Small Mersenne Prime Factors (page 4774/5130)

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
53761746443	107523492887	12	~2015
53762089763	107524179527	12	~2015
53763790859	107527581719	12	~2015
53768279557	322609677343	12	~2016
53771554643	107543109287	12	~2015
53774494637	430195957097	12	~2016
53774953957	322649723743	12	~2016
53779670963	107559341927	12	~2015
53779813133	322678878799	12	~2016
53780934433	322685606599	12	~2016
53784862253	322709173519	12	~2016
53789962087	537899620871	12	~2017
53799408731	107598817463	12	~2015
53803274039	107606548079	12	~2015
53804894471	107609788943	12	~2015
53807399423	107614798847	12	~2015
53807732339	107615464679	12	~2015
53808030011	107616060023	12	~2015
53813624819	430508998553	12	~2016
53813842763	107627685527	12	~2015
53818175423	107636350847	12	~2015
53823663683	107647327367	12	~2015
53825212163	107650424327	12	~2015
53827355977	322964135863	12	~2016
53829036491	107658072983	12	~2015

Exponent	Prime Factor	Dig.	Year
53829426863	107658853727	12	~2015
53834611931	107669223863	12	~2015
53836960643	107673921287	12	~2015
53838932099	430711456793	12	~2016
53844264119	107688528239	12	~2015
53845764671	107691529343	12	~2015
53852094911	107704189823	12	~2015
53857859123	107715718247	12	~2015
53857956497	323147738983	12	~2016
53858486351	107716972703	12	~2015
53860199219	107720398439	12	~2015
53860548073	323163288439	12	~2016
53864541119	107729082239	12	~2015
53868432911	107736865823	12	~2015
53871323459	107742646919	12	~2015
53871337343	107742674687	12	~2015
53873853851	107747707703	12	~2015
53876129831	107752259663	12	~2015
53876608283	107753216567	12	~2015
53882894183	107765788367	12	~2015
53887696871	107775393743	12	~2015
53891111759	107782223519	12	~2015
53892780131	107785560263	12	~2015
53895852119	107791704239	12	~2015
53896571249	754551997487	12	~2017

Exponent	Prime Factor	Dig.	Year
53897396519	107794793039	12	~2015
53899111151	2845...687729	14	2024
53900924243	107801848487	12	~2015
53904580043	107809160087	12	~2015
53905389803	107810779607	12	~2015
53906790023	107813580047	12	~2015
53908335473	323450012839	12	~2016
53908800083	107817600167	12	~2015
53915379779	107830759559	12	~2015
53916948713	323501692279	12	~2016
53923239329	431385914633	12	~2016
53926922891	107853845783	12	~2015
53927283863	107854567727	12	~2015
53932476979	539324769791	12	~2017
53933753339	107867506679	12	~2015
53935723739	107871447479	12	~2015
53936133623	107872267247	12	~2015
53937591503	107875183007	12	~2015
53938369931	107876739863	12	~2015
53940754583	107881509167	12	~2015
53945120291	107890240583	12	~2015
53947326731	107894653463	12	~2015
53954309377	323725856263	12	~2016
53959579451	431676635609	12	~2016
53959776433	323758658599	12	~2016

Exponent	Prime Factor	Dig.	Year
53960695319	107921390639	12	~2015
53961184619	107922369239	12	~2015
53961312659	107922625319	12	~2015
53966425151	107932850303	12	~2015
53966807243	107933614487	12	~2015
53969788721	323818732327	12	~2016
53969793653	323818761919	12	~2016
53970096671	107940193343	12	~2015
53970464033	323822784199	12	~2016
53973558851	107947117703	12	~2015
53978704211	107957408423	12	~2015
53979638641	323877831847	12	~2016
53981196677	431849573417	12	~2016
53987993123	107975986247	12	~2015
53998293983	107996587967	12	~2015
54001696319	108003392639	12	~2015
54001732979	108003465959	12	~2015
54006677951	108013355903	12	~2015
54010787591	108021575183	12	~2015
54013658791	9160...309537	14	2024
54014717173	324088303039	12	~2016
54016057811	108032115623	12	~2015
54018416531	108036833063	12	~2015
54020515331	108041030663	12	~2015
54027202583	108054405167	12	~2015

4.828.532 digits

25-06-01