Small Mersenne Prime Factors (page 2863/5025)

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	Digits	Year
252458231	504916463	9	~1997
252459131	504918263	9	~1997
252459887	2019679097	10	~1998
252471119	504942239	9	~1997
252471371	504942743	9	~1997
252478283	504956567	9	~1997
252480071	504960143	9	~1997
252483137	2019865097	10	~1998
252486977	6059687449	10	~1999
252489371	504978743	9	~1997
252491699	504983399	9	~1997
252494003	504988007	9	~1997
252495371	504990743	9	~1997
252506531	505013063	9	~1997
252523259	505046519	9	~1997
252527903	505055807	9	~1997
252528299	505056599	9	~1997
252530477	1515182863	10	~1998
252534839	505069679	9	~1997
252540131	505080263	9	~1997
252540923	505081847	9	~1997
252545603	505091207	9	~1997
252550619	505101239	9	~1997
252561511	2525615111	10	~1998
252566711	505133423	9	~1997

Exponent	Prime Factor	Digits	Year
252568331	505136663	9	~1997
252574547	2020596377	10	~1998
252574859	505149719	9	~1997
252578279	505156559	9	~1997
252579779	505159559	9	~1997
252579791	505159583	9	~1997
252581141	2020649129	10	~1998
252583031	505166063	9	~1997
252584159	505168319	9	~1997
252604223	505208447	9	~1997
252604789	5557305359	10	~1999
252610903	6062661673	10	~1999
252614137	1515684823	10	~1998
252616817	3536635439	10	~1999
252620243	505240487	9	~1997
252628679	2021029433	10	~1998
252635557	4042168913	10	~1999
252636091	4042177457	10	~1999
252638219	505276439	9	~1997
252665117	3537311639	10	~1999
252666083	505332167	9	~1997
252683987	2021471897	10	~1998
252691919	2021535353	10	~1998
252692263	2526922631	10	~1998
252694523	505389047	9	~1997

Exponent	Prime Factor	Digits	Year
252697751	505395503	9	~1997
252701441	1516208647	10	~1998
252701903	505403807	9	~1997
252706757	1516240543	10	~1998
252717041	1516302247	10	~1998
252721739	505443479	9	~1997
252735179	505470359	9	~1997
252741311	505482623	9	~1997
252747073	1516482439	10	~1998
252755411	505510823	9	~1997
252761291	505522583	9	~1997
252761819	505523639	9	~1997
252767303	505534607	9	~1997
252767519	505535039	9	~1997
252767777	9605175527	10	~2000
252772823	505545647	9	~1997
252781561	1516689367	10	~1998
252783683	505567367	9	~1997
252785303	505570607	9	~1997
252798431	505596863	9	~1997
252801377	1516808263	10	~1998
252801911	505603823	9	~1997
252805043	505610087	9	~1997
252816541	48035142791	11	~2001
252817381	1516904287	10	~1998

Exponent	Prime Factor	Digits	Year
252828143	505656287	9	~1997
252828833	1516972999	10	~1998
252829799	505659599	9	~1997
252830471	505660943	9	~1997
252836099	10619116159	11	~2000
252845291	505690583	9	~1997
252848831	505697663	9	~1997
252857723	505715447	9	~1997
252859319	505718639	9	~1997
252859553	1517157319	10	~1998
252865859	505731719	9	~1997
252866539	10620394639	11	~2000
252870313	1517221879	10	~1998
252872299	2528722991	10	~1998
252873839	505747679	9	~1997
252893783	505787567	9	~1997
252911339	505822679	9	~1997
252913079	505826159	9	~1997
252929711	505859423	9	~1997
252937943	6576386519	10	~1999
252940043	505880087	9	~1997
252944123	505888247	9	~1997
252945257	6070686169	10	~1999
252957851	505915703	9	~1997
252968843	505937687	9	~1997

4.724.182 digits

25-04-13