Small Mersenne Prime Factors (page 4474/5025)

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	Dig.	Year
22682997203	45365994407	11	~2012
22685204471	45370408943	11	~2012
22685224517	136111347103	12	~2013
22685377721	136112266327	12	~2013
22688552123	45377104247	11	~2012
22688628923	45377257847	11	~2012
22689032519	45378065039	11	~2012
22689411119	181515288953	12	~2013
22690645931	45381291863	11	~2012
22691552783	45383105567	11	~2012
22692483563	45384967127	11	~2012
22693171751	45386343503	11	~2012
22693865321	181550922569	12	~2013
22693961243	45387922487	11	~2012
22695107711	181560861689	12	~2013
22695665543	45391331087	11	~2012
22696349603	45392699207	11	~2012
22697442851	45394885703	11	~2012
22699609981	136197659887	12	~2013
22701339071	45402678143	11	~2012
22701996899	45403993799	11	~2012
22702146899	45404293799	11	~2012
22704021673	136224130039	12	~2013
22704371951	45408743903	11	~2012
22704478271	45408956543	11	~2012

Exponent	Prime Factor	Dig.	Year
22705767221	181646137769	12	~2013
22705842119	45411684239	11	~2012
22705967299	227059672991	12	~2014
22707322751	45414645503	11	~2012
22707772859	45415545719	11	~2012
22707920351	45415840703	11	~2012
22708099159	227080991591	12	~2014
22708398059	45416796119	11	~2012
22708412399	45416824799	11	~2012
22709899799	45419799599	11	~2012
22710261611	45420523223	11	~2012
22712780411	45425560823	11	~2012
22712890463	45425780927	11	~2012
22713039317	136278235903	12	~2013
22714568831	181716550649	12	~2013
22715504219	45431008439	11	~2012
22716469367	181731754937	12	~2013
22717140311	45434280623	11	~2012
22718081833	136308490999	12	~2013
22718695451	45437390903	11	~2012
22719772811	45439545623	11	~2012
22721388551	45442777103	11	~2012
22722172937	136333037623	12	~2013
22722670571	45445341143	11	~2012
22722691319	45445382639	11	~2012

Exponent	Prime Factor	Dig.	Year
22723309151	45446618303	11	~2012
22724708159	45449416319	11	~2012
22725391103	45450782207	11	~2012
22725801037	136354806223	12	~2013
22726931231	45453862463	11	~2012
22728209351	45456418703	11	~2012
22729447141	136376682847	12	~2013
22731519787	545556474889	12	~2015
22732543453	136395260719	12	~2013
22734782183	45469564367	11	~2012
22736162279	45472324559	11	~2012
22736439241	136418635447	12	~2013
22737431819	45474863639	11	~2012
22738861499	45477722999	11	~2012
22738958771	45477917543	11	~2012
22739054141	136434324847	12	~2013
22739861051	45479722103	11	~2012
22740395543	45480791087	11	~2012
22740530831	45481061663	11	~2012
22740627659	45481255319	11	~2012
22743353377	136460120263	12	~2013
22743696637	136462179823	12	~2013
22743990683	45487981367	11	~2012
22745847011	45491694023	11	~2012
22746321023	45492642047	11	~2012

Exponent	Prime Factor	Dig.	Year
22746378059	45492756119	11	~2012
22746654017	181973232137	12	~2013
22748487059	181987896473	12	~2013
22749400643	45498801287	11	~2012
22749628277	136497769663	12	~2013
22749697403	45499394807	11	~2012
22750524011	45501048023	11	~2012
22751438819	45502877639	11	~2012
22752114083	45504228167	11	~2012
22753181519	45506363039	11	~2012
22756951523	45513903047	11	~2012
22757041991	45514083983	11	~2012
22757472323	45514944647	11	~2012
22757887931	45515775863	11	~2012
22758454451	182067635609	12	~2013
22758673103	45517346207	11	~2012
22759512959	45519025919	11	~2012
22759644431	45519288863	11	~2012
22759817291	45519634583	11	~2012
22760113867	409682049607	12	~2014
22763741111	45527482223	11	~2012
22766183711	45532367423	11	~2012
22767607273	136605643639	12	~2013
22767736163	45535472327	11	~2012
22768681163	45537362327	11	~2012

4.724.182 digits

25-04-13