Small Mersenne Prime Factors (page 4613/5025)

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
39641774339	79283548679	11	~2014
39643265933	237859595599	12	~2015
39644270641	237865623847	12	~2015
39647731943	79295463887	11	~2014
39648600143	79297200287	11	~2014
39650408879	79300817759	11	~2014
39652455071	79304910143	11	~2014
39659190611	79318381223	11	~2014
39659793419	79319586839	11	~2014
39664504967	317316039737	12	~2015
39668269271	79336538543	11	~2014
39669659303	79339318607	11	~2014
39669922139	79339844279	11	~2014
39669997583	79339995167	11	~2014
39672870179	79345740359	11	~2014
39678512999	79357025999	11	~2014
39678680983	396786809831	12	~2015
39680709617	238084257703	12	~2015
39683231363	79366462727	11	~2014
39683991383	79367982767	11	~2014
39685656683	79371313367	11	~2014
39685808471	79371616943	11	~2014
39687353351	79374706703	11	~2014
39688270337	238129622023	12	~2015
39688932233	2595...680383	14	2024

Exponent	Prime Factor	Dig.	Year
39689724479	79379448959	11	~2014
39691139639	79382279279	11	~2014
39691379773	238148278639	12	~2015
39692879669	317543037353	12	~2015
39693132041	317545056329	12	~2015
39693459083	79386918167	11	~2014
39694805831	79389611663	11	~2014
39697228199	79394456399	11	~2014
39699220487	317593763897	12	~2015
39702753119	79405506239	11	~2014
39709321031	79418642063	11	~2014
39709413461	317675307689	12	~2015
39709570157	1580...922487	14	2025
39712323419	79424646839	11	~2014
39714352373	238286114239	12	~2015
39715013339	79430026679	11	~2014
39716002103	79432004207	11	~2014
39717229379	79434458759	11	~2014
39718170521	317745364169	12	~2015
39718318319	79436636639	11	~2014
39718910999	79437821999	11	~2014
39720856523	79441713047	11	~2014
39721691111	79443382223	11	~2014
39725085551	79450171103	11	~2014
39726381659	79452763319	11	~2014

Exponent	Prime Factor	Dig.	Year
39727015061	238362090367	12	~2015
39729208703	79458417407	11	~2014
39729752957	238378517743	12	~2015
39730625723	79461251447	11	~2014
39732007319	79464014639	11	~2014
39732482021	317859856169	12	~2015
39733105141	635729682257	12	~2016
39735988141	238415928847	12	~2015
39739576763	79479153527	11	~2014
39740385491	79480770983	11	~2014
39744490319	79488980639	11	~2014
39747361373	238484168239	12	~2015
39747495503	79494991007	11	~2014
39747508217	238485049303	12	~2015
39751743259	715531378663	12	~2016
39752112143	79504224287	11	~2014
39756038879	79512077759	11	~2014
39756536003	79513072007	11	~2014
39759484991	318075879929	12	~2015
39764257157	318114057257	12	~2015
39764454599	79528909199	11	~2014
39765251723	79530503447	11	~2014
39770417651	79540835303	11	~2014
39772696673	238636180039	12	~2015
39772889543	79545779087	11	~2014

Exponent	Prime Factor	Dig.	Year
39774770603	79549541207	11	~2014
39775865471	79551730943	11	~2014
39777173069	318217384553	12	~2015
39782753981	4041...044697	14	2024
39783607091	79567214183	11	~2014
39784950211	397849502111	12	~2016
39785415431	79570830863	11	~2014
39785489591	79570979183	11	~2014
39785957591	79571915183	11	~2014
39787004363	79574008727	11	~2014
39792519989	2387...993401	14	2024
39793387391	79586774783	11	~2014
39793704803	79587409607	11	~2014
39794335631	79588671263	11	~2014
39795652763	79591305527	11	~2014
39795861971	79591723943	11	~2014
39797284931	79594569863	11	~2014
39798329513	238789977079	12	~2015
39798602663	79597205327	11	~2014
39799297523	79598595047	11	~2014
39804504011	79609008023	11	~2014
39807150707	318457205657	12	~2015
39808126573	238848759439	12	~2015
39808538219	79617076439	11	~2014
39811990979	79623981959	11	~2014

4.724.182 digits

25-04-13