Small Mersenne Prime Factors (page 4283/5070)

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
10069616699	20139233399	11	~2009
10069962719	80559701753	11	~2011
10069980779	20139961559	11	~2009
10070433311	20140866623	11	~2009
10070500679	80564005433	11	~2011
10070700323	20141400647	11	~2009
10070758693	60424552159	11	~2010
10071300893	60427805359	11	~2010
10071480719	20142961439	11	~2009
10071722033	60430332199	11	~2010
10071803099	20143606199	11	~2009
10072020239	20144040479	11	~2009
10072270597	161156329553	12	~2011
10072433933	60434603599	11	~2010
10072707251	20145414503	11	~2009
10072782491	20145564983	11	~2009
10073451623	20146903247	11	~2009
10073699543	20147399087	11	~2009
10073781077	80590248617	11	~2011
10074126793	60444760759	11	~2010
10076000813	60456004879	11	~2010
10076233151	20152466303	11	~2009
10076492099	20152984199	11	~2009
10076946083	20153892167	11	~2009
10077036743	20154073487	11	~2009

Exponent	Prime Factor	Dig.	Year
10077994583	20155989167	11	~2009
10078018619	241872446857	12	~2012
10078433791	100784337911	12	~2011
10078453019	20156906039	11	~2009
10079020859	20158041719	11	~2009
10079408123	20158816247	11	~2009
10079753591	20159507183	11	~2009
10079787383	20159574767	11	~2009
10080706043	20161412087	11	~2009
10081042511	20162085023	11	~2009
10081221071	20162442143	11	~2009
10081575431	20163150863	11	~2009
10081796713	60490780279	11	~2010
10081821443	20163642887	11	~2009
10082069051	80656552409	11	~2011
10082120801	60492724807	11	~2010
10082292683	20164585367	11	~2009
10082428043	20164856087	11	~2009
10083377519	20166755039	11	~2009
10083745853	60502475119	11	~2010
10084140659	20168281319	11	~2009
10084328363	20168656727	11	~2009
10085068379	20170136759	11	~2009
10086140279	20172280559	11	~2009
10086627379	181559292823	12	~2011

Exponent	Prime Factor	Dig.	Year
10086672419	20173344839	11	~2009
10086832583	20173665167	11	~2009
10087063759	100870637591	12	~2011
10087198811	20174397623	11	~2009
10087271581	60523629487	11	~2010
10087577243	20175154487	11	~2009
10087714853	60526289119	11	~2010
10088496241	60530977447	11	~2010
10089078431	20178156863	11	~2009
10089137291	20178274583	11	~2009
10089362639	20178725279	11	~2009
10089445403	20178890807	11	~2009
10089478691	262326445967	12	~2012
10089547337	60537284023	11	~2010
10089607991	565018047497	12	~2013
10090007723	20180015447	11	~2009
10090314851	80722518809	11	~2011
10090889729	80727117833	11	~2011
10090970339	20181940679	11	~2009
10091023619	20182047239	11	~2009
10092074351	20184148703	11	~2009
10092091781	60552550687	11	~2010
10092546059	20185092119	11	~2009
10092929579	20185859159	11	~2009
10093281461	60559688767	11	~2010

Exponent	Prime Factor	Dig.	Year
10094893217	80759145737	11	~2011
10095024119	20190048239	11	~2009
10095134603	20190269207	11	~2009
10095161123	20190322247	11	~2009
10095369923	20190739847	11	~2009
10095416819	20190833639	11	~2009
10095442481	60572654887	11	~2010
10095641341	60573848047	11	~2010
10095996803	20191993607	11	~2009
10096117079	20192234159	11	~2009
10096234237	60577405423	11	~2010
10097174651	20194349303	11	~2009
10097268581	323112594593	12	~2012
10098537623	20197075247	11	~2009
10098969733	60593818399	11	~2010
10098989843	20197979687	11	~2009
10099998899	20199997799	11	~2009
10100161573	60600969439	11	~2010
10100167391	20200334783	11	~2009
10100442119	20200884239	11	~2009
10101297599	20202595199	11	~2009
10101684899	20203369799	11	~2009
10101687209	80813497673	11	~2011
10101860999	20203721999	11	~2009
10102218491	20204436983	11	~2009

4.768.925 digits

25-05-04