Small Mersenne Prime Factors (page 4206/5025)

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
8709495143	17418990287	11	~2009
8709593723	17419187447	11	~2009
8709813757	261294412711	12	~2012
8709882661	52259295967	11	~2010
8709989111	69679912889	11	~2010
8710136891	69681095129	11	~2010
8710325639	17420651279	11	~2009
8710335563	17420671127	11	~2009
8710672577	121949416079	12	~2011
8711057783	17422115567	11	~2009
8711758999	87117589991	11	~2010
8711841577	52271049463	11	~2010
8712199103	17424398207	11	~2009
8712213551	17424427103	11	~2009
8714599199	17429198399	11	~2009
8714887459	87148874591	11	~2010
8714920871	17429841743	11	~2009
8715347603	17430695207	11	~2009
8715528623	17431057247	11	~2009
8715762119	17431524239	11	~2009
8716252871	17432505743	11	~2009
8716500379	87165003791	11	~2010
8716719131	17433438263	11	~2009
8717520863	17435041727	11	~2009
8717591383	87175913831	11	~2010

Exponent	Prime Factor	Dig.	Year
8717603039	17435206079	11	~2009
8717673719	17435347439	11	~2009
8718463211	226680043487	12	~2011
8718994643	17437989287	11	~2009
8719419479	69755355833	11	~2010
8719476659	17438953319	11	~2009
8719836179	17439672359	11	~2009
8720495999	17440991999	11	~2009
8720784937	52324709623	11	~2010
8721183563	17442367127	11	~2009
8721614003	17443228007	11	~2009
8721857041	52331142247	11	~2010
8722020689	69776165513	11	~2010
8723528897	52341173383	11	~2010
8723640239	17447280479	11	~2009
8723651291	17447302583	11	~2009
8724025811	17448051623	11	~2009
8724087941	69792703529	11	~2010
8724330599	17448661199	11	~2009
8724591803	17449183607	11	~2009
8724898751	17449797503	11	~2009
8724986111	17449972223	11	~2009
8725272071	17450544143	11	~2009
8725374719	17450749439	11	~2009
8725498633	191960969927	12	~2011

Exponent	Prime Factor	Dig.	Year
8725834693	52355008159	11	~2010
8726048783	17452097567	11	~2009
8726337731	17452675463	11	~2009
8726630651	17453261303	11	~2009
8726693399	17453386799	11	~2009
8727056699	17454113399	11	~2009
8727780493	52366682959	11	~2010
8728499603	17456999207	11	~2009
8729197957	52375187743	11	~2010
8729407493	52376444959	11	~2010
8729512439	17459024879	11	~2009
8730229751	17460459503	11	~2009
8730783263	17461566527	11	~2009
8730873779	17461747559	11	~2009
8731250357	52387502143	11	~2010
8731373279	17462746559	11	~2009
8731673939	17463347879	11	~2009
8732226233	122251167263	12	~2011
8732599619	17465199239	11	~2009
8732858947	87328589471	11	~2010
8733485483	17466970967	11	~2009
8733677891	17467355783	11	~2009
8733830999	17467661999	11	~2009
8733859747	157209475447	12	~2011
8734412399	17468824799	11	~2009

Exponent	Prime Factor	Dig.	Year
8734437623	17468875247	11	~2009
8735556961	139768911377	12	~2011
8735657687	69885261497	11	~2010
8735677603	139770841649	12	~2011
8735851391	17471702783	11	~2009
8736247763	17472495527	11	~2009
8736257039	17472514079	11	~2009
8738031563	17476063127	11	~2009
8738366291	69906930329	11	~2010
8739519479	17479038959	11	~2009
8739717383	17479434767	11	~2009
8739759521	69918076169	11	~2010
8739788003	17479576007	11	~2009
8740251431	17480502863	11	~2009
8740445123	17480890247	11	~2009
8740486219	367100421199	12	~2012
8740992647	69927941177	11	~2010
8741365943	17482731887	11	~2009
8742084011	69936672089	11	~2010
8742241793	52453450759	11	~2010
8742294083	17484588167	11	~2009
8742525959	17485051919	11	~2009
8742560531	17485121063	11	~2009
8742754523	17485509047	11	~2009
8742776309	69942210473	11	~2010

4.724.182 digits

25-04-13