Small Mersenne Prime Factors (page 4330/5130)

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
10115385779	20230771559	11	~2009
10115538137	60693228823	11	~2010
10116478451	20232956903	11	~2009
10116493643	20232987287	11	~2009
10116499163	20232998327	11	~2009
10116529153	60699174919	11	~2010
10117868591	20235737183	11	~2009
10117990439	20235980879	11	~2009
10118368751	20236737503	11	~2009
10118468219	20236936439	11	~2009
10118781131	80950249049	11	~2011
10118966791	101189667911	12	~2011
10119459991	101194599911	12	~2011
10120300523	425052621967	12	~2012
10120436939	20240873879	11	~2009
10120638179	20241276359	11	~2009
10120986719	20241973439	11	~2009
10121098079	20242196159	11	~2009
10121689871	20243379743	11	~2009
10121862497	60731174983	11	~2010
10122897887	80983183097	11	~2011
10123025483	20246050967	11	~2009
10123040413	60738242479	11	~2010
10123884203	20247768407	11	~2009
10123932443	20247864887	11	~2009

Exponent	Prime Factor	Dig.	Year
10124092541	80992740329	11	~2011
10124408719	1249...359247	14	2023
10124867579	20249735159	11	~2009
10124956043	20249912087	11	~2009
10125639119	20251278239	11	~2009
10125919103	20251838207	11	~2009
10126061161	60756366967	11	~2010
10127285243	20254570487	11	~2009
10127296079	20254592159	11	~2009
10127478437	60764870623	11	~2010
10127629931	20255259863	11	~2009
10128479519	20256959039	11	~2009
10128560063	20257120127	11	~2009
10128579119	20257158239	11	~2009
10129149011	20258298023	11	~2009
10129206683	20258413367	11	~2009
10129368719	20258737439	11	~2009
10129400483	20258800967	11	~2009
10129562543	20259125087	11	~2009
10129795919	81038367353	11	~2011
10130228819	20260457639	11	~2009
10130245963	101302459631	12	~2011
10131333911	20262667823	11	~2009
10132617419	20265234839	11	~2009
10132786379	20265572759	11	~2009

Exponent	Prime Factor	Dig.	Year
10133376377	60800258263	11	~2010
10133974139	20267948279	11	~2009
10134073091	20268146183	11	~2009
10134099203	20268198407	11	~2009
10134211739	20268423479	11	~2009
10134600953	141884413343	12	~2011
10135116041	81080928329	11	~2011
10135150693	466216931879	12	~2012
10135172291	20270344583	11	~2009
10135292003	20270584007	11	~2009
10135300139	20270600279	11	~2009
10135346051	20270692103	11	~2009
10135611179	81084889433	11	~2011
10135949891	81087599129	11	~2011
10136331431	20272662863	11	~2009
10136567219	20273134439	11	~2009
10136933843	20273867687	11	~2009
10137615563	20275231127	11	~2009
10137655783	101376557831	12	~2011
10137693119	20275386239	11	~2009
10137773879	20275547759	11	~2009
10138312823	20276625647	11	~2009
10138346639	20276693279	11	~2009
10138786919	20277573839	11	~2009
10138823459	81110587673	11	~2011

Exponent	Prime Factor	Dig.	Year
10138976819	20277953639	11	~2009
10139728957	162235663313	12	~2011
10140251963	20280503927	11	~2009
10140634321	466469178767	12	~2012
10140654203	20281308407	11	~2009
10141115339	20282230679	11	~2009
10141476047	243395425129	12	~2012
10141508603	20283017207	11	~2009
10142973419	20285946839	11	~2009
10143925079	182590651423	12	~2011
10144069763	20288139527	11	~2009
10144299563	20288599127	11	~2009
10144423871	20288847743	11	~2009
10144447763	20288895527	11	~2009
10144802831	20289605663	11	~2009
10144917683	20289835367	11	~2009
10145006941	60870041647	11	~2010
10145091119	20290182239	11	~2009
10145114099	20290228199	11	~2009
10145126423	20290252847	11	~2009
10145922667	344961370679	12	~2012
10146401003	20292802007	11	~2009
10147599443	20295198887	11	~2009
10148420063	20296840127	11	~2009
10148669387	81189355097	11	~2011

4.828.532 digits

25-06-01