Small Mersenne Prime Factors (page 4470/5025)

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
22341266411	44682532823	11	~2012
22342681717	134056090303	12	~2013
22343196983	44686393967	11	~2012
22343913731	44687827463	11	~2012
22343988487	357503815793	12	~2014
22343991653	134063949919	12	~2013
22344008231	44688016463	11	~2012
22344621503	44689243007	11	~2012
22344656123	44689312247	11	~2012
22348422731	44696845463	11	~2012
22348721459	44697442919	11	~2012
22349776583	44699553167	11	~2012
22350429041	134102574247	12	~2013
22350702721	134104216327	12	~2013
22353391163	44706782327	11	~2012
22353575099	44707150199	11	~2012
22353953543	44707907087	11	~2012
22354230623	44708461247	11	~2012
22354338659	44708677319	11	~2012
22354541879	44709083759	11	~2012
22354745293	134128471759	12	~2013
22355927521	134135565127	12	~2013
22356913259	44713826519	11	~2012
22356989783	44713979567	11	~2012
22358028551	44716057103	11	~2012

Exponent	Prime Factor	Dig.	Year
22359787979	44719575959	11	~2012
22364222719	223642227191	12	~2014
22364342879	44728685759	11	~2012
22364987363	44729974727	11	~2012
22365852653	134195115919	12	~2013
22366442789	178931542313	12	~2013
22368098477	134208590863	12	~2013
22368185891	44736371783	11	~2012
22368715679	44737431359	11	~2012
22370355803	44740711607	11	~2012
22370721257	178965770057	12	~2013
22370980091	44741960183	11	~2012
22372523111	44745046223	11	~2012
22373697119	44747394239	11	~2012
22375202819	44750405639	11	~2012
22375244579	44750489159	11	~2012
22376836463	44753672927	11	~2012
22378325531	44756651063	11	~2012
22380079283	44760158567	11	~2012
22380335557	358085368913	12	~2014
22380689819	44761379639	11	~2012
22382115607	358113849713	12	~2014
22383252193	358132035089	12	~2014
22383536993	134301221959	12	~2013
22384518011	44769036023	11	~2012

Exponent	Prime Factor	Dig.	Year
22384704731	44769409463	11	~2012
22385688131	44771376263	11	~2012
22387614323	44775228647	11	~2012
22388702291	44777404583	11	~2012
22389255461	134335532767	12	~2013
22389547949	313453671287	12	~2014
22389598739	44779197479	11	~2012
22391293103	44782586207	11	~2012
22392451321	671773539631	12	~2015
22392552131	44785104263	11	~2012
22393900799	44787801599	11	~2012
22393949111	44787898223	11	~2012
22395259811	44790519623	11	~2012
22395518303	44791036607	11	~2012
22395586079	44791172159	11	~2012
22395849779	44791699559	11	~2012
22396347971	44792695943	11	~2012
22398055919	44796111839	11	~2012
22400207891	44800415783	11	~2012
22400605919	44801211839	11	~2012
22401102491	44802204983	11	~2012
22401996713	134411980279	12	~2013
22402245427	358435926833	12	~2014
22403719511	44807439023	11	~2012
22404649199	44809298399	11	~2012

Exponent	Prime Factor	Dig.	Year
22405383241	134432299447	12	~2013
22406337911	44812675823	11	~2012
22406921123	44813842247	11	~2012
22407013691	44814027383	11	~2012
22407182407	224071824071	12	~2014
22408731791	44817463583	11	~2012
22409595371	44819190743	11	~2012
22409645651	44819291303	11	~2012
22411975643	44823951287	11	~2012
22412458811	44824917623	11	~2012
22413089471	2030...060727	14	2023
22413462503	44826925007	11	~2012
22413516179	44827032359	11	~2012
22414737203	44829474407	11	~2012
22415640397	134493842383	12	~2013
22416922013	134501532079	12	~2013
22418933063	44837866127	11	~2012
22418983271	44837966543	11	~2012
22419503671	224195036711	12	~2014
22419724991	44839449983	11	~2012
22421123111	44842246223	11	~2012
22421155997	313896183959	12	~2014
22421569777	134529418663	12	~2013
22422112283	44844224567	11	~2012
22422817031	44845634063	11	~2012

4.724.182 digits

25-04-13