Small Mersenne Prime Factors (page 4326/5070)

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
11680698671	23361397343	11	~2010
11681415143	23362830287	11	~2010
11682992039	23365984079	11	~2010
11683547819	23367095639	11	~2010
11684154719	23368309439	11	~2010
11684221463	23368442927	11	~2010
11684327591	23368655183	11	~2010
11684393477	93475147817	11	~2011
11684978603	23369957207	11	~2010
11685442117	70112652703	11	~2011
11685501731	23371003463	11	~2010
11685646499	23371292999	11	~2010
11686003487	210348062767	12	~2012
11686328021	70117968127	11	~2011
11687654039	280503696937	12	~2012
11688171023	23376342047	11	~2010
11688227581	3625...956263	14	2024
11688349391	23376698783	11	~2010
11689370333	70136221999	11	~2011
11689879139	23379758279	11	~2010
11690038103	23380076207	11	~2010
11690055947	93520447577	11	~2011
11690216099	23380432199	11	~2010
11691436583	23382873167	11	~2010
11691966263	23383932527	11	~2010

Exponent	Prime Factor	Dig.	Year
11692241531	23384483063	11	~2010
11692299263	23384598527	11	~2010
11692599103	116925991031	12	~2011
11692948919	23385897839	11	~2010
11693343923	23386687847	11	~2010
11693844803	23387689607	11	~2010
11693918641	187102698257	12	~2012
11694009731	23388019463	11	~2010
11694013063	187104209009	12	~2012
11695290311	23390580623	11	~2010
11695663877	93565311017	11	~2011
11696373323	23392746647	11	~2010
11696479103	23392958207	11	~2010
11697798743	23395597487	11	~2010
11698004243	23396008487	11	~2010
11698233983	23396467967	11	~2010
11698472413	280763337913	12	~2012
11699259391	187188150257	12	~2012
11699311103	23398622207	11	~2010
11699664059	23399328119	11	~2010
11699771819	23399543639	11	~2010
11699984591	23399969183	11	~2010
11700021071	23400042143	11	~2010
11700208763	23400417527	11	~2010
11701052681	93608421449	11	~2011

Exponent	Prime Factor	Dig.	Year
11701449659	23402899319	11	~2010
11701743029	93613944233	11	~2011
11702311157	93618489257	11	~2011
11702805143	23405610287	11	~2010
11702929211	23405858423	11	~2010
11703088451	23406176903	11	~2010
11703648311	23407296623	11	~2010
11703948479	23407896959	11	~2010
11704193783	23408387567	11	~2010
11704516091	23409032183	11	~2010
11704775843	23409551687	11	~2010
11704991951	374559742433	12	~2013
11705336759	23410673519	11	~2010
11706176873	70237061239	11	~2011
11706221951	23412443903	11	~2010
11706255791	23412511583	11	~2010
11706381119	23412762239	11	~2010
11706875969	93655007753	11	~2011
11707466411	23414932823	11	~2010
11707974263	23415948527	11	~2010
11708950919	23417901839	11	~2010
11708952719	23417905439	11	~2010
11709061979	23418123959	11	~2010
11709114317	93672914537	11	~2011
11709251531	23418503063	11	~2010

Exponent	Prime Factor	Dig.	Year
11709322979	23418645959	11	~2010
11709678059	23419356119	11	~2010
11709914759	23419829519	11	~2010
11710181183	23420362367	11	~2010
11710570583	23421141167	11	~2010
11710700219	23421400439	11	~2010
11712420673	70274524039	11	~2011
11712523241	70275139447	11	~2011
11713339091	23426678183	11	~2010
11713467593	70280805559	11	~2011
11714867663	23429735327	11	~2010
11714905199	23429810399	11	~2010
11716037831	93728302649	11	~2011
11716359713	70298158279	11	~2011
11716635179	23433270359	11	~2010
11716635713	70299814279	11	~2011
11717557991	210916043839	12	~2012
11717996057	93743968457	11	~2011
11718384731	23436769463	11	~2010
11718737603	23437475207	11	~2010
11718824723	23437649447	11	~2010
11718989657	70313937943	11	~2011
11719170119	23438340239	11	~2010
11720080103	23440160207	11	~2010
11720369399	23440738799	11	~2010

4.768.925 digits

25-05-04