Small Mersenne Prime Factors (page 5598/5775)

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
167482064591	334964129183	12	~2019
167491470011	334982940023	12	~2019
167492843951	334985687903	12	~2019
167504152331	335008304663	12	~2019
167505522683	335011045367	12	~2019
167508245543	335016491087	12	~2019
167508594923	335017189847	12	~2019
167513519111	335027038223	12	~2019
167517966839	335035933679	12	~2019
167519916671	2723...507047	15	2024
167544200711	335088401423	12	~2019
167544963851	335089927703	12	~2019
167547796943	335095593887	12	~2019
167553921659	335107843319	12	~2019
167563263743	335126527487	12	~2019
167569710239	335139420479	12	~2019
167578463051	335156926103	12	~2019
167585499899	335170999799	12	~2019
167587117283	335174234567	12	~2019
167592531299	335185062599	12	~2019
167603758583	335207517167	12	~2019
167610662819	335221325639	12	~2019
167624635991	335249271983	12	~2019
167634304751	335268609503	12	~2019
167647810751	335295621503	12	~2019

Exponent	Prime Factor	Dig.	Year
167651033591	335302067183	12	~2019
167660295611	335320591223	12	~2019
167664937703	335329875407	12	~2019
167676297539	335352595079	12	~2019
167693609123	335387218247	12	~2019
167711159879	335422319759	12	~2019
167714259731	335428519463	12	~2019
167717537723	335435075447	12	~2019
167727186251	335454372503	12	~2019
167752576811	335505153623	12	~2019
167762515103	335525030207	12	~2019
167768745479	1009...778359	15	2025
167772114743	335544229487	12	~2019
167772571331	335545142663	12	~2019
167778295319	335556590639	12	~2019
167801312603	335602625207	12	~2019
167804515643	335609031287	12	~2019
167805266879	335610533759	12	~2019
167812824671	335625649343	12	~2019
167837062931	335674125863	12	~2019
167855502179	335711004359	12	~2019
167859553943	335719107887	12	~2019
167865632771	335731265543	12	~2019
167875280123	335750560247	12	~2019
167887991951	335775983903	12	~2019

Exponent	Prime Factor	Dig.	Year
167910778811	335821557623	12	~2019
167940600983	335881201967	12	~2019
167950583891	335901167783	12	~2019
167951150651	335902301303	12	~2019
167953892759	335907785519	12	~2019
167961592283	335923184567	12	~2019
167964601151	335929202303	12	~2019
167977678091	335955356183	12	~2019
167987965703	335975931407	12	~2019
167988902219	335977804439	12	~2019
167990553959	335981107919	12	~2019
168001498823	336002997647	12	~2019
168021747011	336043494023	12	~2019
168028751879	336057503759	12	~2019
168039122197	6318...946073	14	2024
168041031491	336082062983	12	~2019
168048435239	336096870479	12	~2019
168051184943	336102369887	12	~2019
168054780671	336109561343	12	~2019
168062296163	336124592327	12	~2019
168066622211	336133244423	12	~2019
168085693031	336171386063	12	~2019
168099594983	336199189967	12	~2019
168102767279	336205534559	12	~2019
168106558943	336213117887	12	~2019

Exponent	Prime Factor	Dig.	Year
168120358859	336240717719	12	~2019
168128181839	336256363679	12	~2019
168128619383	336257238767	12	~2019
168143702591	336287405183	12	~2019
168146618963	336293237927	12	~2019
168161090039	336322180079	12	~2019
168166506311	336333012623	12	~2019
168173543123	336347086247	12	~2019
168183081491	336366162983	12	~2019
168190553819	336381107639	12	~2019
168196259351	336392518703	12	~2019
168199454243	336398908487	12	~2019
168202289903	336404579807	12	~2019
168233184419	336466368839	12	~2019
168261782891	336523565783	12	~2019
168263416439	336526832879	12	~2019
168269278643	336538557287	12	~2019
168273936079	8783...633239	14	2024
168277790039	336555580079	12	~2019
168295651619	336591303239	12	~2019
168326313899	336652627799	12	~2019
168342980111	336685960223	12	~2019
168345289559	336690579119	12	~2019
168347335511	1515...195991	14	2024
168372179411	336744358823	12	~2019

5.471.290 digits

26-03-29