Small Mersenne Prime Factors (page 5129/5130)

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
395846920919	791693841839	12	~2022
395859750491	791719500983	12	~2022
395885504351	791771008703	12	~2022
395928783683	791857567367	12	~2022
395935190291	791870380583	12	~2022
396014047703	792028095407	12	~2022
396028133833	1164...346903	15	2025
396108471659	792216943319	12	~2022
396162314939	792324629879	12	~2022
396225375131	792450750263	12	~2022
396237450443	792474900887	12	~2022
396299091323	792598182647	12	~2022
396440800391	792881600783	12	~2022
396467837099	792935674199	12	~2022
396515233403	793030466807	12	~2022
396571833863	793143667727	12	~2022
396582987299	793165974599	12	~2022
396590831963	793181663927	12	~2022
396593696231	793187392463	12	~2022
396594477479	793188954959	12	~2022
396620243759	793240487519	12	~2022
396620286239	793240572479	12	~2022
396650467679	793300935359	12	~2022
396692106383	793384212767	12	~2022
396700014731	793400029463	12	~2022

Exponent	Prime Factor	Dig.	Year
396739462319	793478924639	12	~2022
396764191643	793528383287	12	~2022
396781150583	793562301167	12	~2022
396893178551	793786357103	12	~2022
396909232403	793818464807	12	~2022
396937993619	793875987239	12	~2022
396977186159	793954372319	12	~2022
396983187983	793966375967	12	~2022
396998566043	793997132087	12	~2022
397007933963	794015867927	12	~2022
397118249351	794236498703	12	~2022
397125082391	794250164783	12	~2022
397190169479	794380338959	12	~2022
397221199871	794442399743	12	~2022
397221742559	794443485119	12	~2022
397265647703	794531295407	12	~2022
397268393303	794536786607	12	~2022
397283243057	1430...500521	15	2025
397333378103	794666756207	12	~2022
397361472671	794722945343	12	~2022
397395541079	794791082159	12	~2022
397410808979	794821617959	12	~2022
397512386423	795024772847	12	~2022
397518988511	795037977023	12	~2022
397540237009	3235...925327	15	2025

Exponent	Prime Factor	Dig.	Year
397553097971	795106195943	12	~2022
397602157091	795204314183	12	~2022
397735448813	7000...991089	14	2025
397757138039	795514276079	12	~2022
397830856931	795661713863	12	~2022
397887104917	1169...845599	15	2025
397908150239	795816300479	12	~2022
397950300589	8277...522513	14	2025
398002030631	796004061263	12	~2022
398007497243	796014994487	12	~2022
398022825251	796045650503	12	~2022
398045204831	1631...980711	15	2025
398083552199	796167104399	12	~2022
398145278291	796290556583	12	~2022
398162871971	796325743943	12	~2022
398195276819	796390553639	12	~2022
398226867383	796453734767	12	~2022
398252748427	1593...370801	15	2025
398256926471	796513852943	12	~2022
398259590999	796519181999	12	~2022
398273883743	796547767487	12	~2022
398350710011	796701420023	12	~2022
398363060993	8604...174489	14	2025
398371888679	796743777359	12	~2022
398405024399	796810048799	12	~2022

Exponent	Prime Factor	Dig.	Year
398524368251	797048736503	12	~2022
398536689251	797073378503	12	~2022
398583244271	797166488543	12	~2022
398586423479	797172846959	12	~2022
398615136131	797230272263	12	~2022
398621026283	797242052567	12	~2022
398634857903	797269715807	12	~2022
398654273471	797308546943	12	~2022
398713307171	797426614343	12	~2022
398736787811	797473575623	12	~2022
398772602219	797545204439	12	~2022
398784371291	797568742583	12	~2022
398865460139	797730920279	12	~2022
398909757787	1053...055769	15	2025
398936611319	797873222639	12	~2022
398955445979	797910891959	12	~2022
398993315219	797986630439	12	~2022
399047386319	798094772639	12	~2022
399143428163	798286856327	12	~2022
399258244943	798516489887	12	~2022
399261921143	798523842287	12	~2022
399272005991	798544011983	12	~2022
399289122899	798578245799	12	~2022
399311679359	798623358719	12	~2022
399342715631	798685431263	12	~2022

4.828.532 digits

25-06-01