Small Mersenne Prime Factors (page 4878/5070)

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
113418224963	226836449927	12	~2017
113421221423	226842442847	12	~2017
113422038071	226844076143	12	~2017
113430754991	226861509983	12	~2017
113432775611	226865551223	12	~2017
113435063531	226870127063	12	~2017
113440824683	226881649367	12	~2017
113475184457	680851106743	12	~2019
113475389123	226950778247	12	~2017
113481809711	226963619423	12	~2017
113481899039	226963798079	12	~2017
113485784939	226971569879	12	~2017
113487515363	226975030727	12	~2017
113490424721	2247...094759	14	2024
113505214811	227010429623	12	~2017
113511234143	227022468287	12	~2017
113516306159	227032612319	12	~2017
113516520599	227033041199	12	~2017
113519233871	227038467743	12	~2017
113520684779	227041369559	12	~2017
113527666151	227055332303	12	~2017
113538172211	227076344423	12	~2017
113538599579	2997...288857	14	2024
113541672599	227083345199	12	~2017
113543099459	227086198919	12	~2017

Exponent	Prime Factor	Dig.	Year
113544136091	227088272183	12	~2017
113544310991	227088621983	12	~2017
113564424923	227128849847	12	~2017
113570440337	681422642023	12	~2019
113572341563	227144683127	12	~2017
113579536079	227159072159	12	~2017
113582491811	227164983623	12	~2017
113588235179	227176470359	12	~2017
113588781079	5361...669289	14	2023
113589728519	227179457039	12	~2017
113597060231	227194120463	12	~2017
113604020423	227208040847	12	~2017
113604742451	227209484903	12	~2017
113605514111	227211028223	12	~2017
113618990483	227237980967	12	~2017
113620798799	227241597599	12	~2017
113631759443	227263518887	12	~2017
113645854463	227291708927	12	~2017
113647223051	227294446103	12	~2017
113647359047	3000...788409	14	2024
113652721943	227305443887	12	~2017
113653798931	227307597863	12	~2017
113657974019	227315948039	12	~2017
113667697751	227335395503	12	~2017
113670443699	227340887399	12	~2017

Exponent	Prime Factor	Dig.	Year
113682703559	227365407119	12	~2017
113694900323	227389800647	12	~2017
113698190401	682189142407	12	~2019
113709399899	227418799799	12	~2017
113733992819	227467985639	12	~2017
113740421831	227480843663	12	~2017
113746280831	227492561663	12	~2017
113754317819	227508635639	12	~2017
113778290663	227556581327	12	~2017
113783959643	227567919287	12	~2017
113800951163	227601902327	12	~2017
113805527483	227611054967	12	~2017
113810357663	227620715327	12	~2017
113817199091	227634398183	12	~2017
113840834291	227681668583	12	~2017
113847938723	227695877447	12	~2017
113855123353	683130740119	12	~2019
113856690071	227713380143	12	~2017
113860866193	683165197159	12	~2019
113865393671	227730787343	12	~2017
113892630277	683355781663	12	~2019
113895412381	683372474287	12	~2019
113902554397	683415326383	12	~2019
113902598063	227805196127	12	~2017
113943754439	227887508879	12	~2017

Exponent	Prime Factor	Dig.	Year
113945918711	227891837423	12	~2017
113950852061	683705112367	12	~2019
113954089499	227908178999	12	~2017
113962413479	227924826959	12	~2017
113966248163	227932496327	12	~2017
113967640439	227935280879	12	~2017
113973517523	227947035047	12	~2017
113977579277	683865475663	12	~2019
113979215459	227958430919	12	~2017
113983381691	227966763383	12	~2017
113989984079	227979968159	12	~2017
113994005123	227988010247	12	~2017
113996889659	227993779319	12	~2017
113997303383	227994606767	12	~2017
113998920323	227997840647	12	~2017
114011911199	228023822399	12	~2017
114013445099	228026890199	12	~2017
114016779599	228033559199	12	~2017
114021316319	228042632639	12	~2017
114023305223	228046610447	12	~2017
114023542151	228047084303	12	~2017
114032378423	228064756847	12	~2017
114033830159	228067660319	12	~2017
114034032503	228068065007	12	~2017
114034124999	228068249999	12	~2017

4.768.925 digits

25-05-04