Small Mersenne Prime Factors (page 4592/5025)

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
36269818379	72539636759	11	~2013
36269916239	72539832479	11	~2013
36270395573	217622373439	12	~2015
36270611411	72541222823	11	~2013
36270853571	72541707143	11	~2013
36270889841	290167118729	12	~2015
36271546277	290172370217	12	~2015
36273098833	217638592999	12	~2015
36273758903	72547517807	11	~2013
36278785379	72557570759	11	~2013
36281771033	217690626199	12	~2015
36283041551	72566083103	11	~2013
36283369079	72566738159	11	~2013
36284886461	217709318767	12	~2015
36286035059	72572070119	11	~2013
36288009337	217728056023	12	~2015
36288463811	72576927623	11	~2013
36288747353	217732484119	12	~2015
36291046717	217746280303	12	~2015
36291382139	72582764279	11	~2013
36291892943	72583785887	11	~2013
36293907431	72587814863	11	~2013
36297210953	217783265719	12	~2015
36299391071	72598782143	11	~2013
36300591791	72601183583	11	~2013

Exponent	Prime Factor	Dig.	Year
36302658397	217815950383	12	~2015
36302951123	72605902247	11	~2013
36304904551	363049045511	12	~2015
36305158343	72610316687	11	~2013
36305739611	72611479223	11	~2013
36306216629	290449733033	12	~2015
36306848663	72613697327	11	~2013
36309227459	72618454919	11	~2013
36309403421	290475227369	12	~2015
36312994871	72625989743	11	~2013
36313416961	217880501767	12	~2015
36313748291	72627496583	11	~2013
36318681083	72637362167	11	~2013
36320814011	72641628023	11	~2013
36321506843	72643013687	11	~2013
36321893843	72643787687	11	~2013
36322122911	72644245823	11	~2013
36323000471	72646000943	11	~2013
36323578817	290588630537	12	~2015
36324901007	290599208057	12	~2015
36325642739	72651285479	11	~2013
36325693331	72651386663	11	~2013
36327412679	72654825359	11	~2013
36327698111	2290...287967	15	2025
36329938919	72659877839	11	~2013

Exponent	Prime Factor	Dig.	Year
36331768919	72663537839	11	~2013
36334245659	72668491319	11	~2013
36334535351	72669070703	11	~2013
36336266831	72672533663	11	~2013
36338686211	72677372423	11	~2013
36339332279	72678664559	11	~2013
36340122191	72680244383	11	~2013
36340736167	363407361671	12	~2015
36344737703	72689475407	11	~2013
36346857731	72693715463	11	~2013
36348603911	72697207823	11	~2013
36350627639	72701255279	11	~2013
36350683223	72701366447	11	~2013
36352045097	218112270583	12	~2015
36352641359	72705282719	11	~2013
36354516043	363545160431	12	~2015
36357845003	72715690007	11	~2013
36359329261	218155975567	12	~2015
36359488799	72718977599	11	~2013
36360590099	72721180199	11	~2013
36360807403	581772918449	12	~2016
36369744821	218218468927	12	~2015
36374051663	72748103327	11	~2013
36377153357	218262920143	12	~2015
36377175911	72754351823	11	~2013

Exponent	Prime Factor	Dig.	Year
36378107411	72756214823	11	~2013
36378724859	72757449719	11	~2013
36378776639	72757553279	11	~2013
36379305731	72758611463	11	~2013
36381179843	72762359687	11	~2013
36382014743	72764029487	11	~2013
36383777063	72767554127	11	~2013
36388552523	72777105047	11	~2013
36390458543	72780917087	11	~2013
36395589011	72791178023	11	~2013
36396060611	72792121223	11	~2013
36397929863	72795859727	11	~2013
36398348257	218390089543	12	~2015
36403423013	509647922183	12	~2016
36403846211	72807692423	11	~2013
36405469559	72810939119	11	~2013
36410602399	364106023991	12	~2015
36414929399	72829858799	11	~2013
36416537543	72833075087	11	~2013
36417961091	72835922183	11	~2013
36420769823	72841539647	11	~2013
36421038539	72842077079	11	~2013
36424817459	72849634919	11	~2013
36425171603	72850343207	11	~2013
36429238151	72858476303	11	~2013

4.724.182 digits

25-04-13