Small Mersenne Prime Factors (page 5482/5745)

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
109581723539	219163447079	12	~2017
109586579197	657519475183	12	~2018
109588752937	657532517623	12	~2018
109595237879	219190475759	12	~2017
109597224083	219194448167	12	~2017
109599277693	657595666159	12	~2018
109610024567	876880196537	12	~2019
109610931737	657665590423	12	~2018
109619587403	219239174807	12	~2017
109627075429	2657...839897	15	2025
109628389463	219256778927	12	~2017
109631816471	219263632943	12	~2017
109638133523	219276267047	12	~2017
109638526619	219277053239	12	~2017
109641197051	6929...536233	14	2025
109645681141	8420...116289	14	2024
109652838131	219305676263	12	~2017
109671698771	219343397543	12	~2017
109683136571	219366273143	12	~2017
109684133231	219368266463	12	~2017
109685951321	658115707927	12	~2018
109690660223	219381320447	12	~2017
109691620453	658149722719	12	~2018
109694309723	219388619447	12	~2017
109711486799	219422973599	12	~2017

Exponent	Prime Factor	Dig.	Year
109714794311	877718354489	12	~2019
109718212739	219436425479	12	~2017
109718674379	219437348759	12	~2017
109719228431	219438456863	12	~2017
109719419951	219438839903	12	~2017
109725339023	219450678047	12	~2017
109729526831	2337...150031	15	2025
109730946023	219461892047	12	~2017
109731861059	219463722119	12	~2017
109737595403	219475190807	12	~2017
109742864083	1071...345009	15	2025
109751882699	219503765399	12	~2017
109754610359	219509220719	12	~2017
109756889843	219513779687	12	~2017
109759396273	4456...886839	14	2023
109771988987	878175911897	12	~2019
109772789449	1025...345367	15	2023
109773826091	219547652183	12	~2017
109775652851	219551305703	12	~2017
109782622919	219565245839	12	~2017
109782959651	219565919303	12	~2017
109796640539	219593281079	12	~2017
109797215873	658783295239	12	~2018
109798398851	878387190809	12	~2019
109800425363	219600850727	12	~2017

Exponent	Prime Factor	Dig.	Year
109805872139	2980...985247	15	2023
109807807619	219615615239	12	~2017
109812452063	219624904127	12	~2017
109825641083	219651282167	12	~2017
109834248791	219668497583	12	~2017
109834879733	659009278399	12	~2018
109840654871	878725238969	12	~2019
109845703559	219691407119	12	~2017
109846074791	219692149583	12	~2017
109852596011	219705192023	12	~2017
109854161243	219708322487	12	~2017
109858139003	219716278007	12	~2017
109863430643	219726861287	12	~2017
109868411171	219736822343	12	~2017
109871947943	219743895887	12	~2017
109874496983	219748993967	12	~2017
109884658511	219769317023	12	~2017
109885010171	219770020343	12	~2017
109887032231	219774064463	12	~2017
109887142217	659322853303	12	~2018
109889466191	219778932383	12	~2017
109891140071	219782280143	12	~2017
109891674611	219783349223	12	~2017
109901123873	659406743239	12	~2018
109904418227	879235345817	12	~2019

Exponent	Prime Factor	Dig.	Year
109905472709	879243781673	12	~2019
109916808193	659500849159	12	~2018
109930971719	219861943439	12	~2017
109938203929	2440...272239	14	2024
109944538897	659667233383	12	~2018
109945952219	219891904439	12	~2017
109947930179	879583441433	12	~2019
109953965339	219907930679	12	~2017
109962500471	219925000943	12	~2017
109971024563	219942049127	12	~2017
109981419491	219962838983	12	~2017
109986716309	2461...099543	15	2026
109987044263	219974088527	12	~2017
109988192267	879905538137	12	~2019
109989590729	879916725833	12	~2019
109990508809	1819...570087	15	2024
109991400119	219982800239	12	~2017
109996505903	219993011807	12	~2017
110006019251	220012038503	12	~2017
110009144321	2992...255313	14	2024
110015520311	220031040623	12	~2017
110021029277	660126175663	12	~2018
110027357969	3850...289151	14	2023
110036242837	1103...655111	16	2025
110038733699	220077467399	12	~2017

5.441.361 digits

26-03-15