Small Mersenne Prime Factors (page 4963/5730)

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
17622818561	105736911367	12	~2012
17623300991	35246601983	11	~2011
17624640563	35249281127	11	~2011
17625240131	35250480263	11	~2011
17625263753	246753692543	12	~2013
17625506609	141004052873	12	~2013
17626632011	35253264023	11	~2011
17627212643	35254425287	11	~2011
17627518703	35255037407	11	~2011
17627811143	35255622287	11	~2011
17628110939	35256221879	11	~2011
17629466819	35258933639	11	~2011
17629503299	35259006599	11	~2011
17629938343	423118520233	12	~2014
17630055671	35260111343	11	~2011
17632090211	35264180423	11	~2011
17632847651	35265695303	11	~2011
17633463899	35266927799	11	~2011
17633857883	35267715767	11	~2011
17635177583	35270355167	11	~2011
17635294283	35270588567	11	~2011
17636936783	35273873567	11	~2011
17637324671	35274649343	11	~2011
17637397499	35274794999	11	~2011
17637447731	35274895463	11	~2011

Exponent	Prime Factor	Dig.	Year
17639252591	35278505183	11	~2011
17639325191	35278650383	11	~2011
17639900987	141119207897	12	~2013
17640495307	5831...484943	14	2025
17640826103	35281652207	11	~2011
17640868391	35281736783	11	~2011
17641487771	35282975543	11	~2011
17642126717	141137013737	12	~2013
17643169811	35286339623	11	~2011
17643719627	317586953287	12	~2013
17644766291	35289532583	11	~2011
17644973039	35289946079	11	~2011
17645437343	35290874687	11	~2011
17646680531	35293361063	11	~2011
17647621991	35295243983	11	~2011
17648711999	35297423999	11	~2011
17648733017	105892398103	12	~2012
17648758619	35297517239	11	~2011
17649334823	35298669647	11	~2011
17650457399	35300914799	11	~2011
17650469471	35300938943	11	~2011
17650505651	35301011303	11	~2011
17650673459	35301346919	11	~2011
17650755803	35301511607	11	~2011
17650874123	35301748247	11	~2011

Exponent	Prime Factor	Dig.	Year
17650931531	35301863063	11	~2011
17651326139	35302652279	11	~2011
17651970659	35303941319	11	~2011
17651984279	317735717023	12	~2013
17652125341	105912752047	12	~2012
17652155593	105912933559	12	~2012
17652939817	105917638903	12	~2012
17653010339	35306020679	11	~2011
17653235161	105919410967	12	~2012
17653615831	176536158311	12	~2013
17654320583	35308641167	11	~2011
17654919839	35309839679	11	~2011
17655637619	35311275239	11	~2011
17655881219	35311762439	11	~2011
17655988391	35311976783	11	~2011
17656790243	35313580487	11	~2011
17656944479	35313888959	11	~2011
17657323163	35314646327	11	~2011
17657410019	35314820039	11	~2011
17658050411	35316100823	11	~2011
17658660683	35317321367	11	~2011
17658832409	141270659273	12	~2013
17658935339	141271482713	12	~2013
17659732631	35319465263	11	~2011
17659885933	105959315599	12	~2012

Exponent	Prime Factor	Dig.	Year
17660163701	105960982207	12	~2012
17660874839	35321749679	11	~2011
17660941163	35321882327	11	~2011
17661182039	35322364079	11	~2011
17662421723	35324843447	11	~2011
17663282513	105979695079	12	~2012
17663316179	35326632359	11	~2011
17664085559	141312684473	12	~2013
17664451691	35328903383	11	~2011
17665101299	35330202599	11	~2011
17665680899	35331361799	11	~2011
17665829593	529974887791	12	~2014
17666171423	35332342847	11	~2011
17666979721	106001878327	12	~2012
17667036983	35334073967	11	~2011
17667317963	35334635927	11	~2011
17667406439	141339251513	12	~2013
17667635123	35335270247	11	~2011
17667695183	35335390367	11	~2011
17670262837	106021577023	12	~2012
17670634031	35341268063	11	~2011
17671153163	565476901217	12	~2014
17671189703	35342379407	11	~2011
17673595031	35347190063	11	~2011
17673626303	35347252607	11	~2011

5.426.516 digits

26-03-08