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Small Mersenne Prime Factors
Prime numbers of the form Mp= 2p − 1 are called Mersenne primes. For Mp to be prime, p must also be prime.
Any factor q of a Mersenne number 2p − 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
240960472434819209448711 ~2012
240967383114819347662311 ~2012
240970662234819413244711 ~2012
240973795434819475908711 ~2012
240979433394819588667911 ~2012
240993630594819872611911 ~2012
2409952840338559245444912 ~2014
241010780514820215610311 ~2012
241015116714820302334311 ~2012
241038852714820777054311 ~2012
241051843194821036863911 ~2012
241068235194821364703911 ~2012
241073227794821464555911 ~2012
2410816854743394703384712 ~2014
241092136434821842728711 ~2012
2411007497919288059983312 ~2014
241103852034822077040711 ~2012
241104669594822093391911 ~2012
241109736714822194734311 ~2012
241118030994822360619911 ~2012
241131598314822631966311 ~2012
241131835194822636703911 ~2012
2411384578114468307468712 ~2013
2411438405314468630431912 ~2013
2411562993138585007889712 ~2014
Exponent Prime Factor Dig. Year
241159991634823199832711 ~2012
241165043394823300867911 ~2012
2411681611119293452888912 ~2014
241168702314823374046311 ~2012
241170284514823405690311 ~2012
241174363314823487266311 ~2012
241179476034823589520711 ~2012
241193501034823870020711 ~2012
2411966149314471796895912 ~2013
241198816794823976335911 ~2012
2412283849143421109283912 ~2014
241229518434824590368711 ~2012
241231054314824621086311 ~2012
241232915514824658310311 ~2012
2412507412324125074123112 ~2014
241266636234825332724711 ~2012
241267063434825341268711 ~2012
241267146594825342931911 ~2012
241275830994825516619911 ~2012
241275970314825519406311 ~2012
2412791503733779081051912 ~2014
241280844714825616894311 ~2012
2412857735919302861887312 ~2014
241298457114825969142311 ~2012
241317468834826349376711 ~2012
Exponent Prime Factor Dig. Year
241318266234826365324711 ~2012
241330549314826610986311 ~2012
241338329514826766590311 ~2012
241344441234826888824711 ~2012
2413524955314481149731912 ~2013
241362592194827251843911 ~2012
2413678513314482071079912 ~2013
241378662714827573254311 ~2012
241379232234827584644711 ~2012
241380363714827607274311 ~2012
241400532114828010642311 ~2012
241418415714828368314311 ~2012
241418815914828376318311 ~2012
2414336577714486019466312 ~2013
241436160714828723214311 ~2012
241452616914829052338311 ~2012
241455404394829108087911 ~2012
241461825834829236516711 ~2012
241465589634829311792711 ~2012
241473591114829471822311 ~2012
241497374394829947487911 ~2012
241499482194829989643911 ~2012
241501119714830022394311 ~2012
2415156851314490941107912 ~2013
241528643994830572879911 ~2012
Exponent Prime Factor Dig. Year
241540991994830819839911 ~2012
241563421314831268426311 ~2012
241567597194831351943911 ~2012
241568362194831367243911 ~2012
241573630914831472618311 ~2012
2415759116362809737023912 ~2015
241579732434831594648711 ~2012
241587842034831756840711 ~2012
241592695314831853906311 ~2012
2415967871314495807227912 ~2013
241597029714831940594311 ~2012
241601232834832024656711 ~2012
2416022905314496137431912 ~2013
241611898314832237966311 ~2012
2416306926114497841556712 ~2013
2416316643714497899862312 ~2013
241633454994832669099911 ~2012
241654018314833080366311 ~2012
241669373514833387470311 ~2012
241676198034833523960711 ~2012
2416766470114500598820712 ~2013
241686703914833734078311 ~2012
2417088453714502530722312 ~2013
241716206994834324139911 ~2012
241728713634834574272711 ~2012
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26-07-05