Small Mersenne Prime Factors (page 5038/5850)

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
16550487059	33100974119	11	~2011
16550721871	165507218711	12	~2013
16551467111	33102934223	11	~2011
16551556169	496546685071	12	~2014
16551783719	33103567439	11	~2011
16551786239	33103572479	11	~2011
16551865223	33103730447	11	~2011
16551942779	33103885559	11	~2011
16552167431	33104334863	11	~2011
16552663499	33105326999	11	~2011
16554650939	33109301879	11	~2011
16555065871	165550658711	12	~2013
16555247459	33110494919	11	~2011
16555594031	33111188063	11	~2011
16556330639	33112661279	11	~2011
16557218857	99343313143	11	~2012
16557885319	165578853191	12	~2013
16558481603	33116963207	11	~2011
16558669343	33117338687	11	~2011
16558897703	33117795407	11	~2011
16559120339	33118240679	11	~2011
16559545763	33119091527	11	~2011
16560662893	364334583647	12	~2013
16561016743	165610167431	12	~2013
16561121587	165611215871	12	~2013

Exponent	Prime Factor	Dig.	Year
16561524383	33123048767	11	~2011
16562392261	99374353567	11	~2012
16562409971	33124819943	11	~2011
16562522519	33125045039	11	~2011
16563195721	364390305863	12	~2013
16563475451	33126950903	11	~2011
16564526897	99387161383	11	~2012
16564816739	33129633479	11	~2011
16565090651	33130181303	11	~2011
16565209931	33130419863	11	~2011
16566258503	33132517007	11	~2011
16566403979	33132807959	11	~2011
16567204691	33134409383	11	~2011
16568498183	33136996367	11	~2011
16568764981	265100239697	12	~2013
16568966951	33137933903	11	~2011
16569527231	33139054463	11	~2011
16569839711	33139679423	11	~2011
16570184483	33140368967	11	~2011
16571241839	33142483679	11	~2011
16571644577	99429867463	11	~2012
16573805999	33147611999	11	~2011
16575448943	33150897887	11	~2011
16575671597	99454029583	11	~2012
16576315279	165763152791	12	~2013

Exponent	Prime Factor	Dig.	Year
16577367419	33154734839	11	~2011
16577467079	33154934159	11	~2011
16577661377	99465968263	11	~2012
16577844947	298401209047	12	~2013
16578817751	33157635503	11	~2011
16579209431	33158418863	11	~2011
16579408787	132635270297	12	~2012
16579922939	33159845879	11	~2011
16579934699	33159869399	11	~2011
16580135303	33160270607	11	~2011
16580359871	33160719743	11	~2011
16580699461	364775388143	12	~2013
16581952571	33163905143	11	~2011
16583041649	795985999153	12	~2014
16583431811	33166863623	11	~2011
16583468519	33166937039	11	~2011
16584243947	132673951577	12	~2012
16584472901	99506837407	11	~2012
16585512683	33171025367	11	~2011
16585854371	33171708743	11	~2011
16585915919	33171831839	11	~2011
16586050277	99516301663	11	~2012
16586511659	33173023319	11	~2011
16586827703	33173655407	11	~2011
16587188399	33174376799	11	~2011

Exponent	Prime Factor	Dig.	Year
16587873671	33175747343	11	~2011
16587920737	99527524423	11	~2012
16588319921	99529919527	11	~2012
16588474481	99530846887	11	~2012
16588767269	132710138153	12	~2012
16589926343	33179852687	11	~2011
16591629311	33183258623	11	~2011
16593752699	33187505399	11	~2011
16593941911	298690954399	12	~2013
16595816999	33191633999	11	~2011
16596361739	33192723479	11	~2011
16596494549	132771956393	12	~2012
16596633983	33193267967	11	~2011
16596846923	33193693847	11	~2011
16596980431	165969804311	12	~2013
16597578479	33195156959	11	~2011
16598292083	33196584167	11	~2011
16598476637	2851...862367	14	2024
16598484443	33196968887	11	~2011
16598741189	232382376647	12	~2013
16598830453	99592982719	11	~2012
16599058139	33198116279	11	~2011
16599373067	132794984537	12	~2012
16600145977	99600875863	11	~2012
16600396859	33200793719	11	~2011

5.546.121 digits

26-05-03