Small Mersenne Prime Factors (page 4747/5025)

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
71963940203	143927880407	12	~2016
71965001177	1655...270711	14	2023
71966830151	143933660303	12	~2016
71967941579	143935883159	12	~2016
71974780861	431848685167	12	~2017
71975164571	143950329143	12	~2016
71977687091	143955374183	12	~2016
71978129243	143956258487	12	~2016
71984269139	143968538279	12	~2016
71984408141	575875265129	12	~2017
71989646471	143979292943	12	~2016
71990962697	575927701577	12	~2017
71992493819	143984987639	12	~2016
71994368591	143988737183	12	~2016
71994692579	143989385159	12	~2016
72005384189	576043073513	12	~2017
72007270151	144014540303	12	~2016
72008062421	576064499369	12	~2017
72008351003	144016702007	12	~2016
72032172481	432193034887	12	~2017
72035994581	576287956649	12	~2017
72042594719	144085189439	12	~2016
72044086391	144088172783	12	~2016
72050413091	144100826183	12	~2016
72051024959	144102049919	12	~2016

Exponent	Prime Factor	Dig.	Year
72059389799	144118779599	12	~2016
72063248711	144126497423	12	~2016
72065255291	576522042329	12	~2017
72070087163	144140174327	12	~2016
72070299029	576562392233	12	~2017
72073781999	144147563999	12	~2016
72074103611	144148207223	12	~2016
72078974699	144157949399	12	~2016
72080728799	144161457599	12	~2016
72082721999	144165443999	12	~2016
72083001311	144166002623	12	~2016
72085650971	144171301943	12	~2016
72090271139	144180542279	12	~2016
72094127381	432564764287	12	~2017
72094294619	144188589239	12	~2016
72094736183	144189472367	12	~2016
72100029959	144200059919	12	~2016
72104237459	144208474919	12	~2016
72105925691	144211851383	12	~2016
72108421811	144216843623	12	~2016
72111254093	432667524559	12	~2017
72111793337	432670760023	12	~2017
72115242863	144230485727	12	~2016
72130959683	144261919367	12	~2016
72131556383	144263112767	12	~2016

Exponent	Prime Factor	Dig.	Year
72145425113	432872550679	12	~2017
72146704621	432880227727	12	~2017
72150182021	2424...159057	14	2025
72150363653	432902181919	12	~2017
72153571751	144307143503	12	~2016
72154720931	144309441863	12	~2016
72158200259	144316400519	12	~2016
72159562283	144319124567	12	~2016
72160080731	144320161463	12	~2016
72160896737	432965380423	12	~2017
72163643777	577309150217	12	~2017
72165829979	144331659959	12	~2016
72167319181	433003915087	12	~2017
72168940661	433013643967	12	~2017
72169930583	144339861167	12	~2016
72173593643	144347187287	12	~2016
72175753031	144351506063	12	~2016
72176368259	144352736519	12	~2016
72177129151	3017...985119	14	2023
72183106799	144366213599	12	~2016
72183152287	3421...184039	14	2024
72189022439	577512179513	12	~2017
72189677603	144379355207	12	~2016
72193342811	144386685623	12	~2016
72193983083	144387966167	12	~2016

Exponent	Prime Factor	Dig.	Year
72199526771	144399053543	12	~2016
72201888179	577615105433	12	~2017
72202089383	144404178767	12	~2016
72204006971	144408013943	12	~2016
72207304811	144414609623	12	~2016
72207636503	144415273007	12	~2016
72211609697	577692877577	12	~2017
72214528367	577716226937	12	~2017
72215170763	144430341527	12	~2016
72219133351	722191333511	12	~2018
72220434071	577763472569	12	~2017
72220644491	144441288983	12	~2016
72222829661	433336977967	12	~2017
72222894899	144445789799	12	~2016
72225669359	144451338719	12	~2016
72226178483	144452356967	12	~2016
72226473779	144452947559	12	~2016
72230762423	144461524847	12	~2016
72240545291	144481090583	12	~2016
72246849179	144493698359	12	~2016
72247265351	144494530703	12	~2016
72252480959	144504961919	12	~2016
72253627163	144507254327	12	~2016
72254532901	433527197407	12	~2017
72254949671	144509899343	12	~2016

4.724.182 digits

25-04-13