Small Mersenne Prime Factors (page 4751/5070)

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
61400380523	122800761047	12	~2015
61400566741	368403400447	12	~2016
61402427783	122804855567	12	~2015
61408860119	122817720239	12	~2015
61408935179	122817870359	12	~2015
61409824457	368458946743	12	~2016
61415928419	122831856839	12	~2015
61417025641	368502153847	12	~2016
61425928331	122851856663	12	~2015
61430312171	122860624343	12	~2015
61433804543	122867609087	12	~2015
61437446243	122874892487	12	~2015
61447475879	122894951759	12	~2015
61448375903	122896751807	12	~2015
61457325313	368743951879	12	~2016
61461271139	122922542279	12	~2015
61462296131	491698369049	12	~2017
61463340143	122926680287	12	~2015
61464805547	7928...155631	14	2025
61465657199	122931314399	12	~2015
61466841833	368801050999	12	~2016
61467438301	368804629807	12	~2016
61468499531	122936999063	12	~2015
61474195319	122948390639	12	~2015
61475220143	122950440287	12	~2015

Exponent	Prime Factor	Dig.	Year
61478037623	122956075247	12	~2015
61490463647	491923709177	12	~2017
61492966963	614929669631	12	~2017
61497568177	368985409063	12	~2016
61498541231	122997082463	12	~2015
61500119459	123000238919	12	~2015
61502694083	123005388167	12	~2015
61506642971	123013285943	12	~2015
61511795753	369070774519	12	~2016
61512344521	369074067127	12	~2016
61513139879	123026279759	12	~2015
61516987739	123033975479	12	~2015
61520678291	123041356583	12	~2015
61522904099	123045808199	12	~2015
61529255003	123058510007	12	~2015
61530730763	123061461527	12	~2015
61531681223	123063362447	12	~2015
61540643993	7717...567223	14	2025
61540846943	123081693887	12	~2015
61542438379	9403...843113	14	2023
61543135103	123086270207	12	~2015
61549143863	123098287727	12	~2015
61549354103	123098708207	12	~2015
61553285447	492426283577	12	~2017
61563991523	123127983047	12	~2015

Exponent	Prime Factor	Dig.	Year
61568306719	615683067191	12	~2017
61568717719	615687177191	12	~2017
61570703483	123141406967	12	~2015
61572176333	369433057999	12	~2016
61572386483	123144772967	12	~2015
61573541537	492588332297	12	~2017
61575463619	123150927239	12	~2015
61577453579	123154907159	12	~2015
61577647541	369465885247	12	~2016
61579024151	123158048303	12	~2015
61580052431	123160104863	12	~2015
61589468461	369536810767	12	~2016
61591954043	123183908087	12	~2015
61598948051	492791584409	12	~2017
61600674911	123201349823	12	~2015
61601130131	123202260263	12	~2015
61601408833	369608452999	12	~2016
61601904053	369611424319	12	~2016
61607532013	369645192079	12	~2016
61607874539	123215749079	12	~2015
61612066163	123224132327	12	~2015
61622778599	123245557199	12	~2015
61624545161	369747270967	12	~2016
61626191051	123252382103	12	~2015
61629323351	123258646703	12	~2015

Exponent	Prime Factor	Dig.	Year
61629992443	616299924431	12	~2017
61630365059	493042920473	12	~2017
61633650971	123267301943	12	~2015
61634561171	123269122343	12	~2015
61634904293	369809425759	12	~2016
61634945219	123269890439	12	~2015
61643830331	123287660663	12	~2015
61647763973	369886583839	12	~2016
61648053371	123296106743	12	~2015
61648519979	123297039959	12	~2015
61648551401	369891308407	12	~2016
61653398231	123306796463	12	~2015
61655370341	369932222047	12	~2016
61658969819	123317939639	12	~2015
61659703199	493277625593	12	~2017
61668336677	370010020063	12	~2016
61668459179	123336918359	12	~2015
61669391891	123338783783	12	~2015
61672486019	123344972039	12	~2015
61672569131	123345138263	12	~2015
61674333299	123348666599	12	~2015
61676076401	493408611209	12	~2017
61680835691	123361671383	12	~2015
61685349263	123370698527	12	~2015
61686802139	123373604279	12	~2015

4.768.925 digits

25-05-04