Small Mersenne Prime Factors (page 4700/5070)

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	Dig.	Year
48731798663	97463597327	11	~2014
48732013691	97464027383	11	~2014
48734969243	97469938487	11	~2014
48737923859	97475847719	11	~2014
48739004423	97478008847	11	~2014
48741650231	389933201849	12	~2016
48742907431	779886518897	12	~2017
48745498211	97490996423	11	~2014
48747914711	97495829423	11	~2014
48748338911	97496677823	11	~2014
48751511519	97503023039	11	~2014
48755174411	97510348823	11	~2014
48756640403	97513280807	11	~2014
48756800063	97513600127	11	~2014
48760238377	292561430263	12	~2016
48760845737	390086765897	12	~2016
48761714471	97523428943	11	~2014
48762114899	97524229799	11	~2014
48763425479	97526850959	11	~2014
48764044037	390112352297	12	~2016
48766015139	97532030279	11	~2014
48769392803	97538785607	11	~2014
48769562489	682773874847	12	~2017
48770123351	97540246703	11	~2014
48772791863	97545583727	11	~2014

Exponent	Prime Factor	Dig.	Year
48772881191	97545762383	11	~2014
48774685871	97549371743	11	~2014
48775905323	97551810647	11	~2014
48777265259	97554530519	11	~2014
48779326727	390234613817	12	~2016
48780164759	97560329519	11	~2014
48782166239	97564332479	11	~2014
48782488259	97564976519	11	~2014
48783592883	97567185767	11	~2014
48784854311	390278834489	12	~2016
48785770331	97571540663	11	~2014
48788161979	97576323959	11	~2014
48790431251	97580862503	11	~2014
48790831703	97581663407	11	~2014
48791657557	292749945343	12	~2016
48792608219	97585216439	11	~2014
48794553851	390356430809	12	~2016
48795420119	97590840239	11	~2014
48795472013	683136608183	12	~2017
48795582779	97591165559	11	~2014
48797557651	487975576511	12	~2016
48799408799	97598817599	11	~2014
48800509223	97601018447	11	~2014
48801284579	97602569159	11	~2014
48801828611	97603657223	11	~2014

Exponent	Prime Factor	Dig.	Year
48802793771	97605587543	11	~2014
48803588137	292821528823	12	~2016
48804005171	97608010343	11	~2014
48804347363	97608694727	11	~2014
48805042241	390440337929	12	~2016
48805085291	97610170583	11	~2014
48808204079	97616408159	11	~2014
48812157731	97624315463	11	~2014
48814680731	97629361463	11	~2014
48815218619	97630437239	11	~2014
48816415559	97632831119	11	~2014
48819289219	488192892191	12	~2016
48819360983	97638721967	11	~2014
48821864603	97643729207	11	~2014
48823617851	97647235703	11	~2014
48828503041	292971018247	12	~2016
48829213931	97658427863	11	~2014
48831081011	97662162023	11	~2014
48831742277	292990453663	12	~2016
48832230721	1083...544759	16	2023
48835162001	390681296009	12	~2016
48835583189	390684665513	12	~2016
48836954843	97673909687	11	~2014
48837628943	97675257887	11	~2014
48842483891	390739871129	12	~2016

Exponent	Prime Factor	Dig.	Year
48843141287	390745130297	12	~2016
48843323783	97686647567	11	~2014
48843680531	97687361063	11	~2014
48843823211	97687646423	11	~2014
48846644831	97693289663	11	~2014
48849954113	293099724679	12	~2016
48853830059	97707660119	11	~2014
48854607551	97709215103	11	~2014
48854984831	97709969663	11	~2014
48856464071	97712928143	11	~2014
48856717271	97713434543	11	~2014
48857048543	97714097087	11	~2014
48857512601	390860100809	12	~2016
48866907959	97733815919	11	~2014
48867450431	97734900863	11	~2014
48874966631	97749933263	11	~2014
48875676623	97751353247	11	~2014
48880856291	97761712583	11	~2014
48881046163	488810461631	12	~2016
48884678039	97769356079	11	~2014
48884918591	97769837183	11	~2014
48890590811	97781181623	11	~2014
48891163961	391129311689	12	~2016
48901218083	97802436167	11	~2014
48901332731	97802665463	11	~2014

4.768.925 digits

25-05-04