Small Mersenne Prime Factors (page 4679/5340)

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
19055823203	38111646407	11	~2011
19055824019	38111648039	11	~2011
19056208991	38112417983	11	~2011
19056231539	38112463079	11	~2011
19057328579	38114657159	11	~2011
19057519753	114345118519	12	~2012
19058206841	114349241047	12	~2012
19058283971	38116567943	11	~2011
19058363939	38116727879	11	~2011
19061360723	38122721447	11	~2011
19061361491	38122722983	11	~2011
19062140543	38124281087	11	~2011
19063423259	38126846519	11	~2011
19063552583	38127105167	11	~2011
19064795591	152518364729	12	~2013
19065753913	114394523479	12	~2012
19065807941	114394847647	12	~2012
19066270393	114397622359	12	~2012
19066593719	38133187439	11	~2011
19068599951	152548799609	12	~2013
19069360333	114416161999	12	~2012
19069883699	38139767399	11	~2011
19070775029	152566200233	12	~2013
19070824403	38141648807	11	~2011
19070986079	38141972159	11	~2011

Exponent	Prime Factor	Dig.	Year
19070989799	38141979599	11	~2011
19071083183	38142166367	11	~2011
19072645643	38145291287	11	~2011
19073091839	38146183679	11	~2011
19073331311	38146662623	11	~2011
19073605571	38147211143	11	~2011
19076240317	763049612681	12	~2014
19077049619	38154099239	11	~2011
19077245111	38154490223	11	~2011
19077538211	152620305689	12	~2013
19077683759	38155367519	11	~2011
19078917719	38157835439	11	~2011
19080500039	38161000079	11	~2011
19080774239	38161548479	11	~2011
19080880391	38161760783	11	~2011
19081735763	38163471527	11	~2011
19081830221	114490981327	12	~2012
19081895857	114491375143	12	~2012
19082013563	38164027127	11	~2011
19083774497	114502646983	12	~2012
19084104419	38168208839	11	~2011
19085040179	38170080359	11	~2011
19086526607	152692212857	12	~2013
19087415531	38174831063	11	~2011
19087445603	38174891207	11	~2011

Exponent	Prime Factor	Dig.	Year
19087731623	38175463247	11	~2011
19087978859	38175957719	11	~2011
19088757503	38177515007	11	~2011
19089716231	152717729849	12	~2013
19090531319	38181062639	11	~2011
19090746431	38181492863	11	~2011
19090746539	38181493079	11	~2011
19092212411	38184424823	11	~2011
19092320129	152738561033	12	~2013
19092461093	114554766559	12	~2012
19092473531	38184947063	11	~2011
19092639983	38185279967	11	~2011
19092734581	305483753297	12	~2014
19092793679	38185587359	11	~2011
19093242341	725543208959	12	~2014
19093700231	38187400463	11	~2011
19094397131	38188794263	11	~2011
19094488943	38188977887	11	~2011
19094759483	38189518967	11	~2011
19094836259	38189672519	11	~2011
19094953853	114569723119	12	~2012
19096192057	114577152343	12	~2012
19096340759	38192681519	11	~2011
19096502651	38193005303	11	~2011
19098314177	267376398479	12	~2013

Exponent	Prime Factor	Dig.	Year
19099765631	38199531263	11	~2011
19099854479	38199708959	11	~2011
19099950923	38199901847	11	~2011
19100056399	458401353577	12	~2014
19100762963	38201525927	11	~2011
19101896039	152815168313	12	~2013
19102511003	38205022007	11	~2011
19103028421	305648454737	12	~2014
19104035551	191040355511	12	~2013
19104088207	343873587727	12	~2014
19104859049	152838872393	12	~2013
19104884413	114629306479	12	~2012
19104968639	38209937279	11	~2011
19105128239	152841025913	12	~2013
19105576211	38211152423	11	~2011
19106300519	38212601039	11	~2011
19108634543	38217269087	11	~2011
19109315051	38218630103	11	~2011
19109937323	38219874647	11	~2011
19110192011	38220384023	11	~2011
19110816181	305773058897	12	~2014
19112020547	2022...738727	14	2023
19112775023	38225550047	11	~2011
19114373461	305829975377	12	~2014
19115165039	38230330079	11	~2011

5.037.460 digits

25-09-07