Small Mersenne Prime Factors (page 5071/5235)

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
143381364683	286762729367	12	~2018
143381542163	286763084327	12	~2018
143393534159	286787068319	12	~2018
143395051979	286790103959	12	~2018
143396242523	286792485047	12	~2018
143398144679	286796289359	12	~2018
143406762923	286813525847	12	~2018
143440614071	286881228143	12	~2018
143446844063	286893688127	12	~2018
143453411771	286906823543	12	~2018
143457218819	286914437639	12	~2018
143468907563	286937815127	12	~2018
143485777511	286971555023	12	~2018
143486022419	286972044839	12	~2018
143495856239	286991712479	12	~2018
143501986619	287003973239	12	~2018
143509004591	287018009183	12	~2018
143520006419	287040012839	12	~2018
143521673219	287043346439	12	~2018
143526068111	1231...439239	15	2025
143567948351	287135896703	12	~2018
143567994191	287135988383	12	~2018
143568535919	287137071839	12	~2018
143577447539	1251...254009	15	2025
143579658179	287159316359	12	~2018

Exponent	Prime Factor	Dig.	Year
143594139743	1286...209729	15	2025
143596793339	287193586679	12	~2018
143602589783	287205179567	12	~2018
143616165551	287232331103	12	~2018
143624381531	287248763063	12	~2018
143636694011	287273388023	12	~2018
143648581319	287297162639	12	~2018
143665132571	287330265143	12	~2018
143665302239	287330604479	12	~2018
143666462711	287332925423	12	~2018
143674497563	287348995127	12	~2018
143680993271	287361986543	12	~2018
143696216399	287392432799	12	~2018
143704844243	287409688487	12	~2018
143707833803	287415667607	12	~2018
143710782851	287421565703	12	~2018
143713907339	287427814679	12	~2018
143715601259	287431202519	12	~2018
143720686919	287441373839	12	~2018
143721291743	287442583487	12	~2018
143728503419	287457006839	12	~2018
143743495463	287486990927	12	~2018
143753440751	287506881503	12	~2018
143758434383	287516868767	12	~2018
143769575879	287539151759	12	~2018

Exponent	Prime Factor	Dig.	Year
143782769831	287565539663	12	~2018
143783201531	287566403063	12	~2018
143789387783	287578775567	12	~2018
143792178083	287584356167	12	~2018
143794912559	287589825119	12	~2018
143810493839	287620987679	12	~2018
143831425319	287662850639	12	~2018
143831537039	287663074079	12	~2018
143839298639	287678597279	12	~2018
143845298939	287690597879	12	~2018
143856004931	287712009863	12	~2018
143875250411	287750500823	12	~2018
143876671811	287753343623	12	~2018
143878900883	287757801767	12	~2018
143903722031	287807444063	12	~2018
143907256523	287814513047	12	~2018
143924425811	287848851623	12	~2018
143926475051	287852950103	12	~2018
143928223811	287856447623	12	~2018
143932255451	287864510903	12	~2018
143936928959	287873857919	12	~2018
143939458499	287878916999	12	~2018
144000039713	2966...180879	14	2024
144000872269	5616...184911	14	2024
144003652511	288007305023	12	~2018

Exponent	Prime Factor	Dig.	Year
144007270679	288014541359	12	~2018
144010007423	288020014847	12	~2018
144011949071	288023898143	12	~2018
144014861411	288029722823	12	~2018
144039073859	288078147719	12	~2018
144039733391	288079466783	12	~2018
144047588831	288095177663	12	~2018
144048928571	1524...428119	15	2023
144052082957	3111...918713	14	2024
144052353023	288104706047	12	~2018
144057472451	288114944903	12	~2018
144059546699	288119093399	12	~2018
144064403603	288128807207	12	~2018
144071639111	288143278223	12	~2018
144085637603	288171275207	12	~2018
144090085259	288180170519	12	~2018
144102112391	8905...457639	14	2025
144103086299	288206172599	12	~2018
144116715503	288233431007	12	~2018
144117069731	288234139463	12	~2018
144129005939	288258011879	12	~2018
144132059111	288264118223	12	~2018
144148364903	288296729807	12	~2018
144153006551	288306013103	12	~2018
144153150059	288306300119	12	~2018

4.933.056 digits

25-07-20