Small Mersenne Prime Factors (page 2992/5145)

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
294302467	2943024671	10	~1999
294309853	1765859119	10	~1998
294312383	588624767	9	~1997
294321383	588642767	9	~1997
294327431	588654863	9	~1997
294328883	588657767	9	~1997
294329089	6475239959	10	~2000
294338687	16482966473	11	~2001
294356813	1766140879	10	~1998
294368351	588736703	9	~1997
294377711	588755423	9	~1997
294379919	588759839	9	~1997
294382559	588765119	9	~1997
294396983	588793967	9	~1997
294399971	588799943	9	~1997
294401603	588803207	9	~1997
294407219	588814439	9	~1997
294412763	588825527	9	~1997
294417083	588834167	9	~1997
294432023	588864047	9	~1997
294447371	588894743	9	~1997
294461351	588922703	9	~1997
294462611	588925223	9	~1997
294512243	589024487	9	~1997
294512843	589025687	9	~1997

Exponent	Prime Factor	Digits	Year
294520249	11780809961	11	~2000
294521891	589043783	9	~1997
294540593	1767243559	10	~1998
294543239	589086479	9	~1997
294569903	589139807	9	~1997
294577471	25922817449	11	~2001
294581279	589162559	9	~1997
294582731	589165463	9	~1997
294600563	589201127	9	~1997
294604283	589208567	9	~1997
294607091	589214183	9	~1997
294607871	589215743	9	~1997
294610369	6481428119	10	~2000
294612683	589225367	9	~1997
294619621	4713913937	10	~1999
294619799	2356958393	10	~1999
294620699	589241399	9	~1997
294628739	589257479	9	~1997
294637163	589274327	9	~1997
294643631	589287263	9	~1997
294651083	589302167	9	~1997
294653123	589306247	9	~1997
294667211	589334423	9	~1997
294672907	10018878839	11	~2000
294674981	1768049887	10	~1998

Exponent	Prime Factor	Digits	Year
294686459	2357491673	10	~1999
294689957	2357519657	10	~1999
294690497	4125666959	10	~1999
294699401	2357595209	10	~1999
294699659	589399319	9	~1997
294701063	589402127	9	~1997
294704363	589408727	9	~1997
294705503	589411007	9	~1997
294705791	589411583	9	~1997
294708899	589417799	9	~1997
294711971	589423943	9	~1997
294712871	589425743	9	~1997
294713011	2947130111	10	~1999
294713987	2357711897	10	~1999
294717971	589435943	9	~1997
294720623	589441247	9	~1997
294732983	589465967	9	~1997
294733031	589466063	9	~1997
294733919	589467839	9	~1997
294743411	589486823	9	~1997
294744503	589489007	9	~1997
294758531	589517063	9	~1997
294763907	7074333769	10	~2000
294772223	589544447	9	~1997
294780599	589561199	9	~1997

Exponent	Prime Factor	Digits	Year
294817333	1768903999	10	~1998
294818831	589637663	9	~1997
294819719	589639439	9	~1997
294831499	5306966983	10	~1999
294836819	589673639	9	~1997
294838553	4127739743	10	~1999
294851171	589702343	9	~1997
294862091	589724183	9	~1997
294863953	1769183719	10	~1998
294891323	589782647	9	~1997
294896039	589792079	9	~1997
294896201	2359169609	10	~1999
294898529	2359188233	10	~1999
294906323	589812647	9	~1997
294906863	589813727	9	~1997
294907043	589814087	9	~1997
294907637	1769445823	10	~1998
294919991	589839983	9	~1997
294927359	589854719	9	~1997
294938519	589877039	9	~1997
294944399	589888799	9	~1997
294945697	1769674183	10	~1998
294960311	589920623	9	~1997
294965581	82590362681	11	~2002
294969347	2359754777	10	~1999

4.843.404 digits

25-06-08