Small Mersenne Prime Factors (page 4580/5025)

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
34428970811	68857941623	11	~2013
34429874159	68859748319	11	~2013
34430536681	206583220087	12	~2014
34431492839	68862985679	11	~2013
34432517699	68865035399	11	~2013
34432826699	68865653399	11	~2013
34436115179	68872230359	11	~2013
34436618521	206619711127	12	~2014
34437220703	68874441407	11	~2013
34438257907	551012126513	12	~2016
34438497727	551015963633	12	~2016
34439132857	206634797143	12	~2014
34440571579	344405715791	12	~2015
34444608083	68889216167	11	~2013
34449809483	68899618967	11	~2013
34452363479	68904726959	11	~2013
34453554419	68907108839	11	~2013
34455388769	275643110153	12	~2015
34455391357	206732348143	12	~2014
34457128991	68914257983	11	~2013
34457364803	68914729607	11	~2013
34457537531	68915075063	11	~2013
34457821523	68915643047	11	~2013
34458631631	68917263263	11	~2013
34458745991	68917491983	11	~2013

Exponent	Prime Factor	Dig.	Year
34460644931	68921289863	11	~2013
34461441851	68922883703	11	~2013
34464972263	68929944527	11	~2013
34465331963	68930663927	11	~2013
34465965731	68931931463	11	~2013
34466071019	68932142039	11	~2013
34466729831	68933459663	11	~2013
34468715819	68937431639	11	~2013
34470407651	68940815303	11	~2013
34470855563	68941711127	11	~2013
34473090803	68946181607	11	~2013
34474062071	68948124143	11	~2013
34477732559	68955465119	11	~2013
34478214383	68956428767	11	~2013
34478695093	206872170559	12	~2014
34479386531	68958773063	11	~2013
34479502259	68959004519	11	~2013
34481914679	68963829359	11	~2013
34482010379	68964020759	11	~2013
34484163403	9414...090191	14	2025
34487489843	68974979687	11	~2013
34487776943	68975553887	11	~2013
34489432331	68978864663	11	~2013
34490381111	68980762223	11	~2013
34491351407	275930811257	12	~2015

Exponent	Prime Factor	Dig.	Year
34492229791	344922297911	12	~2015
34494090203	68988180407	11	~2013
34496111921	206976671527	12	~2014
34497959897	206987759383	12	~2014
34498432043	68996864087	11	~2013
34498675619	68997351239	11	~2013
34499065841	275992526729	12	~2015
34499940311	68999880623	11	~2013
34500966719	69001933439	11	~2013
34501778939	69003557879	11	~2013
34502671967	276021375737	12	~2015
34503640513	207021843079	12	~2014
34504774211	69009548423	11	~2013
34506780131	69013560263	11	~2013
34507863983	69015727967	11	~2013
34509788279	69019576559	11	~2013
34509904739	69019809479	11	~2013
34517916899	69035833799	11	~2013
34520325923	69040651847	11	~2013
34522808051	69045616103	11	~2013
34523116139	69046232279	11	~2013
34524291023	69048582047	11	~2013
34524518579	69049037159	11	~2013
34525940723	69051881447	11	~2013
34526423081	276211384649	12	~2015

Exponent	Prime Factor	Dig.	Year
34528725383	69057450767	11	~2013
34532616803	69065233607	11	~2013
34532666939	69065333879	11	~2013
34532690603	69065381207	11	~2013
34533529441	207201176647	12	~2014
34534257839	69068515679	11	~2013
34534311719	69068623439	11	~2013
34540937971	621736883479	12	~2016
34541355839	69082711679	11	~2013
34543552343	69087104687	11	~2013
34543962611	69087925223	11	~2013
34544880131	69089760263	11	~2013
34547704931	69095409863	11	~2013
34548959999	69097919999	11	~2013
34549572419	69099144839	11	~2013
34560811583	69121623167	11	~2013
34561343471	69122686943	11	~2013
34562370041	276498960329	12	~2015
34562400503	69124801007	11	~2013
34562697643	553003162289	12	~2016
34564055243	69128110487	11	~2013
34564432319	69128864639	11	~2013
34564467083	69128934167	11	~2013
34566036143	69132072287	11	~2013
34566120839	69132241679	11	~2013

4.724.182 digits

25-04-13