Small Mersenne Prime Factors (page 5192/5340)

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
165975937079	331951874159	12	~2019
165984280223	331968560447	12	~2019
166007255723	332014511447	12	~2019
166033544063	332067088127	12	~2019
166052206499	332104412999	12	~2019
166059430919	332118861839	12	~2019
166061027999	332122055999	12	~2019
166080400163	332160800327	12	~2019
166081899383	332163798767	12	~2019
166089579011	332179158023	12	~2019
166091709011	332183418023	12	~2019
166097346263	332194692527	12	~2019
166098490643	3089...259599	14	2024
166105208327	8272...746847	14	2024
166107867911	332215735823	12	~2019
166108578983	332217157967	12	~2019
166118734763	332237469527	12	~2019
166119884297	8073...768343	14	2025
166124401199	332248802399	12	~2019
166136411183	332272822367	12	~2019
166163860931	332327721863	12	~2019
166187251871	332374503743	12	~2019
166211536079	332423072159	12	~2019
166211894963	332423789927	12	~2019
166232155559	332464311119	12	~2019

Exponent	Prime Factor	Dig.	Year
166235888281	2094...923407	14	2024
166248499139	332496998279	12	~2019
166254695879	332509391759	12	~2019
166255899539	332511799079	12	~2019
166286028539	332572057079	12	~2019
166326540967	2661...554721	14	2024
166331609891	332663219783	12	~2019
166332058499	332664116999	12	~2019
166334589383	332669178767	12	~2019
166336878923	332673757847	12	~2019
166349050919	332698101839	12	~2019
166356435071	332712870143	12	~2019
166358555173	1563...186263	14	2024
166360179731	332720359463	12	~2019
166361406383	332722812767	12	~2019
166370257139	332740514279	12	~2019
166385440691	332770881383	12	~2019
166401845003	332803690007	12	~2019
166415903903	332831807807	12	~2019
166429934999	332859869999	12	~2019
166434530651	332869061303	12	~2019
166434907811	332869815623	12	~2019
166471304711	332942609423	12	~2019
166473339551	332946679103	12	~2019
166474148231	332948296463	12	~2019

Exponent	Prime Factor	Dig.	Year
166506393731	333012787463	12	~2019
166508913359	333017826719	12	~2019
166520628119	333041256239	12	~2019
166540055723	333080111447	12	~2019
166541403383	333082806767	12	~2019
166544344163	333088688327	12	~2019
166544803319	333089606639	12	~2019
166558719253	2398...572433	14	2024
166566050279	333132100559	12	~2019
166588853603	333177707207	12	~2019
166595648339	333191296679	12	~2019
166597827899	333195655799	12	~2019
166605388343	333210776687	12	~2019
166613449319	333226898639	12	~2019
166622084831	333244169663	12	~2019
166622570963	333245141927	12	~2019
166661093531	333322187063	12	~2019
166683451859	333366903719	12	~2019
166685266571	333370533143	12	~2019
166693561091	333387122183	12	~2019
166698287291	333396574583	12	~2019
166733690219	333467380439	12	~2019
166769933399	333539866799	12	~2019
166772325959	333544651919	12	~2019
166792353719	333584707439	12	~2019

Exponent	Prime Factor	Dig.	Year
166822566791	333645133583	12	~2019
166827201539	333654403079	12	~2019
166828311263	333656622527	12	~2019
166844199023	333688398047	12	~2019
166864070039	333728140079	12	~2019
166868909423	333737818847	12	~2019
166877590823	333755181647	12	~2019
166902336179	333804672359	12	~2019
166914229199	333828458399	12	~2019
166918325699	333836651399	12	~2019
166919502083	333839004167	12	~2019
166928101331	333856202663	12	~2019
166931803403	333863606807	12	~2019
166940710763	333881421527	12	~2019
166972079387	5303...133113	15	2025
166976937551	333953875103	12	~2019
166988330231	333976660463	12	~2019
167018420423	334036840847	12	~2019
167033459399	334066918799	12	~2019
167035369283	334070738567	12	~2019
167047964351	334095928703	12	~2019
167052920939	334105841879	12	~2019
167079260423	334158520847	12	~2019
167083463801	2807...918569	14	2024
167106000311	334212000623	12	~2019

5.037.460 digits

25-09-07