Small Mersenne Prime Factors (page 5050/5190)

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
162820240679	325640481359	12	~2019
162825689171	325651378343	12	~2019
162835750691	325671501383	12	~2019
162841159319	325682318639	12	~2019
162846022799	325692045599	12	~2019
162850697759	325701395519	12	~2019
162860796611	5237...602983	16	2025
162869652299	325739304599	12	~2019
162870489539	325740979079	12	~2019
162873810623	325747621247	12	~2019
162911759963	325823519927	12	~2019
162922502663	325845005327	12	~2019
162934192643	325868385287	12	~2019
162937370363	325874740727	12	~2019
162941415419	325882830839	12	~2019
162949532579	325899065159	12	~2019
162966871871	325933743743	12	~2019
162976201211	325952402423	12	~2019
162989742659	325979485319	12	~2019
162994427663	325988855327	12	~2019
163005323171	326010646343	12	~2019
163013729531	326027459063	12	~2019
163014866939	326029733879	12	~2019
163048362443	326096724887	12	~2019
163051711523	326103423047	12	~2019

Exponent	Prime Factor	Dig.	Year
163060262231	326120524463	12	~2019
163075190363	326150380727	12	~2019
163076734031	326153468063	12	~2019
163079757311	326159514623	12	~2019
163082545403	326165090807	12	~2019
163084218551	326168437103	12	~2019
163084238651	326168477303	12	~2019
163086896243	326173792487	12	~2019
163100087291	326200174583	12	~2019
163114433459	326228866919	12	~2019
163120770731	326241541463	12	~2019
163127444659	1435...129993	14	2024
163138549859	326277099719	12	~2019
163141028483	326282056967	12	~2019
163148299823	326296599647	12	~2019
163152847691	326305695383	12	~2019
163177749263	326355498527	12	~2019
163181232839	326362465679	12	~2019
163193287181	2059...422423	15	2025
163195293323	326390586647	12	~2019
163199402279	326398804559	12	~2019
163204041323	326408082647	12	~2019
163204749551	326409499103	12	~2019
163220204291	326440408583	12	~2019
163222322099	326444644199	12	~2019

Exponent	Prime Factor	Dig.	Year
163240559711	326481119423	12	~2019
163248307031	326496614063	12	~2019
163251236591	326502473183	12	~2019
163272456443	326544912887	12	~2019
163304639783	326609279567	12	~2019
163309660583	326619321167	12	~2019
163314336719	326628673439	12	~2019
163316163551	326632327103	12	~2019
163322667611	326645335223	12	~2019
163329261031	7611...640447	14	2024
163346945819	326693891639	12	~2019
163374377459	326748754919	12	~2019
163383971279	326767942559	12	~2019
163395426443	1607...619913	15	2025
163417351463	326834702927	12	~2019
163421734559	326843469119	12	~2019
163423104899	326846209799	12	~2019
163468505771	326937011543	12	~2019
163469637959	326939275919	12	~2019
163478028911	326956057823	12	~2019
163480524611	326961049223	12	~2019
163481775311	326963550623	12	~2019
163485961319	326971922639	12	~2019
163488491063	326976982127	12	~2019
163504994531	327009989063	12	~2019

Exponent	Prime Factor	Dig.	Year
163505539451	327011078903	12	~2019
163532468219	327064936439	12	~2019
163534471979	327068943959	12	~2019
163562389031	327124778063	12	~2019
163565917369	2747...117993	14	2024
163568347139	327136694279	12	~2019
163590636491	327181272983	12	~2019
163591156271	327182312543	12	~2019
163614061283	327228122567	12	~2019
163617331799	327234663599	12	~2019
163620957551	327241915103	12	~2019
163629945179	327259890359	12	~2019
163640737031	327281474063	12	~2019
163653597479	327307194959	12	~2019
163654589243	327309178487	12	~2019
163683054959	327366109919	12	~2019
163688105543	3879...136911	15	2023
163701027359	327402054719	12	~2019
163701548051	327403096103	12	~2019
163702681283	327405362567	12	~2019
163712384579	327424769159	12	~2019
163733299043	327466598087	12	~2019
163738526531	327477053063	12	~2019
163740235079	327480470159	12	~2019
163750263419	327500526839	12	~2019

4.888.230 digits

25-06-29