Small Mersenne Prime Factors (page 4326/5610)

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	Digits	Year
3599397803	86385547273	11	~2008
3599399939	7198799879	10	~2006
3599513249	50393185487	11	~2008
3599515103	7199030207	10	~2006
3599638319	172782639313	12	~2009
3599649359	7199298719	10	~2006
3599733617	21598401703	11	~2007
3599838023	7199676047	10	~2006
3599861953	21599171719	11	~2007
3599867543	7199735087	10	~2006
3599996663	7199993327	10	~2006
3600092579	7200185159	10	~2006
3600098839	36000988391	11	~2007
3600250019	7200500039	10	~2006
3600334319	7200668639	10	~2006
3600343979	7200687959	10	~2006
3600481559	288038524721	12	~2010
3600513551	7201027103	10	~2006
3600593497	21603560983	11	~2007
3600629353	21603776119	11	~2007
3600763619	7201527239	10	~2006
3600922943	7201845887	10	~2006
3601026497	864246359281	12	~2011
3601607831	28812862649	11	~2007
3601657513	21609945079	11	~2007

Exponent	Prime Factor	Digits	Year
3601771489	86442515737	11	~2008
3601962229	86447093497	11	~2008
3602362031	7204724063	10	~2006
3602612779	641265074663	12	~2010
3602853257	21617119543	11	~2007
3602905751	64852303519	11	~2008
3602911079	7205822159	10	~2006
3603165179	7206330359	10	~2006
3603175679	7206351359	10	~2006
3603191243	7206382487	10	~2006
3603244213	21619465279	11	~2007
3603296831	7206593663	10	~2006
3603309971	7206619943	10	~2006
3603488723	7206977447	10	~2006
3603490013	86483760313	11	~2008
3603509603	7207019207	10	~2006
3603686837	28829494697	11	~2007
3603845411	7207690823	10	~2006
3603912971	7207825943	10	~2006
3603975239	28831801913	11	~2007
3603980293	21623881759	11	~2007
3604324991	7208649983	10	~2006
3604336811	7208673623	10	~2006
3604388159	7208776319	10	~2006
3604550759	7209101519	10	~2006

Exponent	Prime Factor	Digits	Year
3604718687	28837749497	11	~2007
3604730399	7209460799	10	~2006
3604752611	7209505223	10	~2006
3604968403	36049684031	11	~2007
3605068199	7210136399	10	~2006
3605128277	108153848311	12	~2009
3605224853	50473147943	11	~2008
3605250791	7210501583	10	~2006
3605297051	7210594103	10	~2006
3605340731	7210681463	10	~2006
3605365619	7210731239	10	~2006
3605469251	7210938503	10	~2006
3605807651	7211615303	10	~2006
3605837407	36058374071	11	~2007
3605882821	21635296927	11	~2007
3606014393	201936806009	12	~2009
3606060713	21636364279	11	~2007
3606154679	7212309359	10	~2006
3606388673	50489441423	11	~2008
3606499973	21638999839	11	~2007
3606674699	7213349399	10	~2006
3606768871	36067688711	11	~2007
3606845999	7213691999	10	~2006
3606908471	7213816943	10	~2006
3606969323	7213938647	10	~2006

Exponent	Prime Factor	Digits	Year
3607033931	7214067863	10	~2006
3607101709	79356237599	11	~2008
3607200851	7214401703	10	~2006
3607350959	7214701919	10	~2006
3607351823	86576443753	11	~2008
3607538279	7215076559	10	~2006
3607541783	7215083567	10	~2006
3607565459	7215130919	10	~2006
3607692551	7215385103	10	~2006
3607708067	28861664537	11	~2007
3607732861	21646397167	11	~2007
3608132399	7216264799	10	~2006
3608560349	28868482793	11	~2007
3608567993	21651407959	11	~2007
3608655371	7217310743	10	~2006
3608889059	7217778119	10	~2006
3608986169	28871889353	11	~2007
3609044111	7218088223	10	~2006
3609110171	7218220343	10	~2006
3609167141	21655002847	11	~2007
3609273721	79404021863	11	~2008
3609359231	28874873849	11	~2007
3609436079	7218872159	10	~2006
3609503099	259884223129	12	~2009
3609539237	21657235423	11	~2007

5.307.017 digits

26-01-11