Small Mersenne Prime Factors (page 4583/5235)

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
18257791523	36515583047	11	~2011
18257793083	36515586167	11	~2011
18258301811	36516603623	11	~2011
18258391499	36516782999	11	~2011
18258822503	36517645007	11	~2011
18259702319	36519404639	11	~2011
18260236031	36520472063	11	~2011
18261369983	766977539287	12	~2014
18262142231	36524284463	11	~2011
18262630031	36525260063	11	~2011
18262863467	1932...548087	14	2023
18263174701	109579048207	12	~2012
18264039179	36528078359	11	~2011
18264077963	36528155927	11	~2011
18264202283	36528404567	11	~2011
18264266483	36528532967	11	~2011
18264857843	36529715687	11	~2011
18265382123	36530764247	11	~2011
18266308507	182663085071	12	~2013
18267578969	255746105567	12	~2013
18267716723	36535433447	11	~2011
18268123123	182681231231	12	~2013
18268164671	36536329343	11	~2011
18269201609	146153612873	12	~2013
18270835619	36541671239	11	~2011

Exponent	Prime Factor	Dig.	Year
18271273739	36542547479	11	~2011
18271356683	36542713367	11	~2011
18272773619	36545547239	11	~2011
18273786689	255833013647	12	~2013
18273994631	36547989263	11	~2011
18275160919	182751609191	12	~2013
18275197093	109651182559	12	~2012
18276183791	36552367583	11	~2011
18278448983	36556897967	11	~2011
18278980211	36557960423	11	~2011
18280084301	146240674409	12	~2013
18280460171	36560920343	11	~2011
18280535291	36561070583	11	~2011
18284145749	146273165993	12	~2013
18284229059	36568458119	11	~2011
18284814071	36569628143	11	~2011
18285257891	36570515783	11	~2011
18286314743	36572629487	11	~2011
18286589017	109719534103	12	~2012
18287216357	109723298143	12	~2012
18287279891	36574559783	11	~2011
18287446379	36574892759	11	~2011
18287631539	36575263079	11	~2011
18289675619	36579351239	11	~2011
18290634311	36581268623	11	~2011

Exponent	Prime Factor	Dig.	Year
18290771399	36581542799	11	~2011
18290909599	182909095991	12	~2013
18291048593	109746291559	12	~2012
18291161783	36582323567	11	~2011
18291960623	36583921247	11	~2011
18292483739	36584967479	11	~2011
18294058859	36588117719	11	~2011
18294651161	109767906967	12	~2012
18295596779	36591193559	11	~2011
18296283053	109777698319	12	~2012
18296431019	36592862039	11	~2011
18296480459	36592960919	11	~2011
18296706023	36593412047	11	~2011
18298016279	36596032559	11	~2011
18298866191	36597732383	11	~2011
18299580059	36599160119	11	~2011
18300056111	36600112223	11	~2011
18301170791	36602341583	11	~2011
18301227299	36602454599	11	~2011
18301360529	146410884233	12	~2013
18302266883	36604533767	11	~2011
18303433283	36606866567	11	~2011
18303656653	402680446367	12	~2014
18303813023	36607626047	11	~2011
18303954803	36607909607	11	~2011

Exponent	Prime Factor	Dig.	Year
18304221959	36608443919	11	~2011
18304415471	36608830943	11	~2011
18305743783	292891900529	12	~2013
18305936339	36611872679	11	~2011
18306105491	36612210983	11	~2011
18306261371	36612522743	11	~2011
18307384453	292918151249	12	~2013
18307410269	585837128609	12	~2014
18307697887	183076978871	12	~2013
18308090519	36616181039	11	~2011
18308539919	36617079839	11	~2011
18308547599	36617095199	11	~2011
18308691769	402791218919	12	~2014
18309021323	36618042647	11	~2011
18309332999	439423991977	12	~2014
18309390569	146475124553	12	~2013
18309502331	36619004663	11	~2011
18309570791	36619141583	11	~2011
18309756457	109858538743	12	~2012
18310146203	36620292407	11	~2011
18311883851	36623767703	11	~2011
18312597521	146500780169	12	~2013
18313403819	36626807639	11	~2011
18313859363	36627718727	11	~2011
18315589403	36631178807	11	~2011

4.933.056 digits

25-07-20