Small Mersenne Prime Factors (page 5159/5160)

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
398405024399	796810048799	12	~2022
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

Exponent	Prime Factor	Dig.	Year
399342715631	798685431263	12	~2022
399407318963	798814637927	12	~2022
399423703271	798847406543	12	~2022
399447620219	798895240439	12	~2022
399474570899	798949141799	12	~2022
399477585179	798955170359	12	~2022
399500792963	799001585927	12	~2022
399520302299	799040604599	12	~2022
399559583183	8390...468431	14	2025
399603414011	799206828023	12	~2022
399632316659	799264633319	12	~2022
399644078831	799288157663	12	~2022
399653311511	799306623023	12	~2022
399661437653	2421...217719	15	2025
399682143383	799364286767	12	~2022
399716173271	799432346543	12	~2022
399719284073	9593...177521	14	2025
399720587351	799441174703	12	~2022
399755266331	799510532663	12	~2022
399772581203	799545162407	12	~2022
399778899491	799557798983	12	~2022
399821372087	9915...277577	14	2025
399826745579	799653491159	12	~2022
399839266019	799678532039	12	~2022
399912723923	799825447847	12	~2022

Exponent	Prime Factor	Dig.	Year
399924259859	799848519719	12	~2022
399965099581	1304...833223	16	2025
400070853719	800141707439	12	~2022
400081770971	800163541943	12	~2022
400093137971	800186275943	12	~2022
400109525177	1056...646729	15	2025
400157092631	800314185263	12	~2022
400162774439	800325548879	12	~2022
400207613111	800415226223	12	~2022
400273075849	9286...596969	14	2025
400329542891	800659085783	12	~2022
400332490583	800664981167	12	~2022
400333763939	800667527879	12	~2022
400341585131	800683170263	12	~2022
400343452823	800686905647	12	~2022
400355759351	800711518703	12	~2022
400376870651	800753741303	12	~2022
400457851109	1441...399241	15	2025
400506515131	9051...419607	14	2025
400515736031	801031472063	12	~2022
400528766639	801057533279	12	~2022
400702910963	801405821927	12	~2022
400736933423	801473866847	12	~2022
400757550899	801515101799	12	~2022
400776903419	801553806839	12	~2022

Exponent	Prime Factor	Dig.	Year
400790533259	801581066519	12	~2022
400844155391	801688310783	12	~2022
400897631831	801795263663	12	~2022
400909909019	801819818039	12	~2022
400926971111	1956...902169	15	2025
400927901651	801855803303	12	~2022
400945007891	801890015783	12	~2022
400969487591	801938975183	12	~2022
401000776079	802001552159	12	~2022
401039724077	9223...537711	14	2025
401073917399	802147834799	12	~2022
401090391491	802180782983	12	~2022
401094801869	6979...525207	14	2025
401096944499	802193888999	12	~2022
401112127271	802224254543	12	~2022
401202439103	802404878207	12	~2022
401224646111	802449292223	12	~2022
401252436131	802504872263	12	~2022
401259877241	8265...711647	14	2025
401276557403	802553114807	12	~2022
401362467371	802724934743	12	~2022
401385524471	802771048943	12	~2022
401502536999	803005073999	12	~2022
401508322499	803016644999	12	~2022
401612113943	803224227887	12	~2022

4.858.378 digits

25-06-15