Small Mersenne Prime Factors (page 5157/5190)

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
323615429363	647230858727	12	~2021
323671881479	647343762959	12	~2021
323684113079	647368226159	12	~2021
323700782183	647401564367	12	~2021
323713614923	647427229847	12	~2021
323754147779	647508295559	12	~2021
323768673083	647537346167	12	~2021
323774077483	9693...984103	15	2024
323823075571	2331...441113	14	2024
323863290851	647726581703	12	~2021
323904003539	647808007079	12	~2021
323935164887	2915...839831	14	2024
323937899039	647875798079	12	~2021
324007922951	648015845903	12	~2021
324068052299	648136104599	12	~2021
324073991231	648147982463	12	~2021
324086625743	648173251487	12	~2021
324113678411	648227356823	12	~2021
324115370963	648230741927	12	~2021
324133276739	648266553479	12	~2021
324148694651	648297389303	12	~2021
324228833843	648457667687	12	~2021
324330510599	648661021199	12	~2021
324339165851	648678331703	12	~2021
324345635303	648691270607	12	~2021

Exponent	Prime Factor	Dig.	Year
324355011119	648710022239	12	~2021
324361381163	648722762327	12	~2021
324362605211	648725210423	12	~2021
324415004099	648830008199	12	~2021
324458020259	648916040519	12	~2021
324459445283	648918890567	12	~2021
324461556179	648923112359	12	~2021
324464912819	648929825639	12	~2021
324496190003	648992380007	12	~2021
324511332851	649022665703	12	~2021
324572264699	649144529399	12	~2021
324595085351	6816...923711	14	2024
324644498603	649288997207	12	~2021
324662887091	649325774183	12	~2021
324687640943	649375281887	12	~2021
324698517491	649397034983	12	~2021
324751628231	649503256463	12	~2021
324771286991	649542573983	12	~2021
324780874673	3312...216647	14	2024
324796037099	649592074199	12	~2021
324805299911	649610599823	12	~2021
324815421251	649630842503	12	~2021
324825972623	649651945247	12	~2021
324856081631	649712163263	12	~2021
324869794393	6952...000103	14	2025

Exponent	Prime Factor	Dig.	Year
324870869507	5717...033233	14	2024
324883397159	649766794319	12	~2021
324925078321	1494...602767	14	2024
324926934803	649853869607	12	~2021
324943570631	649887141263	12	~2021
324956203679	649912407359	12	~2021
325004301863	3900...223561	14	2024
325035856283	650071712567	12	~2021
325077122963	650154245927	12	~2021
325095172019	1150...894727	15	2025
325205153411	650410306823	12	~2021
325219846103	650439692207	12	~2021
325271626499	650543252999	12	~2021
325272601919	650545203839	12	~2021
325283320213	6245...480897	14	2024
325303450163	650606900327	12	~2021
325319194103	650638388207	12	~2021
325332663731	650665327463	12	~2021
325359140279	650718280559	12	~2021
325387906919	650775813839	12	~2021
325444717511	650889435023	12	~2021
325495639811	650991279623	12	~2021
325496151611	650992303223	12	~2021
325581887663	2409...687063	14	2024
325599480443	651198960887	12	~2021

Exponent	Prime Factor	Dig.	Year
325615053119	651230106239	12	~2021
325644207299	651288414599	12	~2021
325647358919	651294717839	12	~2021
325677668171	651355336343	12	~2021
325683150491	651366300983	12	~2021
325691498711	651382997423	12	~2021
325720156763	651440313527	12	~2021
325740727283	651481454567	12	~2021
325751484857	1511...973649	15	2024
325759002311	651518004623	12	~2021
325765969619	651531939239	12	~2021
325795777421	1192...536087	15	2024
325814531411	651629062823	12	~2021
325819014659	651638029319	12	~2021
325834362443	651668724887	12	~2021
325864460711	651728921423	12	~2021
325874390339	651748780679	12	~2021
325895665859	3910...903081	14	2024
325908060277	3845...112687	14	2024
325908353543	3976...132247	14	2024
325912053443	651824106887	12	~2021
325951473251	651902946503	12	~2021
325954363919	651908727839	12	~2021
325988126291	651976252583	12	~2021
326004984983	652009969967	12	~2021

4.888.230 digits

25-06-29