Small Mersenne Prime Factors (page 5440/5745)

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
91893851363	183787702727	12	~2017
91899075143	183798150287	12	~2017
91901264333	551407585999	12	~2018
91908044939	183816089879	12	~2017
91909227911	183818455823	12	~2017
91910326043	183820652087	12	~2017
91914358859	183828717719	12	~2017
91914798323	183829596647	12	~2017
91919694491	183839388983	12	~2017
91920735143	183841470287	12	~2017
91942536611	183885073223	12	~2017
91943577083	183887154167	12	~2017
91952062619	183904125239	12	~2017
91954161599	183908323199	12	~2017
91954784171	183909568343	12	~2017
91962826523	183925653047	12	~2017
91968099239	735744793913	12	~2018
91972902839	183945805679	12	~2017
91976083343	183952166687	12	~2017
91976601779	183953203559	12	~2017
91979459051	183958918103	12	~2017
91987679603	183975359207	12	~2017
91988221817	551929330903	12	~2018
92000993081	552005958487	12	~2018
92008596371	184017192743	12	~2017

Exponent	Prime Factor	Dig.	Year
92017491959	184034983919	12	~2017
92021310533	7196...836807	14	2025
92021433941	552128603647	12	~2018
92021620583	184043241167	12	~2017
92022347831	736178782649	12	~2018
92025396791	184050793583	12	~2017
92027323763	184054647527	12	~2017
92031653687	736253229497	12	~2018
92033586503	184067173007	12	~2017
92040247919	184080495839	12	~2017
92055190441	552331142647	12	~2018
92063604863	184127209727	12	~2017
92065624019	184131248039	12	~2017
92065631641	552393789847	12	~2018
92073685211	184147370423	12	~2017
92073895561	9207...561001	14	2025
92074832819	184149665639	12	~2017
92077215707	5966...778137	14	2023
92082284663	184164569327	12	~2017
92086575821	736692606569	12	~2018
92087873099	184175746199	12	~2017
92091785087	736734280697	12	~2018
92097256451	184194512903	12	~2017
92104115141	552624690847	12	~2018
92111519579	184223039159	12	~2017

Exponent	Prime Factor	Dig.	Year
92122485023	184244970047	12	~2017
92122598591	184245197183	12	~2017
92127739439	184255478879	12	~2017
92129693783	184259387567	12	~2017
92129777783	184259555567	12	~2017
92130252911	184260505823	12	~2017
92133466283	184266932567	12	~2017
92138800151	184277600303	12	~2017
92143959203	184287918407	12	~2017
92147962499	184295924999	12	~2017
92148344003	184296688007	12	~2017
92154465239	184308930479	12	~2017
92155639799	184311279599	12	~2017
92157126241	552942757447	12	~2018
92163670199	184327340399	12	~2017
92166449579	184332899159	12	~2017
92167106039	184334212079	12	~2017
92167523879	184335047759	12	~2017
92174250011	184348500023	12	~2017
92176367831	184352735663	12	~2017
92182537571	184365075143	12	~2017
92189136971	184378273943	12	~2017
92192551739	184385103479	12	~2017
92195289671	184390579343	12	~2017
92195375183	184390750367	12	~2017

Exponent	Prime Factor	Dig.	Year
92199048251	184398096503	12	~2017
92199568931	184399137863	12	~2017
92210220491	184420440983	12	~2017
92211228311	184422456623	12	~2017
92212774163	184425548327	12	~2017
92214191339	184428382679	12	~2017
92216237263	1386...843553	15	2025
92216725009	4629...954519	14	2023
92223229811	184446459623	12	~2017
92226118577	553356711463	12	~2018
92234207963	184468415927	12	~2017
92235473663	184470947327	12	~2017
92239365551	184478731103	12	~2017
92253420683	184506841367	12	~2017
92254230863	184508461727	12	~2017
92258832791	184517665583	12	~2017
92262502751	184525005503	12	~2017
92265690773	553594144639	12	~2018
92269685411	184539370823	12	~2017
92273367143	184546734287	12	~2017
92284172411	184568344823	12	~2017
92287727783	184575455567	12	~2017
92289844319	184579688639	12	~2017
92296470557	553778823343	12	~2018
92298082033	553788492199	12	~2018

5.441.361 digits

26-03-15