Small Mersenne Prime Factors (page 5004/5745)

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
19262093633	115572561799	12	~2013
19262548661	115575291967	12	~2013
19262989643	38525979287	11	~2011
19263647609	154109180873	12	~2013
19263871381	115583228287	12	~2013
19265858663	38531717327	11	~2011
19266024191	38532048383	11	~2011
19266434393	115598606359	12	~2013
19267283603	38534567207	11	~2011
19268674643	38537349287	11	~2011
19268862383	38537724767	11	~2011
19271774237	154174193897	12	~2013
19271905529	154175244233	12	~2013
19272492023	38544984047	11	~2011
19273010189	732374387183	12	~2014
19274496907	346940944327	12	~2014
19274565641	578236969231	12	~2014
19275141239	38550282479	11	~2011
19275948623	38551897247	11	~2011
19276261619	462630278857	12	~2014
19276549511	38553099023	11	~2011
19276734551	38553469103	11	~2011
19277739073	115666434439	12	~2013
19278191651	38556383303	11	~2011
19278509111	38557018223	11	~2011

Exponent	Prime Factor	Dig.	Year
19279738931	38559477863	11	~2011
19280004119	38560008239	11	~2011
19281023819	38562047639	11	~2011
19281470387	154251763097	12	~2013
19282305299	38564610599	11	~2011
19282635863	38565271727	11	~2011
19282865471	38565730943	11	~2011
19283353091	38566706183	11	~2011
19284931723	192849317231	12	~2013
19285033739	38570067479	11	~2011
19285313219	38570626439	11	~2011
19286101343	38572202687	11	~2011
19286154599	38572309199	11	~2011
19286398393	887174326079	12	~2015
19286491331	38572982663	11	~2011
19286503393	115719020359	12	~2013
19286888531	38573777063	11	~2011
19287050819	38574101639	11	~2011
19288221727	192882217271	12	~2013
19288316843	38576633687	11	~2011
19288544567	154308356537	12	~2013
19288787363	38577574727	11	~2011
19288788539	38577577079	11	~2011
19288899419	38577798839	11	~2011
19289249803	308627996849	12	~2014

Exponent	Prime Factor	Dig.	Year
19289359783	308629756529	12	~2014
19289509931	38579019863	11	~2011
19289612107	192896121071	12	~2013
19291492741	2357...129503	14	2023
19291910831	38583821663	11	~2011
19292747879	38585495759	11	~2011
19294630031	38589260063	11	~2011
19294898177	115769389063	12	~2013
19295042321	115770253927	12	~2013
19295548991	38591097983	11	~2011
19296345611	38592691223	11	~2011
19296677171	38593354343	11	~2011
19298314823	38596629647	11	~2011
19298463473	115790780839	12	~2013
19298837003	38597674007	11	~2011
19299641183	38599282367	11	~2011
19299878621	115799271727	12	~2013
19300152197	115800913183	12	~2013
19300501403	38601002807	11	~2011
19301572679	38603145359	11	~2011
19301913791	38603827583	11	~2011
19302070031	38604140063	11	~2011
19302343259	154418746073	12	~2013
19302536971	193025369711	12	~2013
19304811479	38609622959	11	~2011

Exponent	Prime Factor	Dig.	Year
19306187531	38612375063	11	~2011
19306287179	38612574359	11	~2011
19306492921	115838957527	12	~2013
19306781261	154454250089	12	~2013
19307809799	38615619599	11	~2011
19307995439	38615990879	11	~2011
19308542003	38617084007	11	~2011
19310200139	38620400279	11	~2011
19310248619	154481988953	12	~2013
19310475683	38620951367	11	~2011
19311948671	38623897343	11	~2011
19313266403	38626532807	11	~2011
19313943317	154511546537	12	~2013
19314422917	309030766673	12	~2014
19314521543	38629043087	11	~2011
19314569399	38629138799	11	~2011
19314735031	347665230559	12	~2014
19314754379	38629508759	11	~2011
19314980099	38629960199	11	~2011
19316106101	579483183031	12	~2014
19316687783	38633375567	11	~2011
19317688823	38635377647	11	~2011
19318341131	38636682263	11	~2011
19318796543	38637593087	11	~2011
19318903319	38637806639	11	~2011

5.441.361 digits

26-03-15