Small Mersenne Prime Factors (page 4909/5025)

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
176546352971	353092705943	12	~2019
176562465323	353124930647	12	~2019
176580529211	353161058423	12	~2019
176584842911	353169685823	12	~2019
176586719531	353173439063	12	~2019
176600251559	353200503119	12	~2019
176618005379	353236010759	12	~2019
176622276731	353244553463	12	~2019
176631076859	353262153719	12	~2019
176659138751	353318277503	12	~2019
176678701763	353357403527	12	~2019
176730282251	353460564503	12	~2019
176750586263	353501172527	12	~2019
176753063891	353506127783	12	~2019
176783940863	353567881727	12	~2019
176785718723	353571437447	12	~2019
176824371851	353648743703	12	~2019
176856107399	353712214799	12	~2019
176863210631	353726421263	12	~2019
176865819419	353731638839	12	~2019
176875771211	353751542423	12	~2019
176877144551	353754289103	12	~2019
176880046019	353760092039	12	~2019
176898654563	353797309127	12	~2019
176921632031	353843264063	12	~2019

Exponent	Prime Factor	Dig.	Year
176957080571	353914161143	12	~2019
176971938239	353943876479	12	~2019
176973888779	353947777559	12	~2019
176984931131	353969862263	12	~2019
176988626183	353977252367	12	~2019
176990385623	353980771247	12	~2019
176995514489	2654...173351	14	2024
177009827639	354019655279	12	~2019
177018023519	354036047039	12	~2019
177020920379	354041840759	12	~2019
177024497939	354048995879	12	~2019
177035280179	354070560359	12	~2019
177041722631	354083445263	12	~2019
177053988719	354107977439	12	~2019
177069165023	354138330047	12	~2019
177078005843	354156011687	12	~2019
177078757463	354157514927	12	~2019
177094570799	354189141599	12	~2019
177099333539	354198667079	12	~2019
177099449789	3081...263287	14	2024
177137318843	354274637687	12	~2019
177153500879	354307001759	12	~2019
177164096339	354328192679	12	~2019
177171705311	354343410623	12	~2019
177190073843	354380147687	12	~2019

Exponent	Prime Factor	Dig.	Year
177203156051	354406312103	12	~2019
177207484463	354414968927	12	~2019
177234141239	354468282479	12	~2019
177254564579	354509129159	12	~2019
177277828583	354555657167	12	~2019
177280271639	354560543279	12	~2019
177291129791	354582259583	12	~2019
177308152271	354616304543	12	~2019
177314022071	354628044143	12	~2019
177316270991	354632541983	12	~2019
177347780843	354695561687	12	~2019
177348563303	354697126607	12	~2019
177352717211	354705434423	12	~2019
177356000831	354712001663	12	~2019
177367748171	354735496343	12	~2019
177383757539	354767515079	12	~2019
177388842803	354777685607	12	~2019
177391285751	354782571503	12	~2019
177396655571	354793311143	12	~2019
177422257091	354844514183	12	~2019
177475773539	354951547079	12	~2019
177482587679	354965175359	12	~2019
177508416203	355016832407	12	~2019
177563853359	355127706719	12	~2019
177568483931	355136967863	12	~2019

Exponent	Prime Factor	Dig.	Year
177571343699	355142687399	12	~2019
177571473539	355142947079	12	~2019
177571803949	3267...926617	14	2024
177587489039	355174978079	12	~2019
177590147723	355180295447	12	~2019
177617478611	355234957223	12	~2019
177619180379	355238360759	12	~2019
177621727763	355243455527	12	~2019
177623370131	355246740263	12	~2019
177629395523	355258791047	12	~2019
177674724191	355349448383	12	~2019
177697157783	355394315567	12	~2019
177703271831	355406543663	12	~2019
177716936219	355433872439	12	~2019
177752084519	355504169039	12	~2019
177775348043	355550696087	12	~2019
177779571863	355559143727	12	~2019
177789789311	355579578623	12	~2019
177800760491	355601520983	12	~2019
177820356979	1013...478031	15	2025
177824941643	355649883287	12	~2019
177831716291	355663432583	12	~2019
177843500291	355687000583	12	~2019
177898708979	355797417959	12	~2019
177906364043	355812728087	12	~2019

4.724.182 digits

25-04-13