Small Mersenne Prime Factors (page 4701/5745)

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
7770852179	15541704359	11	~2008
7771369591	124341913457	12	~2010
7771411751	15542823503	11	~2008
7771605203	15543210407	11	~2008
7772202497	295343694887	12	~2011
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
7778643179	15557286359	11	~2008
7779115501	46674693007	11	~2009
7779626339	15559252679	11	~2008
7779672839	15559345679	11	~2008
7780245287	202286377463	12	~2011
7780475639	15560951279	11	~2008
7780675913	46684055479	11	~2009
7780700111	15561400223	11	~2008
7781528459	15563056919	11	~2008
7781821373	46690928239	11	~2009
7781909777	108946736879	12	~2010
7782295331	15564590663	11	~2008

Exponent	Prime Factor	Dig.	Year
7782420851	15564841703	11	~2008
7782543911	15565087823	11	~2008
7782707279	15565414559	11	~2008
7783495319	15566990639	11	~2008
7783704479	15567408959	11	~2008
7784330173	46705981039	11	~2009
7784554957	46707329743	11	~2009
7784742683	15569485367	11	~2008
7784767223	15569534447	11	~2008
7784774027	62278192217	11	~2010
7784786777	186834882649	12	~2011
7785723713	186857369113	12	~2011
7785805931	15571611863	11	~2008
7785886103	15571772207	11	~2008
7785890291	15571780583	11	~2008
7786128719	15572257439	11	~2008
7786569433	46719416599	11	~2009
7786983643	327053313007	12	~2012
7788037919	15576075839	11	~2008
7788269459	15576538919	11	~2008
7788308519	15576617039	11	~2008
7788567959	15577135919	11	~2008
7788703883	15577407767	11	~2008
7789272503	15578545007	11	~2008
7789515689	62316125513	11	~2010

Exponent	Prime Factor	Dig.	Year
7789787221	46738723327	11	~2009
7790095499	62320763993	11	~2010
7790990771	15581981543	11	~2008
7791072623	15582145247	11	~2008
7791079717	358389666983	12	~2012
7791319799	15582639599	11	~2008
7791695339	15583390679	11	~2008
7791794903	15583589807	11	~2008
7792388111	15584776223	11	~2008
7792528283	15585056567	11	~2008
7792663559	15585327119	11	~2008
7792831919	15585663839	11	~2008
7792947119	15585894239	11	~2008
7792979459	15585958919	11	~2008
7793208413	46759250479	11	~2009
7793446151	15586892303	11	~2008
7793897651	15587795303	11	~2008
7793911091	15587822183	11	~2008
7794463129	187067115097	12	~2011
7794512227	77945122271	11	~2010
7794689183	15589378367	11	~2008
7794775297	233843258911	12	~2011
7795054451	15590108903	11	~2008
7795248491	15590496983	11	~2008
7796251451	15592502903	11	~2008

5.441.361 digits

26-03-15