Small Mersenne Prime Factors (page 4661/5340)

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
17923308899	35846617799	11	~2011
17924051279	35848102559	11	~2011
17924423261	143395386089	12	~2013
17926778497	537803354911	12	~2014
17926817939	35853635879	11	~2011
17926872539	35853745079	11	~2011
17926926077	107561556463	12	~2012
17927414819	35854829639	11	~2011
17928417313	286854677009	12	~2013
17928613523	35857227047	11	~2011
17928710617	107572263703	12	~2012
17929430483	35858860967	11	~2011
17929866653	107579199919	12	~2012
17929934657	107579607943	12	~2012
17930094431	35860188863	11	~2011
17931845551	286909528817	12	~2013
17932075901	107592455407	12	~2012
17932236011	35864472023	11	~2011
17933056751	466259475527	12	~2014
17933171159	35866342319	11	~2011
17934018671	35868037343	11	~2011
17934363803	35868727607	11	~2011
17934916859	35869833719	11	~2011
17935057823	35870115647	11	~2011
17935460183	35870920367	11	~2011

Exponent	Prime Factor	Dig.	Year
17936277563	35872555127	11	~2011
17936517877	107619107263	12	~2012
17937205703	35874411407	11	~2011
17938827719	35877655439	11	~2011
17940340763	35880681527	11	~2011
17940670343	35881340687	11	~2011
17940780491	35881560983	11	~2011
17940882779	35881765559	11	~2011
17942804219	35885608439	11	~2011
17943044711	35886089423	11	~2011
17944573019	35889146039	11	~2011
17945303557	107671821343	12	~2012
17945313359	35890626719	11	~2011
17945666279	35891332559	11	~2011
17945783077	107674698463	12	~2012
17946964439	35893928879	11	~2011
17947206083	35894412167	11	~2011
17947665503	35895331007	11	~2011
17947861391	35895722783	11	~2011
17948401517	107690409103	12	~2012
17948633639	35897267279	11	~2011
17948953703	35897907407	11	~2011
17949088033	538472640991	12	~2014
17949262841	107695577047	12	~2012
17949311777	107695870663	12	~2012

Exponent	Prime Factor	Dig.	Year
17949435659	35898871319	11	~2011
17949535559	35899071119	11	~2011
17949862643	35899725287	11	~2011
17950710119	35901420239	11	~2011
17950725983	35901451967	11	~2011
17950857853	107705147119	12	~2012
17951347679	35902695359	11	~2011
17951625007	179516250071	12	~2013
17951895239	35903790479	11	~2011
17951950661	3802...499999	14	2023
17951978651	35903957303	11	~2011
17952721343	35905442687	11	~2011
17953448699	35906897399	11	~2011
17956673431	179566734311	12	~2013
17956771463	35913542927	11	~2011
17957582003	35915164007	11	~2011
17958132683	35916265367	11	~2011
17958156179	35916312359	11	~2011
17958503243	35917006487	11	~2011
17959373051	35918746103	11	~2011
17961442193	107768653159	12	~2012
17962182383	35924364767	11	~2011
17963544671	35927089343	11	~2011
17964964229	143719713833	12	~2013
17965140419	35930280839	11	~2011

Exponent	Prime Factor	Dig.	Year
17967289331	35934578663	11	~2011
17967348131	35934696263	11	~2011
17968076831	35936153663	11	~2011
17969168891	143753351129	12	~2013
17969284097	107815704583	12	~2012
17969720591	35939441183	11	~2011
17970703081	107824218487	12	~2012
17972291399	35944582799	11	~2011
17972741243	35945482487	11	~2011
17974945799	35949891599	11	~2011
17975004059	35950008119	11	~2011
17975059331	35950118663	11	~2011
17975541431	35951082863	11	~2011
17976717797	143813742377	12	~2013
17976907451	35953814903	11	~2011
17976968063	35953936127	11	~2011
17977131937	107862791623	12	~2012
17977374323	35954748647	11	~2011
17978287697	107869726183	12	~2012
17979214291	179792142911	12	~2013
17979254339	35958508679	11	~2011
17980239653	107881437919	12	~2012
17980356899	35960713799	11	~2011
17981055101	143848440809	12	~2013
17981653799	35963307599	11	~2011

5.037.460 digits

25-09-07