Small Mersenne Prime Factors (page 4609/5025)

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
38987566979	77975133959	11	~2014
38988293231	77976586463	11	~2014
38989657103	77979314207	11	~2014
38990184251	77980368503	11	~2014
38990220901	233941325407	12	~2015
38992609511	77985219023	11	~2014
38992805399	77985610799	11	~2014
38994459619	701900273143	12	~2016
39000028439	78000056879	11	~2014
39004943699	78009887399	11	~2014
39019514603	78039029207	11	~2014
39019652219	78039304439	11	~2014
39019676519	78039353039	11	~2014
39020249951	78040499903	11	~2014
39021206459	78042412919	11	~2014
39023811943	390238119431	12	~2015
39024854041	234149124247	12	~2015
39028650119	78057300239	11	~2014
39029055743	78058111487	11	~2014
39030053863	390300538631	12	~2015
39031226099	78062452199	11	~2014
39031603703	78063207407	11	~2014
39034557389	312276459113	12	~2015
39035110157	312280881257	12	~2015
39035861219	78071722439	11	~2014

Exponent	Prime Factor	Dig.	Year
39036252011	78072504023	11	~2014
39037462511	78074925023	11	~2014
39037764329	312302114633	12	~2015
39038668457	234232010743	12	~2015
39042099539	78084199079	11	~2014
39042416879	78084833759	11	~2014
39043974083	78087948167	11	~2014
39044836279	702807053023	12	~2016
39046066991	78092133983	11	~2014
39047142479	78094284959	11	~2014
39049847579	78099695159	11	~2014
39050873423	78101746847	11	~2014
39052464931	702944368759	12	~2016
39053412539	78106825079	11	~2014
39055571561	234333429367	12	~2015
39056042153	234336252919	12	~2015
39057929051	78115858103	11	~2014
39062611691	78125223383	11	~2014
39064149931	625026398897	12	~2016
39064914671	78129829343	11	~2014
39068392061	234410352367	12	~2015
39068652719	78137305439	11	~2014
39069566351	78139132703	11	~2014
39069892271	78139784543	11	~2014
39071041463	78142082927	11	~2014

Exponent	Prime Factor	Dig.	Year
39072271559	78144543119	11	~2014
39072297899	78144595799	11	~2014
39076615051	625225840817	12	~2016
39076929179	78153858359	11	~2014
39077129879	78154259759	11	~2014
39079352881	234476117287	12	~2015
39080178083	78160356167	11	~2014
39080771711	78161543423	11	~2014
39081956519	703475217343	12	~2016
39083567531	78167135063	11	~2014
39086329577	312690636617	12	~2015
39088715819	78177431639	11	~2014
39088824083	78177648167	11	~2014
39091062617	234546375703	12	~2015
39091859201	312734873609	12	~2015
39091939531	390919395311	12	~2015
39095868299	78191736599	11	~2014
39096221579	78192443159	11	~2014
39099171791	78198343583	11	~2014
39099618773	234597712639	12	~2015
39100029659	78200059319	11	~2014
39101965901	312815727209	12	~2015
39103945091	78207890183	11	~2014
39105753299	78211506599	11	~2014
39107363819	78214727639	11	~2014

Exponent	Prime Factor	Dig.	Year
39108800677	234652804063	12	~2015
39109883303	78219766607	11	~2014
39110898503	78221797007	11	~2014
39113389921	234680339527	12	~2015
39113431943	78226863887	11	~2014
39114570791	78229141583	11	~2014
39114687043	391146870431	12	~2015
39115485701	312923885609	12	~2015
39115889051	78231778103	11	~2014
39117931439	78235862879	11	~2014
39118349527	391183495271	12	~2015
39122069219	78244138439	11	~2014
39124738643	78249477287	11	~2014
39124781489	547746940847	12	~2016
39124817843	78249635687	11	~2014
39129086683	626065386929	12	~2016
39131400131	78262800263	11	~2014
39133362161	313066897289	12	~2015
39133685303	78267370607	11	~2014
39135598091	78271196183	11	~2014
39139482971	78278965943	11	~2014
39139678283	78279356567	11	~2014
39139800071	78279600143	11	~2014
39140052719	78280105439	11	~2014
39141623243	78283246487	11	~2014

4.724.182 digits

25-04-13