Small Mersenne Prime Factors (page 4785/5070)

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
71530864877	572246919017	12	~2017
71540600471	143081200943	12	~2016
71540641439	143081282879	12	~2016
71542093697	572336749577	12	~2017
71542871531	143085743063	12	~2016
71544839831	572358718649	12	~2017
71549819531	143099639063	12	~2016
71551484171	143102968343	12	~2016
71552337161	572418697289	12	~2017
71553400931	143106801863	12	~2016
71563218431	143126436863	12	~2016
71571216131	143142432263	12	~2016
71578019099	143156038199	12	~2016
71582442593	429494655559	12	~2017
71583484559	143166969119	12	~2016
71587522807	2863...122801	14	2024
71587916303	143175832607	12	~2016
71590184657	572721477257	12	~2017
71591564963	143183129927	12	~2016
71598955451	143197910903	12	~2016
71600113657	429600681943	12	~2017
71601884411	143203768823	12	~2016
71602760303	143205520607	12	~2016
71612554129	3854...322279	15	2025
71614766183	143229532367	12	~2016

Exponent	Prime Factor	Dig.	Year
71615448011	143230896023	12	~2016
71615772659	143231545319	12	~2016
71617317199	716173171991	12	~2018
71619653051	143239306103	12	~2016
71626405559	573011244473	12	~2017
71629196819	143258393639	12	~2016
71634885551	143269771103	12	~2016
71638328351	143276656703	12	~2016
71642483111	573139864889	12	~2017
71649290473	429895742839	12	~2017
71649392233	429896353399	12	~2017
71649588359	143299176719	12	~2016
71651197571	143302395143	12	~2016
71656400093	429938400559	12	~2017
71657482291	716574822911	12	~2018
71658234311	143316468623	12	~2016
71658267683	143316535367	12	~2016
71664488723	143328977447	12	~2016
71665464287	573323714297	12	~2017
71667025019	143334050039	12	~2016
71667238739	143334477479	12	~2016
71669532491	143339064983	12	~2016
71672025443	143344050887	12	~2016
71674938911	143349877823	12	~2016
71677861781	573422894249	12	~2017

Exponent	Prime Factor	Dig.	Year
71688893777	430133362663	12	~2017
71692436999	143384873999	12	~2016
71694033973	430164203839	12	~2017
71700289403	143400578807	12	~2016
71700450247	717004502471	12	~2018
71708772097	430252632583	12	~2017
71709607223	143419214447	12	~2016
71712581351	143425162703	12	~2016
71714249231	143428498463	12	~2016
71716717619	143433435239	12	~2016
71719707071	143439414143	12	~2016
71728409783	143456819567	12	~2016
71731404863	143462809727	12	~2016
71733617771	143467235543	12	~2016
71736438131	143472876263	12	~2016
71738700983	143477401967	12	~2016
71740453139	573923625113	12	~2017
71741779019	143483558039	12	~2016
71745143471	143490286943	12	~2016
71748829441	430492976647	12	~2017
71749120511	143498241023	12	~2016
71752539959	143505079919	12	~2016
71755013399	143510026799	12	~2016
71760237203	143520474407	12	~2016
71762052749	574096421993	12	~2017

Exponent	Prime Factor	Dig.	Year
71767317659	143534635319	12	~2016
71769598331	574156786649	12	~2017
71772739763	143545479527	12	~2016
71773298273	430639789639	12	~2017
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

4.768.925 digits

25-05-04