Small Mersenne Prime Factors (page 3816/5025)

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	Digits	Year
2562955019	5125910039	10	~2004
2562963659	5125927319	10	~2004
2563008803	5126017607	10	~2004
2563014059	5126028119	10	~2004
2563029179	5126058359	10	~2004
2563045619	5126091239	10	~2004
2563074719	5126149439	10	~2004
2563120271	5126240543	10	~2004
2563128371	5126256743	10	~2004
2563139003	5126278007	10	~2004
2563213463	5126426927	10	~2004
2563310591	5126621183	10	~2004
2563325111	5126650223	10	~2004
2563385543	5126771087	10	~2004
2563405583	5126811167	10	~2004
2563423921	15380543527	11	~2006
2563464203	5126928407	10	~2004
2563499531	5126999063	10	~2004
2563543799	5127087599	10	~2004
2563584203	5127168407	10	~2004
2563619843	5127239687	10	~2004
2563680719	5127361439	10	~2004
2563695371	5127390743	10	~2004
2563769051	5127538103	10	~2004
2563832413	15382994479	11	~2006

Exponent	Prime Factor	Digits	Year
2564017679	5128035359	10	~2004
2564031419	5128062839	10	~2004
2564141159	5128282319	10	~2004
2564187737	323087654863	12	~2009
2564224297	15385345783	11	~2006
2564293421	15385760527	11	~2006
2564325251	5128650503	10	~2004
2564395451	5128790903	10	~2004
2564472881	15386837287	11	~2006
2564551859	5129103719	10	~2004
2564585531	5129171063	10	~2004
2564752559	5129505119	10	~2004
2564785103	5129570207	10	~2004
2565053213	15390319279	11	~2006
2565186971	5130373943	10	~2004
2565251543	5130503087	10	~2004
2565375359	5130750719	10	~2004
2565382103	5130764207	10	~2004
2565403439	20523227513	11	~2006
2565411119	5130822239	10	~2004
2565489137	20523913097	11	~2006
2565503321	15393019927	11	~2006
2565522191	5131044383	10	~2004
2565546791	46179842239	11	~2007
2565567611	5131135223	10	~2004

Exponent	Prime Factor	Digits	Year
2565664603	25656646031	11	~2006
2565681571	25656815711	11	~2006
2565843043	25658430431	11	~2006
2565926309	20527410473	11	~2006
2566071731	5132143463	10	~2004
2566080371	5132160743	10	~2004
2566125379	25661253791	11	~2006
2566151051	5132302103	10	~2004
2566256941	15397541647	11	~2006
2566400663	5132801327	10	~2004
2566537643	5133075287	10	~2004
2566580231	5133160463	10	~2004
2566820237	35935483319	11	~2007
2566835471	5133670943	10	~2004
2566958413	102678336521	12	~2008
2566970071	25669700711	11	~2006
2566994663	5133989327	10	~2004
2567331187	41077298993	11	~2007
2567346011	5134692023	10	~2004
2567352961	15404117767	11	~2006
2567362823	5134725647	10	~2004
2567408219	5134816439	10	~2004
2567426093	35943965303	11	~2007
2567529911	5135059823	10	~2004
2567673743	5135347487	10	~2004

Exponent	Prime Factor	Digits	Year
2567982383	5135964767	10	~2004
2568050351	5136100703	10	~2004
2568058511	5136117023	10	~2004
2568110903	5136221807	10	~2004
2568180037	15409080223	11	~2006
2568240491	5136480983	10	~2004
2568472631	5136945263	10	~2004
2568496223	5136992447	10	~2004
2568723659	5137447319	10	~2004
2568899111	5137798223	10	~2004
2569015763	5138031527	10	~2004
2569018943	5138037887	10	~2004
2569063487	20552507897	11	~2006
2569189163	5138378327	10	~2004
2569208819	5138417639	10	~2004
2569220501	20553764009	11	~2006
2569252643	5138505287	10	~2004
2569352293	15416113759	11	~2006
2569398731	5138797463	10	~2004
2569444019	5138888039	10	~2004
2569444373	61666664953	11	~2007
2569528763	5139057527	10	~2004
2569616831	5139233663	10	~2004
2569724303	5139448607	10	~2004
2569781701	15418690207	11	~2006

4.724.182 digits

25-04-13