Small Mersenne Prime Factors (page 3735/5145)

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
1673983991	3347967983	10	~2003
1673998379	13391987033	11	~2005
1674014873	10044089239	11	~2004
1674132203	3348264407	10	~2003
1674162761	93753114617	11	~2007
1674192599	3348385199	10	~2003
1674225599	3348451199	10	~2003
1674308371	16743083711	11	~2005
1674340919	3348681839	10	~2003
1674363059	3348726119	10	~2003
1674402467	13395219737	11	~2005
1674448781	103815824423	12	~2007
1674557663	3349115327	10	~2003
1674614663	3349229327	10	~2003
1674705251	3349410503	10	~2003
1674724223	40193381353	11	~2006
1674813199	16748131991	11	~2005
1674819851	3349639703	10	~2003
1674861239	3349722479	10	~2003
1674895979	3349791959	10	~2003
1674901859	3349803719	10	~2003
1674916979	3349833959	10	~2003
1674930371	3349860743	10	~2003
1674943663	16749436631	11	~2005
1674972577	10049835463	11	~2004

Exponent	Prime Factor	Digits	Year
1675013597	10050081583	11	~2004
1675072583	3350145167	10	~2003
1675117571	3350235143	10	~2003
1675144151	3350288303	10	~2003
1675210703	3350421407	10	~2003
1675312417	26804998673	11	~2005
1675315289	23454414047	11	~2005
1675409369	13403274953	11	~2005
1675417703	3350835407	10	~2003
1675425239	3350850479	10	~2003
1675590359	3351180719	10	~2003
1675618391	3351236783	10	~2003
1675630613	10053783679	11	~2004
1675647383	3351294767	10	~2003
1675674883	26810798129	11	~2005
1675705331	3351410663	10	~2003
1675708403	3351416807	10	~2003
1675739603	3351479207	10	~2003
1675799189	50273975671	11	~2006
1675810949	13406487593	11	~2005
1675816601	10054899607	11	~2004
1675839911	3351679823	10	~2003
1675878133	10055268799	11	~2004
1675891799	3351783599	10	~2003
1675973459	3351946919	10	~2003

Exponent	Prime Factor	Digits	Year
1675983563	3351967127	10	~2003
1675999511	3351999023	10	~2003
1676035919	3352071839	10	~2003
1676036639	3352073279	10	~2003
1676052743	3352105487	10	~2003
1676072543	3352145087	10	~2003
1676086859	3352173719	10	~2003
1676108891	3352217783	10	~2003
1676185691	3352371383	10	~2003
1676229059	3352458119	10	~2003
1676239811	3352479623	10	~2003
1676329211	3352658423	10	~2003
1676335319	3352670639	10	~2003
1676385547	26822168753	11	~2005
1676463923	3352927847	10	~2003
1676554871	3353109743	10	~2003
1676558783	3353117567	10	~2003
1676566943	3353133887	10	~2003
1676603759	3353207519	10	~2003
1676629319	3353258639	10	~2003
1676690417	10060142503	11	~2004
1676724431	3353448863	10	~2003
1676726963	3353453927	10	~2003
1676734277	23474279879	11	~2005
1676789591	3353579183	10	~2003

Exponent	Prime Factor	Digits	Year
1676901839	3353803679	10	~2003
1676903831	3353807663	10	~2003
1676924351	3353848703	10	~2003
1676935103	3353870207	10	~2003
1676946539	3353893079	10	~2003
1677078653	10062471919	11	~2004
1677143459	3354286919	10	~2003
1677189443	3354378887	10	~2003
1677223991	3354447983	10	~2003
1677429541	10064577247	11	~2004
1677532679	3355065359	10	~2003
1677533699	3355067399	10	~2003
1677551321	10065307927	11	~2004
1677602291	3355204583	10	~2003
1677700091	13421600729	11	~2005
1677722569	40265341657	11	~2006
1677833519	3355667039	10	~2003
1677955043	3355910087	10	~2003
1678003403	3356006807	10	~2003
1678036721	13424293769	11	~2005
1678093031	3356186063	10	~2003
1678118699	3356237399	10	~2003
1678178291	3356356583	10	~2003
1678205887	97335941447	11	~2007
1678234931	3356469863	10	~2003

4.843.404 digits

25-06-08