Small Mersenne Prime Factors (page 4229/5070)

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
8416250891	16832501783	11	~2009
8416913149	252507394471	12	~2011
8417057401	50502344407	11	~2010
8417240003	16834480007	11	~2009
8417260391	16834520783	11	~2009
8417488337	50504930023	11	~2010
8417626123	84176261231	11	~2010
8417702159	16835404319	11	~2009
8417775791	16835551583	11	~2009
8418230291	16836460583	11	~2009
8418477187	84184771871	11	~2010
8418509999	16837019999	11	~2009
8418799651	84187996511	11	~2010
8419284479	16838568959	11	~2009
8419610159	16839220319	11	~2009
8419648823	16839297647	11	~2009
8419823519	16839647039	11	~2009
8420486741	67363893929	11	~2010
8421031691	16842063383	11	~2009
8421716789	67373734313	11	~2010
8421952859	16843905719	11	~2009
8422450259	16844900519	11	~2009
8422515779	16845031559	11	~2009
8422554029	67380432233	11	~2010
8422609691	16845219383	11	~2009

Exponent	Prime Factor	Dig.	Year
8422767323	16845534647	11	~2009
8422953779	67383630233	11	~2010
8423262563	16846525127	11	~2009
8423285099	16846570199	11	~2009
8423348519	16846697039	11	~2009
8423425561	50540553367	11	~2010
8423839223	16847678447	11	~2009
8424533021	50547198127	11	~2010
8424804613	185345701487	12	~2011
8425274771	16850549543	11	~2009
8425349441	252760483231	12	~2011
8425376339	16850752679	11	~2009
8425547831	16851095663	11	~2009
8425815173	50554891039	11	~2010
8425816043	16851632087	11	~2009
8426012123	16852024247	11	~2009
8426310671	16852621343	11	~2009
8426550997	50559305983	11	~2010
8427268163	16854536327	11	~2009
8427275303	16854550607	11	~2009
8427458471	16854916943	11	~2009
8427688499	16855376999	11	~2009
8427911369	269693163809	12	~2011
8428055879	16856111759	11	~2009
8428565543	16857131087	11	~2009

Exponent	Prime Factor	Dig.	Year
8428729499	16857458999	11	~2009
8428865843	16857731687	11	~2009
8428914743	16857829487	11	~2009
8428970813	50573824879	11	~2010
8429158403	16858316807	11	~2009
8429372131	134869954097	12	~2011
8429667671	16859335343	11	~2009
8429886659	16859773319	11	~2009
8430005393	50580032359	11	~2010
8430355919	16860711839	11	~2009
8430546479	16861092959	11	~2009
8430563783	16861127567	11	~2009
8430660299	16861320599	11	~2009
8430695363	16861390727	11	~2009
8430837683	16861675367	11	~2009
8431395611	16862791223	11	~2009
8431503299	16863006599	11	~2009
8431551917	252946557511	12	~2011
8431619879	16863239759	11	~2009
8431663871	16863327743	11	~2009
8431686071	16863372143	11	~2009
8431952003	16863904007	11	~2009
8431993943	16863987887	11	~2009
8432396801	50594380807	11	~2010
8432544839	16865089679	11	~2009

Exponent	Prime Factor	Dig.	Year
8432778989	118058905847	12	~2011
8432871899	16865743799	11	~2009
8432922983	16865845967	11	~2009
8433375683	16866751367	11	~2009
8433531131	16867062263	11	~2009
8433670957	134938735313	12	~2011
8433967693	50603806159	11	~2010
8434036199	16868072399	11	~2009
8434200143	16868400287	11	~2009
8434606679	16869213359	11	~2009
8435001803	16870003607	11	~2009
8435056139	16870112279	11	~2009
8435513459	16871026919	11	~2009
8435534171	151839615079	12	~2011
8435635993	134970175889	12	~2011
8436110363	16872220727	11	~2009
8436482003	16872964007	11	~2009
8436526079	16873052159	11	~2009
8436808463	16873616927	11	~2009
8437206347	67497650777	11	~2010
8437691477	67501531817	11	~2010
8438107523	16876215047	11	~2009
8438403419	16876806839	11	~2009
8438507219	151893129943	12	~2011
8438552891	16877105783	11	~2009

4.768.925 digits

25-05-04