Small Mersenne Prime Factors (page 4970/5070)

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
200846904743	401693809487	12	~2019
200862028799	401724057599	12	~2019
200872270499	401744540999	12	~2019
200892830819	401785661639	12	~2019
200893284131	401786568263	12	~2019
200897846399	401795692799	12	~2019
200925333803	401850667607	12	~2019
200951961299	401903922599	12	~2019
200993945783	401987891567	12	~2019
200998158923	401996317847	12	~2019
201027059483	402054118967	12	~2019
201042347111	402084694223	12	~2019
201045094559	402090189119	12	~2019
201057655871	402115311743	12	~2019
201072820199	1785...336713	15	2025
201075435611	402150871223	12	~2019
201080028899	402160057799	12	~2019
201080044439	402160088879	12	~2019
201089374091	402178748183	12	~2019
201115125791	402230251583	12	~2019
201126417071	2453...882663	14	2024
201139654883	402279309767	12	~2019
201151624403	402303248807	12	~2019
201184307531	402368615063	12	~2019
201211840211	402423680423	12	~2019

Exponent	Prime Factor	Dig.	Year
201213240131	402426480263	12	~2019
201215783663	402431567327	12	~2019
201215963951	402431927903	12	~2019
201226243079	402452486159	12	~2019
201245081963	402490163927	12	~2019
201259354739	402518709479	12	~2019
201260708003	402521416007	12	~2019
201263568371	402527136743	12	~2019
201278923931	402557847863	12	~2019
201294839939	402589679879	12	~2019
201304133279	402608266559	12	~2019
201306326723	402612653447	12	~2019
201310699619	402621399239	12	~2019
201313653731	402627307463	12	~2019
201367115843	5839...594471	14	2023
201370672201	1304...586249	15	2025
201371200931	402742401863	12	~2019
201406267103	402812534207	12	~2019
201414441383	402828882767	12	~2019
201423161903	402846323807	12	~2019
201465145943	402930291887	12	~2019
201478220231	402956440463	12	~2019
201510509663	403021019327	12	~2019
201511468919	403022937839	12	~2019
201523994219	403047988439	12	~2019

Exponent	Prime Factor	Dig.	Year
201580504991	403161009983	12	~2019
201587912231	403175824463	12	~2019
201603345731	403206691463	12	~2019
201613667243	403227334487	12	~2019
201619419803	403238839607	12	~2019
201623516219	403247032439	12	~2019
201627760511	403255521023	12	~2019
201648576023	403297152047	12	~2019
201660902783	403321805567	12	~2019
201669915983	403339831967	12	~2019
201675156383	403350312767	12	~2019
201692093381	2541...766007	14	2024
201693731411	403387462823	12	~2019
201727016399	403454032799	12	~2019
201770684099	403541368199	12	~2019
201810790691	403621581383	12	~2019
201817909439	403635818879	12	~2019
201829991843	403659983687	12	~2019
201834010009	1776...880793	14	2024
201885854759	403771709519	12	~2019
201903966191	403807932383	12	~2019
201908696123	403817392247	12	~2019
201910292219	403820584439	12	~2019
201913781291	403827562583	12	~2019
201922744403	403845488807	12	~2019

Exponent	Prime Factor	Dig.	Year
201943866671	403887733343	12	~2019
201949009631	403898019263	12	~2019
201970979579	403941959159	12	~2019
201972219539	403944439079	12	~2019
201987905363	403975810727	12	~2019
201996484103	403992968207	12	~2019
201999830951	403999661903	12	~2019
202005605519	404011211039	12	~2019
202014080423	404028160847	12	~2019
202029312263	404058624527	12	~2019
202059554699	404119109399	12	~2019
202065478151	404130956303	12	~2019
202068285059	404136570119	12	~2019
202071983903	404143967807	12	~2019
202082994803	404165989607	12	~2019
202126229471	404252458943	12	~2019
202146989399	404293978799	12	~2019
202149194399	404298388799	12	~2019
202150481471	404300962943	12	~2019
202156724999	404313449999	12	~2019
202164455819	404328911639	12	~2019
202194569891	404389139783	12	~2019
202216718051	404433436103	12	~2019
202244608451	404489216903	12	~2019
202251178043	404502356087	12	~2019

4.768.925 digits

25-05-04