Small Mersenne Prime Factors (page 4800/5340)

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
29321522213	175929133279	12	~2014
29322390173	410513462423	12	~2015
29323776563	58647553127	11	~2013
29324392451	58648784903	11	~2013
29324861591	58649723183	11	~2013
29325681839	58651363679	11	~2013
29325699127	293256991271	12	~2014
29327169491	527889050839	12	~2015
29327730119	58655460239	11	~2013
29329333619	58658667239	11	~2013
29329362851	58658725703	11	~2013
29329609013	175977654079	12	~2014
29330305127	234642441017	12	~2014
29333052971	58666105943	11	~2013
29333795581	176002773487	12	~2014
29333841599	58667683199	11	~2013
29334109109	410677527527	12	~2015
29334653171	58669306343	11	~2013
29335362587	1361...240369	14	2023
29336104223	58672208447	11	~2013
29336160251	58672320503	11	~2013
29337397699	293373976991	12	~2014
29341991543	58683983087	11	~2013
29343001043	58686002087	11	~2013
29348035163	58696070327	11	~2013

Exponent	Prime Factor	Dig.	Year
29348354803	293483548031	12	~2014
29348803453	176092820719	12	~2014
29348885381	234791083049	12	~2014
29350159703	58700319407	11	~2013
29350914977	176105489863	12	~2014
29351002559	58702005119	11	~2013
29351087483	58702174967	11	~2013
29351399647	293513996471	12	~2014
29351705171	58703410343	11	~2013
29353571651	58707143303	11	~2013
29357938751	58715877503	11	~2013
29358533339	58717066679	11	~2013
29359880051	58719760103	11	~2013
29363977871	58727955743	11	~2013
29365100123	58730200247	11	~2013
29366221691	58732443383	11	~2013
29369280779	58738561559	11	~2013
29369896141	176219376847	12	~2014
29373612899	58747225799	11	~2013
29373835657	176243013943	12	~2014
29374910063	58749820127	11	~2013
29375528473	470008455569	12	~2015
29375748659	58751497319	11	~2013
29375969879	58751939759	11	~2013
29378437831	293784378311	12	~2014

Exponent	Prime Factor	Dig.	Year
29379720031	293797200311	12	~2014
29380331339	58760662679	11	~2013
29382602939	58765205879	11	~2013
29383684559	58767369119	11	~2013
29384026963	470144431409	12	~2015
29384163737	235073309897	12	~2014
29385705551	58771411103	11	~2013
29386251077	235090008617	12	~2014
29388300791	235106406329	12	~2014
29388325919	58776651839	11	~2013
29390305753	176341834519	12	~2014
29390745337	176344472023	12	~2014
29391758111	58783516223	11	~2013
29391843839	58783687679	11	~2013
29392369943	58784739887	11	~2013
29396002039	293960020391	12	~2014
29396690723	58793381447	11	~2013
29398499843	58796999687	11	~2013
29399597933	176397587599	12	~2014
29399700899	58799401799	11	~2013
29400592223	58801184447	11	~2013
29401234139	58802468279	11	~2013
29401741163	58803482327	11	~2013
29403242579	58806485159	11	~2013
29403579539	58807159079	11	~2013

Exponent	Prime Factor	Dig.	Year
29404610219	58809220439	11	~2013
29405216461	176431298767	12	~2014
29406022259	58812044519	11	~2013
29406590903	58813181807	11	~2013
29407029779	58814059559	11	~2013
29408796311	58817592623	11	~2013
29409914291	58819828583	11	~2013
29414293141	176485758847	12	~2014
29415249119	58830498239	11	~2013
29416681919	58833363839	11	~2013
29418775619	58837551239	11	~2013
29418951323	58837902647	11	~2013
29419561823	58839123647	11	~2013
29424317189	235394537513	12	~2014
29424722699	58849445399	11	~2013
29426377441	470822039057	12	~2015
29426710331	58853420663	11	~2013
29427792143	58855584287	11	~2013
29429481491	235435851929	12	~2014
29429873783	58859747567	11	~2013
29430206423	58860412847	11	~2013
29430245843	58860491687	11	~2013
29430695831	58861391663	11	~2013
29431009219	294310092191	12	~2014
29434080059	58868160119	11	~2013

5.037.460 digits

25-09-07