Small Mersenne Prime Factors (page 4541/5490)

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
8454890711	16909781423	11	~2009
8454909299	67639274393	11	~2010
8455066091	67640528729	11	~2010
8455172723	16910345447	11	~2009
8455433543	16910867087	11	~2009
8455770143	16911540287	11	~2009
8456193373	50737160239	11	~2010
8456225213	50737351279	11	~2010
8456434271	16912868543	11	~2009
8456604119	16913208239	11	~2009
8456657357	67653258857	11	~2010
8456747219	16913494439	11	~2009
8457034351	405937648849	12	~2012
8457281471	16914562943	11	~2009
8457297851	16914595703	11	~2009
8458670723	16917341447	11	~2009
8458743521	50752461127	11	~2010
8459332697	50755996183	11	~2010
8459406359	67675250873	11	~2010
8460090251	16920180503	11	~2009
8460093023	16920186047	11	~2009
8460744599	16921489199	11	~2009
8460903089	524575991519	12	~2012
8461421567	67691372537	11	~2010
8461942571	67695540569	11	~2010

Exponent	Prime Factor	Dig.	Year
8462271371	16924542743	11	~2009
8462572763	220026891839	12	~2011
8463305183	16926610367	11	~2009
8463816983	16927633967	11	~2009
8463977303	16927954607	11	~2009
8463982283	16927964567	11	~2009
8464321163	16928642327	11	~2009
8464598651	16929197303	11	~2009
8464604209	186221292599	12	~2011
8464741807	84647418071	11	~2010
8465716799	16931433599	11	~2009
8466314399	16932628799	11	~2009
8466449417	253993482511	12	~2011
8466799823	16933599647	11	~2009
8466933203	16933866407	11	~2009
8467098179	16934196359	11	~2009
8467229951	16934459903	11	~2009
8467515209	863686551319	12	~2013
8467518743	16935037487	11	~2009
8467616797	338704671881	12	~2012
8467636223	16935272447	11	~2009
8467829171	16935658343	11	~2009
8468348243	16936696487	11	~2009
8468594723	16937189447	11	~2009
8469929033	50819574199	11	~2010

Exponent	Prime Factor	Dig.	Year
8470235723	16940471447	11	~2009
8470529519	16941059039	11	~2009
8470678787	152472218167	12	~2011
8470791419	16941582839	11	~2009
8470936913	50825621479	11	~2010
8471027531	16942055063	11	~2009
8471092739	16942185479	11	~2009
8471385179	16942770359	11	~2009
8471603099	16943206199	11	~2009
8472250331	16944500663	11	~2009
8472940043	16945880087	11	~2009
8473103519	16946207039	11	~2009
8473243799	16946487599	11	~2009
8473477601	67787820809	11	~2010
8473606081	660941274319	12	~2012
8473720103	16947440207	11	~2009
8473971683	16947943367	11	~2009
8474005139	67792041113	11	~2010
8474030251	135584484017	12	~2011
8474206513	50845239079	11	~2010
8474326979	16948653959	11	~2009
8475158063	16950316127	11	~2009
8475646511	355977153463	12	~2012
8475742127	152563358287	12	~2011
8475848737	50855092423	11	~2010

Exponent	Prime Factor	Dig.	Year
8476476527	67811812217	11	~2010
8477030819	16954061639	11	~2009
8477238131	16954476263	11	~2009
8477753591	16955507183	11	~2009
8478023857	50868143143	11	~2010
8478178883	16956357767	11	~2009
8478248231	16956496463	11	~2009
8478310783	84783107831	11	~2010
8478399781	50870398687	11	~2010
8478831299	16957662599	11	~2009
8478964199	16957928399	11	~2009
8479141403	16958282807	11	~2009
8479338773	50876032639	11	~2010
8479543463	16959086927	11	~2009
8480282963	16960565927	11	~2009
8480365451	16960730903	11	~2009
8480553131	16961106263	11	~2009
8480897699	16961795399	11	~2009
8480955683	16961911367	11	~2009
8481564011	16963128023	11	~2009
8481602347	84816023471	11	~2010
8483081423	16966162847	11	~2009
8483337539	16966675079	11	~2009
8483393111	16966786223	11	~2009
8483495393	50900972359	11	~2010

5.187.277 digits

25-11-17