Small Mersenne Prime Factors (page 5131/5190)

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
273586672343	547173344687	12	~2020
273588288251	547176576503	12	~2020
273622990643	547245981287	12	~2020
273644828903	547289657807	12	~2020
273666585431	547333170863	12	~2020
273689030063	547378060127	12	~2020
273696849971	547393699943	12	~2020
273811134911	547622269823	12	~2020
273829837331	547659674663	12	~2020
273881755319	547763510639	12	~2020
273897093419	547794186839	12	~2020
273935084639	6793...990473	14	2025
273940832411	547881664823	12	~2020
273998009819	547996019639	12	~2020
274010402173	4554...411527	15	2023
274029169163	548058338327	12	~2020
274057413611	548114827223	12	~2020
274067793683	548135587367	12	~2020
274151015819	548302031639	12	~2020
274152022031	548304044063	12	~2020
274207022483	548414044967	12	~2020
274221133619	548442267239	12	~2020
274225665251	548451330503	12	~2020
274289963999	548579927999	12	~2020
274320691439	548641382879	12	~2020

Exponent	Prime Factor	Dig.	Year
274335152771	548670305543	12	~2020
274336408823	548672817647	12	~2020
274365056579	548730113159	12	~2020
274365227243	548730454487	12	~2020
274386432311	1322...373903	15	2024
274399830311	548799660623	12	~2020
274402837223	548805674447	12	~2020
274405052303	548810104607	12	~2020
274427432231	548854864463	12	~2020
274429760701	5708...225809	14	2023
274432386863	548864773727	12	~2020
274456760969	9386...251399	14	2025
274463553719	548927107439	12	~2020
274491930899	548983861799	12	~2020
274495869443	548991738887	12	~2020
274520116319	549040232639	12	~2020
274528631831	549057263663	12	~2020
274538187659	549076375319	12	~2020
274540624679	549081249359	12	~2020
274550454443	549100908887	12	~2020
274586862551	549173725103	12	~2020
274598328239	549196656479	12	~2020
274646649083	549293298167	12	~2020
274648918331	549297836663	12	~2020
274649073431	549298146863	12	~2020

Exponent	Prime Factor	Dig.	Year
274658522459	549317044919	12	~2020
274670403071	549340806143	12	~2020
274698806339	549397612679	12	~2020
274735308383	549470616767	12	~2020
274777500839	549555001679	12	~2020
274780699859	549561399719	12	~2020
274817184949	2418...275513	14	2024
274818709331	549637418663	12	~2020
274852834643	549705669287	12	~2020
274858311971	549716623943	12	~2020
274860162779	549720325559	12	~2020
274865180003	549730360007	12	~2020
274912034339	549824068679	12	~2020
274913871779	549827743559	12	~2020
274934059259	549868118519	12	~2020
274938941279	549877882559	12	~2020
274942209803	549884419607	12	~2020
274949787157	2639...567073	14	2024
274952268659	549904537319	12	~2020
275034789203	550069578407	12	~2020
275049344747	2640...095713	14	2024
275055466571	550110933143	12	~2020
275061246371	550122492743	12	~2020
275069944739	550139889479	12	~2020
275093769761	2365...199447	14	2024

Exponent	Prime Factor	Dig.	Year
275094239531	550188479063	12	~2020
275105696471	550211392943	12	~2020
275132175443	550264350887	12	~2020
275133359531	550266719063	12	~2020
275152301471	550304602943	12	~2020
275158863599	550317727199	12	~2020
275162329619	550324659239	12	~2020
275193728003	550387456007	12	~2020
275197654019	550395308039	12	~2020
275199312691	4403...030561	14	2024
275203487243	550406974487	12	~2020
275219296151	550438592303	12	~2020
275263510649	2807...086199	14	2024
275270310803	550540621607	12	~2020
275279298551	550558597103	12	~2020
275302369211	550604738423	12	~2020
275323397159	550646794319	12	~2020
275337377099	550674754199	12	~2020
275341953881	9636...858351	14	2024
275386876343	550773752687	12	~2020
275392130771	550784261543	12	~2020
275413128443	550826256887	12	~2020
275473521299	550947042599	12	~2020
275480425271	550960850543	12	~2020
275504873219	551009746439	12	~2020

4.888.230 digits

25-06-29