Small Mersenne Prime Factors (page 4391/5775)

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
3175196639	6350393279	10	~2005
3175433777	44456072879	11	~2007
3175479119	6350958239	10	~2005
3175601837	19053611023	11	~2006
3175646459	6351292919	10	~2005
3175849139	133385663839	12	~2008
3175913843	6351827687	10	~2005
3175947163	31759471631	11	~2007
3176016719	6352033439	10	~2005
3176213219	6352426439	10	~2005
3176287043	6352574087	10	~2005
3176301899	6352603799	10	~2005
3176317933	19057907599	11	~2006
3176554421	19059326527	11	~2006
3176751251	6353502503	10	~2005
3176865827	25414926617	11	~2007
3177303029	25418424233	11	~2007
3177407459	6354814919	10	~2005
3177483203	6354966407	10	~2005
3177565043	6355130087	10	~2005
3177612901	69907483823	11	~2008
3177750047	235153503479	12	~2009
3177820573	19066923439	11	~2006
3177888611	6355777223	10	~2005
3177960419	6355920839	10	~2005

Exponent	Prime Factor	Digits	Year
3177993457	50847895313	11	~2007
3178450763	6356901527	10	~2005
3178515503	6357031007	10	~2005
3178541291	6357082583	10	~2005
3178797239	6357594479	10	~2005
3178940543	6357881087	10	~2005
3179033827	31790338271	11	~2007
3179341523	6358683047	10	~2005
3179516377	19077098263	11	~2006
3179544413	19077266479	11	~2006
3179734651	50875754417	11	~2007
3179766043	31797660431	11	~2007
3179786849	76314884377	11	~2008
3179843033	76316232793	11	~2008
3179854243	31798542431	11	~2007
3179869093	50877905489	11	~2007
3179886719	6359773439	10	~2005
3180216493	19081298959	11	~2006
3180322283	6360644567	10	~2005
3180374159	6360748319	10	~2005
3180411683	6360823367	10	~2005
3180441371	6360882743	10	~2005
3180468857	19082813143	11	~2006
3180470099	57248461783	11	~2008
3180582803	6361165607	10	~2005

Exponent	Prime Factor	Digits	Year
3180632531	6361265063	10	~2005
3180651251	6361302503	10	~2005
3180671161	814251817217	12	~2010
3181025759	6362051519	10	~2005
3181092539	6362185079	10	~2005
3181152983	6362305967	10	~2005
3181183991	6362367983	10	~2005
3181313903	6362627807	10	~2005
3181349399	6362698799	10	~2005
3181360571	6362721143	10	~2005
3181467671	6362935343	10	~2005
3181663763	6363327527	10	~2005
3181710923	6363421847	10	~2005
3181727231	6363454463	10	~2005
3181771991	6363543983	10	~2005
3181879297	19091275783	11	~2006
3182021651	6364043303	10	~2005
3182037779	6364075559	10	~2005
3182157623	6364315247	10	~2005
3182158211	159107910551	12	~2009
3182255243	6364510487	10	~2005
3182268359	6364536719	10	~2005
3182302463	6364604927	10	~2005
3182415023	6364830047	10	~2005
3182495951	6364991903	10	~2005

Exponent	Prime Factor	Digits	Year
3182610839	6365221679	10	~2005
3182682121	19096092727	11	~2006
3182817779	6365635559	10	~2005
3182921939	6365843879	10	~2005
3182927441	25463419529	11	~2007
3183218543	6366437087	10	~2005
3183306323	6366612647	10	~2005
3183400439	6366800879	10	~2005
3183482171	6366964343	10	~2005
3183524243	6367048487	10	~2005
3183546011	6367092023	10	~2005
3183612059	6367224119	10	~2005
3183875003	6367750007	10	~2005
3183881843	6367763687	10	~2005
3184208063	6368416127	10	~2005
3184209863	6368419727	10	~2005
3184229819	6368459639	10	~2005
3184284503	6368569007	10	~2005
3184309081	19105854487	11	~2006
3184314641	25474517129	11	~2007
3184532783	6369065567	10	~2005
3184600931	6369201863	10	~2005
3184674743	6369349487	10	~2005
3184723471	50955575537	11	~2007
3184764263	6369528527	10	~2005

5.471.290 digits

26-03-29