Small Mersenne Prime Factors (page 4854/5850)

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
9640467971	19280935943	11	~2009
9640783811	19281567623	11	~2009
9641375339	19282750679	11	~2009
9641762639	19283525279	11	~2009
9641977979	19283955959	11	~2009
9642164699	19284329399	11	~2009
9642803831	77142430649	11	~2010
9642840743	19285681487	11	~2009
9643499819	19286999639	11	~2009
9643709819	19287419639	11	~2009
9643791593	57862749559	11	~2010
9645009611	19290019223	11	~2009
9645726977	57874361863	11	~2010
9645760031	19291520063	11	~2009
9646477091	19292954183	11	~2009
9646545323	19293090647	11	~2009
9647473391	77179787129	11	~2010
9647578379	19295156759	11	~2009
9647800859	19295601719	11	~2009
9648051437	135072720119	12	~2011
9648844631	19297689263	11	~2009
9648934391	19297868783	11	~2009
9649027691	173682498439	12	~2011
9649135211	19298270423	11	~2009
9649502873	135093040223	12	~2011

Exponent	Prime Factor	Dig.	Year
9650083259	19300166519	11	~2009
9650086739	19300173479	11	~2009
9650322683	19300645367	11	~2009
9650562143	19301124287	11	~2009
9650611199	19301222399	11	~2009
9651121247	77208969977	11	~2010
9651136897	57906821383	11	~2010
9651414599	19302829199	11	~2009
9651494903	19302989807	11	~2009
9651713857	57910283143	11	~2010
9651757163	19303514327	11	~2009
9651766259	19303532519	11	~2009
9652437719	19304875439	11	~2009
9652568483	19305136967	11	~2009
9652921259	19305842519	11	~2009
9653453963	19306907927	11	~2009
9653607791	19307215583	11	~2009
9653797859	19307595719	11	~2009
9653834579	19307669159	11	~2009
9654306503	19308613007	11	~2009
9654396943	154470351089	12	~2011
9654498383	19308996767	11	~2009
9656247157	57937482943	11	~2010
9656784017	135194976239	12	~2011
9657239783	19314479567	11	~2009

Exponent	Prime Factor	Dig.	Year
9657623351	19315246703	11	~2009
9658054079	19316108159	11	~2009
9658420259	19316840519	11	~2009
9659096039	19318192079	11	~2009
9659285213	289778556391	12	~2012
9659567857	57957407143	11	~2010
9660423491	19320846983	11	~2009
9660881753	57965290519	11	~2010
9661206091	96612060911	11	~2011
9661853291	19323706583	11	~2009
9662080871	19324161743	11	~2009
9662165911	695675945593	12	~2013
9662859359	19325718719	11	~2009
9663128543	19326257087	11	~2009
9663418679	19326837359	11	~2009
9663449801	57980698807	11	~2010
9663549611	19327099223	11	~2009
9663591683	19327183367	11	~2009
9663966491	19327932983	11	~2009
9663996493	57983978959	11	~2010
9664701731	19329403463	11	~2009
9665284823	19330569647	11	~2009
9665362523	231968700553	12	~2012
9666168971	19332337943	11	~2009
9666587837	77332702697	11	~2010

Exponent	Prime Factor	Dig.	Year
9666679007	715334246519	12	~2013
9666939251	19333878503	11	~2009
9667633919	19335267839	11	~2009
9667817381	58006904287	11	~2010
9668261363	19336522727	11	~2009
9668341777	58010050663	11	~2010
9668762821	58012576927	11	~2010
9669433643	19338867287	11	~2009
9669727439	19339454879	11	~2009
9670393511	19340787023	11	~2009
9670458719	19340917439	11	~2009
9671016419	19342032839	11	~2009
9671039723	19342079447	11	~2009
9671047931	19342095863	11	~2009
9671566319	19343132639	11	~2009
9671655023	19343310047	11	~2009
9671990417	58031942503	11	~2010
9672279313	154756469009	12	~2011
9672511559	19345023119	11	~2009
9672527363	19345054727	11	~2009
9673460399	19346920799	11	~2009
9673636781	77389094249	11	~2010
9673713227	77389705817	11	~2010
9673952503	154783240049	12	~2011
9674314619	19348629239	11	~2009

5.546.121 digits

26-05-03