Small Mersenne Prime Factors (page 4238/5070)

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	Dig.	Year
8673690299	17347380599	11	~2009
8673743651	17347487303	11	~2009
8673797471	277561519073	12	~2012
8674486763	17348973527	11	~2009
8674992239	17349984479	11	~2009
8675766959	17351533919	11	~2009
8675918957	52055513743	11	~2010
8676456671	17352913343	11	~2009
8676476381	52058858287	11	~2010
8676631739	17353263479	11	~2009
8676645437	69413163497	11	~2010
8676790799	17353581599	11	~2009
8677792523	17355585047	11	~2009
8677897691	17355795383	11	~2009
8677955513	52067733079	11	~2010
8678364661	260350939831	12	~2012
8678586131	17357172263	11	~2009
8679179819	17358359639	11	~2009
8679348617	69434788937	11	~2010
8680068283	86800682831	11	~2010
8680547891	17361095783	11	~2009
8681301793	52087810759	11	~2010
8681920901	52091525407	11	~2010
8681956331	17363912663	11	~2009
8681980679	17363961359	11	~2009

Exponent	Prime Factor	Dig.	Year
8682016559	17364033119	11	~2009
8682022631	17364045263	11	~2009
8682363857	52094183143	11	~2010
8682711659	17365423319	11	~2009
8682891803	17365783607	11	~2009
8683107011	17366214023	11	~2009
8683368097	52100208583	11	~2010
8683704803	17367409607	11	~2009
8684054413	52104326479	11	~2010
8684206631	17368413263	11	~2009
8684440351	86844403511	11	~2010
8684545487	69476363897	11	~2010
8684629631	17369259263	11	~2009
8684762123	17369524247	11	~2009
8684802251	17369604503	11	~2009
8685001343	17370002687	11	~2009
8685262559	17370525119	11	~2009
8685354493	52112126959	11	~2010
8685964799	17371929599	11	~2009
8686160579	17372321159	11	~2009
8686865879	17373731759	11	~2009
8687753699	17375507399	11	~2009
8688044801	69504358409	11	~2010
8688427343	17376854687	11	~2009
8688711743	17377423487	11	~2009

Exponent	Prime Factor	Dig.	Year
8689322303	17378644607	11	~2009
8690069903	17380139807	11	~2009
8690156921	52140941527	11	~2010
8690408099	17380816199	11	~2009
8690478911	17380957823	11	~2009
8690734517	52144407103	11	~2010
8690791283	17381582567	11	~2009
8690801783	17381603567	11	~2009
8690899081	764799119129	12	~2013
8690954543	17381909087	11	~2009
8691068723	17382137447	11	~2009
8691077771	17382155543	11	~2009
8691678419	17383356839	11	~2009
8691873119	17383746239	11	~2009
8692216523	17384433047	11	~2009
8692968551	17385937103	11	~2009
8693138483	17386276967	11	~2009
8693281711	156479070799	12	~2011
8693325611	17386651223	11	~2009
8693451419	17386902839	11	~2009
8693635147	86936351471	11	~2010
8693988323	17387976647	11	~2009
8694044759	17388089519	11	~2009
8694550583	17389101167	11	~2009
8694786181	52168717087	11	~2010

Exponent	Prime Factor	Dig.	Year
8694848579	17389697159	11	~2009
8695700423	17391400847	11	~2009
8696554189	208717300537	12	~2011
8696642231	17393284463	11	~2009
8696977643	17393955287	11	~2009
8697444403	208738665673	12	~2011
8698350443	17396700887	11	~2009
8698389083	17396778167	11	~2009
8698559071	156574063279	12	~2011
8698560239	17397120479	11	~2009
8698935923	17397871847	11	~2009
8699174999	17398349999	11	~2009
8699273963	17398547927	11	~2009
8699319131	17398638263	11	~2009
8700011531	17400023063	11	~2009
8700119411	156602149399	12	~2011
8700127619	17400255239	11	~2009
8700211259	17400422519	11	~2009
8700238511	17400477023	11	~2009
8700422903	17400845807	11	~2009
8700466763	17400933527	11	~2009
8700556583	17401113167	11	~2009
8700891911	17401783823	11	~2009
8700908171	17401816343	11	~2009
8701238891	17402477783	11	~2009

4.768.925 digits

25-05-04