Small Mersenne Prime Factors (page 4287/5025)

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
11485709993	68914259959	11	~2011
11486101007	91888808057	11	~2011
11486464499	22972928999	11	~2010
11486518451	22973036903	11	~2010
11486541179	22973082359	11	~2010
11486647379	22973294759	11	~2010
11486695919	22973391839	11	~2010
11486728411	4080...315873	14	2025
11487034523	22974069047	11	~2010
11487363659	22974727319	11	~2010
11487435677	68924614063	11	~2011
11487478571	22974957143	11	~2010
11487733319	22975466639	11	~2010
11488031459	22976062919	11	~2010
11488987511	91911900089	11	~2011
11489499157	68936994943	11	~2011
11490771983	22981543967	11	~2010
11491055351	22982110703	11	~2010
11491496221	183863939537	12	~2012
11491891583	22983783167	11	~2010
11492285771	22984571543	11	~2010
11492363713	68954182279	11	~2011
11492366243	22984732487	11	~2010
11492649341	643588363097	12	~2013
11492802703	114928027031	12	~2011

Exponent	Prime Factor	Dig.	Year
11492806573	68956839439	11	~2011
11493610889	91948887113	11	~2011
11494305419	91954443353	11	~2011
11494768517	91958148137	11	~2011
11494776701	68968660207	11	~2011
11494821491	22989642983	11	~2010
11495420003	22990840007	11	~2010
11495505683	22991011367	11	~2010
11495606477	68973638863	11	~2011
11496822671	22993645343	11	~2010
11497183163	22994366327	11	~2010
11497305671	91978445369	11	~2011
11497763423	22995526847	11	~2010
11497996337	68987978023	11	~2011
11498025881	68988155287	11	~2011
11498505659	22997011319	11	~2010
11499412937	68996477623	11	~2011
11500104263	23000208527	11	~2010
11500284121	69001704727	11	~2011
11500492739	23000985479	11	~2010
11500517111	23001034223	11	~2010
11501051603	23002103207	11	~2010
11501731379	23003462759	11	~2010
11502964199	23005928399	11	~2010
11503216811	23006433623	11	~2010

Exponent	Prime Factor	Dig.	Year
11503964159	23007928319	11	~2010
11504068931	23008137863	11	~2010
11504119703	23008239407	11	~2010
11504663603	23009327207	11	~2010
11504777423	23009554847	11	~2010
11505059003	23010118007	11	~2010
11505830593	69034983559	11	~2011
11505914131	184094626097	12	~2012
11506434187	115064341871	12	~2011
11507227139	23014454279	11	~2010
11507230061	92057840489	11	~2011
11507242753	69043456519	11	~2011
11507272559	23014545119	11	~2010
11507838119	92062704953	11	~2011
11508277139	23016554279	11	~2010
11508609971	23017219943	11	~2010
11508691559	23017383119	11	~2010
11509730657	552467071537	12	~2013
11509801843	184156829489	12	~2012
11510645101	184170321617	12	~2012
11510752763	368344088417	12	~2013
11510819057	92086552457	11	~2011
11511167663	23022335327	11	~2010
11511746777	69070480663	11	~2011
11511935833	69071614999	11	~2011

Exponent	Prime Factor	Dig.	Year
11512079147	92096633177	11	~2011
11512341371	23024682743	11	~2010
11512384571	23024769143	11	~2010
11514780911	23029561823	11	~2010
11514841477	345445244311	12	~2012
11514950519	23029901039	11	~2010
11515007243	23030014487	11	~2010
11515139459	23030278919	11	~2010
11515456703	23030913407	11	~2010
11516142457	184258279313	12	~2012
11516459723	23032919447	11	~2010
11516671583	23033343167	11	~2010
11517596003	23035192007	11	~2010
11517752591	23035505183	11	~2010
11518237943	23036475887	11	~2010
11518798799	23037597599	11	~2010
11518864499	23037728999	11	~2010
11519734543	184315752689	12	~2012
11520033779	207360608023	12	~2012
11520057959	23040115919	11	~2010
11520145751	23040291503	11	~2010
11520861419	23041722839	11	~2010
11521630499	92173043993	11	~2011
11521910483	23043820967	11	~2010
11522271119	23044542239	11	~2010

4.724.182 digits

25-04-13