Small Mersenne Prime Factors (page 5424/5775)

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
77563510109	620508080873	12	~2018
77568049511	155136099023	12	~2016
77569497839	620555982713	12	~2018
77583118163	155166236327	12	~2016
77585318099	155170636199	12	~2016
77587984739	155175969479	12	~2016
77588272061	465529632367	12	~2017
77588958371	155177916743	12	~2016
77590794977	465544769863	12	~2017
77591627177	620733017417	12	~2018
77595077099	155190154199	12	~2016
77596101899	155192203799	12	~2016
77600537711	155201075423	12	~2016
77602978091	155205956183	12	~2016
77607989477	465647936863	12	~2017
77616556163	155233112327	12	~2016
77617467121	465704802727	12	~2017
77621949539	155243899079	12	~2016
77622423239	155244846479	12	~2016
77623252843	2872...551911	14	2023
77626971011	155253942023	12	~2016
77629385699	155258771399	12	~2016
77629508003	155259016007	12	~2016
77631593603	155263187207	12	~2016
77635124951	155270249903	12	~2016

Exponent	Prime Factor	Dig.	Year
77637068231	155274136463	12	~2016
77637255541	465823533247	12	~2017
77638113733	465828682399	12	~2017
77638353203	155276706407	12	~2016
77650159451	155300318903	12	~2016
77654228303	155308456607	12	~2016
77655949583	155311899167	12	~2016
77660520299	155321040599	12	~2016
77662784159	155325568319	12	~2016
77669646001	466017876007	12	~2017
77671660343	155343320687	12	~2016
77672394119	155344788239	12	~2016
77682843863	155365687727	12	~2016
77685357131	155370714263	12	~2016
77695391219	155390782439	12	~2016
77699869391	621598955129	12	~2018
77703650771	621629206169	12	~2018
77705932019	155411864039	12	~2016
77710837499	155421674999	12	~2016
77711273891	155422547783	12	~2016
77711683319	155423366639	12	~2016
77715225683	155430451367	12	~2016
77715601451	155431202903	12	~2016
77718435779	155436871559	12	~2016
77718587099	155437174199	12	~2016

Exponent	Prime Factor	Dig.	Year
77718598091	621748784729	12	~2018
77726754613	466360527679	12	~2017
77730304163	155460608327	12	~2016
77732970839	155465941679	12	~2016
77736501959	155473003919	12	~2016
77737748111	621901984889	12	~2018
77738730821	466432384927	12	~2017
77741356717	1001...451497	15	2026
77743898711	621951189689	12	~2018
77747852317	466487113903	12	~2017
77749380131	621995041049	12	~2018
77749955639	155499911279	12	~2016
77752828271	155505656543	12	~2016
77754469283	155508938567	12	~2016
77755454831	155510909663	12	~2016
77768042003	155536084007	12	~2016
77771080391	155542160783	12	~2016
77772051943	777720519431	12	~2018
77775420787	777754207871	12	~2018
77775444559	9970...924639	14	2024
77778569003	155557138007	12	~2016
77780065199	155560130399	12	~2016
77783364773	466700188639	12	~2017
77783928311	155567856623	12	~2016
77785802483	155571604967	12	~2016

Exponent	Prime Factor	Dig.	Year
77790750623	155581501247	12	~2016
77795238659	155590477319	12	~2016
77797133339	155594266679	12	~2016
77798421923	155596843847	12	~2016
77799718949	622397751593	12	~2018
77803259519	155606519039	12	~2016
77806125431	155612250863	12	~2016
77812294213	466873765279	12	~2017
77820337139	155640674279	12	~2016
77823013259	155646026519	12	~2016
77825907683	155651815367	12	~2016
77830384823	155660769647	12	~2016
77834126423	155668252847	12	~2016
77836931759	155673863519	12	~2016
77840098751	155680197503	12	~2016
77843742863	155687485727	12	~2016
77844023219	155688046439	12	~2016
77858261171	155716522343	12	~2016
77858320019	155716640039	12	~2016
77861111423	1868...741521	14	2024
77866391903	155732783807	12	~2016
77868943511	155737887023	12	~2016
77880836063	155761672127	12	~2016
77888935763	155777871527	12	~2016
77891891639	155783783279	12	~2016

5.471.290 digits

26-03-29