Small Mersenne Prime Factors (page 5473/5745)

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
105488957603	210977915207	12	~2017
105490169077	632941014463	12	~2018
105491565563	210983131127	12	~2017
105501239111	211002478223	12	~2017
105509273447	844074187577	12	~2019
105510178177	633061069063	12	~2018
105514623839	211029247679	12	~2017
105515771363	211031542727	12	~2017
105517966181	633107797087	12	~2018
105526591763	211053183527	12	~2017
105532823531	211065647063	12	~2017
105537909671	211075819343	12	~2017
105538648679	211077297359	12	~2017
105546618491	211093236983	12	~2017
105577338983	211154677967	12	~2017
105586496003	211172992007	12	~2017
105587069977	633522419863	12	~2018
105588815099	211177630199	12	~2017
105593318813	633559912879	12	~2018
105594881459	211189762919	12	~2017
105595143743	211190287487	12	~2017
105607646471	211215292943	12	~2017
105608828219	211217656439	12	~2017
105610637771	211221275543	12	~2017
105611641979	211223283959	12	~2017

Exponent	Prime Factor	Dig.	Year
105618219851	211236439703	12	~2017
105620919359	211241838719	12	~2017
105629593271	211259186543	12	~2017
105632742101	845061936809	12	~2019
105641083157	845128665257	12	~2019
105645638999	211291277999	12	~2017
105648958763	211297917527	12	~2017
105652519403	211305038807	12	~2017
105653107223	211306214447	12	~2017
105653924531	211307849063	12	~2017
105657560891	211315121783	12	~2017
105675284219	211350568439	12	~2017
105680387713	634082326279	12	~2018
105682859363	211365718727	12	~2017
105683097623	211366195247	12	~2017
105683716847	845469734777	12	~2019
105692639879	211385279759	12	~2017
105694671697	634168030183	12	~2018
105696743543	211393487087	12	~2017
105697356119	211394712239	12	~2017
105706011179	211412022359	12	~2017
105711261563	211422523127	12	~2017
105718268219	211436536439	12	~2017
105732126431	211464252863	12	~2017
105734011151	211468022303	12	~2017

Exponent	Prime Factor	Dig.	Year
105746703311	211493406623	12	~2017
105750327323	211500654647	12	~2017
105752629943	211505259887	12	~2017
105755587439	211511174879	12	~2017
105764444099	211528888199	12	~2017
105769570853	634617425119	12	~2018
105772465439	211544930879	12	~2017
105777523499	211555046999	12	~2017
105778440623	211556881247	12	~2017
105780739331	211561478663	12	~2017
105781298939	211562597879	12	~2017
105781523411	211563046823	12	~2017
105784782791	846278262329	12	~2019
105790925963	211581851927	12	~2017
105795247979	211590495959	12	~2017
105795480961	634772885767	12	~2018
105808338131	211616676263	12	~2017
105814196231	211628392463	12	~2017
105822489601	634934937607	12	~2018
105823497623	211646995247	12	~2017
105829001423	211658002847	12	~2017
105829486403	211658972807	12	~2017
105834843173	635009059039	12	~2018
105841847591	2209...770009	15	2025
105845309939	211690619879	12	~2017

Exponent	Prime Factor	Dig.	Year
105846647663	211693295327	12	~2017
105849537011	211699074023	12	~2017
105849956777	635099740663	12	~2018
105857119541	846856956329	12	~2019
105858587363	211717174727	12	~2017
105858846851	211717693703	12	~2017
105866762747	846934101977	12	~2019
105868726571	211737453143	12	~2017
105868944911	211737889823	12	~2017
105878349911	211756699823	12	~2017
105880294313	635281765879	12	~2018
105887021651	211774043303	12	~2017
105888262177	635329573063	12	~2018
105890598887	8577...098471	14	2023
105898349639	847186797113	12	~2019
105899062019	211798124039	12	~2017
105902048971	2719...757529	15	2025
105902793791	211805587583	12	~2017
105905977211	211811954423	12	~2017
105908115421	1150...347207	15	2025
105909887401	635459324407	12	~2018
105913127423	211826254847	12	~2017
105914337563	211828675127	12	~2017
105916334099	211832668199	12	~2017
105918917999	211837835999	12	~2017

5.441.361 digits

26-03-15