Small Mersenne Prime Factors (page 5295/5610)

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
83195996291	166391992583	12	~2016
83198137391	166396274783	12	~2016
83198524301	499191145807	12	~2017
83198990639	166397981279	12	~2016
83200632659	166401265319	12	~2016
83203243223	166406486447	12	~2016
83207019097	499242114583	12	~2017
83207723579	665661788633	12	~2018
83208635423	166417270847	12	~2016
83208710303	166417420607	12	~2016
83210112659	166420225319	12	~2016
83216160353	499296962119	12	~2017
83217017711	166434035423	12	~2016
83220229283	166440458567	12	~2016
83225082599	166450165199	12	~2016
83225562011	166451124023	12	~2016
83226668243	166453336487	12	~2016
83228882669	665831061353	12	~2018
83232108191	166464216383	12	~2016
83236289621	665890316969	12	~2018
83236941191	166473882383	12	~2016
83239635841	499437815047	12	~2017
83242205939	665937647513	12	~2018
83242505459	166485010919	12	~2016
83246123459	166492246919	12	~2016

Exponent	Prime Factor	Dig.	Year
83246188919	166492377839	12	~2016
83247534131	166495068263	12	~2016
83251163833	3614...362887	15	2025
83260645823	166521291647	12	~2016
83262493991	166524987983	12	~2016
83264183003	166528366007	12	~2016
83274394997	499646369983	12	~2017
83275517459	166551034919	12	~2016
83281695599	166563391199	12	~2016
83282967359	166565934719	12	~2016
83284688401	9577...661151	14	2024
83288105639	166576211279	12	~2016
83294962739	166589925479	12	~2016
83297529179	166595058359	12	~2016
83303362211	166606724423	12	~2016
83317988951	166635977903	12	~2016
83318137943	166636275887	12	~2016
83319060911	166638121823	12	~2016
83321208263	166642416527	12	~2016
83322267659	166644535319	12	~2016
83324373623	166648747247	12	~2016
83333256053	499999536319	12	~2017
83334965783	166669931567	12	~2016
83336803499	166673606999	12	~2016
83340361271	166680722543	12	~2016

Exponent	Prime Factor	Dig.	Year
83344292579	166688585159	12	~2016
83347133459	166694266919	12	~2016
83351075879	666808607033	12	~2018
83351855903	166703711807	12	~2016
83357500781	500145004687	12	~2017
83368333859	166736667719	12	~2016
83369048491	833690484911	12	~2018
83369941871	166739883743	12	~2016
83370044963	166740089927	12	~2016
83371063093	500226378559	12	~2017
83372944199	166745888399	12	~2016
83374367099	166748734199	12	~2016
83378134991	166756269983	12	~2016
83381364761	667050918089	12	~2018
83387805971	166775611943	12	~2016
83388950453	500333702719	12	~2017
83393209201	7388...352087	14	2024
83393216351	667145730809	12	~2018
83401070639	166802141279	12	~2016
83402544083	166805088167	12	~2016
83405449643	166810899287	12	~2016
83406265571	166812531143	12	~2016
83410123151	166820246303	12	~2016
83414141831	166828283663	12	~2016
83417563679	166835127359	12	~2016

Exponent	Prime Factor	Dig.	Year
83418702179	166837404359	12	~2016
83420797001	667366376009	12	~2018
83423832643	834238326431	12	~2018
83425091221	1962...551793	15	2025
83425611491	166851222983	12	~2016
83427511241	4471...025177	14	2023
83429037073	500574222439	12	~2017
83432199443	166864398887	12	~2016
83432402939	667459223513	12	~2018
83438443951	2085...987751	14	2023
83440151183	166880302367	12	~2016
83444047763	166888095527	12	~2016
83450339579	166900679159	12	~2016
83452034321	2470...159017	14	2024
83453239393	500719436359	12	~2018
83459610431	166919220863	12	~2016
83461995479	667695963833	12	~2018
83463286631	166926573263	12	~2016
83471965691	166943931383	12	~2016
83476391783	166952783567	12	~2016
83477661191	166955322383	12	~2016
83494860079	834948600791	12	~2018
83495897951	166991795903	12	~2016
83500263131	668002105049	12	~2018
83506776779	167013553559	12	~2016

5.307.017 digits

26-01-11