Small Mersenne Prime Factors (page 4831/5025)

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
109671698771	219343397543	12	~2017
109684133231	219368266463	12	~2017
109685951321	658115707927	12	~2018
109690660223	219381320447	12	~2017
109694309723	219388619447	12	~2017
109711486799	219422973599	12	~2017
109718212739	219436425479	12	~2017
109718674379	219437348759	12	~2017
109719228431	219438456863	12	~2017
109719419951	219438839903	12	~2017
109725339023	219450678047	12	~2017
109730946023	219461892047	12	~2017
109737595403	219475190807	12	~2017
109751882699	219503765399	12	~2017
109754610359	219509220719	12	~2017
109756889843	219513779687	12	~2017
109759396273	4456...886839	14	2023
109772789449	1025...345367	15	2023
109773826091	219547652183	12	~2017
109782622919	219565245839	12	~2017
109782959651	219565919303	12	~2017
109796640539	219593281079	12	~2017
109797215873	658783295239	12	~2018
109805872139	2980...985247	15	2023
109807807619	219615615239	12	~2017

Exponent	Prime Factor	Dig.	Year
109812452063	219624904127	12	~2017
109825641083	219651282167	12	~2017
109834248791	219668497583	12	~2017
109834879733	659009278399	12	~2018
109845703559	219691407119	12	~2017
109846074791	219692149583	12	~2017
109852596011	219705192023	12	~2017
109854161243	219708322487	12	~2017
109858139003	219716278007	12	~2017
109863430643	219726861287	12	~2017
109868411171	219736822343	12	~2017
109874496983	219748993967	12	~2017
109884658511	219769317023	12	~2017
109887032231	219774064463	12	~2017
109887142217	659322853303	12	~2018
109889466191	219778932383	12	~2017
109891674611	219783349223	12	~2017
109916808193	659500849159	12	~2018
109930971719	219861943439	12	~2017
109938203929	2440...272239	14	2024
109944538897	659667233383	12	~2018
109945952219	219891904439	12	~2017
109962500471	219925000943	12	~2017
109971024563	219942049127	12	~2017
109987044263	219974088527	12	~2017

Exponent	Prime Factor	Dig.	Year
109990508809	1819...570087	15	2024
109991400119	219982800239	12	~2017
109996505903	219993011807	12	~2017
110006019251	220012038503	12	~2017
110009144321	2992...255313	14	2024
110015520311	220031040623	12	~2017
110021029277	660126175663	12	~2018
110027357969	3850...289151	14	2023
110036242837	1103...655111	16	2025
110038733699	220077467399	12	~2017
110042944211	220085888423	12	~2017
110043192577	660259155463	12	~2018
110045339279	220090678559	12	~2017
110049767543	220099535087	12	~2017
110057953931	220115907863	12	~2017
110059282121	2729...966009	14	2024
110059335923	220118671847	12	~2017
110064265991	220128531983	12	~2017
110066368211	220132736423	12	~2017
110069945939	220139891879	12	~2017
110070323843	220140647687	12	~2017
110073066179	220146132359	12	~2017
110083206683	220166413367	12	~2017
110111169299	220222338599	12	~2017
110132611139	220265222279	12	~2017

Exponent	Prime Factor	Dig.	Year
110135298461	660811790767	12	~2018
110136092351	220272184703	12	~2017
110145264731	1844...185327	16	2025
110147601803	220295203607	12	~2017
110180346491	220360692983	12	~2017
110185383263	220370766527	12	~2017
110191120859	220382241719	12	~2017
110191440433	661148642599	12	~2018
110195097497	661170584983	12	~2018
110195995223	220391990447	12	~2017
110196453743	220392907487	12	~2017
110200726739	220401453479	12	~2017
110201862053	661211172319	12	~2018
110202999323	220405998647	12	~2017
110203393031	220406786063	12	~2017
110214266171	220428532343	12	~2017
110215965791	220431931583	12	~2017
110226566903	220453133807	12	~2017
110232922823	220465845647	12	~2017
110243389577	661460337463	12	~2018
110243570831	220487141663	12	~2017
110255807113	661534842679	12	~2018
110259536771	220519073543	12	~2017
110260629191	220521258383	12	~2017
110265045479	220530090959	12	~2017

4.724.182 digits

25-04-13