Small Mersenne Prime Factors (page 4056/5070)

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
4801780967	38414247737	11	~2008
4801909499	9603818999	10	~2007
4802086463	9604172927	10	~2007
4802119379	9604238759	10	~2007
4802199719	9604399439	10	~2007
4802221799	9604443599	10	~2007
4802355923	9604711847	10	~2007
4802451971	9604903943	10	~2007
4802492351	9604984703	10	~2007
4802523293	115260559033	12	~2009
4802580983	9605161967	10	~2007
4803147311	9606294623	10	~2007
4803315689	38426525513	11	~2008
4803999671	9607999343	10	~2007
4804067591	9608135183	10	~2007
4804233893	28825403359	11	~2008
4804332983	9608665967	10	~2007
4804390403	9608780807	10	~2007
4804433663	9608867327	10	~2007
4804451363	9608902727	10	~2007
4804504721	38436037769	11	~2008
4804507231	48045072311	11	~2008
4804649431	86483689759	11	~2009
4804768211	9609536423	10	~2007
4804831013	28828986079	11	~2008

Exponent	Prime Factor	Digits	Year
4804968251	9609936503	10	~2007
4804991423	9609982847	10	~2007
4804992793	115319827033	12	~2009
4804997831	9609995663	10	~2007
4805407601	144162228031	12	~2009
4805465783	9610931567	10	~2007
4805812703	9611625407	10	~2007
4805887679	9611775359	10	~2007
4805978783	9611957567	10	~2007
4806127751	9612255503	10	~2007
4806706739	9613413479	10	~2007
4806769631	9613539263	10	~2007
4806885443	115365250633	12	~2009
4806922723	48069227231	11	~2008
4807275383	9614550767	10	~2007
4807369093	28844214559	11	~2008
4807750043	9615500087	10	~2007
4807764323	9615528647	10	~2007
4807995671	153855861473	12	~2010
4808123891	9616247783	10	~2007
4808125319	9616250639	10	~2007
4808257453	28849544719	11	~2008
4808284441	221181084287	12	~2010
4808575763	9617151527	10	~2007
4808666111	9617332223	10	~2007

Exponent	Prime Factor	Digits	Year
4808725583	9617451167	10	~2007
4808863817	28853182903	11	~2008
4809249917	28855499503	11	~2008
4809423791	9618847583	10	~2007
4809465721	28856794327	11	~2008
4809583703	9619167407	10	~2007
4809780067	86576041207	11	~2009
4810416419	9620832839	10	~2007
4810702201	28864213207	11	~2008
4810719181	28864315087	11	~2008
4810759403	9621518807	10	~2007
4810786199	153945158369	12	~2010
4811113511	9622227023	10	~2007
4811123701	28866742207	11	~2008
4811428571	9622857143	10	~2007
4811431333	76982901329	11	~2009
4811697251	9623394503	10	~2007
4811732603	9623465207	10	~2007
4811868263	9623736527	10	~2007
4811885473	538931172977	12	~2011
4812274823	9624549647	10	~2007
4812366743	9624733487	10	~2007
4812493787	86624888167	11	~2009
4812592649	38500741193	11	~2008
4813180331	9626360663	10	~2007

Exponent	Prime Factor	Digits	Year
4813260203	125144765279	12	~2009
4813487603	9626975207	10	~2007
4813617217	28881703303	11	~2008
4813628003	9627256007	10	~2007
4813687213	28882123279	11	~2008
4813792609	259944800887	12	~2010
4813826243	9627652487	10	~2007
4813992863	9627985727	10	~2007
4814176903	48141769031	11	~2008
4814243939	9628487879	10	~2007
4814283553	28885701319	11	~2008
4815057911	9630115823	10	~2007
4815192779	9630385559	10	~2007
4815223739	9630447479	10	~2007
4815247057	28891482343	11	~2008
4815264683	9630529367	10	~2007
4815318419	9630636839	10	~2007
4815437771	38523502169	11	~2008
4815492023	9630984047	10	~2007
4815615979	48156159791	11	~2008
4815705283	48157052831	11	~2008
4815711359	9631422719	10	~2007
4815907511	9631815023	10	~2007
4815917831	9631835663	10	~2007
4816357751	9632715503	10	~2007

4.768.925 digits

25-05-04