Small Mersenne Prime Factors (page 4965/5070)

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
193995566111	2327...933321	14	2024
194004463979	388008927959	12	~2019
194004504839	388009009679	12	~2019
194013635771	388027271543	12	~2019
194022860819	388045721639	12	~2019
194038807031	388077614063	12	~2019
194061434519	388122869039	12	~2019
194073012011	388146024023	12	~2019
194110750649	3261...109033	14	2024
194116887059	388233774119	12	~2019
194126701511	388253403023	12	~2019
194172342251	388344684503	12	~2019
194183798339	388367596679	12	~2019
194192371931	388384743863	12	~2019
194203207871	388406415743	12	~2019
194251523171	388503046343	12	~2019
194262512819	388525025639	12	~2019
194273423651	388546847303	12	~2019
194273900399	388547800799	12	~2019
194278375391	388556750783	12	~2019
194323476131	388646952263	12	~2019
194329305851	388658611703	12	~2019
194344306811	388688613623	12	~2019
194358378359	3770...401647	14	2024
194371088423	388742176847	12	~2019

Exponent	Prime Factor	Dig.	Year
194391133379	388782266759	12	~2019
194396847539	388793695079	12	~2019
194428865051	388857730103	12	~2019
194457498551	388914997103	12	~2019
194466660803	388933321607	12	~2019
194471018363	388942036727	12	~2019
194474056379	388948112759	12	~2019
194478768479	388957536959	12	~2019
194501258351	389002516703	12	~2019
194513734091	389027468183	12	~2019
194538436139	389076872279	12	~2019
194544720239	389089440479	12	~2019
194545357679	389090715359	12	~2019
194547885263	389095770527	12	~2019
194556812903	389113625807	12	~2019
194602638179	389205276359	12	~2019
194603436383	389206872767	12	~2019
194607469373	9341...299041	14	2024
194630413319	389260826639	12	~2019
194659279511	389318559023	12	~2019
194661298439	389322596879	12	~2019
194666598011	389333196023	12	~2019
194681745971	389363491943	12	~2019
194683718819	389367437639	12	~2019
194706743663	389413487327	12	~2019

Exponent	Prime Factor	Dig.	Year
194722829219	389445658439	12	~2019
194724011411	389448022823	12	~2019
194750910239	389501820479	12	~2019
194756363843	389512727687	12	~2019
194791853999	389583707999	12	~2019
194798269859	389596539719	12	~2019
194804964203	2805...845233	14	2025
194818084823	389636169647	12	~2019
194845895459	389691790919	12	~2019
194856933779	389713867559	12	~2019
194857981931	389715963863	12	~2019
194858557451	389717114903	12	~2019
194898334439	389796668879	12	~2019
194900353691	389800707383	12	~2019
194912851151	389825702303	12	~2019
194947903523	389895807047	12	~2019
194958386531	389916773063	12	~2019
194967694931	389935389863	12	~2019
194992808063	389985616127	12	~2019
194999150243	389998300487	12	~2019
195006192971	390012385943	12	~2019
195025992779	390051985559	12	~2019
195065230571	390130461143	12	~2019
195071583659	390143167319	12	~2019
195072392191	2340...062921	14	2024

Exponent	Prime Factor	Dig.	Year
195075211319	390150422639	12	~2019
195085913843	390171827687	12	~2019
195086824391	390173648783	12	~2019
195107628959	390215257919	12	~2019
195116377223	390232754447	12	~2019
195123451703	390246903407	12	~2019
195165612419	390331224839	12	~2019
195167186003	390334372007	12	~2019
195187013101	7612...109391	14	2024
195203621603	390407243207	12	~2019
195229366379	390458732759	12	~2019
195237209411	390474418823	12	~2019
195256431983	390512863967	12	~2019
195257428043	390514856087	12	~2019
195295018823	390590037647	12	~2019
195306586379	390613172759	12	~2019
195316964291	390633928583	12	~2019
195340764611	390681529223	12	~2019
195345554231	390691108463	12	~2019
195358023251	390716046503	12	~2019
195381463159	9601...963327	15	2024
195406506131	390813012263	12	~2019
195421909367	2696...492647	14	2024
195435176099	390870352199	12	~2019
195444645131	390889290263	12	~2019

4.768.925 digits

25-05-04