Small Mersenne Prime Factors (page 4852/5190)

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
60409450091	120818900183	12	~2015
60409697963	120819395927	12	~2015
60412766651	120825533303	12	~2015
60413333723	120826667447	12	~2015
60414545903	120829091807	12	~2015
60419047079	120838094159	12	~2015
60422718599	120845437199	12	~2015
60425114699	120850229399	12	~2015
60426032759	120852065519	12	~2015
60430000993	362580005959	12	~2016
60435559643	120871119287	12	~2015
60441075671	120882151343	12	~2015
60441865559	120883731119	12	~2015
60443356703	120886713407	12	~2015
60446193217	362677159303	12	~2016
60450236513	362701419079	12	~2016
60454814081	362728884487	12	~2016
60456270869	483650166953	12	~2017
60461750003	120923500007	12	~2015
60461890739	120923781479	12	~2015
60463102319	120926204639	12	~2015
60465163439	120930326879	12	~2015
60467979359	120935958719	12	~2015
60469086817	362814520903	12	~2016
60472613161	362835678967	12	~2016

Exponent	Prime Factor	Dig.	Year
60473340503	120946681007	12	~2015
60477587531	120955175063	12	~2015
60478361591	120956723183	12	~2015
60481029443	120962058887	12	~2015
60483814799	120967629599	12	~2015
60485884139	120971768279	12	~2015
60487538651	120975077303	12	~2015
60489139079	120978278159	12	~2015
60490308251	120980616503	12	~2015
60492002891	120984005783	12	~2015
60496014959	120992029919	12	~2015
60496722659	120993445319	12	~2015
60498746519	120997493039	12	~2015
60500761319	121001522639	12	~2015
60508943459	121017886919	12	~2015
60510019259	121020038519	12	~2015
60510642011	121021284023	12	~2015
60518926199	121037852399	12	~2015
60520584623	121041169247	12	~2015
60525896719	605258967191	12	~2017
60531810061	363190860367	12	~2016
60532042799	121064085599	12	~2015
60533539799	121067079599	12	~2015
60535612541	363213675247	12	~2016
60536237309	484289898473	12	~2017

Exponent	Prime Factor	Dig.	Year
60545660963	121091321927	12	~2015
60549137399	121098274799	12	~2015
60550362193	363302173159	12	~2016
60551221319	484409770553	12	~2017
60552804491	121105608983	12	~2015
60555600557	363333603343	12	~2016
60555903503	121111807007	12	~2015
60557021051	121114042103	12	~2015
60558133243	605581332431	12	~2017
60560199773	363361198639	12	~2016
60562016363	121124032727	12	~2015
60563808971	121127617943	12	~2015
60570493877	363422963263	12	~2016
60570632159	121141264319	12	~2015
60571518191	121143036383	12	~2015
60573456059	121146912119	12	~2015
60573619657	363441717943	12	~2016
60577286417	363463718503	12	~2016
60578313487	605783134871	12	~2017
60578963831	121157927663	12	~2015
60580213619	121160427239	12	~2015
60580776577	363484659463	12	~2016
60583307639	121166615279	12	~2015
60585820643	121171641287	12	~2015
60590959409	484727675273	12	~2017

Exponent	Prime Factor	Dig.	Year
60590965511	121181931023	12	~2015
60592443683	121184887367	12	~2015
60595259737	363571558423	12	~2016
60595509893	363573059359	12	~2016
60601917059	121203834119	12	~2015
60603999493	363623996959	12	~2016
60610097291	121220194583	12	~2015
60610463663	121220927327	12	~2015
60621238837	363727433023	12	~2016
60621496139	121242992279	12	~2015
60627669863	121255339727	12	~2015
60631537523	121263075047	12	~2015
60632995867	606329958671	12	~2017
60637172087	5297...352033	15	2025
60638815063	3310...024399	14	2023
60641145751	606411457511	12	~2017
60645062843	121290125687	12	~2015
60650553611	121301107223	12	~2015
60651041519	121302083039	12	~2015
60652112819	121304225639	12	~2015
60654901871	121309803743	12	~2015
60655767383	121311534767	12	~2015
60662643479	485301147833	12	~2017
60662874353	363977246119	12	~2016
60663834779	121327669559	12	~2015

4.888.230 digits

25-06-29