Small Mersenne Prime Factors (page 4706/5610)

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
10623606641	63741639847	11	~2011
10623633731	21247267463	11	~2009
10623646093	63741876559	11	~2011
10623668299	446194068559	12	~2013
10623798853	63742793119	11	~2011
10623947303	21247894607	11	~2009
10624367063	21248734127	11	~2009
10624589447	84996715577	11	~2011
10625013613	63750081679	11	~2011
10625250791	85002006329	11	~2011
10625258771	85002070169	11	~2011
10625439491	21250878983	11	~2009
10625698511	21251397023	11	~2009
10625988557	85007908457	11	~2011
10626150079	106261500791	12	~2011
10626267241	510060827569	12	~2013
10627276199	21254552399	11	~2009
10627696811	21255393623	11	~2009
10627800671	21255601343	11	~2009
10627812397	425112495881	12	~2013
10628001479	21256002959	11	~2009
10628395259	21256790519	11	~2009
10629025633	170064410129	12	~2012
10629072011	21258144023	11	~2009
10629261479	21258522959	11	~2009

Exponent	Prime Factor	Dig.	Year
10629316559	21258633119	11	~2009
10629561671	21259123343	11	~2009
10629750961	63778505767	11	~2011
10629848639	21259697279	11	~2009
10630094411	21260188823	11	~2009
10630695539	21261391079	11	~2009
10630787513	63784725079	11	~2011
10630986491	21261972983	11	~2009
10631084363	21262168727	11	~2009
10631113919	21262227839	11	~2009
10631134123	170098145969	12	~2012
10631212643	21262425287	11	~2009
10632589931	21265179863	11	~2009
10632729671	21265459343	11	~2009
10632953971	425318158841	12	~2013
10633765151	21267530303	11	~2009
10634484023	21268968047	11	~2009
10635066493	744454654511	12	~2013
10636030283	21272060567	11	~2009
10636059431	21272118863	11	~2009
10636141583	21272283167	11	~2009
10636230383	21272460767	11	~2009
10636915447	361655125199	12	~2012
10637196623	21274393247	11	~2009
10637202683	21274405367	11	~2009

Exponent	Prime Factor	Dig.	Year
10637454101	85099632809	11	~2011
10637545211	21275090423	11	~2009
10637847683	21275695367	11	~2009
10638030563	21276061127	11	~2009
10638333983	21276667967	11	~2009
10638442567	170215081073	12	~2012
10639078403	21278156807	11	~2009
10639276331	21278552663	11	~2009
10639962287	85119698297	11	~2011
10640384063	255369217513	12	~2012
10640416343	21280832687	11	~2009
10640802779	21281605559	11	~2009
10641610223	21283220447	11	~2009
10641653303	21283306607	11	~2009
10642341263	21284682527	11	~2009
10642491371	21284982743	11	~2009
10643437939	106434379391	12	~2011
10643463023	21286926047	11	~2009
10643816231	21287632463	11	~2009
10643914943	21287829887	11	~2009
10644145019	21288290039	11	~2009
10644180839	85153446713	11	~2011
10644455777	149022380879	12	~2011
10644575723	21289151447	11	~2009
10645099511	85160796089	11	~2011

Exponent	Prime Factor	Dig.	Year
10645506983	21291013967	11	~2009
10645808111	21291616223	11	~2009
10645894331	21291788663	11	~2009
10645947659	1024...647959	14	2023
10646928983	21293857967	11	~2009
10647870791	21295741583	11	~2009
10647890651	21295781303	11	~2009
10648629419	21297258839	11	~2009
10648792499	21297584999	11	~2009
10648917731	21297835463	11	~2009
10649503751	21299007503	11	~2009
10649992751	21299985503	11	~2009
10650300937	63901805623	11	~2011
10650383531	21300767063	11	~2009
10650749471	21301498943	11	~2009
10650912011	21301824023	11	~2009
10650966121	170415457937	12	~2012
10651402523	21302805047	11	~2009
10651777061	63910662367	11	~2011
10652080403	21304160807	11	~2009
10652334431	21304668863	11	~2009
10652555897	63915335383	11	~2011
10652558009	85220464073	11	~2011
10652744339	21305488679	11	~2009
10652957507	85223660057	11	~2011

5.307.017 digits

26-01-11