Small Mersenne Prime Factors (page 4330/5775)

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
2718664103	5437328207	10	~2005
2718759479	5437518959	10	~2005
2718900367	288203438903	12	~2009
2718908917	16313453503	11	~2006
2718945263	5437890527	10	~2005
2718946733	16313680399	11	~2006
2719513619	5439027239	10	~2005
2719880963	5439761927	10	~2005
2719933591	114237210823	12	~2008
2719962647	21759701177	11	~2006
2719965863	5439931727	10	~2005
2720267789	21762142313	11	~2006
2720331217	16321987303	11	~2006
2720441123	5440882247	10	~2005
2720583269	21764666153	11	~2006
2720678879	5441357759	10	~2005
2720773103	5441546207	10	~2005
2720885891	48975946039	11	~2007
2720984531	5441969063	10	~2005
2721011291	5442022583	10	~2005
2721120481	16326722887	11	~2006
2721128639	5442257279	10	~2005
2721132083	5442264167	10	~2005
2721191021	16327146127	11	~2006
2721287341	16327724047	11	~2006

Exponent	Prime Factor	Digits	Year
2721335471	5442670943	10	~2005
2721342901	16328057407	11	~2006
2721427823	5442855647	10	~2005
2721532061	16329192367	11	~2006
2721556193	16329337159	11	~2006
2721560519	5443121039	10	~2005
2721703499	5443406999	10	~2005
2721752393	16330514359	11	~2006
2721849587	21774796697	11	~2006
2721877643	5443755287	10	~2005
2721990917	21775927337	11	~2006
2722184173	16333105039	11	~2006
2722220279	5444440559	10	~2005
2722226471	5444452943	10	~2005
2722304399	21778435193	11	~2006
2722334591	5444669183	10	~2005
2722353479	5444706959	10	~2005
2722463819	5444927639	10	~2005
2722552087	49005937567	11	~2007
2722567619	5445135239	10	~2005
2722587443	5445174887	10	~2005
2722707677	16336246063	11	~2006
2722774139	5445548279	10	~2005
2722862123	5445724247	10	~2005
2722969943	5445939887	10	~2005

Exponent	Prime Factor	Digits	Year
2723038691	5446077383	10	~2005
2723076071	21784608569	11	~2006
2723196761	21785574089	11	~2006
2723260031	5446520063	10	~2005
2723524019	5447048039	10	~2005
2723561909	130730971633	12	~2008
2723589101	16341534607	11	~2006
2723650717	16341904303	11	~2006
2723678843	5447357687	10	~2005
2723771903	5447543807	10	~2005
2723832659	5447665319	10	~2005
2724081719	5448163439	10	~2005
2724113831	479444034257	12	~2009
2724154151	5448308303	10	~2005
2724231373	16345388239	11	~2006
2724284159	5448568319	10	~2005
2724287759	5448575519	10	~2005
2724308131	43588930097	11	~2007
2724327071	5448654143	10	~2005
2724335543	5448671087	10	~2005
2724468251	5448936503	10	~2005
2724492359	5448984719	10	~2005
2724664199	5449328399	10	~2005
2724944063	5449888127	10	~2005
2724998401	16349990407	11	~2006

Exponent	Prime Factor	Digits	Year
2725129559	65403109417	11	~2007
2725221409	59954870999	11	~2007
2725234157	16351404943	11	~2006
2725242119	5450484239	10	~2005
2725259441	16351556647	11	~2006
2725262531	5450525063	10	~2005
2725277699	5450555399	10	~2005
2725294931	5450589863	10	~2005
2725416277	16352497663	11	~2006
2725525571	5451051143	10	~2005
2725618391	5451236783	10	~2005
2725623419	5451246839	10	~2005
2725628491	27256284911	11	~2006
2725667801	21805342409	11	~2006
2725732397	21805859177	11	~2006
2725839397	43613430353	11	~2007
2725885039	27258850391	11	~2006
2725925711	5451851423	10	~2005
2726030831	5452061663	10	~2005
2726220779	5452441559	10	~2005
2726245139	5452490279	10	~2005
2726289899	5452579799	10	~2005
2726311781	21810494249	11	~2006
2726322143	5452644287	10	~2005
2726382299	5452764599	10	~2005

5.471.290 digits

26-03-29