Small Mersenne Prime Factors (page 3819/5145)

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	Digits	Year
2085066359	16680530873	11	~2005
2085085199	4170170399	10	~2004
2085086639	4170173279	10	~2004
2085251657	12511509943	11	~2005
2085275561	16682204489	11	~2005
2085444721	12512668327	11	~2005
2085448919	4170897839	10	~2004
2085637943	4171275887	10	~2004
2085647519	4171295039	10	~2004
2085685799	4171371599	10	~2004
2085725821	12514354927	11	~2005
2085918143	4171836287	10	~2004
2085929047	33374864753	11	~2006
2086039789	646672334591	12	~2009
2086111343	4172222687	10	~2004
2086205963	4172411927	10	~2004
2086431163	20864311631	11	~2005
2086480199	4172960399	10	~2004
2086482119	4172964239	10	~2004
2086570991	4173141983	10	~2004
2086602989	16692823913	11	~2005
2086631639	4173263279	10	~2004
2086675919	4173351839	10	~2004
2086680803	4173361607	10	~2004
2086689323	4173378647	10	~2004

Exponent	Prime Factor	Digits	Year
2086805711	4173611423	10	~2004
2086879859	4173759719	10	~2004
2087042443	20870424431	11	~2005
2087198497	12523190983	11	~2005
2087306939	4174613879	10	~2004
2087316323	4174632647	10	~2004
2087413271	4174826543	10	~2004
2087465183	4174930367	10	~2004
2087491859	4174983719	10	~2004
2087499311	4174998623	10	~2004
2087632103	4175264207	10	~2004
2087712437	12526274623	11	~2005
2087718209	16701745673	11	~2005
2087746763	4175493527	10	~2004
2087877941	12527267647	11	~2005
2088064571	4176129143	10	~2004
2088147973	33410367569	11	~2006
2088392291	4176784583	10	~2004
2088407437	50121778489	11	~2006
2088490751	4176981503	10	~2004
2088512593	12531075559	11	~2005
2088575939	4177151879	10	~2004
2088578039	16708624313	11	~2005
2088636533	167090922641	12	~2008
2088664859	4177329719	10	~2004

Exponent	Prime Factor	Digits	Year
2088761579	104438078951	12	~2007
2088889219	20888892191	11	~2006
2088894851	4177789703	10	~2004
2088937451	4177874903	10	~2004
2088951503	4177903007	10	~2004
2088961943	4177923887	10	~2004
2088984827	37601726887	11	~2006
2089120931	4178241863	10	~2004
2089188617	12535131703	11	~2005
2089288199	4178576399	10	~2004
2089300859	4178601719	10	~2004
2089316783	4178633567	10	~2004
2089358963	4178717927	10	~2004
2089394057	12536364343	11	~2005
2089565059	20895650591	11	~2006
2089674577	12538047463	11	~2005
2089695551	4179391103	10	~2004
2089722863	4179445727	10	~2004
2089735859	4179471719	10	~2004
2089808459	4179616919	10	~2004
2089871783	4179743567	10	~2004
2089875409	100314019633	12	~2007
2089965637	12539793823	11	~2005
2090037959	4180075919	10	~2004
2090155643	4180311287	10	~2004

Exponent	Prime Factor	Digits	Year
2090189879	4180379759	10	~2004
2090312351	4180624703	10	~2004
2090409161	16723273289	11	~2005
2090432243	4180864487	10	~2004
2090477663	4180955327	10	~2004
2090511491	4181022983	10	~2004
2090563463	4181126927	10	~2004
2090597897	12543587383	11	~2005
2090607191	4181214383	10	~2004
2090703431	4181406863	10	~2004
2090846519	4181693039	10	~2004
2090868817	12545212903	11	~2005
2090886299	4181772599	10	~2004
2090963111	4181926223	10	~2004
2090968343	4181936687	10	~2004
2091001453	12546008719	11	~2005
2091022937	16728183497	11	~2005
2091040439	4182080879	10	~2004
2091044911	20910449111	11	~2006
2091204281	12547225687	11	~2005
2091263159	4182526319	10	~2004
2091271207	33460339313	11	~2006
2091282071	4182564143	10	~2004
2091294341	12547766047	11	~2005
2091351683	4182703367	10	~2004

4.843.404 digits

25-06-08