Small Mersenne Prime Factors (page 5043/5070)

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
327001916317	1327...024703	15	2024
327017410799	654034821599	12	~2021
327020352203	654040704407	12	~2021
327031581031	3139...778977	14	2024
327038110799	654076221599	12	~2021
327041109071	654082218143	12	~2021
327048849443	654097698887	12	~2021
327053835593	5756...064369	14	2024
327054942611	654109885223	12	~2021
327056824403	654113648807	12	~2021
327085056719	654170113439	12	~2021
327104427389	1570...514673	14	2024
327111640283	654223280567	12	~2021
327138218111	654276436223	12	~2021
327149420483	654298840967	12	~2021
327166740671	654333481343	12	~2021
327168134399	654336268799	12	~2021
327271966331	654543932663	12	~2021
327340280303	654680560607	12	~2021
327342589751	654685179503	12	~2021
327345012119	654690024239	12	~2021
327349699091	654699398183	12	~2021
327383603531	654767207063	12	~2021
327386193731	654772387463	12	~2021
327401082971	654802165943	12	~2021

Exponent	Prime Factor	Dig.	Year
327410979299	654821958599	12	~2021
327418096679	654836193359	12	~2021
327433463579	654866927159	12	~2021
327439577771	654879155543	12	~2021
327487820483	654975640967	12	~2021
327495744899	654991489799	12	~2021
327516285301	7270...336823	14	2024
327581364983	655162729967	12	~2021
327596786423	6093...274679	14	2024
327640394759	655280789519	12	~2021
327645826643	655291653287	12	~2021
327679577531	655359155063	12	~2021
327689223083	655378446167	12	~2021
327690055331	655380110663	12	~2021
327694035131	655388070263	12	~2021
327696819071	1710...555063	15	2025
327698759879	655397519759	12	~2021
327714579971	655429159943	12	~2021
327716904803	655433809607	12	~2021
327728171579	655456343159	12	~2021
327732114371	655464228743	12	~2021
327740495197	2556...625367	14	2024
327771054313	3146...214049	14	2024
327782997551	655565995103	12	~2021
327793851659	655587703319	12	~2021

Exponent	Prime Factor	Dig.	Year
327807688751	655615377503	12	~2021
327818079383	3546...892407	15	2024
327859179803	655718359607	12	~2021
327914662913	1888...837889	15	2025
327919519073	2361...373257	14	2024
327944011253	1856...369199	15	2024
327977826383	655955652767	12	~2021
327989865011	655979730023	12	~2021
327999428483	655998856967	12	~2021
328081693169	3346...703239	14	2024
328089246011	656178492023	12	~2021
328102874531	656205749063	12	~2021
328121500319	656243000639	12	~2021
328123775459	656247550919	12	~2021
328147259591	656294519183	12	~2021
328150533731	656301067463	12	~2021
328171545631	2953...106791	14	2024
328186264163	656372528327	12	~2021
328204617803	656409235607	12	~2021
328217946071	3367...668847	15	2025
328233440831	656466881663	12	~2021
328247714831	656495429663	12	~2021
328258285259	656516570519	12	~2021
328275525491	656551050983	12	~2021
328317432323	656634864647	12	~2021

Exponent	Prime Factor	Dig.	Year
328381239773	1103...563729	15	2025
328388346119	656776692239	12	~2021
328402530311	656805060623	12	~2021
328448542739	656897085479	12	~2021
328451176379	656902352759	12	~2021
328466320057	2562...964447	14	2024
328486031017	4730...466449	14	2024
328491495863	656982991727	12	~2021
328495792343	656991584687	12	~2021
328514861819	657029723639	12	~2021
328529298389	1576...322673	14	2025
328542570311	657085140623	12	~2021
328562645003	657125290007	12	~2021
328572715199	657145430399	12	~2021
328630549019	1820...156527	15	2025
328699020431	657398040863	12	~2021
328711147703	657422295407	12	~2021
328781163863	657562327727	12	~2021
328818105743	657636211487	12	~2021
328830555239	657661110479	12	~2021
328849078703	657698157407	12	~2021
328908554519	657817109039	12	~2021
328930476779	657860953559	12	~2021
328945297379	657890594759	12	~2021
328955061983	657910123967	12	~2021

4.768.925 digits

25-05-04