Small Mersenne Prime Factors (page 4517/5190)

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
16398128837	98388773023	11	~2012
16399320719	32798641439	11	~2011
16400722883	32801445767	11	~2011
16401049799	32802099599	11	~2011
16401226091	131209808729	12	~2012
16403316491	32806632983	11	~2011
16403421271	164034212711	12	~2013
16403436541	262454984657	12	~2013
16403855053	98423130319	11	~2012
16404056737	98424340423	11	~2012
16404534599	131236276793	12	~2012
16406241287	6657...142647	14	2024
16406576309	229692068327	12	~2013
16407938207	131263505657	12	~2012
16408000457	131264003657	12	~2012
16408462181	98450773087	11	~2012
16408633229	131269065833	12	~2012
16409841817	787672407217	12	~2014
16411211711	32822423423	11	~2011
16411673363	32823346727	11	~2011
16412336593	98474019559	11	~2012
16413101651	32826203303	11	~2011
16413149947	164131499471	12	~2013
16414012141	262624194257	12	~2013
16414426103	32828852207	11	~2011

Exponent	Prime Factor	Dig.	Year
16414718779	393953250697	12	~2013
16415999219	295487985943	12	~2013
16416067931	131328543449	12	~2012
16416397979	32832795959	11	~2011
16417427381	98504564287	11	~2012
16418642183	32837284367	11	~2011
16418745727	164187457271	12	~2013
16418872559	32837745119	11	~2011
16418987723	32837975447	11	~2011
16419234479	32838468959	11	~2011
16419278641	98515671847	11	~2012
16419675299	295554155383	12	~2013
16419699743	32839399487	11	~2011
16420381193	98522287159	11	~2012
16420945763	32841891527	11	~2011
16421907311	131375258489	12	~2012
16422016823	32844033647	11	~2011
16422625031	32845250063	11	~2011
16423154057	98538924343	11	~2012
16424387099	32848774199	11	~2011
16424606531	32849213063	11	~2011
16424786831	32849573663	11	~2011
16425600677	131404805417	12	~2012
16426921943	394246126633	12	~2013
16427595143	32855190287	11	~2011

Exponent	Prime Factor	Dig.	Year
16427897777	98567386663	11	~2012
16429209497	394301027929	12	~2013
16429234501	1209...592737	14	2023
16429662989	131437303913	12	~2012
16430649071	32861298143	11	~2011
16430800979	32861601959	11	~2011
16431210359	32862420719	11	~2011
16431358739	32862717479	11	~2011
16432835033	98597010199	11	~2012
16433078471	32866156943	11	~2011
16433495891	32866991783	11	~2011
16434271979	32868543959	11	~2011
16436045819	32872091639	11	~2011
16437049313	98622295879	11	~2012
16437126011	32874252023	11	~2011
16438052957	131504423657	12	~2012
16438299239	32876598479	11	~2011
16439276173	98635657039	11	~2012
16440525239	32881050479	11	~2011
16440632963	32881265927	11	~2011
16440716639	32881433279	11	~2011
16440809051	32881618103	11	~2011
16440914473	98645486839	11	~2012
16441644899	32883289799	11	~2011
16442100329	230189404607	12	~2013

Exponent	Prime Factor	Dig.	Year
16442668163	32885336327	11	~2011
16442710357	98656262143	11	~2012
16442849231	32885698463	11	~2011
16443302159	32886604319	11	~2011
16443761011	164437610111	12	~2013
16443785713	98662714279	11	~2012
16444082939	32888165879	11	~2011
16446519539	32893039079	11	~2011
16447803791	32895607583	11	~2011
16447827059	32895654119	11	~2011
16447989539	131583916313	12	~2012
16448250491	32896500983	11	~2011
16449571001	98697426007	11	~2012
16449677399	32899354799	11	~2011
16450176719	32900353439	11	~2011
16450714681	98704288087	11	~2012
16451065199	32902130399	11	~2011
16451247899	32902495799	11	~2011
16451710763	32903421527	11	~2011
16453469003	32906938007	11	~2011
16453899029	131631192233	12	~2012
16454156717	230358194039	12	~2013
16454347631	32908695263	11	~2011
16454732579	32909465159	11	~2011
16454805119	131638440953	12	~2012

4.888.230 digits

25-06-29