Small Mersenne Prime Factors (page 2850/5490)

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
165846731	331693463	9	~1995
165847463	331694927	9	~1995
165847823	331695647	9	~1995
165848939	331697879	9	~1995
165850361	995102167	9	~1996
165854677	2653674833	10	~1997
165859691	331719383	9	~1995
165861029	2322054407	10	~1997
165863723	331727447	9	~1995
165873371	331746743	9	~1995
165878819	331757639	9	~1995
165881459	331762919	9	~1995
165882683	331765367	9	~1995
165883087	1658830871	10	~1997
165883801	23555499743	11	~2000
165885809	3981259417	10	~1998
165901979	331803959	9	~1995
165903131	331806263	9	~1995
165905483	331810967	9	~1995
165906431	331812863	9	~1995
165907537	995445223	9	~1996
165910163	331820327	9	~1995
165912203	331824407	9	~1995
165912371	331824743	9	~1995
165915443	331830887	9	~1995

Exponent	Prime Factor	Digits	Year
165915803	331831607	9	~1995
165922583	331845167	9	~1995
165923141	995538847	9	~1996
165925619	331851239	9	~1995
165927479	331854959	9	~1995
165928799	331857599	9	~1995
165930029	41150647193	11	~2000
165932537	3982380889	10	~1998
165936203	331872407	9	~1995
165941663	331883327	9	~1995
165943439	331886879	9	~1995
165944929	6637797161	10	~1998
165947549	2323265687	10	~1997
165948773	995692639	9	~1996
165956723	331913447	9	~1995
165963263	331926527	9	~1995
165964691	331929383	9	~1995
165968903	331937807	9	~1995
165970237	995821423	9	~1996
165975263	331950527	9	~1995
165976079	1327808633	10	~1997
165989423	331978847	9	~1995
165990179	331980359	9	~1995
166001663	332003327	9	~1995
166003217	996019303	9	~1996

Exponent	Prime Factor	Digits	Year
166004291	332008583	9	~1995
166008071	332016143	9	~1995
166017251	332034503	9	~1995
166020839	332041679	9	~1995
166023563	332047127	9	~1995
166029659	332059319	9	~1995
166030919	332061839	9	~1995
166031051	332062103	9	~1995
166031609	1328252873	10	~1997
166036151	332072303	9	~1995
166043639	332087279	9	~1995
166047587	4317237263	10	~1998
166048451	332096903	9	~1995
166050551	1328404409	10	~1997
166054921	996329527	9	~1996
166057981	996347887	9	~1996
166059431	332118863	9	~1995
166065743	332131487	9	~1995
166067933	2324951063	10	~1997
166068263	332136527	9	~1995
166069441	996416647	9	~1996
166072619	332145239	9	~1995
166077083	332154167	9	~1995
166080443	332160887	9	~1995
166080923	332161847	9	~1995

Exponent	Prime Factor	Digits	Year
166085033	2325190463	10	~1997
166093523	332187047	9	~1995
166095239	332190479	9	~1995
166097663	332195327	9	~1995
166100327	1328802617	10	~1997
166104131	332208263	9	~1995
166104839	332209679	9	~1995
166110481	3654430583	10	~1998
166111331	332222663	9	~1995
166116617	996699703	9	~1996
166118081	1328944649	10	~1997
166121003	332242007	9	~1995
166124363	332248727	9	~1995
166124831	332249663	9	~1995
166126199	332252399	9	~1995
166126451	332252903	9	~1995
166126463	332252927	9	~1995
166133003	332266007	9	~1995
166133939	332267879	9	~1995
166137791	332275583	9	~1995
166141007	1329128057	10	~1997
166141091	1329128729	10	~1997
166142891	332285783	9	~1995
166157723	332315447	9	~1995
166159391	332318783	9	~1995

5.187.277 digits

25-11-17