Small Mersenne Prime Factors (page 4343/5130)

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
10564470061	232418341343	12	~2012
10564575397	63387452383	11	~2010
10565019659	21130039319	11	~2009
10565266013	147913724183	12	~2011
10566091439	84528731513	11	~2011
10566210359	21132420719	11	~2009
10566904223	21133808447	11	~2009
10567007939	21134015879	11	~2009
10567028891	21134057783	11	~2009
10567490603	21134981207	11	~2009
10567863083	21135726167	11	~2009
10567947083	21135894167	11	~2009
10568012291	21136024583	11	~2009
10568071177	63408427063	11	~2010
10568212097	63409272583	11	~2010
10568499731	21136999463	11	~2009
10568788091	21137576183	11	~2009
10568959991	21137919983	11	~2009
10569174191	21138348383	11	~2009
10569371339	21138742679	11	~2009
10569906299	21139812599	11	~2009
10570128397	63420770383	11	~2010
10570332023	21140664047	11	~2009
10570581863	21141163727	11	~2009
10570593431	21141186863	11	~2009

Exponent	Prime Factor	Dig.	Year
10571098991	21142197983	11	~2009
10571925839	21143851679	11	~2009
10571980571	21143961143	11	~2009
10572593159	21145186319	11	~2009
10572652991	21145305983	11	~2009
10572764381	63436586287	11	~2010
10574239471	169187831537	12	~2012
10574523731	21149047463	11	~2009
10574657657	63447945943	11	~2010
10574821643	21149643287	11	~2009
10574840579	21149681159	11	~2009
10574871371	21149742743	11	~2009
10575311471	21150622943	11	~2009
10575909173	317277275191	12	~2012
10576586843	21153173687	11	~2009
10576953011	21153906023	11	~2009
10577649161	84621193289	11	~2011
10578025043	21156050087	11	~2009
10578688979	21157377959	11	~2009
10579046981	63474281887	11	~2010
10579229411	21158458823	11	~2009
10579280879	21158561759	11	~2009
10579535243	21159070487	11	~2009
10579540511	21159081023	11	~2009
10579642537	63477855223	11	~2010

Exponent	Prime Factor	Dig.	Year
10580186843	21160373687	11	~2009
10580230159	444369666679	12	~2013
10580327011	190445886199	12	~2012
10580467559	21160935119	11	~2009
10580599343	21161198687	11	~2009
10581374653	63488247919	11	~2010
10581460199	21162920399	11	~2009
10581620317	63489721903	11	~2010
10581853433	63491120599	11	~2010
10582792819	105827928191	12	~2011
10583758319	21167516639	11	~2009
10584240431	21168480863	11	~2009
10584479039	21168958079	11	~2009
10585012859	21170025719	11	~2009
10585458599	84683668793	11	~2011
10585558037	84684464297	11	~2011
10585644203	21171288407	11	~2009
10585854299	21171708599	11	~2009
10586054027	275237404703	12	~2012
10586389763	21172779527	11	~2009
10586491871	21172983743	11	~2009
10586531531	21173063063	11	~2009
10586690843	21173381687	11	~2009
10586828731	105868287311	12	~2011
10587117181	63522703087	11	~2010

Exponent	Prime Factor	Dig.	Year
10587175979	21174351959	11	~2009
10587488893	169399822289	12	~2012
10587655223	21175310447	11	~2009
10588018799	21176037599	11	~2009
10588282871	21176565743	11	~2009
10588305493	63529832959	11	~2010
10588417121	63530502727	11	~2010
10588517293	63531103759	11	~2010
10588522163	21177044327	11	~2009
10590538319	21181076639	11	~2009
10591147331	21182294663	11	~2009
10591799497	63550796983	11	~2010
10592289137	63553734823	11	~2010
10593488219	21186976439	11	~2009
10595144969	84761159753	11	~2011
10595439683	275481431759	12	~2012
10595577983	21191155967	11	~2009
10596044939	21192089879	11	~2009
10596284519	21192569039	11	~2009
10596761167	105967611671	12	~2011
10597151003	21194302007	11	~2009
10598710091	21197420183	11	~2009
10599089843	21198179687	11	~2009
10599753491	21199506983	11	~2009
10599979223	21199958447	11	~2009

4.828.532 digits

25-06-01