Small Mersenne Prime Factors (page 4809/5850)

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
8488863221	50933179327	11	~2010
8488902263	16977804527	11	~2009
8489014739	16978029479	11	~2009
8489324939	16978649879	11	~2009
8489635097	118854891359	12	~2011
8490039263	16980078527	11	~2009
8490042839	16980085679	11	~2009
8490266651	16980533303	11	~2009
8490347639	16980695279	11	~2009
8490400199	16980800399	11	~2009
8490446183	16980892367	11	~2009
8491031513	50946189079	11	~2010
8491255511	16982511023	11	~2009
8492028491	16984056983	11	~2009
8492059811	16984119623	11	~2009
8492070277	135873124433	12	~2011
8492104037	50952624223	11	~2010
8492123603	16984247207	11	~2009
8492343551	16984687103	11	~2009
8492848781	67942790249	11	~2010
8492930483	16985860967	11	~2009
8492931719	16985863439	11	~2009
8494030631	16988061263	11	~2009
8494211111	16988422223	11	~2009
8494213631	16988427263	11	~2009

Exponent	Prime Factor	Dig.	Year
8494442471	16988884943	11	~2009
8494682831	16989365663	11	~2009
8495138347	84951383471	11	~2010
8495396471	16990792943	11	~2009
8495408693	50972452159	11	~2010
8495513879	16991027759	11	~2009
8495586181	50973517087	11	~2010
8495624171	16991248343	11	~2009
8495811889	186907861559	12	~2011
8495856983	16991713967	11	~2009
8496024623	16992049247	11	~2009
8496173177	50977039063	11	~2010
8496325391	16992650783	11	~2009
8496542399	16993084799	11	~2009
8497116821	50982700927	11	~2010
8498033737	135968539793	12	~2011
8498192051	16996384103	11	~2009
8498262431	16996524863	11	~2009
8498304341	50989826047	11	~2010
8498321099	16996642199	11	~2009
8498469601	50990817607	11	~2010
8498510843	16997021687	11	~2009
8498538271	135976612337	12	~2011
8498651039	16997302079	11	~2009
8498744539	84987445391	11	~2010

Exponent	Prime Factor	Dig.	Year
8499614597	67996916777	11	~2010
8499690599	16999381199	11	~2009
8499721859	16999443719	11	~2009
8499806291	16999612583	11	~2009
8499827461	50998964767	11	~2010
8500358459	17000716919	11	~2009
8500578491	17001156983	11	~2009
8500685003	17001370007	11	~2009
8500735319	17001470639	11	~2009
8500995263	17001990527	11	~2009
8501233439	17002466879	11	~2009
8501293517	119018109239	12	~2011
8501325179	17002650359	11	~2009
8501354111	17002708223	11	~2009
8501680477	51010082863	11	~2010
8501794811	17003589623	11	~2009
8501956873	136031309969	12	~2011
8502008759	17004017519	11	~2009
8502297911	17004595823	11	~2009
8502757199	17005514399	11	~2009
8502989879	17005979759	11	~2009
8503269157	136052306513	12	~2011
8503600663	85036006631	11	~2010
8503690463	17007380927	11	~2009
8503722911	17007445823	11	~2009

Exponent	Prime Factor	Dig.	Year
8503908863	17007817727	11	~2009
8504307551	17008615103	11	~2009
8504318219	17008636439	11	~2009
8504526671	17009053343	11	~2009
8504673953	51028043719	11	~2010
8504792573	51028755439	11	~2010
8504961719	17009923439	11	~2009
8505215843	17010431687	11	~2009
8505337199	17010674399	11	~2009
8505528599	17011057199	11	~2009
8505910661	51035463967	11	~2010
8506437743	17012875487	11	~2009
8506507739	17013015479	11	~2009
8506509299	17013018599	11	~2009
8506650479	17013300959	11	~2009
8507124419	153128239543	12	~2011
8507312699	17014625399	11	~2009
8507606291	17015212583	11	~2009
8507824631	17015649263	11	~2009
8508426263	17016852527	11	~2009
8508436571	17016873143	11	~2009
8508563317	51051379903	11	~2010
8508777019	748772377673	12	~2013
8508966239	17017932479	11	~2009
8509220833	136147533329	12	~2011

5.546.121 digits

26-05-03