Small Mersenne Prime Factors (page 4606/5070)

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
32920944659	65841889319	11	~2013
32922155537	263377244297	12	~2015
32923520411	65847040823	11	~2013
32923669993	197542019959	12	~2014
32924335511	65848671023	11	~2013
32927245033	197563470199	12	~2014
32928345503	65856691007	11	~2013
32928624539	65857249079	11	~2013
32930821463	65861642927	11	~2013
32931223211	65862446423	11	~2013
32931439379	65862878759	11	~2013
32931488099	65862976199	11	~2013
32936573773	197619442639	12	~2014
32937021097	790488506329	12	~2016
32937201371	65874402743	11	~2013
32937877289	263503018313	12	~2015
32938361969	3208...557807	14	2023
32938902599	65877805199	11	~2013
32939300969	263514407753	12	~2015
32941277783	65882555567	11	~2013
32944579823	65889159647	11	~2013
32947748843	65895497687	11	~2013
32947790041	197686740247	12	~2014
32949308933	197695853599	12	~2014
32949990011	65899980023	11	~2013

Exponent	Prime Factor	Dig.	Year
32952265961	197713595767	12	~2014
32952743039	65905486079	11	~2013
32954822759	790915746217	12	~2016
32955384131	65910768263	11	~2013
32955472003	329554720031	12	~2015
32956164667	329561646671	12	~2015
32957369519	65914739039	11	~2013
32960359511	65920719023	11	~2013
32962027331	65924054663	11	~2013
32962292039	65924584079	11	~2013
32967093371	65934186743	11	~2013
32967689171	65935378343	11	~2013
32968141163	65936282327	11	~2013
32968205279	65936410559	11	~2013
32969203703	65938407407	11	~2013
32973616129	791366787097	12	~2016
32974070551	527585128817	12	~2015
32974712759	65949425519	11	~2013
32977844303	65955688607	11	~2013
32979380303	65958760607	11	~2013
32982279251	65964558503	11	~2013
32982660019	593687880343	12	~2015
32984993423	65969986847	11	~2013
32985326723	65970653447	11	~2013
32988949963	329889499631	12	~2015

Exponent	Prime Factor	Dig.	Year
32989618931	1362...185031	15	2023
32991756131	65983512263	11	~2013
32993347463	65986694927	11	~2013
32995787963	65991575927	11	~2013
32996702941	197980217647	12	~2014
32997179651	65994359303	11	~2013
32999675843	65999351687	11	~2013
32999828903	65999657807	11	~2013
33000168727	330001687271	12	~2015
33000224921	198001349527	12	~2014
33000354311	66000708623	11	~2013
33001034369	264008274953	12	~2015
33003253043	66006506087	11	~2013
33004680629	264037445033	12	~2015
33008617403	66017234807	11	~2013
33009620837	264076966697	12	~2015
33010447703	66020895407	11	~2013
33011092739	66022185479	11	~2013
33011536763	66023073527	11	~2013
33011842463	66023684927	11	~2013
33012025451	66024050903	11	~2013
33013471811	66026943623	11	~2013
33013549259	66027098519	11	~2013
33014135051	66028270103	11	~2013
33014273471	66028546943	11	~2013

Exponent	Prime Factor	Dig.	Year
33015623077	198093738463	12	~2014
33020319743	66040639487	11	~2013
33020990713	198125944279	12	~2014
33021509219	66043018439	11	~2013
33023455121	198140730727	12	~2014
33029677211	66059354423	11	~2013
33030030251	66060060503	11	~2013
33032563799	66065127599	11	~2013
33033550181	198201301087	12	~2014
33036142319	66072284639	11	~2013
33042649331	66085298663	11	~2013
33044640311	66089280623	11	~2013
33046756343	66093512687	11	~2013
33047903519	66095807039	11	~2013
33052572359	66105144719	11	~2013
33054054779	264432438233	12	~2015
33056194337	264449554697	12	~2015
33056439553	198338637319	12	~2014
33056816563	793363597513	12	~2016
33058094579	66116189159	11	~2013
33060335543	66120671087	11	~2013
33061135091	66122270183	11	~2013
33062300471	66124600943	11	~2013
33062969021	198377814127	12	~2014
33064303439	66128606879	11	~2013

4.768.925 digits

25-05-04