Small Mersenne Prime Factors (page 4942/5190)

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
90579074123	181158148247	12	~2017
90585901331	181171802663	12	~2017
90587370851	181174741703	12	~2017
90591400979	181182801959	12	~2017
90595244711	181190489423	12	~2017
90598030121	543588180727	12	~2018
90600460991	181200921983	12	~2017
90601260383	181202520767	12	~2017
90606667223	181213334447	12	~2017
90610848299	181221696599	12	~2017
90612907381	543677444287	12	~2018
90618801551	181237603103	12	~2017
90620472311	724963778489	12	~2018
90621799979	181243599959	12	~2017
90623256673	543739540039	12	~2018
90639307679	181278615359	12	~2017
90642263111	181284526223	12	~2017
90653675699	181307351399	12	~2017
90657459131	181314918263	12	~2017
90658738673	543952432039	12	~2018
90664114187	725312913497	12	~2018
90669916019	181339832039	12	~2017
90676230383	181352460767	12	~2017
90677442203	181354884407	12	~2017
90682765163	181365530327	12	~2017

Exponent	Prime Factor	Dig.	Year
90685031303	181370062607	12	~2017
90688180657	544129083943	12	~2018
90692943623	181385887247	12	~2017
90696946757	544181680543	12	~2018
90703352123	181406704247	12	~2017
90713186771	181426373543	12	~2017
90713232251	181426464503	12	~2017
90721002059	181442004119	12	~2017
90721182731	181442365463	12	~2017
90731599823	181463199647	12	~2017
90731872331	181463744663	12	~2017
90736224941	544417349647	12	~2018
90740467397	544442804383	12	~2018
90751972691	181503945383	12	~2017
90753824519	181507649039	12	~2017
90754848479	181509696959	12	~2017
90775435043	181550870087	12	~2017
90779840219	181559680439	12	~2017
90779928623	181559857247	12	~2017
90780745871	181561491743	12	~2017
90788971943	181577943887	12	~2017
90790355339	181580710679	12	~2017
90808022423	181616044847	12	~2017
90808346009	726466768073	12	~2018
90811198391	2633...533391	14	2024

Exponent	Prime Factor	Dig.	Year
90813260003	181626520007	12	~2017
90818290151	181636580303	12	~2017
90820171523	181640343047	12	~2017
90825723083	181651446167	12	~2017
90827585951	181655171903	12	~2017
90828993239	181657986479	12	~2017
90829176143	181658352287	12	~2017
90832631177	726661049417	12	~2018
90841190963	181682381927	12	~2017
90843026033	545058156199	12	~2018
90847114331	181694228663	12	~2017
90847772303	181695544607	12	~2017
90851249999	181702499999	12	~2017
90853467311	181706934623	12	~2017
90860674211	181721348423	12	~2017
90864269429	726914155433	12	~2018
90864787463	181729574927	12	~2017
90867197521	545203185127	12	~2018
90876025391	181752050783	12	~2017
90888005363	181776010727	12	~2017
90888183803	181776367607	12	~2017
90890322839	727122582713	12	~2018
90896437559	181792875119	12	~2017
90898159577	727185276617	12	~2018
90899639177	545397835063	12	~2018

Exponent	Prime Factor	Dig.	Year
90900047159	181800094319	12	~2017
90904923503	181809847007	12	~2017
90905893751	181811787503	12	~2017
90910536911	181821073823	12	~2017
90912859643	181825719287	12	~2017
90912978433	545477870599	12	~2018
90917271877	545503631263	12	~2018
90917634959	181835269919	12	~2017
90919920263	181839840527	12	~2017
90919956601	545519739607	12	~2018
90921366059	181842732119	12	~2017
90921652477	545529914863	12	~2018
90922286951	181844573903	12	~2017
90923824451	181847648903	12	~2017
90924229127	727393833017	12	~2018
90925021157	545550126943	12	~2018
90927600193	545565601159	12	~2018
90931027283	181862054567	12	~2017
90937370519	181874741039	12	~2017
90939999431	181879998863	12	~2017
90957071501	545742429007	12	~2018
90960927119	181921854239	12	~2017
90961422371	181922844743	12	~2017
90964224059	727713792473	12	~2018
90966522323	181933044647	12	~2017

4.888.230 digits

25-06-29