Small Mersenne Prime Factors (page 3894/5775)

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
1004632423	10046324231	11	~2003
1004655059	2009310119	10	~2001
1004660411	2009320823	10	~2001
1004702063	2009404127	10	~2001
1004705651	2009411303	10	~2001
1004783999	2009567999	10	~2001
1004819099	2009638199	10	~2001
1004836643	2009673287	10	~2001
1004836753	6029020519	10	~2003
1004844299	2009688599	10	~2001
1004919731	2009839463	10	~2001
1004950559	2009901119	10	~2001
1004955071	2009910143	10	~2001
1005030623	2010061247	10	~2001
1005050831	2010101663	10	~2001
1005083531	2010167063	10	~2001
1005091859	2010183719	10	~2001
1005167711	2010335423	10	~2001
1005206831	2010413663	10	~2001
1005237479	2010474959	10	~2001
1005317723	2010635447	10	~2001
1005327959	2010655919	10	~2001
1005364253	86461325759	11	~2005
1005380213	6032281279	10	~2003
1005472379	2010944759	10	~2001

Exponent	Prime Factor	Digits	Year
1005478559	2010957119	10	~2001
1005494471	2010988943	10	~2001
1005494753	6032968519	10	~2003
1005504959	2011009919	10	~2001
1005509969	8044079753	10	~2003
1005550333	6033301999	10	~2003
1005577511	2011155023	10	~2001
1005669737	8045357897	10	~2003
1005682631	2011365263	10	~2001
1005700499	2011400999	10	~2001
1005709721	8045677769	10	~2003
1005717287	8045738297	10	~2003
1005761759	2011523519	10	~2001
1005806861	6034841167	10	~2003
1005852131	2011704263	10	~2001
1005881531	2011763063	10	~2001
1005904589	8047236713	10	~2003
1005907411	42248111263	11	~2005
1005948971	98582999159	11	~2005
1005983107	10059831071	11	~2003
1006005541	6036033247	10	~2003
1006006019	2012012039	10	~2001
1006056983	2012113967	10	~2001
1006073459	2012146919	10	~2001
1006097819	2012195639	10	~2001

Exponent	Prime Factor	Digits	Year
1006101923	2012203847	10	~2001
1006105409	24146529817	11	~2004
1006106929	30183207871	11	~2004
1006112543	2012225087	10	~2001
1006122671	2012245343	10	~2001
1006124501	8048996009	10	~2003
1006129331	2012258663	10	~2001
1006151183	2012302367	10	~2001
1006153091	2012306183	10	~2001
1006191377	6037148263	10	~2003
1006198441	6037190647	10	~2003
1006203173	14086844423	11	~2003
1006251293	6037507759	10	~2003
1006256519	2012513039	10	~2001
1006272887	18112911967	11	~2004
1006331369	8050650953	10	~2003
1006334519	2012669039	10	~2001
1006373663	2012747327	10	~2001
1006416863	2012833727	10	~2001
1006431227	18115762087	11	~2004
1006453751	2012907503	10	~2001
1006529239	48313403473	11	~2005
1006549259	2013098519	10	~2001
1006596743	2013193487	10	~2001
1006598399	2013196799	10	~2001

Exponent	Prime Factor	Digits	Year
1006604639	2013209279	10	~2001
1006608157	120792978841	12	~2006
1006652963	2013305927	10	~2001
1006659061	6039954367	10	~2003
1006670363	2013340727	10	~2001
1006692443	2013384887	10	~2001
1006697963	2013395927	10	~2001
1006749743	2013499487	10	~2001
1006755037	24162120889	11	~2004
1006770839	2013541679	10	~2001
1006772303	2013544607	10	~2001
1006784917	16108558673	11	~2004
1006811777	6040870663	10	~2003
1006823683	42286594687	11	~2005
1006843919	2013687839	10	~2001
1006871953	6041231719	10	~2003
1006877777	6041266663	10	~2003
1006895657	8055165257	10	~2003
1006933703	2013867407	10	~2001
1006990331	8055922649	10	~2003
1006994819	2013989639	10	~2001
1006996423	10069964231	11	~2003
1007015021	6042090127	10	~2003
1007016863	2014033727	10	~2001
1007071379	2014142759	10	~2001

5.471.290 digits

26-03-29