Small Mersenne Prime Factors (page 4384/5025)

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
16244727931	162447279311	12	~2012
16246803959	32493607919	11	~2011
16246876981	97481261887	11	~2012
16247033219	32494066439	11	~2011
16247040731	32494081463	11	~2011
16247612411	32495224823	11	~2011
16248197411	32496394823	11	~2011
16249721837	227496105719	12	~2013
16250267771	130002142169	12	~2012
16252215071	32504430143	11	~2011
16252291373	390054992953	12	~2013
16252871051	32505742103	11	~2011
16254413951	32508827903	11	~2011
16255152187	292592739367	12	~2013
16255878011	32511756023	11	~2011
16256195213	227586732983	12	~2013
16256342831	32512685663	11	~2011
16257169403	32514338807	11	~2011
16257245099	130057960793	12	~2012
16257876191	32515752383	11	~2011
16257985817	617803461047	12	~2014
16258258343	32516516687	11	~2011
16258511287	260136180593	12	~2013
16259934029	130079472233	12	~2012
16260269351	32520538703	11	~2011

Exponent	Prime Factor	Dig.	Year
16260951209	227653316927	12	~2013
16261254923	32522509847	11	~2011
16261317203	32522634407	11	~2011
16263007283	32526014567	11	~2011
16263090719	32526181439	11	~2011
16263743759	32527487519	11	~2011
16265516651	32531033303	11	~2011
16265615519	32531231039	11	~2011
16266029519	32532059039	11	~2011
16266703177	97600219063	11	~2012
16266763511	32533527023	11	~2011
16267070591	32534141183	11	~2011
16267480331	32534960663	11	~2011
16268769109	357912920399	12	~2013
16269464699	32538929399	11	~2011
16269934199	32539868399	11	~2011
16269981263	32539962527	11	~2011
16270138679	32540277359	11	~2011
16270201751	32540403503	11	~2011
16270330871	32540661743	11	~2011
16272469679	32544939359	11	~2011
16273063571	32546127143	11	~2011
16273072703	32546145407	11	~2011
16273448837	130187590697	12	~2012
16275350561	130202804489	12	~2012

Exponent	Prime Factor	Dig.	Year
16275752879	32551505759	11	~2011
16276405511	32552811023	11	~2011
16276940051	32553880103	11	~2011
16278572699	32557145399	11	~2011
16279284419	32558568839	11	~2011
16279296641	97675779847	11	~2012
16279306037	130234448297	12	~2012
16280121359	32560242719	11	~2011
16281195719	32562391439	11	~2011
16281228191	32562456383	11	~2011
16282123103	32564246207	11	~2011
16283332811	32566665623	11	~2011
16284617039	32569234079	11	~2011
16284766331	32569532663	11	~2011
16286301203	32572602407	11	~2011
16286912963	32573825927	11	~2011
16287284459	32574568919	11	~2011
16287483011	32574966023	11	~2011
16287552311	32575104623	11	~2011
16287710723	32575421447	11	~2011
16288531643	32577063287	11	~2011
16288691879	32577383759	11	~2011
16288950053	97733700319	11	~2012
16289189951	32578379903	11	~2011
16289303141	97735818847	11	~2012

Exponent	Prime Factor	Dig.	Year
16290267307	162902673071	12	~2012
16290544163	32581088327	11	~2011
16291195391	32582390783	11	~2011
16292087153	391010091673	12	~2013
16292644993	260682319889	12	~2013
16292871359	32585742719	11	~2011
16293294791	32586589583	11	~2011
16295774489	228140842847	12	~2013
16296617891	32593235783	11	~2011
16297214039	32594428079	11	~2011
16297965839	32595931679	11	~2011
16298548691	32597097383	11	~2011
16298625719	32597251439	11	~2011
16301036903	32602073807	11	~2011
16301088613	391226126713	12	~2013
16301859923	32603719847	11	~2011
16302586541	97815519247	11	~2012
16302954841	97817729047	11	~2012
16304549351	32609098703	11	~2011
16305461171	32610922343	11	~2011
16305602371	260889637937	12	~2013
16305705683	32611411367	11	~2011
16306591943	32613183887	11	~2011
16306834343	32613668687	11	~2011
16307704691	32615409383	11	~2011

4.724.182 digits

25-04-13