Small Mersenne Prime Factors (page 4453/5850)

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	Digits	Year
3275045701	19650274207	11	~2007
3275171279	6550342559	10	~2005
3275298203	6550596407	10	~2005
3275317751	6550635503	10	~2005
3275489291	6550978583	10	~2005
3275518751	6551037503	10	~2005
3275661479	6551322959	10	~2005
3275748961	98272468831	11	~2008
3275806883	6551613767	10	~2005
3275829911	6551659823	10	~2005
3275878187	26207025497	11	~2007
3275881361	98276440831	11	~2008
3275962451	6551924903	10	~2005
3276007523	6552015047	10	~2005
3276036587	78624878089	11	~2008
3276315857	19657895143	11	~2007
3276372023	6552744047	10	~2005
3276427439	6552854879	10	~2005
3276556021	19659336127	11	~2007
3276634841	19659809047	11	~2007
3276741953	45874387343	11	~2007
3276823741	19660942447	11	~2007
3276830363	6553660727	10	~2005
3276892991	6553785983	10	~2005
3276992861	203173557383	12	~2009

Exponent	Prime Factor	Digits	Year
3277195267	32771952671	11	~2007
3277244891	6554489783	10	~2005
3277312211	6554624423	10	~2005
3277407863	6554815727	10	~2005
3277452863	6554905727	10	~2005
3277464803	6554929607	10	~2005
3277581803	6555163607	10	~2005
3277664833	19665988999	11	~2007
3277776731	6555553463	10	~2005
3277825559	6555651119	10	~2005
3277892543	6555785087	10	~2005
3277928411	6555856823	10	~2005
3278197691	6556395383	10	~2005
3278269807	32782698071	11	~2007
3278276723	6556553447	10	~2005
3278290501	19669743007	11	~2007
3278307839	6556615679	10	~2005
3278341751	6556683503	10	~2005
3278686979	6557373959	10	~2005
3278778911	6557557823	10	~2005
3278822843	6557645687	10	~2005
3278910443	6557820887	10	~2005
3278991503	6557983007	10	~2005
3279016271	6558032543	10	~2005
3279105191	6558210383	10	~2005

Exponent	Prime Factor	Digits	Year
3279313501	19675881007	11	~2007
3279437303	6558874607	10	~2005
3279476279	6558952559	10	~2005
3279523019	26236184153	11	~2007
3279582227	78709973449	11	~2008
3279736391	6559472783	10	~2005
3279747743	6559495487	10	~2005
3279751691	6559503383	10	~2005
3279793463	6559586927	10	~2005
3279911933	183675068249	12	~2009
3279996211	52479939377	11	~2008
3280011659	6560023319	10	~2005
3280048633	150882237119	12	~2009
3280049939	6560099879	10	~2005
3280109471	6560218943	10	~2005
3280188187	78724516489	11	~2008
3280479481	19682876887	11	~2007
3280497931	59048962759	11	~2008
3280517819	6561035639	10	~2005
3280698247	32806982471	11	~2007
3280711751	6561423503	10	~2005
3280891571	6561783143	10	~2005
3281236163	6562472327	10	~2005
3281276363	6562552727	10	~2005
3281379719	6562759439	10	~2005

Exponent	Prime Factor	Digits	Year
3281450113	19688700679	11	~2007
3281563003	32815630031	11	~2007
3281602847	78758468329	11	~2008
3281626531	32816265311	11	~2007
3281691839	6563383679	10	~2005
3281714057	183775987193	12	~2009
3281734223	6563468447	10	~2005
3281754251	6563508503	10	~2005
3281817641	19690905847	11	~2007
3281822891	6563645783	10	~2005
3281908967	164095448351	12	~2009
3281979971	26255839769	11	~2007
3282017477	19692104863	11	~2007
3282110519	6564221039	10	~2005
3282256031	26258048249	11	~2007
3282257063	6564514127	10	~2005
3282291539	6564583079	10	~2005
3282379283	6564758567	10	~2005
3282487283	6564974567	10	~2005
3282489779	6564979559	10	~2005
3282565597	19695393583	11	~2007
3282608603	6565217207	10	~2005
3282807971	6565615943	10	~2005
3282939307	32829393071	11	~2007
3283167337	19699004023	11	~2007

5.546.121 digits

26-05-03