Small Mersenne Prime Factors (page 4590/5340)

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
14109729743	28219459487	11	~2010
14109852359	28219704719	11	~2010
14109949583	28219899167	11	~2010
14110752067	253993537207	12	~2013
14110758971	28221517943	11	~2010
14111210231	28222420463	11	~2010
14111673203	28223346407	11	~2010
14112233711	28224467423	11	~2010
14114094119	28228188239	11	~2010
14114843579	28229687159	11	~2010
14115318713	338767649113	12	~2013
14115380399	28230760799	11	~2010
14115614761	84693688567	11	~2011
14115680867	112925446937	12	~2012
14116670411	28233340823	11	~2010
14116836119	28233672239	11	~2010
14117232659	28234465319	11	~2010
14118887773	84713326639	11	~2011
14119444931	28238889863	11	~2010
14119864091	28239728183	11	~2010
14120708671	141207086711	12	~2012
14120747887	141207478871	12	~2012
14121562139	28243124279	11	~2010
14121973223	28243946447	11	~2010
14122304303	28244608607	11	~2010

Exponent	Prime Factor	Dig.	Year
14122314263	28244628527	11	~2010
14122405403	28244810807	11	~2010
14123482601	112987860809	12	~2012
14124143843	28248287687	11	~2010
14124904987	225998479793	12	~2013
14125686469	1615...320537	14	2024
14126155079	28252310159	11	~2010
14126709851	28253419703	11	~2010
14126813159	28253626319	11	~2010
14126884223	28253768447	11	~2010
14127046463	28254092927	11	~2010
14127436259	28254872519	11	~2010
14127550631	28255101263	11	~2010
14127557231	28255114463	11	~2010
14127713981	84766283887	11	~2011
14127781571	28255563143	11	~2010
14128695491	28257390983	11	~2010
14129435497	84776612983	11	~2011
14129684659	678224863633	12	~2014
14129936543	28259873087	11	~2010
14130490823	28260981647	11	~2010
14130779543	28261559087	11	~2010
14130820559	28261641119	11	~2010
14133015359	28266030719	11	~2010
14133299111	28266598223	11	~2010

Exponent	Prime Factor	Dig.	Year
14133552731	28267105463	11	~2010
14133578077	84801468463	11	~2011
14133689831	113069518649	12	~2012
14134065563	28268131127	11	~2010
14134857059	28269714119	11	~2010
14134893959	28269787919	11	~2010
14135565623	28271131247	11	~2010
14135949791	28271899583	11	~2010
14136305213	84817831279	11	~2011
14137414211	28274828423	11	~2010
14137532351	28275064703	11	~2010
14137584431	28275168863	11	~2010
14137665911	28275331823	11	~2010
14137918703	28275837407	11	~2010
14138093863	226209501809	12	~2013
14138526907	141385269071	12	~2012
14138785873	84832715239	11	~2011
14140117207	141401172071	12	~2012
14141299187	254543385367	12	~2013
14141318759	28282637519	11	~2010
14142443411	28284886823	11	~2010
14143215071	28286430143	11	~2010
14143446563	28286893127	11	~2010
14144160071	28288320143	11	~2010
14144480711	28288961423	11	~2010

Exponent	Prime Factor	Dig.	Year
14144761259	28289522519	11	~2010
14144867983	141448679831	12	~2012
14145501479	28291002959	11	~2010
14145782771	28291565543	11	~2010
14146157891	28292315783	11	~2010
14146771109	198054795527	12	~2012
14146936109	113175488873	12	~2012
14148368231	28296736463	11	~2010
14149899097	84899394583	11	~2011
14150175443	28300350887	11	~2010
14152009331	28304018663	11	~2010
14152889339	28305778679	11	~2010
14153368499	28306736999	11	~2010
14153870723	28307741447	11	~2010
14155051231	254790922159	12	~2013
14156487539	28312975079	11	~2010
14156601311	28313202623	11	~2010
14156684411	28313368823	11	~2010
14156748329	198194476607	12	~2012
14156959613	84941757679	11	~2011
14157421897	84944531383	11	~2011
14158152719	28316305439	11	~2010
14159054671	141590546711	12	~2012
14159337851	28318675703	11	~2010
14159561459	28319122919	11	~2010

5.037.460 digits

25-09-07