Small Mersenne Prime Factors (page 4446/5340)

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
8856904559	17713809119	11	~2009
8857250161	53143500967	11	~2010
8857407323	17714814647	11	~2009
8857893743	17715787487	11	~2009
8858316079	212599585897	12	~2011
8858443591	159451984639	12	~2011
8858678483	17717356967	11	~2009
8858738183	17717476367	11	~2009
8858903783	17717807567	11	~2009
8859916679	17719833359	11	~2009
8860140491	17720280983	11	~2009
8860174181	53161045087	11	~2010
8860299121	53161794727	11	~2010
8860423811	17720847623	11	~2009
8861541971	70892335769	11	~2010
8861736839	17723473679	11	~2009
8862035771	17724071543	11	~2009
8862784691	17725569383	11	~2009
8862858889	354514355561	12	~2012
8863435079	17726870159	11	~2009
8863698023	17727396047	11	~2009
8863806131	17727612263	11	~2009
8863845071	17727690143	11	~2009
8863965839	17727931679	11	~2009
8864305559	17728611119	11	~2009

Exponent	Prime Factor	Dig.	Year
8865759839	17731519679	11	~2009
8866930223	17733860447	11	~2009
8867006639	17734013279	11	~2009
8867259503	17734519007	11	~2009
8867972279	17735944559	11	~2009
8868147443	17736294887	11	~2009
8868424469	124157942567	12	~2011
8868998561	53213991367	11	~2010
8869594717	53217568303	11	~2010
8869924571	70959396569	11	~2010
8870490437	53222942623	11	~2010
8870903819	17741807639	11	~2009
8871045311	17742090623	11	~2009
8871781403	443589070151	12	~2012
8871925511	17743851023	11	~2009
8872063559	17744127119	11	~2009
8872303151	17744606303	11	~2009
8872447403	17744894807	11	~2009
8872513297	53235079783	11	~2010
8872583887	212942013289	12	~2011
8873398151	17746796303	11	~2009
8873771891	17747543783	11	~2009
8873956379	17747912759	11	~2009
8874055261	266221657831	12	~2012
8874126113	53244756679	11	~2010

Exponent	Prime Factor	Dig.	Year
8874195383	17748390767	11	~2009
8874237059	17748474119	11	~2009
8874332651	70994661209	11	~2010
8874761591	70998092729	11	~2010
8875012199	17750024399	11	~2009
8875379291	17750758583	11	~2009
8875444393	53252666359	11	~2010
8875956203	17751912407	11	~2009
8876611637	124272562919	12	~2011
8876783339	17753566679	11	~2009
8877204071	17754408143	11	~2009
8878055951	17756111903	11	~2009
8878196363	17756392727	11	~2009
8878311067	88783110671	11	~2010
8878335491	17756670983	11	~2009
8878504619	17757009239	11	~2009
8878632011	17757264023	11	~2009
8879128103	17758256207	11	~2009
8879363459	17758726919	11	~2009
8879396159	17758792319	11	~2009
8879764967	159835769407	12	~2011
8880120863	17760241727	11	~2009
8880384797	124325387159	12	~2011
8880455027	159848190487	12	~2011
8880608623	88806086231	11	~2010

Exponent	Prime Factor	Dig.	Year
8880644579	17761289159	11	~2009
8880741263	17761482527	11	~2009
8881699679	17763399359	11	~2009
8882023211	71056185689	11	~2010
8882286323	17764572647	11	~2009
8882360843	17764721687	11	~2009
8882872391	17765744783	11	~2009
8882980013	213191520313	12	~2011
8883013597	692875060567	12	~2013
8883787037	53302722223	11	~2010
8883812543	17767625087	11	~2009
8884274363	17768548727	11	~2009
8884423511	17768847023	11	~2009
8884452419	71075619353	11	~2010
8884674443	17769348887	11	~2009
8884731917	124386246839	12	~2011
8885082599	17770165199	11	~2009
8885228603	17770457207	11	~2009
8885698337	124399776719	12	~2011
8885708879	17771417759	11	~2009
8885715719	213257177257	12	~2011
8885715953	124400023343	12	~2011
8886416353	53318498119	11	~2010
8886634511	17773269023	11	~2009
8886798071	284377538273	12	~2012

5.037.460 digits

25-09-07