Small Mersenne Prime Factors (page 4006/5070)

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
4109451371	32875610969	11	~2008
4109603903	8219207807	10	~2006
4109651411	8219302823	10	~2006
4109763727	41097637271	11	~2008
4109783663	8219567327	10	~2006
4109891939	8219783879	10	~2006
4109908723	41099087231	11	~2008
4109964623	8219929247	10	~2006
4109994263	8219988527	10	~2006
4110174613	65762793809	11	~2008
4110369611	8220739223	10	~2006
4110577927	41105779271	11	~2008
4110681203	8221362407	10	~2006
4110713891	172649983423	12	~2009
4110729431	8221458863	10	~2006
4110741443	8221482887	10	~2006
4110932951	8221865903	10	~2006
4111120511	8222241023	10	~2006
4111447553	24668685319	11	~2007
4111496633	24668979799	11	~2007
4111712903	8223425807	10	~2006
4111794419	8223588839	10	~2006
4111843049	123355291471	12	~2009
4111897571	8223795143	10	~2006
4111935731	8223871463	10	~2006

Exponent	Prime Factor	Digits	Year
4112031503	8224063007	10	~2006
4112228759	32897830073	11	~2008
4112468219	8224936439	10	~2006
4112776807	98706643369	11	~2009
4113251111	8226502223	10	~2006
4113383819	8226767639	10	~2006
4113457823	8226915647	10	~2006
4113463751	8226927503	10	~2006
4113645247	41136452471	11	~2008
4113715421	24682292527	11	~2007
4113735121	189231815567	12	~2009
4113823691	8227647383	10	~2006
4113917051	8227834103	10	~2006
4113935183	8227870367	10	~2006
4114105871	32912846969	11	~2008
4114242347	32913938777	11	~2008
4114386323	8228772647	10	~2006
4114402273	24686413639	11	~2007
4114530011	8229060023	10	~2006
4114545217	24687271303	11	~2007
4114836083	8229672167	10	~2006
4114843679	8229687359	10	~2006
4114858427	32918867417	11	~2008
4115055491	8230110983	10	~2006
4115190179	8230380359	10	~2006

Exponent	Prime Factor	Digits	Year
4115194379	8230388759	10	~2006
4115204279	8230408559	10	~2006
4115328419	8230656839	10	~2006
4115357669	32922861353	11	~2008
4115372839	41153728391	11	~2008
4115592311	8231184623	10	~2006
4115817491	32926539929	11	~2008
4116048323	8232096647	10	~2006
4116164399	8232328799	10	~2006
4116173519	32929388153	11	~2008
4116186299	32929490393	11	~2008
4116382463	8232764927	10	~2006
4116417023	8232834047	10	~2006
4116546803	8233093607	10	~2006
4116618923	8233237847	10	~2006
4116688319	8233376639	10	~2006
4116942779	8233885559	10	~2006
4117138631	8234277263	10	~2006
4117219859	32937758873	11	~2008
4117477151	8234954303	10	~2006
4117653311	8235306623	10	~2006
4117809733	24706858399	11	~2007
4117878119	8235756239	10	~2006
4117895233	24707371399	11	~2007
4118042377	65888678033	11	~2008

Exponent	Prime Factor	Digits	Year
4118045623	41180456231	11	~2008
4118171903	8236343807	10	~2006
4118371003	41183710031	11	~2008
4118466431	8236932863	10	~2006
4118496911	8236993823	10	~2006
4118545177	24711271063	11	~2007
4118604323	8237208647	10	~2006
4118795399	8237590799	10	~2006
4119385961	32955087689	11	~2008
4119453323	8238906647	10	~2006
4119699959	8239399919	10	~2006
4119704399	8239408799	10	~2006
4119823853	98875772473	11	~2009
4119933617	32959468937	11	~2008
4120079783	8240159567	10	~2006
4120171283	8240342567	10	~2006
4120290539	8240581079	10	~2006
4120322939	8240645879	10	~2006
4120417571	8240835143	10	~2006
4121017091	8242034183	10	~2006
4121511419	8243022839	10	~2006
4121545343	601745620079	12	~2011
4121604719	8243209439	10	~2006
4121720549	32973764393	11	~2008
4121913863	8243827727	10	~2006

4.768.925 digits

25-05-04