Small Mersenne Prime Factors (page 4356/5070)

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
12942411299	25884822599	11	~2010
12942846071	25885692143	11	~2010
12944084653	77664507919	11	~2011
12944776583	25889553167	11	~2010
12944803451	25889606903	11	~2010
12945151463	25890302927	11	~2010
12945427037	77672562223	11	~2011
12945500591	25891001183	11	~2010
12945944663	25891889327	11	~2010
12946746503	25893493007	11	~2010
12947085491	233047538839	12	~2012
12948848321	103590786569	12	~2011
12949250843	25898501687	11	~2010
12951271643	25902543287	11	~2010
12951833473	1212...130729	14	2023
12953397323	25906794647	11	~2010
12953663141	77721978847	11	~2011
12953899121	103631192969	12	~2011
12955790051	25911580103	11	~2010
12955920899	25911841799	11	~2010
12956106491	25912212983	11	~2010
12956593781	77739562687	11	~2011
12956607551	25913215103	11	~2010
12957836653	207325386449	12	~2012
12958798087	129587980871	12	~2012

Exponent	Prime Factor	Dig.	Year
12959188883	25918377767	11	~2010
12959240159	25918480319	11	~2010
12959542207	129595422071	12	~2012
12959542723	129595427231	12	~2012
12960692039	25921384079	11	~2010
12960997403	25921994807	11	~2010
12961456691	25922913383	11	~2010
12962485469	311099651257	12	~2013
12962542661	77775255967	11	~2011
12962866799	25925733599	11	~2010
12963679513	207418872209	12	~2012
12964215119	25928430239	11	~2010
12964944119	25929888239	11	~2010
12965023139	25930046279	11	~2010
12965367287	311168814889	12	~2013
12966184073	77797104439	11	~2011
12966470999	25932941999	11	~2010
12966471383	25932942767	11	~2010
12966663959	25933327919	11	~2010
12967406663	337152573239	12	~2013
12967416431	25934832863	11	~2010
12967657799	25935315599	11	~2010
12967889171	25935778343	11	~2010
12968015843	25936031687	11	~2010
12968168581	77809011487	11	~2011

Exponent	Prime Factor	Dig.	Year
12968471891	25936943783	11	~2010
12968478553	77810871319	11	~2011
12969192683	25938385367	11	~2010
12969279677	77815678063	11	~2011
12969378431	25938756863	11	~2010
12969629263	129696292631	12	~2012
12969667043	25939334087	11	~2010
12970287899	25940575799	11	~2010
12971072039	25942144079	11	~2010
12971281391	25942562783	11	~2010
12972402623	25944805247	11	~2010
12972464639	25944929279	11	~2010
12972920221	77837521327	11	~2011
12973025759	25946051519	11	~2010
12973192931	25946385863	11	~2010
12973523833	77841142999	11	~2011
12975101759	25950203519	11	~2010
12975591451	129755914511	12	~2012
12976441151	25952882303	11	~2010
12977125211	25954250423	11	~2010
12977146019	622903008913	12	~2013
12977309531	25954619063	11	~2010
12977426977	207638831633	12	~2012
12977843111	25955686223	11	~2010
12979370279	25958740559	11	~2010

Exponent	Prime Factor	Dig.	Year
12979628999	25959257999	11	~2010
12980106803	25960213607	11	~2010
12980595983	25961191967	11	~2010
12980691041	77884146247	11	~2011
12981341531	25962683063	11	~2010
12982722983	25965445967	11	~2010
12984347891	25968695783	11	~2010
12985008131	25970016263	11	~2010
12985154411	25970308823	11	~2010
12986788751	25973577503	11	~2010
12987115331	25974230663	11	~2010
12988359551	25976719103	11	~2010
12988440851	25976881703	11	~2010
12988747883	25977495767	11	~2010
12989593451	25979186903	11	~2010
12989787823	441652785983	12	~2013
12990674531	25981349063	11	~2010
12990810713	77944864279	11	~2011
12991245719	25982491439	11	~2010
12991313603	25982627207	11	~2010
12991946087	103935568697	12	~2011
12991989601	77951937607	11	~2011
12992263993	77953583959	11	~2011
12992833391	25985666783	11	~2010
12992943503	25985887007	11	~2010

4.768.925 digits

25-05-04