Small Mersenne Prime Factors (page 4446/5190)

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
12797415623	25594831247	11	~2010
12798016139	25596032279	11	~2010
12798079883	25596159767	11	~2010
12798662819	25597325639	11	~2010
12799732163	25599464327	11	~2010
12799857503	25599715007	11	~2010
12800021329	281600469239	12	~2012
12800120783	25600241567	11	~2010
12800764451	25601528903	11	~2010
12801023357	102408186857	12	~2011
12801338831	25602677663	11	~2010
12801640151	25603280303	11	~2010
12801721379	25603442759	11	~2010
12802107677	76812646063	11	~2011
12802457039	25604914079	11	~2010
12802768571	25605537143	11	~2010
12802911899	25605823799	11	~2010
12802978891	128029788911	12	~2012
12803225893	76819355359	11	~2011
12803426093	76820556559	11	~2011
12803601857	179250425999	12	~2012
12804000299	25608000599	11	~2010
12804340019	25608680039	11	~2010
12805070363	25610140727	11	~2010
12806202041	102449616329	12	~2011

Exponent	Prime Factor	Dig.	Year
12806689691	25613379383	11	~2010
12807238721	76843432327	11	~2011
12807282011	25614564023	11	~2010
12807573041	102460584329	12	~2011
12808544711	25617089423	11	~2010
12808618423	204937894769	12	~2012
12808646303	25617292607	11	~2010
12809316631	204949066097	12	~2012
12810109703	25620219407	11	~2010
12810178379	25620356759	11	~2010
12810228803	25620457607	11	~2010
12810354899	25620709799	11	~2010
12810469933	76862819599	11	~2011
12810986543	25621973087	11	~2010
12813017831	25626035663	11	~2010
12813207637	76879245823	11	~2011
12813234869	102505878953	12	~2011
12813309539	102506476313	12	~2011
12814118711	25628237423	11	~2010
12814137851	25628275703	11	~2010
12814233011	25628466023	11	~2010
12814704491	25629408983	11	~2010
12814747559	25629495119	11	~2010
12815454083	25630908167	11	~2010
12815713849	692048547847	12	~2013

Exponent	Prime Factor	Dig.	Year
12815823701	384474711031	12	~2013
12816058301	102528466409	12	~2011
12816750119	25633500239	11	~2010
12816853811	25633707623	11	~2010
12816966473	76901798839	11	~2011
12818085191	25636170383	11	~2010
12818528137	205096450193	12	~2012
12818859743	25637719487	11	~2010
12819573023	25639146047	11	~2010
12819625151	25639250303	11	~2010
12820128851	25640257703	11	~2010
12823819439	25647638879	11	~2010
12823828079	25647656159	11	~2010
12823849799	25647699599	11	~2010
12824957357	76949744143	11	~2011
12825033131	25650066263	11	~2010
12825167651	25650335303	11	~2010
12825485983	538670411287	12	~2013
12825522599	102604180793	12	~2011
12826893239	25653786479	11	~2010
12826903811	25653807623	11	~2010
12826966457	76961798743	11	~2011
12826971431	25653942863	11	~2010
12827939213	76967635279	11	~2011
12828527903	25657055807	11	~2010

Exponent	Prime Factor	Dig.	Year
12828670259	25657340519	11	~2010
12829238879	25658477759	11	~2010
12829414841	102635318729	12	~2011
12829785959	102638287673	12	~2011
12830256737	76981540423	11	~2011
12830291759	25660583519	11	~2010
12830733347	102645866777	12	~2011
12831435257	102651482057	12	~2011
12831468971	25662937943	11	~2010
12831538927	128315389271	12	~2012
12832864463	1817...079609	14	2023
12832903631	25665807263	11	~2010
12833371777	77000230663	11	~2011
12833474293	77000845759	11	~2011
12833857103	25667714207	11	~2010
12834697801	77008186807	11	~2011
12835331051	25670662103	11	~2010
12836089817	77016538903	11	~2011
12836606819	25673213639	11	~2010
12837716231	25675432463	11	~2010
12839071103	25678142207	11	~2010
12840067651	128400676511	12	~2012
12840239603	25680479207	11	~2010
12840263221	77041579327	11	~2011
12840955343	25681910687	11	~2010

4.888.230 digits

25-06-29