Small Mersenne Prime Factors (page 4372/5235)

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	Dig.	Year
8981256707	161662620727	12	~2011
8981324699	17962649399	11	~2009
8981486201	53888917207	11	~2010
8981572343	17963144687	11	~2009
8981598011	17963196023	11	~2009
8981710357	143707365713	12	~2011
8981751983	17963503967	11	~2009
8982915077	53897490463	11	~2010
8982921319	161692583743	12	~2011
8983472483	17966944967	11	~2009
8983649953	53901899719	11	~2010
8984128379	17968256759	11	~2009
8984191319	17968382639	11	~2009
8984717699	17969435399	11	~2009
8985139763	17970279527	11	~2009
8985243803	17970487607	11	~2009
8985390937	53912345623	11	~2010
8985688319	17971376639	11	~2009
8986103723	17972207447	11	~2009
8986490141	53918940847	11	~2010
8986579037	71892632297	11	~2010
8986828703	17973657407	11	~2009
8987221619	17974443239	11	~2009
8987257091	17974514183	11	~2009
8987790923	17975581847	11	~2009

Exponent	Prime Factor	Dig.	Year
8988067559	17976135119	11	~2009
8988410681	53930464087	11	~2010
8990201123	17980402247	11	~2009
8990285411	17980570823	11	~2009
8990510099	17981020199	11	~2009
8990907677	53945446063	11	~2010
8990958323	17981916647	11	~2009
8991128557	53946771343	11	~2010
8991342407	215792217769	12	~2011
8991394211	17982788423	11	~2009
8991410419	89914104191	11	~2010
8991465251	17982930503	11	~2009
8991691409	71933531273	11	~2010
8991854171	17983708343	11	~2009
8991990443	17983980887	11	~2009
8992552703	17985105407	11	~2009
8992898819	17985797639	11	~2009
8993856983	17987713967	11	~2009
8993962811	17987925623	11	~2009
8994043841	53964263047	11	~2010
8994433991	17988867983	11	~2009
8994437849	341788638263	12	~2012
8994504719	17989009439	11	~2009
8994727799	17989455599	11	~2009
8995268231	17990536463	11	~2009

Exponent	Prime Factor	Dig.	Year
8995417583	17990835167	11	~2009
8995455383	17990910767	11	~2009
8996459603	17992919207	11	~2009
8996835443	17993670887	11	~2009
8997056011	143952896177	12	~2011
8997763811	17995527623	11	~2009
8997792911	17995585823	11	~2009
8998262219	17996524439	11	~2009
8998551343	143976821489	12	~2011
8998665671	17997331343	11	~2009
8998718051	17997436103	11	~2009
8998847141	71990777129	11	~2010
8999039603	17998079207	11	~2009
8999336243	17998672487	11	~2009
8999589551	17999179103	11	~2009
8999766133	197994854927	12	~2011
8999923259	17999846519	11	~2009
9000099049	198002179079	12	~2011
9000150959	18000301919	11	~2009
9000235943	18000471887	11	~2009
9001198783	90011987831	11	~2010
9001352291	18002704583	11	~2009
9001389863	18002779727	11	~2009
9001592339	18003184679	11	~2009
9002392391	18004784783	11	~2009

Exponent	Prime Factor	Dig.	Year
9002558531	18005117063	11	~2009
9003020161	54018120967	11	~2010
9003035663	18006071327	11	~2009
9003036037	54018216223	11	~2010
9003069203	18006138407	11	~2009
9003232643	18006465287	11	~2009
9003355103	18006710207	11	~2009
9003438937	414158191103	12	~2012
9003509279	18007018559	11	~2009
9003578939	18007157879	11	~2009
9003954727	90039547271	11	~2010
9003979931	18007959863	11	~2009
9004037639	18008075279	11	~2009
9004111019	18008222039	11	~2009
9004260971	18008521943	11	~2009
9004686773	54028120639	11	~2010
9004712471	18009424943	11	~2009
9004988123	18009976247	11	~2009
9005500687	90055006871	11	~2010
9005766001	270172980031	12	~2012
9006343259	18012686519	11	~2009
9006444659	18012889319	11	~2009
9006466211	18012932423	11	~2009
9006480299	18012960599	11	~2009
9006682463	18013364927	11	~2009

4.933.056 digits

25-07-20