Small Mersenne Prime Factors (page 4849/5850)

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
9509877523	228237060553	12	~2012
9510151439	76081211513	11	~2010
9510685841	57064115047	11	~2010
9511198883	19022397767	11	~2009
9511309751	19022619503	11	~2009
9511381729	228273161497	12	~2012
9512079359	19024158719	11	~2009
9513031523	19026063047	11	~2009
9513182633	133184556863	12	~2011
9513228299	19026456599	11	~2009
9513788783	19027577567	11	~2009
9513890741	76111125929	11	~2010
9514475123	19028950247	11	~2009
9514602011	19029204023	11	~2009
9514690583	19029381167	11	~2009
9514891439	19029782879	11	~2009
9515332979	76122663833	11	~2010
9515679011	19031358023	11	~2009
9516102371	19032204743	11	~2009
9516152903	19032305807	11	~2009
9517146851	19034293703	11	~2009
9517152971	19034305943	11	~2009
9517313831	19034627663	11	~2009
9517656539	19035313079	11	~2009
9517713911	19035427823	11	~2009

Exponent	Prime Factor	Dig.	Year
9517981127	76143849017	11	~2010
9518099021	76144792169	11	~2010
9518202719	19036405439	11	~2009
9518378819	19036757639	11	~2009
9518477603	19036955207	11	~2009
9518518259	76148146073	11	~2010
9518696699	19037393399	11	~2009
9518985383	19037970767	11	~2009
9519050813	285571524391	12	~2012
9519218363	19038436727	11	~2009
9519255299	19038510599	11	~2009
9519320903	19038641807	11	~2009
9519599891	19039199783	11	~2009
9519938159	19039876319	11	~2009
9520796891	19041593783	11	~2009
9521380031	19042760063	11	~2009
9521439959	76171519673	11	~2010
9522156443	19044312887	11	~2009
9522283879	323757651887	12	~2012
9522782839	95227828391	11	~2011
9522825359	19045650719	11	~2009
9523624031	19047248063	11	~2009
9523815733	57142894399	11	~2010
9523890791	19047781583	11	~2009
9524037563	19048075127	11	~2009

Exponent	Prime Factor	Dig.	Year
9524218043	19048436087	11	~2009
9524770691	19049541383	11	~2009
9524859109	209546900399	12	~2012
9524978717	133349702039	12	~2011
9525109619	19050219239	11	~2009
9525136139	19050272279	11	~2009
9525183803	19050367607	11	~2009
9525294193	57151765159	11	~2010
9525420791	19050841583	11	~2009
9525515843	19051031687	11	~2009
9525655943	19051311887	11	~2009
9526243283	19052486567	11	~2009
9526338011	19052676023	11	~2009
9526548131	19053096263	11	~2009
9526612661	57159675967	11	~2010
9527046863	19054093727	11	~2009
9527115263	19054230527	11	~2009
9527432951	76219463609	11	~2010
9527579723	19055159447	11	~2009
9527931071	19055862143	11	~2009
9528130637	57168783823	11	~2010
9528483311	19056966623	11	~2009
9528599939	19057199879	11	~2009
9528963329	76231706633	11	~2010
9529991363	19059982727	11	~2009

Exponent	Prime Factor	Dig.	Year
9530420579	19060841159	11	~2009
9530989483	686231242777	12	~2013
9531394027	171565092487	12	~2011
9531535199	19063070399	11	~2009
9531864851	19063729703	11	~2009
9532414103	19064828207	11	~2009
9532480043	19064960087	11	~2009
9532654199	19065308399	11	~2009
9532969499	19065938999	11	~2009
9533351231	19066702463	11	~2009
9533459003	19066918007	11	~2009
9533590019	19067180039	11	~2009
9533867279	19067734559	11	~2009
9533971283	19067942567	11	~2009
9534182993	133478561903	12	~2011
9534705359	19069410719	11	~2009
9534837503	19069675007	11	~2009
9534940379	19069880759	11	~2009
9535016537	57210099223	11	~2010
9535667341	57214004047	11	~2010
9536164199	19072328399	11	~2009
9536598611	19073197223	11	~2009
9536650631	19073301263	11	~2009
9536737439	19073474879	11	~2009
9536836619	19073673239	11	~2009

5.546.121 digits

26-05-03