Small Mersenne Prime Factors (page 5066/5670)

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
28841540939	57683081879	11	~2013
28845324191	57690648383	11	~2013
28845698291	230765586329	12	~2014
28846431431	57692862863	11	~2013
28847793203	57695586407	11	~2013
28847934169	1246...561009	14	2023
28848300863	57696601727	11	~2013
28848434171	57696868343	11	~2013
28851615179	57703230359	11	~2013
28854759743	57709519487	11	~2013
28856313617	173137881703	12	~2014
28856323451	57712646903	11	~2013
28858879919	57717759839	11	~2013
28859069699	57718139399	11	~2013
28863390797	230907126377	12	~2014
28864675991	519564167839	12	~2015
28865405279	57730810559	11	~2013
28865639717	173193838303	12	~2014
28865791753	7476...640271	14	2025
28866141299	57732282599	11	~2013
28866198983	57732397967	11	~2013
28868027521	173208165127	12	~2014
28868279837	173209679023	12	~2014
28868757733	173212546399	12	~2014
28869201551	57738403103	11	~2013

Exponent	Prime Factor	Dig.	Year
28869271147	288692711471	12	~2014
28869483683	57738967367	11	~2013
28869761597	230958092777	12	~2014
28869931393	173219588359	12	~2014
28870115077	173220690463	12	~2014
28872454043	57744908087	11	~2013
28873814219	57747628439	11	~2013
28875117119	57750234239	11	~2013
28875159179	57750318359	11	~2013
28875874259	57751748519	11	~2013
28880067389	404320943447	12	~2015
28880753591	57761507183	11	~2013
28881453203	57762906407	11	~2013
28883261837	404365665719	12	~2015
28883509381	173301056287	12	~2014
28884358259	57768716519	11	~2013
28887631439	57775262879	11	~2013
28888768211	519997827799	12	~2015
28889523787	288895237871	12	~2014
28891635611	57783271223	11	~2013
28892194319	57784388639	11	~2013
28892408243	57784816487	11	~2013
28892728493	173356370959	12	~2014
28892922059	57785844119	11	~2013
28894152167	520094739007	12	~2015

Exponent	Prime Factor	Dig.	Year
28894275383	57788550767	11	~2013
28895354303	57790708607	11	~2013
28896469319	57792938639	11	~2013
28897179013	173383074079	12	~2014
28898183063	57796366127	11	~2013
28898246999	57796493999	11	~2013
28898683043	57797366087	11	~2013
28903319519	520259751343	12	~2015
28903849319	57807698639	11	~2013
28904608451	57809216903	11	~2013
28904767751	57809535503	11	~2013
28908144299	57816288599	11	~2013
28910926853	173465561119	12	~2014
28911793931	57823587863	11	~2013
28913296457	231306371657	12	~2014
28914614983	462633839729	12	~2015
28918234733	173509408399	12	~2014
28918655951	231349247609	12	~2014
28919405477	173516432863	12	~2014
28919731811	57839463623	11	~2013
28920083771	57840167543	11	~2013
28920962951	57841925903	11	~2013
28922883487	694149203689	12	~2015
28923100751	57846201503	11	~2013
28924159991	57848319983	11	~2013

Exponent	Prime Factor	Dig.	Year
28928726819	57857453639	11	~2013
28929754391	57859508783	11	~2013
28931473301	173588839807	12	~2014
28931631637	173589789823	12	~2014
28933333139	57866666279	11	~2013
28933616171	57867232343	11	~2013
28935075899	57870151799	11	~2013
28935663959	57871327919	11	~2013
28936037831	57872075663	11	~2013
28936484183	57872968367	11	~2013
28936889207	231495113657	12	~2014
28937346491	57874692983	11	~2013
28938002783	57876005567	11	~2013
28938645023	57877290047	11	~2013
28938721379	57877442759	11	~2013
28938888691	289388886911	12	~2014
28939168463	57878336927	11	~2013
28941800831	57883601663	11	~2013
28942501739	57885003479	11	~2013
28943130431	57886260863	11	~2013
28943308403	57886616807	11	~2013
28943718263	57887436527	11	~2013
28945397291	57890794583	11	~2013
28945427891	57890855783	11	~2013
28945549153	173673294919	12	~2014

5.366.787 digits

26-02-08