Small Mersenne Prime Factors (page 5527/5790)

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
111669989471	223339978943	12	~2017
111677889731	223355779463	12	~2017
111682209137	670093254823	12	~2018
111685192379	223370384759	12	~2017
111685524803	223371049607	12	~2017
111686654039	223373308079	12	~2017
111688252681	670129516087	12	~2018
111690392123	223380784247	12	~2017
111698447123	223396894247	12	~2017
111705014303	223410028607	12	~2017
111712191917	670273151503	12	~2018
111712497551	223424995103	12	~2017
111716014229	893728113833	12	~2019
111719337623	223438675247	12	~2017
111721858373	670331150239	12	~2018
111725321639	893802573113	12	~2019
111728050081	670368300487	12	~2018
111733485599	223466971199	12	~2017
111734815403	223469630807	12	~2017
111736152491	223472304983	12	~2017
111738926483	223477852967	12	~2017
111740368991	223480737983	12	~2017
111741858671	223483717343	12	~2017
111760466459	223520932919	12	~2017
111765019739	223530039479	12	~2017

Exponent	Prime Factor	Dig.	Year
111765067949	894120543593	12	~2019
111770991851	223541983703	12	~2017
111774895163	223549790327	12	~2017
111778384979	223556769959	12	~2017
111785557151	223571114303	12	~2017
111786472619	894291780953	12	~2019
111793545373	670761272239	12	~2019
111796704119	223593408239	12	~2017
111801055427	894408443417	12	~2019
111803521031	223607042063	12	~2017
111805903019	223611806039	12	~2017
111808502471	223617004943	12	~2017
111810685631	223621371263	12	~2017
111812723257	670876339543	12	~2019
111826709213	670960255279	12	~2019
111827025311	223654050623	12	~2017
111831011543	223662023087	12	~2017
111835732031	223671464063	12	~2017
111844305851	223688611703	12	~2017
111846297611	223692595223	12	~2017
111853024093	671118144559	12	~2019
111854864063	223709728127	12	~2017
111862990439	223725980879	12	~2017
111870141983	223740283967	12	~2017
111874033391	223748066783	12	~2017

Exponent	Prime Factor	Dig.	Year
111874871351	223749742703	12	~2017
111881440523	223762881047	12	~2017
111888643091	895109144729	12	~2019
111889584563	7720...348471	14	2026
111896268839	223792537679	12	~2017
111900031163	223800062327	12	~2017
111903645719	223807291439	12	~2017
111906590063	223813180127	12	~2017
111911710333	671470261999	12	~2019
111914774393	671488646359	12	~2019
111917942561	671507655367	12	~2019
111920080619	895360644953	12	~2019
111921724619	223843449239	12	~2017
111924264923	223848529847	12	~2017
111926001763	2417...380809	14	2024
111926366939	223852733879	12	~2017
111930570491	223861140983	12	~2017
111931278143	223862556287	12	~2017
111931847039	223863694079	12	~2017
111935480099	223870960199	12	~2017
111938588123	223877176247	12	~2017
111955404917	671732429503	12	~2019
111961458551	223922917103	12	~2017
111961724363	3835...667639	15	2023
111965288951	223930577903	12	~2017

Exponent	Prime Factor	Dig.	Year
111965551979	223931103959	12	~2017
111966963401	671801780407	12	~2019
111969630659	223939261319	12	~2017
111984211931	223968423863	12	~2017
111985112353	671910674119	12	~2019
111992229911	223984459823	12	~2017
111995877299	223991754599	12	~2017
111996293963	223992587927	12	~2017
111997876979	223995753959	12	~2017
111998440751	223996881503	12	~2017
112000523653	672003141919	12	~2019
112005877681	672035266087	12	~2019
112017619919	224035239839	12	~2017
112028650313	672171901879	12	~2019
112029971939	224059943879	12	~2017
112036692479	224073384959	12	~2017
112038658883	224077317767	12	~2017
112045289903	224090579807	12	~2017
112045659419	224091318839	12	~2017
112048556111	224097112223	12	~2017
112048852319	224097704639	12	~2017
112049830897	672298985383	12	~2019
112051194791	224102389583	12	~2017
112057054337	896456434697	12	~2019
112058077283	224116154567	12	~2017

5.486.313 digits

26-04-05