Small Mersenne Prime Factors (page 4614/5130)

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
27904420757	167426524543	12	~2014
27904810079	55809620159	11	~2013
27906529559	55813059119	11	~2013
27907261709	223258093673	12	~2014
27909484657	446551754513	12	~2015
27909578303	55819156607	11	~2013
27910065913	446561054609	12	~2015
27911489563	7011...782257	14	2023
27912670099	279126700991	12	~2014
27912970979	55825941959	11	~2013
27914130323	55828260647	11	~2013
27914282233	167485693399	12	~2014
27914396249	223315169993	12	~2014
27914948291	55829896583	11	~2013
27915367643	55830735287	11	~2013
27915453623	55830907247	11	~2013
27916044059	55832088119	11	~2013
27917137403	55834274807	11	~2013
27917460023	55834920047	11	~2013
27918113183	55836226367	11	~2013
27919084231	279190842311	12	~2014
27919131983	55838263967	11	~2013
27919197203	55838394407	11	~2013
27920134741	167520808447	12	~2014
27922413731	55844827463	11	~2013

Exponent	Prime Factor	Dig.	Year
27924066899	55848133799	11	~2013
27924236843	55848473687	11	~2013
27924285131	55848570263	11	~2013
27927208679	670253008297	12	~2015
27927298499	55854596999	11	~2013
27927541991	55855083983	11	~2013
27927965711	55855931423	11	~2013
27930637019	55861274039	11	~2013
27931711061	167590266367	12	~2014
27932331659	55864663319	11	~2013
27934855391	55869710783	11	~2013
27935681773	167614090639	12	~2014
27937681199	55875362399	11	~2013
27939300359	55878600719	11	~2013
27939772103	55879544207	11	~2013
27940070003	670561680073	12	~2015
27940559903	55881119807	11	~2013
27943439483	55886878967	11	~2013
27943585391	55887170783	11	~2013
27944264339	55888528679	11	~2013
27945165323	55890330647	11	~2013
27947192543	55894385087	11	~2013
27948077471	55896154943	11	~2013
27954288491	223634307929	12	~2014
27955603003	447289648049	12	~2015

Exponent	Prime Factor	Dig.	Year
27955957259	55911914519	11	~2013
27956807491	503222534839	12	~2015
27958379159	55916758319	11	~2013
27959499611	55918999223	11	~2013
27960890099	55921780199	11	~2013
27961729511	223693836089	12	~2014
27962688623	55925377247	11	~2013
27964728047	223717824377	12	~2014
27965042543	55930085087	11	~2013
27965503103	55931006207	11	~2013
27967037303	55934074607	11	~2013
27967154051	55934308103	11	~2013
27968614711	503435064799	12	~2015
27969534371	55939068743	11	~2013
27970041839	55940083679	11	~2013
27970572023	55941144047	11	~2013
27972279761	167833678567	12	~2014
27972528011	55945056023	11	~2013
27973704383	55947408767	11	~2013
27976362301	167858173807	12	~2014
27977207099	55954414199	11	~2013
27977398931	55954797863	11	~2013
27979389023	55958778047	11	~2013
27980817133	167884902799	12	~2014
27980972141	167885832847	12	~2014

Exponent	Prime Factor	Dig.	Year
27982077923	55964155847	11	~2013
27983652563	55967305127	11	~2013
27986098223	55972196447	11	~2013
27986391263	55972782527	11	~2013
27986692763	55973385527	11	~2013
27991012691	55982025383	11	~2013
27994486631	55988973263	11	~2013
27994661641	167967969847	12	~2014
27995436397	447926982353	12	~2015
27996754823	55993509647	11	~2013
28000421699	56000843399	11	~2013
28002350039	56004700079	11	~2013
28002757319	56005514639	11	~2013
28003350853	168020105119	12	~2014
28003894679	56007789359	11	~2013
28004071643	56008143287	11	~2013
28004345111	56008690223	11	~2013
28007964503	56015929007	11	~2013
28008724301	224069794409	12	~2014
28009406563	280094065631	12	~2014
28009473851	56018947703	11	~2013
28014589727	224116717817	12	~2014
28016325563	56032651127	11	~2013
28016729519	56033459039	11	~2013
28018064603	56036129207	11	~2013

4.828.532 digits

25-06-01