Small Mersenne Prime Factors (page 5044/5235)

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
123104636939	246209273879	12	~2018
123105121523	246210243047	12	~2018
123124937951	246249875903	12	~2018
123140007983	246280015967	12	~2018
123143939339	246287878679	12	~2018
123150671219	246301342439	12	~2018
123150897839	246301795679	12	~2018
123173358083	246346716167	12	~2018
123181666631	246363333263	12	~2018
123191194151	246382388303	12	~2018
123194190803	246388381607	12	~2018
123210608291	246421216583	12	~2018
123224351903	246448703807	12	~2018
123238968659	246477937319	12	~2018
123249348083	246498696167	12	~2018
123258204623	246516409247	12	~2018
123261387239	246522774479	12	~2018
123269777483	246539554967	12	~2018
123275162243	246550324487	12	~2018
123277607003	246555214007	12	~2018
123277801799	246555603599	12	~2018
123292083203	246584166407	12	~2018
123304304771	246608609543	12	~2018
123316658903	246633317807	12	~2018
123318510929	8287...344289	14	2023

Exponent	Prime Factor	Dig.	Year
123318683219	246637366439	12	~2018
123325008563	246650017127	12	~2018
123325980383	246651960767	12	~2018
123327418619	246654837239	12	~2018
123327900323	246655800647	12	~2018
123332830151	246665660303	12	~2018
123345985463	246691970927	12	~2018
123359569379	246719138759	12	~2018
123362962799	246725925599	12	~2018
123371644463	246743288927	12	~2018
123376320131	246752640263	12	~2018
123376588501	740259531007	12	~2019
123389234219	246778468439	12	~2018
123394551503	246789103007	12	~2018
123397596719	246795193439	12	~2018
123400860959	246801721919	12	~2018
123406233539	246812467079	12	~2018
123407998271	246815996543	12	~2018
123427817459	246855634919	12	~2018
123434218091	246868436183	12	~2018
123436897691	246873795383	12	~2018
123437384243	246874768487	12	~2018
123447563231	246895126463	12	~2018
123462079817	740772478903	12	~2019
123480423611	246960847223	12	~2018

Exponent	Prime Factor	Dig.	Year
123481652351	246963304703	12	~2018
123483682379	246967364759	12	~2018
123489004811	246978009623	12	~2018
123494589371	246989178743	12	~2018
123496529483	246993058967	12	~2018
123505589653	741033537919	12	~2019
123514947551	247029895103	12	~2018
123522465611	247044931223	12	~2018
123527758751	247055517503	12	~2018
123528892093	4125...959063	14	2024
123529825403	247059650807	12	~2018
123534478499	247068956999	12	~2018
123539852881	741239117287	12	~2019
123546004919	247092009839	12	~2018
123546404711	247092809423	12	~2018
123555938543	247111877087	12	~2018
123560900663	247121801327	12	~2018
123562581899	247125163799	12	~2018
123566164451	247132328903	12	~2018
123570256559	247140513119	12	~2018
123573328523	247146657047	12	~2018
123579844499	247159688999	12	~2018
123583539743	247167079487	12	~2018
123595673423	247191346847	12	~2018
123596428463	247192856927	12	~2018

Exponent	Prime Factor	Dig.	Year
123612067177	741672403063	12	~2019
123615541739	247231083479	12	~2018
123620444639	247240889279	12	~2018
123622400173	741734401039	12	~2019
123636125303	247272250607	12	~2018
123644785079	247289570159	12	~2018
123653637491	247307274983	12	~2018
123664297391	247328594783	12	~2018
123673676183	247347352367	12	~2018
123678854759	247357709519	12	~2018
123680375963	247360751927	12	~2018
123681337363	2671...870409	14	2024
123686207873	742117247239	12	~2019
123687273071	247374546143	12	~2018
123695923199	247391846399	12	~2018
123701061899	247402123799	12	~2018
123701998571	247403997143	12	~2018
123703655219	247407310439	12	~2018
123704644667	7125...328193	14	2025
123705763403	247411526807	12	~2018
123717197099	247434394199	12	~2018
123723774851	247447549703	12	~2018
123729727571	247459455143	12	~2018
123734189723	247468379447	12	~2018
123739689659	247479379319	12	~2018

4.933.056 digits

25-07-20