Small Mersenne Prime Factors (page 4782/5340)

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
27400932791	54801865583	11	~2013
27402357329	219218858633	12	~2014
27402399539	54804799079	11	~2013
27404320529	219234564233	12	~2014
27406674623	54813349247	11	~2013
27408313421	164449880527	12	~2014
27408615191	54817230383	11	~2013
27410053739	54820107479	11	~2013
27410120321	164460721927	12	~2014
27410136443	54820272887	11	~2013
27410727059	54821454119	11	~2013
27412949411	54825898823	11	~2013
27413571071	54827142143	11	~2013
27414285599	54828571199	11	~2013
27414434543	54828869087	11	~2013
27417675023	54835350047	11	~2013
27417781753	164506690519	12	~2014
27420671143	438730738289	12	~2015
27420811199	54841622399	11	~2013
27420886931	54841773863	11	~2013
27420895823	54841791647	11	~2013
27421529461	164529176767	12	~2014
27422598011	54845196023	11	~2013
27423506039	54847012079	11	~2013
27425028791	713050748567	12	~2015

Exponent	Prime Factor	Dig.	Year
27426310423	274263104231	12	~2014
27427595399	54855190799	11	~2013
27430356203	54860712407	11	~2013
27431859131	54863718263	11	~2013
27432596123	54865192247	11	~2013
27433013651	54866027303	11	~2013
27433420127	219467361017	12	~2014
27434222813	164605336879	12	~2014
27437521897	164625131383	12	~2014
27439596593	658550318233	12	~2015
27439811771	54879623543	11	~2013
27440504783	54881009567	11	~2013
27441359483	54882718967	11	~2013
27442953911	219543631289	12	~2014
27443108111	54886216223	11	~2013
27444106583	54888213167	11	~2013
27445757063	54891514127	11	~2013
27446084429	219568675433	12	~2014
27446325383	54892650767	11	~2013
27446425403	54892850807	11	~2013
27448736303	54897472607	11	~2013
27449363219	54898726439	11	~2013
27449855843	54899711687	11	~2013
27451946281	164711677687	12	~2014
27453066143	54906132287	11	~2013

Exponent	Prime Factor	Dig.	Year
27454088951	54908177903	11	~2013
27456676739	54913353479	11	~2013
27457168559	54914337119	11	~2013
27457411343	54914822687	11	~2013
27460419191	54920838383	11	~2013
27460758323	54921516647	11	~2013
27461372051	54922744103	11	~2013
27462162719	54924325439	11	~2013
27465150899	54930301799	11	~2013
27465202021	164791212127	12	~2014
27467555183	54935110367	11	~2013
27468551893	164811311359	12	~2014
27470434247	219763473977	12	~2014
27471007939	494478142903	12	~2015
27471204983	54942409967	11	~2013
27472787509	1758...005761	14	2023
27474407699	54948815399	11	~2013
27476045903	54952091807	11	~2013
27476688803	54953377607	11	~2013
27478877099	54957754199	11	~2013
27479775473	164878652839	12	~2014
27486494891	54972989783	11	~2013
27487764299	54975528599	11	~2013
27488275433	164929652599	12	~2014
27489490117	164936940703	12	~2014

Exponent	Prime Factor	Dig.	Year
27490688339	54981376679	11	~2013
27490839203	54981678407	11	~2013
27491824957	439869199313	12	~2015
27492221087	219937768697	12	~2014
27492681017	219941448137	12	~2014
27495408191	54990816383	11	~2013
27495600623	54991201247	11	~2013
27498045719	54996091439	11	~2013
27498346333	164990077999	12	~2014
27500496113	660011906713	12	~2015
27500764199	55001528399	11	~2013
27502793663	55005587327	11	~2013
27502915133	660069963193	12	~2015
27504260471	55008520943	11	~2013
27506859371	55013718743	11	~2013
27508275779	55016551559	11	~2013
27508997231	55017994463	11	~2013
27509207941	165055247647	12	~2014
27509927111	55019854223	11	~2013
27510412463	55020824927	11	~2013
27510471563	55020943127	11	~2013
27510532393	825315971791	12	~2015
27511188623	55022377247	11	~2013
27511332593	385158656303	12	~2015
27511818959	55023637919	11	~2013

5.037.460 digits

25-09-07