Small Mersenne Prime Factors (page 5156/5445)

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
85740533531	171481067063	12	~2016
85742152211	171484304423	12	~2016
85750054283	171500108567	12	~2016
85751286119	171502572239	12	~2016
85752531671	171505063343	12	~2016
85752646571	171505293143	12	~2016
85753555157	514521330943	12	~2018
85760940203	171521880407	12	~2016
85768915943	171537831887	12	~2016
85775672291	171551344583	12	~2016
85775868539	686206948313	12	~2018
85778643257	514671859543	12	~2018
85784051939	171568103879	12	~2016
85794411959	171588823919	12	~2016
85795197419	171590394839	12	~2016
85800838583	171601677167	12	~2016
85806288143	171612576287	12	~2016
85807404863	171614809727	12	~2016
85808025071	171616050143	12	~2016
85819212659	171638425319	12	~2016
85824397751	171648795503	12	~2016
85830460883	171660921767	12	~2016
85837595317	515025571903	12	~2018
85843070699	171686141399	12	~2016
85843082651	171686165303	12	~2016

Exponent	Prime Factor	Dig.	Year
85844115233	515064691399	12	~2018
85846766933	515080601599	12	~2018
85850515823	171701031647	12	~2016
85850562383	171701124767	12	~2016
85854875459	686839003673	12	~2018
85866993203	171733986407	12	~2016
85874322119	686994576953	12	~2018
85883526731	171767053463	12	~2016
85884823091	171769646183	12	~2016
85887451151	171774902303	12	~2016
85892408051	171784816103	12	~2016
85895223143	171790446287	12	~2016
85897327207	858973272071	12	~2018
85898604359	171797208719	12	~2016
85901348651	171802697303	12	~2016
85902502271	171805004543	12	~2016
85905969911	171811939823	12	~2016
85911061981	515466371887	12	~2018
85913877659	687311021273	12	~2018
85921151363	171842302727	12	~2016
85932571139	171865142279	12	~2016
85935657323	171871314647	12	~2016
85946893211	171893786423	12	~2016
85949131223	171898262447	12	~2016
85949572931	171899145863	12	~2016

Exponent	Prime Factor	Dig.	Year
85952716691	171905433383	12	~2016
85954676519	171909353039	12	~2016
85955277671	171910555343	12	~2016
85957900559	171915801119	12	~2016
85962747371	171925494743	12	~2016
85963849871	171927699743	12	~2016
85965642461	515793854767	12	~2018
85974193559	687793548473	12	~2018
85976852261	515861113567	12	~2018
85977594803	171955189607	12	~2016
85980092651	171960185303	12	~2016
85983166271	171966332543	12	~2016
85987378537	515924271223	12	~2018
85991397203	171982794407	12	~2016
85991514311	9854...400407	14	2025
85992993479	171985986959	12	~2016
85996675159	859966751591	12	~2018
85997640383	171995280767	12	~2016
86002082717	688016661737	12	~2018
86006706479	172013412959	12	~2016
86010293483	172020586967	12	~2016
86010620159	172021240319	12	~2016
86021594159	172043188319	12	~2016
86024163551	688193308409	12	~2018
86031447923	172062895847	12	~2016

Exponent	Prime Factor	Dig.	Year
86032961831	172065923663	12	~2016
86033008241	516198049447	12	~2018
86034669299	172069338599	12	~2016
86035183463	172070366927	12	~2016
86048251511	172096503023	12	~2016
86048295479	172096590959	12	~2016
86049929219	172099858439	12	~2016
86063504333	516381025999	12	~2018
86067622391	172135244783	12	~2016
86070933121	516425598727	12	~2018
86072038883	172144077767	12	~2016
86087416223	172174832447	12	~2016
86096060627	688768485017	12	~2018
86102132579	172204265159	12	~2016
86102915939	172205831879	12	~2016
86103617399	172207234799	12	~2016
86107598249	688860785993	12	~2018
86110156109	688881248873	12	~2018
86113312513	516679875079	12	~2018
86117953721	516707722327	12	~2018
86118169079	172236338159	12	~2016
86118370991	172236741983	12	~2016
86119985881	516719915287	12	~2018
86122379879	172244759759	12	~2016
86122407359	172244814719	12	~2016

5.142.307 digits

25-10-26