Small Mersenne Prime Factors (page 5023/5340)

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
71774092139	143548184279	12	~2016
71776142303	143552284607	12	~2016
71780466721	2569...086119	14	2023
71782961477	430697768863	12	~2017
71787161471	143574322943	12	~2016
71787922751	143575845503	12	~2016
71789664113	430737984679	12	~2017
71789733311	143579466623	12	~2016
71793821531	143587643063	12	~2016
71797205591	143594411183	12	~2016
71804154179	143608308359	12	~2016
71807703899	143615407799	12	~2016
71807831939	143615663879	12	~2016
71812926131	143625852263	12	~2016
71816572393	430899434359	12	~2017
71820295271	143640590543	12	~2016
71823346379	143646692759	12	~2016
71824483751	143648967503	12	~2016
71827425251	143654850503	12	~2016
71832750169	1114...262289	15	2025
71838775861	431032655167	12	~2017
71841770783	143683541567	12	~2016
71842788071	143685576143	12	~2016
71842976963	143685953927	12	~2016
71843266499	143686532999	12	~2016

Exponent	Prime Factor	Dig.	Year
71843968223	1495...840287	15	2024
71848724099	143697448199	12	~2016
71849054219	143698108439	12	~2016
71851176697	431107060183	12	~2017
71853953519	143707907039	12	~2016
71854124483	143708248967	12	~2016
71855238127	718552381271	12	~2018
71858435339	143716870679	12	~2016
71862316663	718623166631	12	~2018
71864542553	431187255319	12	~2017
71864840483	143729680967	12	~2016
71867587271	143735174543	12	~2016
71868156071	143736312143	12	~2016
71869387283	143738774567	12	~2016
71869802423	143739604847	12	~2016
71872105919	143744211839	12	~2016
71873616323	143747232647	12	~2016
71875798637	431254791823	12	~2017
71876440403	143752880807	12	~2016
71878423433	431270540599	12	~2017
71881786399	718817863991	12	~2018
71887884671	143775769343	12	~2016
71890669871	143781339743	12	~2016
71890926083	143781852167	12	~2016
71894750003	143789500007	12	~2016

Exponent	Prime Factor	Dig.	Year
71898703099	718987030991	12	~2018
71898893219	143797786439	12	~2016
71899450151	143798900303	12	~2016
71901839879	143803679759	12	~2016
71908031939	143816063879	12	~2016
71911887851	143823775703	12	~2016
71915149333	431490895999	12	~2017
71916614531	143833229063	12	~2016
71922212891	143844425783	12	~2016
71922934763	143845869527	12	~2016
71930627123	143861254247	12	~2016
71930776691	143861553383	12	~2016
71931267623	143862535247	12	~2016
71931487349	575451898793	12	~2017
71933372591	575466980729	12	~2017
71940008711	143880017423	12	~2016
71945104223	143890208447	12	~2016
71946661463	143893322927	12	~2016
71949036959	143898073919	12	~2016
71950979411	575607835289	12	~2017
71952607361	575620858889	12	~2017
71956706771	143913413543	12	~2016
71963233057	431779398343	12	~2017
71963940203	143927880407	12	~2016
71965001177	1655...270711	14	2023

Exponent	Prime Factor	Dig.	Year
71966830151	143933660303	12	~2016
71967941579	143935883159	12	~2016
71974780861	431848685167	12	~2017
71975164571	143950329143	12	~2016
71977687091	143955374183	12	~2016
71978129243	143956258487	12	~2016
71984269139	143968538279	12	~2016
71984408141	575875265129	12	~2017
71989646471	143979292943	12	~2016
71990962697	575927701577	12	~2017
71992493819	143984987639	12	~2016
71994368591	143988737183	12	~2016
71994692579	143989385159	12	~2016
72005384189	576043073513	12	~2017
72007270151	144014540303	12	~2016
72008062421	576064499369	12	~2017
72008351003	144016702007	12	~2016
72015833471	144031666943	12	~2016
72026483839	1619...670073	15	2025
72032172481	432193034887	12	~2017
72035994581	576287956649	12	~2017
72042594719	144085189439	12	~2016
72044086391	144088172783	12	~2016
72050413091	144100826183	12	~2016
72051024959	144102049919	12	~2016

5.037.460 digits

25-09-07