Small Mersenne Prime Factors (page 5154/5745)

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
31534705343	63069410687	11	~2013
31534909933	504558558929	12	~2015
31535340413	189212042479	12	~2014
31537211969	252297695753	12	~2015
31538566739	63077133479	11	~2013
31538598863	63077197727	11	~2013
31539407423	63078814847	11	~2013
31539602693	189237616159	12	~2014
31541538551	63083077103	11	~2013
31541669927	252333359417	12	~2015
31543400279	63086800559	11	~2013
31545295679	63090591359	11	~2013
31545533471	252364267769	12	~2015
31545661463	63091322927	11	~2013
31546366109	441649125527	12	~2015
31547780963	63095561927	11	~2013
31548501137	189291006823	12	~2014
31549160477	189294962863	12	~2014
31553704211	63107408423	11	~2013
31554518951	63109037903	11	~2013
31555619951	63111239903	11	~2013
31557326891	63114653783	11	~2013
31560080063	63120160127	11	~2013
31560302447	252482419577	12	~2015
31561287143	63122574287	11	~2013

Exponent	Prime Factor	Dig.	Year
31561441243	315614412431	12	~2015
31561847171	63123694343	11	~2013
31562965139	63125930279	11	~2013
31563614399	63127228799	11	~2013
31565053319	63130106639	11	~2013
31567424719	315674247191	12	~2015
31568885459	63137770919	11	~2013
31569066911	63138133823	11	~2013
31569597599	63139195199	11	~2013
31571010791	63142021583	11	~2013
31572556991	252580455929	12	~2015
31572898921	694603776263	12	~2016
31574682311	63149364623	11	~2013
31574964077	442049497079	12	~2015
31575240199	757805764777	12	~2016
31576942619	63153885239	11	~2013
31578015251	63156030503	11	~2013
31579079579	63158159159	11	~2013
31579591639	568432649503	12	~2015
31584358439	63168716879	11	~2013
31586721371	63173442743	11	~2013
31587015923	63174031847	11	~2013
31590864707	252726917657	12	~2015
31592931871	315929318711	12	~2015
31594729589	252757836713	12	~2015

Exponent	Prime Factor	Dig.	Year
31594867211	63189734423	11	~2013
31595039939	63190079879	11	~2013
31595309639	63190619279	11	~2013
31595969351	63191938703	11	~2013
31596097919	63192195839	11	~2013
31596623183	63193246367	11	~2013
31597625711	63195251423	11	~2013
31597638731	63195277463	11	~2013
31597794919	315977949191	12	~2015
31598077523	63196155047	11	~2013
31600564993	189603389959	12	~2014
31601813407	316018134071	12	~2015
31601880811	505630092977	12	~2015
31601907703	505630523249	12	~2015
31602987623	63205975247	11	~2013
31604301733	189625810399	12	~2014
31605585443	63211170887	11	~2013
31606503361	189639020167	12	~2014
31606809239	252854473913	12	~2015
31608089351	63216178703	11	~2013
31608320603	63216641207	11	~2013
31610181289	695423988359	12	~2016
31610500919	63221001839	11	~2013
31611488879	63222977759	11	~2013
31612025639	63224051279	11	~2013

Exponent	Prime Factor	Dig.	Year
31613103143	63226206287	11	~2013
31613564483	63227128967	11	~2013
31613616971	63227233943	11	~2013
31614231563	63228463127	11	~2013
31615051343	63230102687	11	~2013
31615810267	316158102671	12	~2015
31615816451	63231632903	11	~2013
31615991707	1498...069119	14	2023
31616182079	63232364159	11	~2013
31617177071	63234354143	11	~2013
31617649463	63235298927	11	~2013
31617945743	63235891487	11	~2013
31618317623	63236635247	11	~2013
31618441931	63236883863	11	~2013
31618906859	63237813719	11	~2013
31619633113	189717798679	12	~2014
31620563339	63241126679	11	~2013
31625265011	63250530023	11	~2013
31625373779	63250747559	11	~2013
31625907671	63251815343	11	~2013
31626199133	189757194799	12	~2014
31627169963	63254339927	11	~2013
31628900423	63257800847	11	~2013
31629127091	63258254183	11	~2013
31629663419	63259326839	11	~2013

5.441.361 digits

26-03-15