Small Mersenne Prime Factors (page 5191/5745)

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
35814314339	71628628679	11	~2013
35815077323	71630154647	11	~2013
35824254157	214945524943	12	~2015
35824346843	71648693687	11	~2013
35827384163	71654768327	11	~2013
35828043791	71656087583	11	~2013
35831732501	214990395007	12	~2015
35831971163	71663942327	11	~2013
35833393289	2343...211007	14	2024
35834559779	71669119559	11	~2013
35837661263	71675322527	11	~2013
35840603521	215043621127	12	~2015
35841418703	71682837407	11	~2013
35843750099	286750000793	12	~2015
35843753339	71687506679	11	~2013
35844520619	71689041239	11	~2013
35845393631	71690787263	11	~2013
35846005259	71692010519	11	~2013
35846193263	71692386527	11	~2013
35848193083	358481930831	12	~2015
35848787231	71697574463	11	~2013
35848873883	71697747767	11	~2013
35849848739	71699697479	11	~2013
35849972219	71699944439	11	~2013
35851297439	71702594879	11	~2013

Exponent	Prime Factor	Dig.	Year
35852332199	71704664399	11	~2013
35854805543	71709611087	11	~2013
35854975511	71709951023	11	~2013
35855269991	71710539983	11	~2013
35855474519	71710949039	11	~2013
35855986297	215135917783	12	~2015
35858671223	71717342447	11	~2013
35860754651	71721509303	11	~2013
35860762571	71721525143	11	~2013
35860965383	71721930767	11	~2013
35861621591	71723243183	11	~2013
35862149047	358621490471	12	~2015
35862579377	286900635017	12	~2015
35863681103	71727362207	11	~2013
35864182163	71728364327	11	~2013
35864787643	573836602289	12	~2016
35865040643	71730081287	11	~2013
35866546931	71733093863	11	~2013
35868141359	71736282719	11	~2013
35870299859	71740599719	11	~2013
35870369537	286962956297	12	~2015
35871083681	215226502087	12	~2015
35871577241	286972617929	12	~2015
35872162019	71744324039	11	~2013
35872165451	286977323609	12	~2015

Exponent	Prime Factor	Dig.	Year
35874778223	71749556447	11	~2013
35875280543	71750561087	11	~2013
35876298371	71752596743	11	~2013
35877695351	71755390703	11	~2013
35877903839	71755807679	11	~2013
35877943691	71755887383	11	~2013
35878860239	71757720479	11	~2013
35879397839	71758795679	11	~2013
35879937053	215279622319	12	~2015
35881042523	71762085047	11	~2013
35883805621	215302833727	12	~2015
35891041897	215346251383	12	~2015
35892476183	71784952367	11	~2013
35894149619	71788299239	11	~2013
35894282219	71788564439	11	~2013
35894840771	71789681543	11	~2013
35895793993	215374763959	12	~2015
35895868103	71791736207	11	~2013
35897249573	502561494023	12	~2016
35897456669	287179653353	12	~2015
35897945903	71795891807	11	~2013
35899598333	215397589999	12	~2015
35900944181	215405665087	12	~2015
35901098111	71802196223	11	~2013
35901304091	71802608183	11	~2013

Exponent	Prime Factor	Dig.	Year
35901415213	574422643409	12	~2016
35904959443	861719026633	12	~2016
35905596491	71811192983	11	~2013
35907237787	359072377871	12	~2015
35907285203	71814570407	11	~2013
35908939127	287271513017	12	~2015
35909416883	71818833767	11	~2013
35910342059	71820684119	11	~2013
35910739283	71821478567	11	~2013
35911646003	71823292007	11	~2013
35915928583	359159285831	12	~2015
35916893591	71833787183	11	~2013
35916990211	359169902111	12	~2015
35917267163	71834534327	11	~2013
35918680079	71837360159	11	~2013
35918813039	71837626079	11	~2013
35923575683	71847151367	11	~2013
35924407751	71848815503	11	~2013
35924965031	71849930063	11	~2013
35926287577	862230901849	12	~2016
35927347739	862256345737	12	~2016
35928528491	71857056983	11	~2013
35929454261	287435634089	12	~2015
35931093479	71862186959	11	~2013
35931223733	2311...050657	15	2025

5.441.361 digits

26-03-15