Small Mersenne Prime Factors (page 4591/5340)

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
14159615891	28319231783	11	~2010
14159941337	84959648023	11	~2011
14159944991	113279559929	12	~2012
14160337151	28320674303	11	~2010
14160347951	28320695903	11	~2010
14160406907	113283255257	12	~2012
14160693803	28321387607	11	~2010
14160828809	113286630473	12	~2012
14161967783	28323935567	11	~2010
14162584697	84975508183	11	~2011
14162607611	28325215223	11	~2010
14162850419	28325700839	11	~2010
14163849467	113310795737	12	~2012
14163872171	28327744343	11	~2010
14164005083	28328010167	11	~2010
14165192579	28330385159	11	~2010
14165217959	28330435919	11	~2010
14165685731	28331371463	11	~2010
14166269437	84997616623	11	~2011
14166271033	84997626199	11	~2011
14166355019	28332710039	11	~2010
14166477953	84998867719	11	~2011
14166902903	28333805807	11	~2010
14169535739	28339071479	11	~2010
14169633617	425089008511	12	~2013

Exponent	Prime Factor	Dig.	Year
14169644663	28339289327	11	~2010
14170473721	226727579537	12	~2013
14170480139	28340960279	11	~2010
14171170441	425135113231	12	~2013
14171370971	28342741943	11	~2010
14171934599	28343869199	11	~2010
14171943433	85031660599	11	~2011
14171975963	28343951927	11	~2010
14172399023	28344798047	11	~2010
14173099487	1329...318807	14	2023
14173349891	28346699783	11	~2010
14173413599	28346827199	11	~2010
14173467241	85040803447	11	~2011
14174028797	113392230377	12	~2012
14174224811	113393798489	12	~2012
14174511899	28349023799	11	~2010
14174558159	28349116319	11	~2010
14174831791	226797308657	12	~2013
14175174983	28350349967	11	~2010
14175533279	28351066559	11	~2010
14176035193	85056211159	11	~2011
14176427519	28352855039	11	~2010
14177074319	28354148639	11	~2010
14177560043	2645...040239	14	2024
14178248099	28356496199	11	~2010

Exponent	Prime Factor	Dig.	Year
14178643151	28357286303	11	~2010
14178703559	28357407119	11	~2010
14181628739	28363257479	11	~2010
14182604173	85095625039	11	~2011
14182988951	28365977903	11	~2010
14183187121	85099122727	11	~2011
14183660339	28367320679	11	~2010
14184526943	28369053887	11	~2010
14185068503	28370137007	11	~2010
14185462211	28370924423	11	~2010
14185700369	425571011071	12	~2013
14186053837	85116323023	11	~2011
14186287991	28372575983	11	~2010
14186392331	28372784663	11	~2010
14186415707	113491325657	12	~2012
14186930291	28373860583	11	~2010
14186948939	28373897879	11	~2010
14186964119	28373928239	11	~2010
14186978639	28373957279	11	~2010
14187206773	85123240639	11	~2011
14187418691	28374837383	11	~2010
14188698197	3186...150463	14	2023
14188999007	113511992057	12	~2012
14189174459	28378348919	11	~2010
14190209843	28380419687	11	~2010

Exponent	Prime Factor	Dig.	Year
14191014683	28382029367	11	~2010
14191770779	28383541559	11	~2010
14191910303	28383820607	11	~2010
14193577157	113548617257	12	~2012
14193797153	85162782919	11	~2011
14194270877	85165625263	11	~2011
14194312799	28388625599	11	~2010
14194320719	28388641439	11	~2010
14195267657	85171605943	11	~2011
14195744291	28391488583	11	~2010
14197160111	113577280889	12	~2012
14197684643	28395369287	11	~2010
14197898069	113583184553	12	~2012
14198060939	28396121879	11	~2010
14198399093	85190394559	11	~2011
14198502011	28397004023	11	~2010
14198582423	28397164847	11	~2010
14199279001	85195674007	11	~2011
14199843023	28399686047	11	~2010
14200059371	113600474969	12	~2012
14200508099	28401016199	11	~2010
14200990633	85205943799	11	~2011
14201285099	28402570199	11	~2010
14201307031	255623526559	12	~2013
14202104831	28404209663	11	~2010

5.037.460 digits

25-09-07