Small Mersenne Prime Factors (page 3781/5070)

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	Digits	Year
2147029799	4294059599	10	~2004
2147063953	12882383719	11	~2005
2147081647	103059919057	12	~2007
2147146559	4294293119	10	~2004
2147214383	4294428767	10	~2004
2147261339	4294522679	10	~2004
2147280731	4294561463	10	~2004
2147336969	17178695753	11	~2005
2147383739	4294767479	10	~2004
2147457413	12884744479	11	~2005
2147474159	4294948319	10	~2004
2147645317	12885871903	11	~2005
2147680259	4295360519	10	~2004
2147711003	4295422007	10	~2004
2147844157	12887064943	11	~2005
2148111419	4296222839	10	~2004
2148183431	4296366863	10	~2004
2148190679	4296381359	10	~2004
2148196091	4296392183	10	~2004
2148241943	4296483887	10	~2004
2148667403	4297334807	10	~2004
2148705059	4297410119	10	~2004
2148782771	4297565543	10	~2004
2148819851	17190558809	11	~2005
2148965171	17191721369	11	~2005

Exponent	Prime Factor	Digits	Year
2149001219	4298002439	10	~2004
2149055141	17192441129	11	~2005
2149080071	4298160143	10	~2004
2149154411	4298308823	10	~2004
2149165703	4298331407	10	~2004
2149174627	34386794033	11	~2006
2149179551	17193436409	11	~2005
2149184099	4298368199	10	~2004
2149189859	4298379719	10	~2004
2149362731	4298725463	10	~2004
2149432751	4298865503	10	~2004
2149468147	21494681471	11	~2006
2149541171	4299082343	10	~2004
2149687643	4299375287	10	~2004
2149725323	4299450647	10	~2004
2149830097	12898980583	11	~2005
2149847951	4299695903	10	~2004
2149852163	4299704327	10	~2004
2149918223	4299836447	10	~2004
2150032091	4300064183	10	~2004
2150181283	21501812831	11	~2006
2150238841	12901433047	11	~2005
2150372209	51608933017	11	~2007
2150406803	4300813607	10	~2004
2150474783	4300949567	10	~2004

Exponent	Prime Factor	Digits	Year
2150531171	4301062343	10	~2004
2150543831	4301087663	10	~2004
2150545739	4301091479	10	~2004
2150560883	4301121767	10	~2004
2150575523	4301151047	10	~2004
2150644493	30109022903	11	~2006
2150731181	17205849449	11	~2005
2150820779	4301641559	10	~2004
2150845811	4301691623	10	~2004
2150866463	4301732927	10	~2004
2150999003	4301998007	10	~2004
2151070391	17208563129	11	~2005
2151115303	34417844849	11	~2006
2151141983	4302283967	10	~2004
2151189179	4302378359	10	~2004
2151242651	4302485303	10	~2004
2151253327	21512533271	11	~2006
2151284483	4302568967	10	~2004
2151326063	4302652127	10	~2004
2151399893	185020390799	12	~2008
2151405911	4302811823	10	~2004
2151548603	4303097207	10	~2004
2151724871	4303449743	10	~2004
2151779891	4303559783	10	~2004
2151793829	17214350633	11	~2005

Exponent	Prime Factor	Digits	Year
2151955139	4303910279	10	~2004
2151982991	4303965983	10	~2004
2152045361	12912272167	11	~2005
2152053539	4304107079	10	~2004
2152106303	4304212607	10	~2004
2152153691	4304307383	10	~2004
2152245863	4304491727	10	~2004
2152287083	4304574167	10	~2004
2152292147	55959595823	11	~2007
2152401659	4304803319	10	~2004
2152435963	21524359631	11	~2006
2152531039	38745558703	11	~2006
2152607183	4305214367	10	~2004
2152633753	12915802519	11	~2005
2152649483	4305298967	10	~2004
2152653479	4305306959	10	~2004
2152662623	4305325247	10	~2004
2152702943	4305405887	10	~2004
2152801733	12916810399	11	~2005
2152808759	17222470073	11	~2005
2152809731	4305619463	10	~2004
2152898999	4305797999	10	~2004
2152925111	4305850223	10	~2004
2152980059	4305960119	10	~2004
2153155457	17225243657	11	~2005

4.768.925 digits

25-05-04