Small Mersenne Prime Factors (page 5762/5775)

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
417107973203	834215946407	12	~2022
417143061551	834286123103	12	~2022
417173087939	834346175879	12	~2022
417174318419	834348636839	12	~2022
417192848123	834385696247	12	~2022
417235182011	834470364023	12	~2022
417265720979	834531441959	12	~2022
417272687099	834545374199	12	~2022
417297035951	834594071903	12	~2022
417329029703	834658059407	12	~2022
417352120511	834704241023	12	~2022
417377270543	834754541087	12	~2022
417416016299	834832032599	12	~2022
417435578243	834871156487	12	~2022
417474136883	834948273767	12	~2022
417474932183	834949864367	12	~2022
417500452441	7014...010089	14	2025
417523685147	6012...661169	14	2025
417639849239	835279698479	12	~2022
417670888163	835341776327	12	~2022
417672603779	835345207559	12	~2022
417703483859	835406967719	12	~2022
417703949093	9356...596833	14	2025
417782688083	835565376167	12	~2022
417783024359	835566048719	12	~2022

Exponent	Prime Factor	Dig.	Year
417783179603	835566359207	12	~2022
417827001899	835654003799	12	~2022
417831289259	835662578519	12	~2022
417869865911	5766...495719	14	2025
417958847221	4931...972079	14	2026
417978206291	835956412583	12	~2022
417990296579	835980593159	12	~2022
418002892823	836005785647	12	~2022
418014495023	836028990047	12	~2022
418043139551	836086279103	12	~2022
418069036739	836138073479	12	~2022
418125447121	1329...184479	15	2025
418140311077	7275...127399	14	2025
418195827683	836391655367	12	~2022
418212692399	836425384799	12	~2022
418244160311	836488320623	12	~2022
418285258931	836570517863	12	~2022
418326647663	836653295327	12	~2022
418439636591	836879273183	12	~2022
418466698211	836933396423	12	~2022
418498229183	836996458367	12	~2022
418515126959	837030253919	12	~2022
418523517311	837047034623	12	~2022
418532151179	837064302359	12	~2022
418547715431	837095430863	12	~2022

Exponent	Prime Factor	Dig.	Year
418566234479	837132468959	12	~2022
418606303019	837212606039	12	~2022
418610175803	837220351607	12	~2022
418693945253	1230...904383	15	2026
418727953739	837455907479	12	~2022
418748983043	837497966087	12	~2022
418749475451	837498950903	12	~2022
418808704877	5628...354689	15	2025
418832289251	837664578503	12	~2022
418865291171	837730582343	12	~2022
418925024951	837850049903	12	~2022
418927357273	7881...734223	16	2025
418980655319	837961310639	12	~2022
418988956301	8379...260201	14	2025
418990293383	837980586767	12	~2022
418991573639	837983147279	12	~2022
419000864819	838001729639	12	~2022
419050699637	1910...034473	15	2025
419079138539	838158277079	12	~2022
419206870739	838413741479	12	~2022
419219349431	838438698863	12	~2022
419228990111	1886...549951	15	2026
419234721539	838469443079	12	~2022
419264449129	1677...651601	15	2025
419271879863	838543759727	12	~2022

Exponent	Prime Factor	Dig.	Year
419283399371	838566798743	12	~2022
419331293963	838662587927	12	~2022
419382958751	838765917503	12	~2022
419391994163	838783988327	12	~2022
419396718479	838793436959	12	~2022
419482231799	838964463599	12	~2022
419504476271	839008952543	12	~2022
419511124523	839022249047	12	~2022
419548004483	839096008967	12	~2022
419628128651	839256257303	12	~2022
419646277763	839292555527	12	~2022
419674622903	839349245807	12	~2022
419756858051	839513716103	12	~2022
419795607191	839591214383	12	~2022
419818155623	839636311247	12	~2022
419822688419	839645376839	12	~2022
419887981871	839775963743	12	~2022
419893914733	1704...381599	15	2025
419899046783	839798093567	12	~2022
419899863959	839799727919	12	~2022
419906391617	8314...540167	14	2025
419913649139	839827298279	12	~2022
419934097211	839868194423	12	~2022
419955628091	839911256183	12	~2022
419956763819	839913527639	12	~2022

5.471.290 digits

26-03-29