Small Mersenne Prime Factors (page 3937/5490)

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	Digits	Year
1630517783	3261035567	10	~2003
1630578011	3261156023	10	~2003
1630671857	9784031143	10	~2004
1630749863	3261499727	10	~2003
1630763501	9784581007	10	~2004
1630796171	3261592343	10	~2003
1630843559	3261687119	10	~2003
1630845239	3261690479	10	~2003
1630858891	16308588911	11	~2005
1630930117	9785580703	10	~2004
1630994663	3261989327	10	~2003
1631004943	65240197721	11	~2006
1631059873	9786359239	10	~2004
1631082121	35883806663	11	~2006
1631094743	3262189487	10	~2003
1631133521	9786801127	10	~2004
1631214433	9787286599	10	~2004
1631260283	3262520567	10	~2003
1631283239	3262566479	10	~2003
1631285231	3262570463	10	~2003
1631310077	9787860463	10	~2004
1631358629	13050869033	11	~2004
1631387759	3262775519	10	~2003
1631390231	3262780463	10	~2003
1631410477	9788462863	10	~2004

Exponent	Prime Factor	Digits	Year
1631482739	13051861913	11	~2004
1631528039	3263056079	10	~2003
1631666423	3263332847	10	~2003
1631804579	3263609159	10	~2003
1631806619	3263613239	10	~2003
1631876063	3263752127	10	~2003
1631876399	3263752799	10	~2003
1632005449	35904119879	11	~2006
1632022859	13056182873	11	~2004
1632041591	3264083183	10	~2003
1632042299	3264084599	10	~2003
1632110999	3264221999	10	~2003
1632114083	3264228167	10	~2003
1632131723	3264263447	10	~2003
1632188699	3264377399	10	~2003
1632254339	3264508679	10	~2003
1632268223	68555265367	11	~2006
1632310367	29381586607	11	~2005
1632326183	3264652367	10	~2003
1632332917	9793997503	10	~2004
1632391571	3264783143	10	~2003
1632419843	3264839687	10	~2003
1632429863	3264859727	10	~2003
1632430817	39178339609	11	~2006
1632433193	39178396633	11	~2006

Exponent	Prime Factor	Digits	Year
1632495191	3264990383	10	~2003
1632612911	3265225823	10	~2003
1632634331	3265268663	10	~2003
1632658451	3265316903	10	~2003
1632709283	3265418567	10	~2003
1632841583	3265683167	10	~2003
1632844417	26125510673	11	~2005
1632898343	3265796687	10	~2003
1633038161	91450137017	11	~2007
1633047491	3266094983	10	~2003
1633089203	3266178407	10	~2003
1633119629	13064957033	11	~2004
1633124123	3266248247	10	~2003
1633132601	13065060809	11	~2004
1633207403	3266414807	10	~2003
1633265363	3266530727	10	~2003
1633265363	42464899439	11
1633387787	13067102297	11	~2004
1633448699	3266897399	10	~2003
1633487173	9800923039	10	~2004
1633492799	3266985599	10	~2003
1633537319	3267074639	10	~2003
1633635623	3267271247	10	~2003
1633655459	13069243673	11	~2004
1633689899	3267379799	10	~2003

Exponent	Prime Factor	Digits	Year
1633796579	3267593159	10	~2003
1633804691	3267609383	10	~2003
1633842097	9803052583	10	~2004
1633869163	55551551543	11	~2006
1633871051	3267742103	10	~2003
1633969303	39215263273	11	~2006
1633983971	3267967943	10	~2003
1634129543	3268259087	10	~2003
1634144857	65365794281	11	~2006
1634164379	3268328759	10	~2003
1634184257	9805105543	10	~2004
1634198063	3268396127	10	~2003
1634251043	3268502087	10	~2003
1634300231	3268600463	10	~2003
1634446679	3268893359	10	~2003
1634471099	3268942199	10	~2003
1634493071	3268986143	10	~2003
1634499143	3268998287	10	~2003
1634507183	3269014367	10	~2003
1634508881	9807053287	10	~2004
1634511607	16345116071	11	~2005
1634533259	3269066519	10	~2003
1634637551	3269275103	10	~2003
1634702351	3269404703	10	~2003
1634713783	107891109679	12	~2007

5.187.277 digits

25-11-17