Small Mersenne Prime Factors (page 2934/5025)

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
293555573	1761333439	10	~1998
293559191	2348473529	10	~1999
293569739	587139479	9	~1997
293572871	587145743	9	~1997
293573849	2348590793	10	~1999
293573963	587147927	9	~1997
293575823	587151647	9	~1997
293598911	587197823	9	~1997
293599739	587199479	9	~1997
293605523	587211047	9	~1997
293605853	1761635119	10	~1998
293610697	1761664183	10	~1998
293613623	587227247	9	~1997
293627123	587254247	9	~1997
293638757	1761832543	10	~1998
293639393	1761836359	10	~1998
293642579	587285159	9	~1997
293642627	2349141017	10	~1999
293662181	2349297449	10	~1999
293662871	587325743	9	~1997
293663099	587326199	9	~1997
293669459	587338919	9	~1997
293675159	587350319	9	~1997
293684221	1762105327	10	~1998
293705579	587411159	9	~1997

Exponent	Prime Factor	Digits	Year
293706299	587412599	9	~1997
293708231	587416463	9	~1997
293710619	587421239	9	~1997
293711233	1762267399	10	~1998
293715659	587431319	9	~1997
293732291	587464583	9	~1997
293737403	587474807	9	~1997
293739431	587478863	9	~1997
293760683	587521367	9	~1997
293763803	587527607	9	~1997
293773631	587547263	9	~1997
293778427	2937784271	10	~1999
293783177	1762699063	10	~1998
293783999	587567999	9	~1997
293804579	587609159	9	~1997
293807117	1762842703	10	~1998
293811299	587622599	9	~1997
293829533	1762977199	10	~1998
293838203	587676407	9	~1997
293839103	587678207	9	~1997
293850757	1763104543	10	~1998
293853431	587706863	9	~1997
293854573	6464800607	10	~2000
293856557	2350852457	10	~1999
293857871	587715743	9	~1997

Exponent	Prime Factor	Digits	Year
293866571	587733143	9	~1997
293875723	2938757231	10	~1999
293887883	587775767	9	~1997
293902643	587805287	9	~1997
293903521	8817105631	10	~2000
293906363	587812727	9	~1997
293910359	587820719	9	~1997
293912471	587824943	9	~1997
293919377	7054065049	10	~2000
293926799	587853599	9	~1997
293937097	1763622583	10	~1998
293949181	4703186897	10	~1999
293953631	587907263	9	~1997
293954561	1763727367	10	~1998
293957243	587914487	9	~1997
293960063	587920127	9	~1997
293961599	7055078377	10	~2000
293965163	587930327	9	~1997
293966723	587933447	9	~1997
293975681	1763854087	10	~1998
293978599	2939785991	10	~1999
293980259	12347170879	11	~2000
293992931	587985863	9	~1997
293995811	587991623	9	~1997
294001271	588002543	9	~1997

Exponent	Prime Factor	Digits	Year
294009293	1764055759	10	~1998
294028739	588057479	9	~1997
294033203	588066407	9	~1997
294033923	588067847	9	~1997
294039143	588078287	9	~1997
294041963	588083927	9	~1997
294044099	588088199	9	~1997
294045599	588091199	9	~1997
294047921	1764287527	10	~1998
294048809	7057171417	10	~2000
294057191	588114383	9	~1997
294059879	588119759	9	~1997
294060631	2940606311	10	~1999
294065363	588130727	9	~1997
294066863	588133727	9	~1997
294086467	7058075209	10	~2000
294093851	588187703	9	~1997
294097933	7058350393	10	~2000
294105239	2352841913	10	~1999
294111563	588223127	9	~1997
294111581	2352892649	10	~1999
294124793	1764748759	10	~1998
294128687	7647345863	10	~2000
294143771	588287543	9	~1997
294148199	588296399	9	~1997

4.724.182 digits

25-04-13