Small Mersenne Prime Factors (page 2930/5040)

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	Digits	Year
286959083	573918167	9	~1997
286962911	573925823	9	~1997
286964963	573929927	9	~1997
286972097	1721832583	10	~1998
286976279	573952559	9	~1997
286979597	1721877583	10	~1998
286981619	573963239	9	~1997
286984513	1721907079	10	~1998
286985123	573970247	9	~1997
286986071	573972143	9	~1997
286992731	573985463	9	~1997
287002031	574004063	9	~1997
287010611	574021223	9	~1997
287013299	574026599	9	~1997
287014901	2296119209	10	~1999
287022661	1722135967	10	~1998
287031683	574063367	9	~1997
287040779	574081559	9	~1997
287043671	574087343	9	~1997
287044811	574089623	9	~1997
287050019	574100039	9	~1997
287060219	574120439	9	~1997
287065643	574131287	9	~1997
287080433	1722482599	10	~1998
287082623	574165247	9	~1997

Exponent	Prime Factor	Digits	Year
287087639	574175279	9	~1997
287096261	2296770089	10	~1999
287100119	574200239	9	~1997
287104403	574208807	9	~1997
287105099	574210199	9	~1997
287105839	5167905103	10	~1999
287106383	574212767	9	~1997
287118599	2296948793	10	~1999
287124419	574248839	9	~1997
287127353	1722764119	10	~1998
287132171	574264343	9	~1997
287132831	574265663	9	~1997
287134271	574268543	9	~1997
287136449	2297091593	10	~1999
287142431	574284863	9	~1997
287146879	6891525097	10	~2000
287147717	1722886303	10	~1998
287160011	574320023	9	~1997
287162507	13783800337	11	~2000
287166989	2297335913	10	~1999
287174957	1723049743	10	~1998
287177357	2297418857	10	~1999
287177623	2871776231	10	~1999
287177771	574355543	9	~1997
287194643	574389287	9	~1997

Exponent	Prime Factor	Digits	Year
287198819	574397639	9	~1997
287199179	574398359	9	~1997
287199743	574399487	9	~1997
287210221	4595363537	10	~1999
287235253	1723411519	10	~1998
287236997	4021317959	10	~1999
287240771	574481543	9	~1997
287243039	20681498809	11	~2001
287252831	574505663	9	~1997
287252891	574505783	9	~1997
287254043	574508087	9	~1997
287254133	1723524799	10	~1998
287257199	574514399	9	~1997
287260991	5170697839	10	~1999
287264339	574528679	9	~1997
287274671	574549343	9	~1997
287278169	2298225353	10	~1999
287279711	574559423	9	~1997
287279939	574559879	9	~1997
287281331	574562663	9	~1997
287281451	574562903	9	~1997
287284031	574568063	9	~1997
287284451	574568903	9	~1997
287288809	6320353799	10	~2000
287291099	574582199	9	~1997

Exponent	Prime Factor	Digits	Year
287295539	574591079	9	~1997
287309417	1723856503	10	~1998
287315111	574630223	9	~1997
287317619	574635239	9	~1997
287339543	574679087	9	~1997
287353343	574706687	9	~1997
287354437	45976709921	11	~2002
287358563	574717127	9	~1997
287358671	574717343	9	~1997
287359703	574719407	9	~1997
287360471	574720943	9	~1997
287363591	574727183	9	~1997
287367361	6322081943	10	~2000
287385313	1724311879	10	~1998
287389211	574778423	9	~1997
287398253	36212179879	11	~2001
287400551	574801103	9	~1997
287403839	574807679	9	~1997
287409359	574818719	9	~1997
287410163	574820327	9	~1997
287417951	574835903	9	~1997
287424283	4598788529	10	~1999
287424569	2299396553	10	~1999
287429771	574859543	9	~1997
287447411	574894823	9	~1997

4.739.325 digits

25-04-20