Small Mersenne Prime Factors (page 3105/5070)

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	Digits	Year
408772979	817545959	9	~1998
408801671	817603343	9	~1998
408819311	817638623	9	~1998
408829543	17170840807	11	~2001
408839243	817678487	9	~1998
408839591	817679183	9	~1998
408856559	817713119	9	~1998
408866663	817733327	9	~1998
408871081	2453226487	10	~1999
408886391	817772783	9	~1998
408889931	817779863	9	~1998
408894203	817788407	9	~1998
408894911	817789823	9	~1998
408896617	2453379703	10	~1999
408913613	32713089041	11	~2002
408915191	817830383	9	~1998
408916709	5724833927	10	~2000
408921497	3271371977	10	~2000
408936959	817873919	9	~1998
408945401	3271563209	10	~2000
408950099	817900199	9	~1998
408964091	817928183	9	~1998
409013771	818027543	9	~1998
409016197	2454097183	10	~1999
409018271	818036543	9	~1998

Exponent	Prime Factor	Digits	Year
409029791	3272238329	10	~2000
409045919	818091839	9	~1998
409063871	818127743	9	~1998
409080071	818160143	9	~1998
409086239	818172479	9	~1998
409095299	818190599	9	~1998
409095959	818191919	9	~1998
409098281	3272786249	10	~2000
409104461	2454626767	10	~1999
409110203	818220407	9	~1998
409120703	818241407	9	~1998
409127051	818254103	9	~1998
409130837	3273046697	10	~2000
409137923	818275847	9	~1998
409138043	818276087	9	~1998
409163099	818326199	9	~1998
409181833	2455090999	10	~1999
409182491	818364983	9	~1998
409183091	818366183	9	~1998
409216001	19642368049	11	~2002
409217663	818435327	9	~1998
409232587	6547721393	10	~2000
409233791	818467583	9	~1998
409234517	2455407103	10	~1999
409234853	2455409119	10	~1999

Exponent	Prime Factor	Digits	Year
409237001	2455422007	10	~1999
409248067	26191876289	11	~2002
409250591	818501183	9	~1998
409250771	818501543	9	~1998
409255439	818510879	9	~1998
409258439	818516879	9	~1998
409268963	818537927	9	~1998
409277051	818554103	9	~1998
409297391	818594783	9	~1998
409300883	818601767	9	~1998
409303547	10641892223	11	~2001
409314599	818629199	9	~1998
409317659	818635319	9	~1998
409330253	5730623543	10	~2000
409337171	818674343	9	~1998
409339559	818679119	9	~1998
409341743	818683487	9	~1998
409357393	2456144359	10	~1999
409358219	818716439	9	~1998
409362599	818725199	9	~1998
409391243	818782487	9	~1998
409403597	3275228777	10	~2000
409404547	16376181881	11	~2001
409404937	2456429623	10	~1999
409409747	3275277977	10	~2000

Exponent	Prime Factor	Digits	Year
409420523	818841047	9	~1998
409421629	68782833673	11	~2003
409427939	818855879	9	~1998
409428443	818856887	9	~1998
409430951	818861903	9	~1998
409434071	818868143	9	~1998
409453283	818906567	9	~1998
409462589	5732476247	10	~2000
409474553	5732643743	10	~2000
409488923	818977847	9	~1998
409502837	2457017023	10	~1999
409510379	819020759	9	~1998
409513259	819026519	9	~1998
409542671	819085343	9	~1998
409568591	819137183	9	~1998
409572461	2457434767	10	~1999
409607477	2457644863	10	~1999
409611817	2457670903	10	~1999
409615991	819231983	9	~1998
409627051	6554032817	10	~2000
409636319	7373453743	10	~2001
409659163	13928411543	11	~2001
409676921	2458061527	10	~1999
409686659	819373319	9	~1998
409686821	2458120927	10	~1999

4.768.925 digits

25-05-04