Small Mersenne Prime Factors (page 4100/5025)

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
6117392423	12234784847	11	~2007
6117657131	12235314263	11	~2007
6117918083	12235836167	11	~2007
6118568437	36711410623	11	~2009
6118706281	293697901489	12	~2011
6118756643	12237513287	11	~2007
6119071451	48952571609	11	~2009
6119087099	12238174199	11	~2007
6119897873	36719387239	11	~2009
6119938481	36719630887	11	~2009
6120088343	12240176687	11	~2007
6120216611	12240433223	11	~2007
6120477131	12240954263	11	~2007
6120646211	12241292423	11	~2007
6121015067	110178271207	12	~2010
6121374719	12242749439	11	~2007
6121388563	61213885631	11	~2009
6121567037	36729402223	11	~2009
6121638437	36729830623	11	~2009
6122141699	12244283399	11	~2007
6122268371	12244536743	11	~2007
6122425079	12244850159	11	~2007
6122787179	12245574359	11	~2007
6122818631	12245637263	11	~2007
6122826851	12245653703	11	~2007

Exponent	Prime Factor	Dig.	Year
6122946691	61229466911	11	~2009
6122978951	12245957903	11	~2007
6123092231	12246184463	11	~2007
6123356903	12246713807	11	~2007
6123552647	48988421177	11	~2009
6124011791	12248023583	11	~2007
6124029623	12248059247	11	~2007
6124057739	12248115479	11	~2007
6124271677	36745630063	11	~2009
6124411561	36746469367	11	~2009
6124447223	12248894447	11	~2007
6124480961	48995847689	11	~2009
6124575719	489966057521	12	~2011
6124706573	36748239439	11	~2009
6125022479	12250044959	11	~2007
6125564339	12251128679	11	~2007
6125629319	12251258639	11	~2007
6125659271	12251318543	11	~2007
6125675291	12251350583	11	~2007
6125879597	49007036777	11	~2009
6126131471	12252262943	11	~2007
6126176351	12252352703	11	~2007
6126490037	36758940223	11	~2009
6126538823	12253077647	11	~2007
6126717743	12253435487	11	~2007

Exponent	Prime Factor	Dig.	Year
6126875291	12253750583	11	~2007
6127162259	12254324519	11	~2007
6127239233	36763435399	11	~2009
6127336751	12254673503	11	~2007
6127563371	12255126743	11	~2007
6127875443	12255750887	11	~2007
6128033603	12256067207	11	~2007
6128099039	12256198079	11	~2007
6128288879	12256577759	11	~2007
6128699663	12257399327	11	~2007
6128773643	12257547287	11	~2007
6129114683	12258229367	11	~2007
6129361019	12258722039	11	~2007
6129627299	12259254599	11	~2007
6130048871	159381270647	12	~2010
6130063883	12260127767	11	~2007
6130076399	12260152799	11	~2007
6130096799	12260193599	11	~2007
6130433483	12260866967	11	~2007
6130743757	98091900113	11	~2010
6130811171	12261622343	11	~2007
6130811413	36784868479	11	~2009
6130851263	12261702527	11	~2007
6130921211	12261842423	11	~2007
6131377859	12262755719	11	~2007

Exponent	Prime Factor	Dig.	Year
6131770343	12263540687	11	~2007
6132055043	12264110087	11	~2007
6132230719	61322307191	11	~2009
6132444203	12264888407	11	~2007
6133309439	12266618879	11	~2007
6133871459	12267742919	11	~2007
6134017691	12268035383	11	~2007
6134348999	12268697999	11	~2007
6134556443	12269112887	11	~2007
6134588693	36807532159	11	~2009
6134757311	12269514623	11	~2007
6134762951	12269525903	11	~2007
6134862719	12269725439	11	~2007
6135040031	12270080063	11	~2007
6135195119	12270390239	11	~2007
6135278423	12270556847	11	~2007
6135748259	12271496519	11	~2007
6135825901	36814955407	11	~2009
6135847079	12271694159	11	~2007
6136059971	12272119943	11	~2007
6136416017	36818496103	11	~2009
6136532203	98184515249	11	~2010
6136690327	98187045233	11	~2010
6136887863	12273775727	11	~2007
6137008079	12274016159	11	~2007

4.724.182 digits

25-04-13