Small Mersenne Prime Factors (page 4815/5445)

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
22810956433	136865738599	12	~2013
22812275099	182498200793	12	~2013
22812401723	45624803447	11	~2012
22814031371	45628062743	11	~2012
22815200879	45630401759	11	~2012
22815255311	45630510623	11	~2012
22816086311	45632172623	11	~2012
22816431299	45632862599	11	~2012
22817502299	45635004599	11	~2012
22819617017	182556936137	12	~2013
22821123719	45642247439	11	~2012
22824007799	45648015599	11	~2012
22824272417	182594179337	12	~2013
22825200311	45650400623	11	~2012
22825675933	136954055599	12	~2013
22826451023	45652902047	11	~2012
22826914223	45653828447	11	~2012
22828532143	228285321431	12	~2014
22828649111	45657298223	11	~2012
22830188603	45660377207	11	~2012
22830350099	45660700199	11	~2012
22830751283	45661502567	11	~2012
22831096811	45662193623	11	~2012
22831766843	45663533687	11	~2012
22831958537	182655668297	12	~2013

Exponent	Prime Factor	Dig.	Year
22831976693	5207...460559	15	2025
22832542091	45665084183	11	~2012
22832790293	136996741759	12	~2013
22833164531	45666329063	11	~2012
22833360367	228333603671	12	~2014
22835577637	365369242193	12	~2014
22838120219	45676240439	11	~2012
22838711099	45677422199	11	~2012
22839498023	45678996047	11	~2012
22841118913	365457902609	12	~2014
22841960117	182735680937	12	~2013
22842762791	45685525583	11	~2012
22842803603	45685607207	11	~2012
22842956963	45685913927	11	~2012
22843088201	137058529207	12	~2013
22844087099	45688174199	11	~2012
22844700899	45689401799	11	~2012
22845706223	45691412447	11	~2012
22845817451	45691634903	11	~2012
22846790171	45693580343	11	~2012
22848371219	45696742439	11	~2012
22848848039	182790784313	12	~2013
22849475003	45698950007	11	~2012
22850628431	45701256863	11	~2012
22851103703	45702207407	11	~2012

Exponent	Prime Factor	Dig.	Year
22851497729	319920968207	12	~2014
22851576983	45703153967	11	~2012
22852096571	182816772569	12	~2013
22852600943	45705201887	11	~2012
22853652137	182829217097	12	~2013
22853753159	45707506319	11	~2012
22855108823	45710217647	11	~2012
22855334039	45710668079	11	~2012
22856538779	45713077559	11	~2012
22856701319	45713402639	11	~2012
22857291089	320002075247	12	~2014
22857466091	45714932183	11	~2012
22857480083	45714960167	11	~2012
22858045699	411444822583	12	~2014
22858365781	685750973431	12	~2015
22858654061	182869232489	12	~2013
22859195123	45718390247	11	~2012
22863665939	45727331879	11	~2012
22863725123	45727450247	11	~2012
22865315227	411575674087	12	~2014
22865323823	45730647647	11	~2012
22866368303	45732736607	11	~2012
22866386771	45732773543	11	~2012
22866947399	411605053183	12	~2014
22867636217	137205817303	12	~2013

Exponent	Prime Factor	Dig.	Year
22868336723	45736673447	11	~2012
22869402659	45738805319	11	~2012
22869632651	45739265303	11	~2012
22870158673	137220952039	12	~2013
22872195473	686165864191	12	~2015
22872549803	45745099607	11	~2012
22872602939	45745205879	11	~2012
22872801383	45745602767	11	~2012
22872967001	137237802007	12	~2013
22873125787	228731257871	12	~2014
22873467713	137240806279	12	~2013
22873848911	45747697823	11	~2012
22874273173	137245639039	12	~2013
22874647283	45749294567	11	~2012
22875060497	183000483977	12	~2013
22875260459	45750520919	11	~2012
22876087301	183008698409	12	~2013
22876368539	183010948313	12	~2013
22877032091	45754064183	11	~2012
22878622807	228786228071	12	~2014
22879812881	183038503049	12	~2013
22879920191	45759840383	11	~2012
22879966463	45759932927	11	~2012
22881583079	45763166159	11	~2012
22882055071	228820550711	12	~2014

5.142.307 digits

25-10-26