Small Mersenne Prime Factors (page 5753/5790)

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
364154033339	728308066679	12	~2021
364170208403	728340416807	12	~2021
364175134619	728350269239	12	~2021
364180670963	728361341927	12	~2021
364222648319	728445296639	12	~2021
364225390019	728450780039	12	~2021
364239488849	6993...859009	14	2024
364245053663	728490107327	12	~2021
364255988563	1027...774767	15	2025
364287445079	728574890159	12	~2021
364296703559	728593407119	12	~2021
364297061819	728594123639	12	~2021
364317016319	728634032639	12	~2021
364422851543	728845703087	12	~2021
364423603139	728847206279	12	~2021
364440167771	728880335543	12	~2021
364454549243	728909098487	12	~2021
364458245539	5029...884383	14	2024
364475147143	1785...100071	15	2025
364492845071	728985690143	12	~2021
364495256003	728990512007	12	~2021
364515313583	729030627167	12	~2021
364515604253	6998...016577	14	2025
364517039863	1399...307393	15	2024
364568730719	729137461439	12	~2021

Exponent	Prime Factor	Dig.	Year
364574020451	729148040903	12	~2021
364584995947	1487...346377	15	2025
364593693047	1057...983631	15	2025
364665450323	729330900647	12	~2021
364670863451	729341726903	12	~2021
364687455707	2698...722319	14	2024
364697040803	729394081607	12	~2021
364701106223	2042...948489	14	2024
364722197771	729444395543	12	~2021
364759454711	729518909423	12	~2021
364759623971	729519247943	12	~2021
364790060639	729580121279	12	~2021
364815433331	729630866663	12	~2021
364823975423	729647950847	12	~2021
364922320531	2408...155047	14	2024
364929864011	729859728023	12	~2021
364939706711	729879413423	12	~2021
364944385079	729888770159	12	~2021
364954500299	729909000599	12	~2021
364959979379	729919958759	12	~2021
365004262319	730008524639	12	~2021
365007505463	730015010927	12	~2021
365015776991	730031553983	12	~2021
365048944031	730097888063	12	~2021
365053002179	730106004359	12	~2021

Exponent	Prime Factor	Dig.	Year
365124074363	730248148727	12	~2021
365147544613	4966...067369	14	2024
365148331391	730296662783	12	~2021
365199199019	730398398039	12	~2021
365205887303	730411774607	12	~2021
365217088139	730434176279	12	~2021
365221507439	730443014879	12	~2021
365228458289	9934...654609	14	2025
365245648151	730491296303	12	~2021
365324607911	730649215823	12	~2021
365330112299	730660224599	12	~2021
365330713421	3507...488417	14	2024
365342732291	730685464583	12	~2021
365348075903	730696151807	12	~2021
365357803571	730715607143	12	~2021
365365332257	7234...786887	14	2024
365382197231	730764394463	12	~2021
365403798503	730807597007	12	~2021
365407863251	730815726503	12	~2021
365428346903	730856693807	12	~2021
365435796199	2346...159759	15	2024
365471873303	730943746607	12	~2021
365473661123	730947322247	12	~2021
365515647719	731031295439	12	~2021
365580159239	731160318479	12	~2021

Exponent	Prime Factor	Dig.	Year
365614096643	731228193287	12	~2021
365632263779	731264527559	12	~2021
365640824491	2413...416407	14	2024
365656925603	731313851207	12	~2021
365693806403	731387612807	12	~2021
365727427979	731454855959	12	~2021
365727999023	731455998047	12	~2021
365747669663	731495339327	12	~2021
365769382031	731538764063	12	~2021
365833598411	731667196823	12	~2021
365841676283	731683352567	12	~2021
365854711331	731709422663	12	~2021
365874134243	731748268487	12	~2021
365895663299	731791326599	12	~2021
365903129783	731806259567	12	~2021
365913990371	731827980743	12	~2021
365914634387	6220...845791	14	2024
365916279551	731832559103	12	~2021
365918873077	1046...700023	15	2024
365925549623	731851099247	12	~2021
365996976899	731993953799	12	~2021
366010521791	732021043583	12	~2021
366014837603	732029675207	12	~2021
366032192171	732064384343	12	~2021
366036820343	732073640687	12	~2021

5.486.313 digits

26-04-05