Small Mersenne Prime Factors (page 4161/5070)

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
6700336619	13400673239	11	~2008
6700398059	13400796119	11	~2008
6700541051	13401082103	11	~2008
6700628003	13401256007	11	~2008
6700857671	13401715343	11	~2008
6701117051	13402234103	11	~2008
6701915711	13403831423	11	~2008
6702265033	40213590199	11	~2009
6702317543	13404635087	11	~2008
6702364771	388737156719	12	~2011
6702713351	13405426703	11	~2008
6703047553	40218285319	11	~2009
6703139351	13406278703	11	~2008
6703346999	13406693999	11	~2008
6703410359	13406820719	11	~2008
6703837319	13407674639	11	~2008
6704070731	13408141463	11	~2008
6704233691	13408467383	11	~2008
6704322143	13408644287	11	~2008
6704496923	13408993847	11	~2008
6704518643	13409037287	11	~2008
6704546903	13409093807	11	~2008
6704950991	13409901983	11	~2008
6705166417	40230998503	11	~2009
6705295537	40231773223	11	~2009

Exponent	Prime Factor	Dig.	Year
6705415943	13410831887	11	~2008
6705439927	120697918687	12	~2010
6705605339	13411210679	11	~2008
6705709403	13411418807	11	~2008
6705858121	40235148727	11	~2009
6706024823	13412049647	11	~2008
6706237841	40237427047	11	~2009
6706264511	13412529023	11	~2008
6706559039	13413118079	11	~2008
6706576199	13413152399	11	~2008
6706602011	13413204023	11	~2008
6706759571	53654076569	11	~2009
6706920763	67069207631	11	~2009
6707618063	13415236127	11	~2008
6707808683	13415617367	11	~2008
6708008771	13416017543	11	~2008
6708011951	13416023903	11	~2008
6708281159	13416562319	11	~2008
6708372719	13416745439	11	~2008
6708683759	13417367519	11	~2008
6708816083	13417632167	11	~2008
6708825911	13417651823	11	~2008
6709202639	13418405279	11	~2008
6709336097	53674688777	11	~2009
6709515563	13419031127	11	~2008

Exponent	Prime Factor	Dig.	Year
6709536299	13419072599	11	~2008
6709617311	13419234623	11	~2008
6710214443	13420428887	11	~2008
6710247623	13420495247	11	~2008
6710517119	13421034239	11	~2008
6710687579	13421375159	11	~2008
6710974019	13421948039	11	~2008
6711211763	13422423527	11	~2008
6711305651	13422611303	11	~2008
6712085077	107393361233	12	~2010
6712196999	13424393999	11	~2008
6712288853	40273733119	11	~2009
6712348793	40274092759	11	~2009
6712535311	120825635599	12	~2010
6712820531	13425641063	11	~2008
6712999691	13425999383	11	~2008
6713165843	13426331687	11	~2008
6713232023	13426464047	11	~2008
6713291159	13426582319	11	~2008
6713318021	53706544169	11	~2009
6713339123	13426678247	11	~2008
6713363099	13426726199	11	~2008
6713522009	53708176073	11	~2009
6713530081	107416481297	12	~2010
6713556673	107416906769	12	~2010

Exponent	Prime Factor	Dig.	Year
6713834843	13427669687	11	~2008
6714326243	13428652487	11	~2008
6715213591	107443417457	12	~2010
6715332791	13430665583	11	~2008
6715573133	94018023863	11	~2010
6715658819	13431317639	11	~2008
6715982159	13431964319	11	~2008
6718014203	13436028407	11	~2008
6718154519	13436309039	11	~2008
6718402037	53747216297	11	~2009
6718930139	13437860279	11	~2008
6719160127	67191601271	11	~2009
6719210683	67192106831	11	~2009
6719879291	13439758583	11	~2008
6719911823	13439823647	11	~2008
6720005843	13440011687	11	~2008
6720214337	40321286023	11	~2009
6720530639	13441061279	11	~2008
6720550631	13441101263	11	~2008
6720589607	53764716857	11	~2009
6720658319	13441316639	11	~2008
6721021207	161304508969	12	~2010
6721393607	53771148857	11	~2009
6721788739	67217887391	11	~2009
6722328199	67223281991	11	~2009

4.768.925 digits

25-05-04