Small Mersenne Prime Factors (page 4800/5850)

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
8288967959	16577935919	11	~2009
8288971811	16577943623	11	~2009
8289051341	49734308047	11	~2010
8289337559	149208076063	12	~2011
8289868903	82898689031	11	~2010
8290123463	16580246927	11	~2009
8290324403	16580648807	11	~2009
8290855823	16581711647	11	~2009
8291026559	16582053119	11	~2009
8291601803	16583203607	11	~2009
8291779319	16583558639	11	~2009
8292243203	16584486407	11	~2009
8292351911	16584703823	11	~2009
8292480851	16584961703	11	~2009
8293028351	16586056703	11	~2009
8293070699	16586141399	11	~2009
8293466999	16586933999	11	~2009
8293595039	16587190079	11	~2009
8293818983	16587637967	11	~2009
8293845359	16587690719	11	~2009
8293897379	16587794759	11	~2009
8294194457	116118722399	12	~2011
8294830877	315203573327	12	~2012
8295179303	16590358607	11	~2009
8295288361	49771730167	11	~2010

Exponent	Prime Factor	Dig.	Year
8295643403	16591286807	11	~2009
8295649091	16591298183	11	~2009
8295650183	16591300367	11	~2009
8295791573	116141082023	12	~2011
8296552541	66372420329	11	~2010
8296558103	16593116207	11	~2009
8296933943	16593867887	11	~2009
8296995467	66375963737	11	~2010
8297083331	16594166663	11	~2009
8297151281	49782907687	11	~2010
8297618159	16595236319	11	~2009
8298066743	16596133487	11	~2009
8298575171	16597150343	11	~2009
8299116863	16598233727	11	~2009
8299295881	331971835241	12	~2012
8299749959	16599499919	11	~2009
8299798757	315392352767	12	~2012
8300006843	16600013687	11	~2009
8300102567	66400820537	11	~2010
8300278351	149405010319	12	~2011
8300320421	66402563369	11	~2010
8300526173	514632622727	12	~2012
8300679239	16601358479	11	~2009
8300687099	16601374199	11	~2009
8300747671	83007476711	11	~2010

Exponent	Prime Factor	Dig.	Year
8301158219	16602316439	11	~2009
8301267911	16602535823	11	~2009
8301372733	49808236399	11	~2010
8301377099	16602754199	11	~2009
8301673343	16603346687	11	~2009
8301725951	16603451903	11	~2009
8301973331	16603946663	11	~2009
8302219283	16604438567	11	~2009
8302948343	16605896687	11	~2009
8303257847	215884704023	12	~2011
8303956103	16607912207	11	~2009
8303985191	16607970383	11	~2009
8304018263	16608036527	11	~2009
8304138587	66433108697	11	~2010
8304917557	49829505343	11	~2010
8305007219	16610014439	11	~2009
8305292503	83052925031	11	~2010
8305616057	714282980903	12	~2013
8305639637	66445117097	11	~2010
8305916579	16611833159	11	~2009
8306001299	16612002599	11	~2009
8306054177	66448433417	11	~2010
8306192519	16612385039	11	~2009
8306195519	16612391039	11	~2009
8306197037	49837182223	11	~2010

Exponent	Prime Factor	Dig.	Year
8306509559	16613019119	11	~2009
8306839991	16613679983	11	~2009
8306849743	83068497431	11	~2010
8307016079	16614032159	11	~2009
8307402419	16614804839	11	~2009
8307473543	16614947087	11	~2009
8307663257	66461306057	11	~2010
8307872843	16615745687	11	~2009
8308313557	49849881343	11	~2010
8308816739	16617633479	11	~2009
8309040569	66472324553	11	~2010
8309229581	49855377487	11	~2010
8309458463	16618916927	11	~2009
8309460919	149570296543	12	~2011
8309471699	16618943399	11	~2009
8309662457	49857974743	11	~2010
8309772389	66478179113	11	~2010
8310013823	16620027647	11	~2009
8310319691	16620639383	11	~2009
8310612071	16621224143	11	~2009
8310870479	16621740959	11	~2009
8311063093	249331892791	12	~2011
8311366837	49868201023	11	~2010
8311484243	16622968487	11	~2009
8311582199	16623164399	11	~2009

5.546.121 digits

26-05-03