Small Mersenne Prime Factors (page 4327/5025)

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	Dig.	Year
13220355623	26440711247	11	~2010
13220384531	26440769063	11	~2010
13220892011	26441784023	11	~2010
13221130823	26442261647	11	~2010
13221721043	26443442087	11	~2010
13222462229	185114471207	12	~2012
13222819523	26445639047	11	~2010
13223855831	26447711663	11	~2010
13224109403	26448218807	11	~2010
13225588331	26451176663	11	~2010
13226315363	26452630727	11	~2010
13226356631	26452713263	11	~2010
13226919551	26453839103	11	~2010
13226942959	555531604279	12	~2013
13227013199	26454026399	11	~2010
13227157943	26454315887	11	~2010
13227345731	26454691463	11	~2010
13227555629	185185778807	12	~2012
13227575099	26455150199	11	~2010
13227701041	211643216657	12	~2012
13228036793	79368220759	11	~2011
13228070837	105824566697	12	~2012
13228433759	26456867519	11	~2010
13229320451	26458640903	11	~2010
13229631397	79377788383	11	~2011

Exponent	Prime Factor	Dig.	Year
13229642831	26459285663	11	~2010
13229854919	26459709839	11	~2010
13230652811	26461305623	11	~2010
13230875579	26461751159	11	~2010
13231082519	26462165039	11	~2010
13231879273	317565102553	12	~2013
13232588951	26465177903	11	~2010
13234434599	26468869199	11	~2010
13234561139	26469122279	11	~2010
13235241247	2382...244601	14	2024
13235243737	79411462423	11	~2011
13235356859	105882854873	12	~2012
13235983021	79415898127	11	~2011
13236483977	105891871817	12	~2012
13236558521	79419351127	11	~2011
13237678319	26475356639	11	~2010
13238591939	26477183879	11	~2010
13240830299	26481660599	11	~2010
13241039411	26482078823	11	~2010
13241160809	397234824271	12	~2013
13242360083	26484720167	11	~2010
13243197839	26486395679	11	~2010
13243410263	26486820527	11	~2010
13243453753	79460722519	11	~2011
13244569397	79467416383	11	~2011

Exponent	Prime Factor	Dig.	Year
13244733479	26489466959	11	~2010
13246248641	105969989129	12	~2012
13247139293	185459950103	12	~2012
13247866883	26495733767	11	~2010
13247999507	105983996057	12	~2012
13248032519	26496065039	11	~2010
13248480359	26496960719	11	~2010
13249266139	132492661391	12	~2012
13249580651	26499161303	11	~2010
13250261881	79501571287	11	~2011
13251034991	106008279929	12	~2012
13251461039	26502922079	11	~2010
13252276417	79513658503	11	~2011
13252820111	26505640223	11	~2010
13253101139	106024809113	12	~2012
13253253743	26506507487	11	~2010
13253278427	238559011687	12	~2012
13253401043	26506802087	11	~2010
13253518357	79521110143	11	~2011
13253820179	26507640359	11	~2010
13254238133	79525428799	11	~2011
13254870803	26509741607	11	~2010
13255222859	26510445719	11	~2010
13255717043	26511434087	11	~2010
13255778411	26511556823	11	~2010

Exponent	Prime Factor	Dig.	Year
13256282051	26512564103	11	~2010
13256726519	26513453039	11	~2010
13256737463	26513474927	11	~2010
13257717743	26515435487	11	~2010
13257847663	212125562609	12	~2012
13259943971	26519887943	11	~2010
13260085571	26520171143	11	~2010
13260321551	26520643103	11	~2010
13260355271	26520710543	11	~2010
13260828923	26521657847	11	~2010
13261593601	212185497617	12	~2012
13262155079	26524310159	11	~2010
13262846053	212205536849	12	~2012
13263248951	26526497903	11	~2010
13264613651	26529227303	11	~2010
13264919819	26529839639	11	~2010
13265223221	79591339327	11	~2011
13265511071	26531022143	11	~2010
13265823037	79594938223	11	~2011
13267100219	26534200439	11	~2010
13267429807	212278876913	12	~2012
13267894319	26535788639	11	~2010
13268012171	7538...155623	14	2023
13269542459	26539084919	11	~2010
13269695903	26539391807	11	~2010

4.724.182 digits

25-04-13