Small Mersenne Prime Factors (page 4492/5070)

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
21181462901	127088777407	12	~2013
21181941611	42363883223	11	~2012
21182668607	169461348857	12	~2013
21183800243	42367600487	11	~2012
21184571099	42369142199	11	~2012
21186593783	42373187567	11	~2012
21188749259	42377498519	11	~2012
21188801999	42377603999	11	~2012
21190373591	42380747183	11	~2012
21190759643	42381519287	11	~2012
21191202199	1169...613849	14	2023
21191739539	42383479079	11	~2012
21192223631	42384447263	11	~2012
21193006379	42386012759	11	~2012
21193015889	508632381337	12	~2014
21193160459	42386320919	11	~2012
21193771919	42387543839	11	~2012
21193776179	42387552359	11	~2012
21196201979	42392403959	11	~2012
21196317203	42392634407	11	~2012
21196494383	42392988767	11	~2012
21196497547	211964975471	12	~2013
21196869971	42393739943	11	~2012
21196916849	169575334793	12	~2013
21198024791	42396049583	11	~2012

Exponent	Prime Factor	Dig.	Year
21199984783	211999847831	12	~2013
21200416781	127202500687	12	~2013
21200579333	296808110663	12	~2014
21200738759	42401477519	11	~2012
21201197051	42402394103	11	~2012
21202248077	127213488463	12	~2013
21202472111	42404944223	11	~2012
21202615751	42405231503	11	~2012
21202960799	42405921599	11	~2012
21203333171	42406666343	11	~2012
21204836503	212048365031	12	~2013
21205010353	127230062119	12	~2013
21206964923	42413929847	11	~2012
21207993143	42415986287	11	~2012
21208539479	42417078959	11	~2012
21209044931	42418089863	11	~2012
21209465411	42418930823	11	~2012
21210903419	42421806839	11	~2012
21211625723	42423251447	11	~2012
21211627403	42423254807	11	~2012
21212799917	169702399337	12	~2013
21213762959	42427525919	11	~2012
21213885299	42427770599	11	~2012
21214738283	42429476567	11	~2012
21215005433	127290032599	12	~2013

Exponent	Prime Factor	Dig.	Year
21215028089	1425...875809	14	2023
21215339231	42430678463	11	~2012
21217115939	169736927513	12	~2013
21217968437	297051558119	12	~2014
21219109211	42438218423	11	~2012
21219793403	42439586807	11	~2012
21220966271	42441932543	11	~2012
21221652323	42443304647	11	~2012
21221815211	42443630423	11	~2012
21222888623	42445777247	11	~2012
21224504663	42449009327	11	~2012
21224671337	127348028023	12	~2013
21225485279	509411646697	12	~2014
21225532931	42451065863	11	~2012
21226616231	42453232463	11	~2012
21226705859	42453411719	11	~2012
21227031101	127362186607	12	~2013
21227633579	42455267159	11	~2012
21227788783	339644620529	12	~2014
21228146399	42456292799	11	~2012
21229420703	42458841407	11	~2012
21231498779	42462997559	11	~2012
21232161719	42464323439	11	~2012
21232548791	42465097583	11	~2012
21233232359	679463435489	12	~2015

Exponent	Prime Factor	Dig.	Year
21233631131	42467262263	11	~2012
21233757731	42467515463	11	~2012
21233797859	42467595719	11	~2012
21234221231	42468442463	11	~2012
21237263843	42474527687	11	~2012
21238175363	42476350727	11	~2012
21238644677	169909157417	12	~2013
21240065351	42480130703	11	~2012
21240142093	339842273489	12	~2014
21241474777	127448848663	12	~2013
21242803259	42485606519	11	~2012
21243911963	42487823927	11	~2012
21244800443	42489600887	11	~2012
21244845179	42489690359	11	~2012
21244959779	42489919559	11	~2012
21245515283	42491030567	11	~2012
21245519363	42491038727	11	~2012
21246222983	42492445967	11	~2012
21247644841	127485869047	12	~2013
21248453771	42496907543	11	~2012
21249910301	127499461807	12	~2013
21250148651	42500297303	11	~2012
21250656299	510015751177	12	~2014
21252216983	42504433967	11	~2012
21253155743	42506311487	11	~2012

4.768.925 digits

25-05-04