Small Mersenne Prime Factors (page 3629/5070)

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	Digits	Year
1433582831	2867165663	10	~2003
1433647031	2867294063	10	~2003
1433677523	2867355047	10	~2003
1433679917	8602079503	10	~2004
1433691877	8602151263	10	~2004
1433715359	2867430719	10	~2003
1433728559	2867457119	10	~2003
1433732771	2867465543	10	~2003
1433737271	2867474543	10	~2003
1433779097	11470232777	11	~2004
1433785403	2867570807	10	~2003
1433844383	2867688767	10	~2003
1433872523	2867745047	10	~2003
1433891113	8603346679	10	~2004
1433925959	2867851919	10	~2003
1433970469	31547350319	11	~2005
1433973631	14339736311	11	~2004
1434035411	2868070823	10	~2003
1434052979	2868105959	10	~2003
1434158821	8604952927	10	~2004
1434162179	2868324359	10	~2003
1434185327	11473482617	11	~2004
1434205271	2868410543	10	~2003
1434227737	8605366423	10	~2004
1434277451	2868554903	10	~2003

Exponent	Prime Factor	Digits	Year
1434438961	8606633767	10	~2004
1434483551	2868967103	10	~2003
1434524603	2869049207	10	~2003
1434551351	2869102703	10	~2003
1434553583	2869107167	10	~2003
1434581417	8607488503	10	~2004
1434671417	11477371337	11	~2004
1434673739	2869347479	10	~2003
1434729743	2869459487	10	~2003
1434743969	11477951753	11	~2004
1434752411	2869504823	10	~2003
1434776831	2869553663	10	~2003
1434812579	2869625159	10	~2003
1434815663	2869631327	10	~2003
1434817019	2869634039	10	~2003
1434923051	2869846103	10	~2003
1434980957	11479847657	11	~2004
1434992903	80359602569	11	~2006
1435054199	2870108399	10	~2003
1435143299	2870286599	10	~2003
1435158743	2870317487	10	~2003
1435213679	2870427359	10	~2003
1435238641	8611431847	10	~2004
1435287803	2870575607	10	~2003
1435331917	8611991503	10	~2004

Exponent	Prime Factor	Digits	Year
1435420691	2870841383	10	~2003
1435427039	2870854079	10	~2003
1435474811	2870949623	10	~2003
1435474921	8612849527	10	~2004
1435477553	20096685743	11	~2005
1435567631	2871135263	10	~2003
1435581341	8613488047	10	~2004
1435715531	2871431063	10	~2003
1435716301	57428652041	11	~2006
1435733219	2871466439	10	~2003
1435766243	2871532487	10	~2003
1435766677	22972266833	11	~2005
1435768423	117733010687	12	~2006
1435815323	2871630647	10	~2003
1435824023	2871648047	10	~2003
1435895257	8615371543	10	~2004
1435944017	34462656409	11	~2005
1435991573	20103882023	11	~2005
1436052181	8616313087	10	~2004
1436079119	2872158239	10	~2003
1436097203	2872194407	10	~2003
1436182931	2872365863	10	~2003
1436226119	2872452239	10	~2003
1436337677	252795431153	12	~2007
1436437997	11491503977	11	~2004

Exponent	Prime Factor	Digits	Year
1436466431	2872932863	10	~2003
1436479571	2872959143	10	~2003
1436482693	8618896159	10	~2004
1436505803	2873011607	10	~2003
1436564771	2873129543	10	~2003
1436599991	2873199983	10	~2003
1436626421	8619758527	10	~2004
1436660399	2873320799	10	~2003
1436699651	2873399303	10	~2003
1436863643	2873727287	10	~2003
1436864617	8621187703	10	~2004
1437012359	2874024719	10	~2003
1437101339	2874202679	10	~2003
1437145163	2874290327	10	~2003
1437160691	2874321383	10	~2003
1437179987	11497439897	11	~2004
1437217091	2874434183	10	~2003
1437248159	2874496319	10	~2003
1437268439	2874536879	10	~2003
1437326621	8623959727	10	~2004
1437345251	2874690503	10	~2003
1437392591	2874785183	10	~2003
1437488519	68999448913	11	~2006
1437501959	2875003919	10	~2003
1437624599	2875249199	10	~2003

4.768.925 digits

25-05-04