Small Mersenne Prime Factors (page 4431/5070)

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
16963221557	101779329343	12	~2012
16963912243	169639122431	12	~2013
16964386981	101786321887	12	~2012
16964497223	33928994447	11	~2011
16964690783	33929381567	11	~2011
16964763239	33929526479	11	~2011
16966059431	33932118863	11	~2011
16966380779	33932761559	11	~2011
16966770179	33933540359	11	~2011
16967265233	101803591399	12	~2012
16967931671	33935863343	11	~2011
16968663983	33937327967	11	~2011
16969208783	33938417567	11	~2011
16969630019	33939260039	11	~2011
16969839479	33939678959	11	~2011
16970098331	33940196663	11	~2011
16970728409	135765827273	12	~2012
16971157331	33942314663	11	~2011
16971720971	33943441943	11	~2011
16973731091	33947462183	11	~2011
16973759051	33947518103	11	~2011
16975101893	237651426503	12	~2013
16975170983	33950341967	11	~2011
16975364963	33950729927	11	~2011
16975762019	33951524039	11	~2011

Exponent	Prime Factor	Dig.	Year
16976186891	33952373783	11	~2011
16976523299	33953046599	11	~2011
16976620207	169766202071	12	~2013
16977428939	33954857879	11	~2011
16978237343	33956474687	11	~2011
16979209003	169792090031	12	~2013
16979359979	33958719959	11	~2011
16979686859	33959373719	11	~2011
16980146663	33960293327	11	~2011
16980352897	101882117383	12	~2012
16980757657	101884545943	12	~2012
16980815339	33961630679	11	~2011
16982139959	33964279919	11	~2011
16982207591	33964415183	11	~2011
16982653703	33965307407	11	~2011
16983510023	33967020047	11	~2011
16984972019	33969944039	11	~2011
16984993799	33969987599	11	~2011
16986095039	33972190079	11	~2011
16986183299	33972366599	11	~2011
16986941423	33973882847	11	~2011
16987250183	33974500367	11	~2011
16988592479	33977184959	11	~2011
16988673907	679546956281	12	~2014
16989065297	237846914159	12	~2013

Exponent	Prime Factor	Dig.	Year
16989300299	33978600599	11	~2011
16989335351	33978670703	11	~2011
16989564829	407749555897	12	~2014
16991041819	407785003657	12	~2014
16991264131	271860226097	12	~2013
16993063523	33986127047	11	~2011
16993842023	33987684047	11	~2011
16994248933	101965493599	12	~2012
16995832631	33991665263	11	~2011
16996407671	135971261369	12	~2012
16997748671	33995497343	11	~2011
16997850257	101987101543	12	~2012
16998868559	33997737119	11	~2011
16999799879	33999599759	11	~2011
16999856411	33999712823	11	~2011
17000118119	34000236239	11	~2011
17001186599	34002373199	11	~2011
17001743651	34003487303	11	~2011
17001997079	34003994159	11	~2011
17002495859	34004991719	11	~2011
17002947323	34005894647	11	~2011
17003166143	34006332287	11	~2011
17006365913	4703...115359	14	2023
17006770973	102040625839	12	~2012
17006837137	102041022823	12	~2012

Exponent	Prime Factor	Dig.	Year
17007311063	34014622127	11	~2011
17007342251	34014684503	11	~2011
17007723311	34015446623	11	~2011
17009157901	374201473823	12	~2013
17009860163	34019720327	11	~2011
17010322523	34020645047	11	~2011
17010707891	34021415783	11	~2011
17011867679	34023735359	11	~2011
17012912459	34025824919	11	~2011
17013297551	34026595103	11	~2011
17014252163	34028504327	11	~2011
17015221739	34030443479	11	~2011
17015293343	34030586687	11	~2011
17015684243	34031368487	11	~2011
17016155531	34032311063	11	~2011
17016323279	34032646559	11	~2011
17017087151	442444265927	12	~2014
17017406303	34034812607	11	~2011
17017577543	34035155087	11	~2011
17018576539	408445836937	12	~2014
17018982359	136151858873	12	~2012
17019185201	102115111207	12	~2012
17020574531	34041149063	11	~2011
17020915501	102125493007	12	~2012
17021901727	272350427633	12	~2013

4.768.925 digits

25-05-04