Small Mersenne Prime Factors (page 4564/5025)

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
32271158459	64542316919	11	~2013
32273458523	64546917047	11	~2013
32276421689	258211373513	12	~2015
32276835491	64553670983	11	~2013
32277163991	258217311929	12	~2015
32278873631	64557747263	11	~2013
32280266279	64560532559	11	~2013
32281396223	64562792447	11	~2013
32282269559	64564539119	11	~2013
32283098423	64566196847	11	~2013
32284683659	64569367319	11	~2013
32285176823	64570353647	11	~2013
32285869631	64571739263	11	~2013
32286357557	193718145343	12	~2014
32287716479	64575432959	11	~2013
32288028599	64576057199	11	~2013
32288467943	64576935887	11	~2013
32289751661	1801...426839	14	2023
32290026337	193740158023	12	~2014
32290041611	64580083223	11	~2013
32290841963	64581683927	11	~2013
32291029409	258328235273	12	~2015
32292878161	193757268967	12	~2014
32296000721	193776004327	12	~2014
32296698611	64593397223	11	~2013

Exponent	Prime Factor	Dig.	Year
32296729763	64593459527	11	~2013
32298423901	193790543407	12	~2014
32299444043	64598888087	11	~2013
32300256311	64600512623	11	~2013
32301860819	64603721639	11	~2013
32302927199	64605854399	11	~2013
32304114911	64608229823	11	~2013
32304669671	258437357369	12	~2015
32306120579	64612241159	11	~2013
32307707843	64615415687	11	~2013
32307886379	64615772759	11	~2013
32310043739	64620087479	11	~2013
32311019159	64622038319	11	~2013
32312750279	64625500559	11	~2013
32313855179	64627710359	11	~2013
32314096943	64628193887	11	~2013
32314480283	64628960567	11	~2013
32316126433	193896758599	12	~2014
32319059713	193914358279	12	~2014
32319515021	193917090127	12	~2014
32321350751	64642701503	11	~2013
32322604199	64645208399	11	~2013
32322956339	64645912679	11	~2013
32323342397	193940054383	12	~2014
32323670363	64647340727	11	~2013

Exponent	Prime Factor	Dig.	Year
32323947731	64647895463	11	~2013
32324847077	258598776617	12	~2015
32327549123	64655098247	11	~2013
32328979451	64657958903	11	~2013
32330426081	258643408649	12	~2015
32336371337	258690970697	12	~2015
32342344403	64684688807	11	~2013
32342349359	64684698719	11	~2013
32342914091	64685828183	11	~2013
32343619859	64687239719	11	~2013
32343993221	258751945769	12	~2015
32344474417	194066846503	12	~2014
32346043283	64692086567	11	~2013
32347038131	64694076263	11	~2013
32347086839	64694173679	11	~2013
32348499731	64696999463	11	~2013
32350754257	1391...330511	14	2024
32351362271	64702724543	11	~2013
32351679517	194110077103	12	~2014
32351945159	64703890319	11	~2013
32354380379	64708760759	11	~2013
32355621839	64711243679	11	~2013
32356742903	64713485807	11	~2013
32358523283	64717046567	11	~2013
32358946093	194153676559	12	~2014

Exponent	Prime Factor	Dig.	Year
32358977951	64717955903	11	~2013
32359483921	194156903527	12	~2014
32360667191	64721334383	11	~2013
32360989631	64721979263	11	~2013
32361198323	64722396647	11	~2013
32361552071	64723104143	11	~2013
32365823183	64731646367	11	~2013
32366018341	517856293457	12	~2015
32367263099	258938104793	12	~2015
32367808043	64735616087	11	~2013
32368936031	64737872063	11	~2013
32372185823	64744371647	11	~2013
32372604791	64745209583	11	~2013
32374816363	323748163631	12	~2015
32380095263	64760190527	11	~2013
32380698743	64761397487	11	~2013
32383421663	64766843327	11	~2013
32383942859	64767885719	11	~2013
32385631979	64771263959	11	~2013
32386533071	64773066143	11	~2013
32388307883	64776615767	11	~2013
32389404251	64778808503	11	~2013
32389815119	64779630239	11	~2013
32389954111	518239265777	12	~2015
32392287743	64784575487	11	~2013

4.724.182 digits

25-04-13