11	~2012
24358094879	48716189759	11	~2012
24359193871	389747101937	12	~2014
24359678891	48719357783	11	~2012
24360862651	389773802417	12	~2014
24361708337	194893666697	12	~2014
24361716383	48723432767	11	~2012
24363167779	828347704487	12	~2015
24363517523	48727035047	11	~2012
24364720619	194917764953	12	~2014
24365273351	48730546703	11	~2012
24369939311	48739878623	11	~2012
24369994577	194959956617	12	~2014
24371219123	48742438247	11	~2012
24371364623	48742729247	11	~2012
24371657363	48743314727	11	~2012
24372210253	146233261519	12	~2013
24372446893	389959150289	12	~2014
24373173719	48746347439	11	~2012
24373237991	48746475983	11	~2012
24373307411	48746614823	11	~2012
24373430423	48746860847	11	~2012
24374788871	48749577743	11	~2012

Exponent	Prime Factor	Dig.	Year
24375350651	48750701303	11	~2012
24375703441	146254220647	12	~2013
24376224689	195009797513	12	~2014
24376721003	48753442007	11	~2012
24377571983	48755143967	11	~2012
24380737597	585137702329	12	~2015
24380921473	146285528839	12	~2013
24381874567	243818745671	12	~2014
24382136567	195057092537	12	~2014
24382206899	48764413799	11	~2012
24383283791	48766567583	11	~2012
24383633243	48767266487	11	~2012
24383975771	48767951543	11	~2012
24384915059	48769830119	11	~2012
24385771199	48771542399	11	~2012
24387166019	48774332039	11	~2012
24388313783	48776627567	11	~2012
24388991089	536557803959	12	~2015
24389306891	48778613783	11	~2012
24390137327	195121098617	12	~2014
24390655979	48781311959	11	~2012
24391762331	48783524663	11	~2012
24393227723	48786455447	11	~2012
24394660583	48789321167	11	~2012
24394817617	146368905703	12	~2013

Exponent	Prime Factor	Dig.	Year
24396249719	48792499439	11	~2012
24396801263	48793602527	11	~2012
24396988043	48793976087	11	~2012
24397753091	48795506183	11	~2012
24397810523	48795621047	11	~2012
24398144399	48796288799	11	~2012
24398666921	146392001527	12	~2013
24398859071	48797718143	11	~2012
24401755151	48803510303	11	~2012
24402926123	48805852247	11	~2012
24403319651	48806639303	11	~2012
24405771959	48811543919	11	~2012
24407101919	48814203839	11	~2012
24407350081	146444100487	12	~2013
24409493411	48818986823	11	~2012
24410468783	48820937567	11	~2012
24411376459	244113764591	12	~2014
24412503587	439425064567	12	~2015
24413966771	48827933543	11	~2012
24414208241	195313665929	12	~2014
24414257363	48828514727	11	~2012
24417487751	48834975503	11	~2012
24418902953	781404894497	12	~2015
24420064633	146520387799	12	~2013
24420759371	48841518743	11	~2012

Exponent	Prime Factor	Dig.	Year
24420844583	48841689167	11	~2012
24421050359	48842100719	11	~2012
24421612823	48843225647	11	~2012
24421648763	48843297527	11	~2012
24423217691	48846435383	11	~2012
24423455597	146540733583	12	~2013
24427087103	48854174207	11	~2012
24427548839	48855097679	11	~2012
24428262311	48856524623	11	~2012
24429595871	48859191743	11	~2012
24430761671	48861523343	11	~2012
24431017763	48862035527	11	~2012
24432361391	48864722783	11	~2012
24433222031	48866444063	11	~2012
24434924231	48869848463	11	~2012
24435467183	48870934367	11	~2012
24435467663	48870935327	11	~2012
24435825443	48871650887	11	~2012
24436558691	48873117383	11	~2012
24436767911	195494143289	12	~2014
24438491743	244384917431	12	~2014
24438622919	195508983353	12	~2014
24438677143	830915022863	12	~2015
24439453583	48878907167	11	~2012
24440317619	586567622857	12	~2015

5.486.313 digits

26-04-05