Small Mersenne Prime Factors (page 4327/5235)

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
7755340643	15510681287	11	~2008
7755553997	108577755959	12	~2010
7756122839	62048982713	11	~2010
7756863337	124109813393	12	~2010
7756998911	15513997823	11	~2008
7757298007	77572980071	11	~2010
7758259297	46549555783	11	~2009
7758489493	46550936959	11	~2009
7758641897	186207405529	12	~2011
7758870323	15517740647	11	~2008
7758990611	15517981223	11	~2008
7759591793	46557550759	11	~2009
7759689911	15519379823	11	~2008
7759731491	15519462983	11	~2008
7759737457	46558424743	11	~2009
7759839863	15519679727	11	~2008
7760250671	15520501343	11	~2008
7760793731	15521587463	11	~2008
7760838479	15521676959	11	~2008
7761238571	15522477143	11	~2008
7761525917	62092207337	11	~2010
7762129157	46572774943	11	~2009
7762204763	201817323839	12	~2011
7762402391	15524804783	11	~2008
7762441523	15524883047	11	~2008

Exponent	Prime Factor	Dig.	Year
7762701923	15525403847	11	~2008
7762728299	15525456599	11	~2008
7762825919	15525651839	11	~2008
7763049823	558939587257	12	~2012
7763246759	15526493519	11	~2008
7763637611	15527275223	11	~2008
7763967863	15527935727	11	~2008
7764327101	295044429839	12	~2011
7764398177	62115185417	11	~2010
7764649811	15529299623	11	~2008
7765767281	232973018431	12	~2011
7765979051	15531958103	11	~2008
7766026259	15532052519	11	~2008
7766070671	15532141343	11	~2008
7766666497	46599998983	11	~2009
7766748841	46600493047	11	~2009
7767041339	15534082679	11	~2008
7767323821	46603942927	11	~2009
7768019123	15536038247	11	~2008
7768075027	186433800649	12	~2011
7768543231	124296691697	12	~2010
7768865843	15537731687	11	~2008
7769306117	46615836703	11	~2009
7769317403	15538634807	11	~2008
7770262823	15540525647	11	~2008

Exponent	Prime Factor	Dig.	Year
7770678203	15541356407	11	~2008
7770760691	62166085529	11	~2010
7770852179	15541704359	11	~2008
7771369591	124341913457	12	~2010
7771411751	15542823503	11	~2008
7772260921	46633565527	11	~2009
7772539223	15545078447	11	~2008
7772903641	46637421847	11	~2009
7772904719	15545809439	11	~2008
7772952029	186550848697	12	~2011
7773085007	202100210183	12	~2011
7773484343	15546968687	11	~2008
7773566681	46641400087	11	~2009
7773611843	15547223687	11	~2008
7773612419	15547224839	11	~2008
7773829493	108833612903	12	~2010
7773919537	357600298703	12	~2012
7773921299	15547842599	11	~2008
7774308323	15548616647	11	~2008
7774618133	46647708799	11	~2009
7774670003	15549340007	11	~2008
7774745399	15549490799	11	~2008
7774973411	15549946823	11	~2008
7775012711	15550025423	11	~2008
7775064373	124401029969	12	~2010

Exponent	Prime Factor	Dig.	Year
7775600401	46653602407	11	~2009
7775637983	15551275967	11	~2008
7775754191	15551508383	11	~2008
7776570541	46659423247	11	~2009
7777119023	15554238047	11	~2008
7777420811	15554841623	11	~2008
7777625711	62221005689	11	~2010
7777676789	186664242937	12	~2011
7777797479	15555594959	11	~2008
7777862243	15555724487	11	~2008
7777891333	46667347999	11	~2009
7777937819	15555875639	11	~2008
7778229077	46669374463	11	~2009
7779115501	46674693007	11	~2009
7779626339	15559252679	11	~2008
7779672839	15559345679	11	~2008
7780245287	202286377463	12	~2011
7780475639	15560951279	11	~2008
7780700111	15561400223	11	~2008
7781528459	15563056919	11	~2008
7781821373	46690928239	11	~2009
7781909777	108946736879	12	~2010
7782295331	15564590663	11	~2008
7782420851	15564841703	11	~2008
7782543911	15565087823	11	~2008

4.933.056 digits

25-07-20