Small Mersenne Prime Factors (page 5429/5775)

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
79076601731	158153203463	12	~2016
79077095963	158154191927	12	~2016
79080042593	474480255559	12	~2017
79081289561	632650316489	12	~2018
79082496323	3283...733097	15	2023
79083569581	474501417487	12	~2017
79084026779	158168053559	12	~2016
79095953483	158191906967	12	~2016
79096378583	158192757167	12	~2016
79102832909	632822663273	12	~2018
79104023051	158208046103	12	~2016
79105094303	158210188607	12	~2016
79107075563	158214151127	12	~2016
79114421039	632915368313	12	~2018
79118544971	158237089943	12	~2016
79121407031	158242814063	12	~2016
79121807197	474730843183	12	~2017
79122785311	791227853111	12	~2018
79123358423	158246716847	12	~2016
79124508731	158249017463	12	~2016
79127765243	158255530487	12	~2016
79128530639	158257061279	12	~2016
79130597591	633044780729	12	~2018
79133702723	158267405447	12	~2016
79133713937	633069711497	12	~2018

Exponent	Prime Factor	Dig.	Year
79147494911	158294989823	12	~2016
79153526051	158307052103	12	~2016
79162067357	633296538857	12	~2018
79162327883	158324655767	12	~2016
79163895451	791638954511	12	~2018
79165469909	633323759273	12	~2018
79166525609	633332204873	12	~2018
79168259759	158336519519	12	~2016
79170940763	158341881527	12	~2016
79173839117	475043034703	12	~2017
79179521471	158359042943	12	~2016
79185106193	475110637159	12	~2017
79185853181	633486825449	12	~2018
79194609863	158389219727	12	~2016
79196065379	158392130759	12	~2016
79198265039	158396530079	12	~2016
79199386979	158398773959	12	~2016
79202530163	158405060327	12	~2016
79202759771	158405519543	12	~2016
79204617731	158409235463	12	~2016
79209001649	633672013193	12	~2018
79218516259	792185162591	12	~2018
79225099703	158450199407	12	~2016
79231011131	158462022263	12	~2016
79235264021	475411584127	12	~2017

Exponent	Prime Factor	Dig.	Year
79235726123	158471452247	12	~2016
79238522483	158477044967	12	~2016
79240040521	475440243127	12	~2017
79251600971	158503201943	12	~2016
79255652243	158511304487	12	~2016
79257509183	158515018367	12	~2016
79268613839	158537227679	12	~2016
79269275159	158538550319	12	~2016
79269657899	158539315799	12	~2016
79270686083	158541372167	12	~2016
79276872203	158553744407	12	~2016
79281346223	158562692447	12	~2016
79284112771	792841127711	12	~2018
79287652343	158575304687	12	~2016
79289641943	158579283887	12	~2016
79291153703	158582307407	12	~2016
79292286539	158584573079	12	~2016
79297330583	158594661167	12	~2016
79298715719	158597431439	12	~2016
79303462859	634427702873	12	~2018
79305654839	158611309679	12	~2016
79309284563	158618569127	12	~2016
79315537043	158631074087	12	~2016
79317894443	158635788887	12	~2016
79324543643	158649087287	12	~2016

Exponent	Prime Factor	Dig.	Year
79325502587	634604020697	12	~2018
79326348551	158652697103	12	~2016
79330477601	634643820809	12	~2018
79334629943	158669259887	12	~2016
79335292031	158670584063	12	~2016
79339229591	158678459183	12	~2016
79346380571	634771044569	12	~2018
79347094103	158694188207	12	~2016
79348073939	158696147879	12	~2016
79348483213	476090899279	12	~2017
79353100523	158706201047	12	~2016
79353676019	158707352039	12	~2016
79359599183	158719198367	12	~2016
79362130271	158724260543	12	~2016
79365639791	158731279583	12	~2016
79367629501	476205777007	12	~2017
79369446011	158738892023	12	~2016
79370156951	158740313903	12	~2016
79371598451	158743196903	12	~2016
79373500691	158747001383	12	~2016
79375516043	158751032087	12	~2016
79378616099	158757232199	12	~2016
79380502193	476283013159	12	~2017
79385127119	158770254239	12	~2016
79386817061	476320902367	12	~2017

5.471.290 digits

26-03-29