Small Mersenne Prime Factors (page 4477/5025)

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
22929566843	45859133687	11	~2012
22929618599	45859237199	11	~2012
22930285241	137581711447	12	~2013
22930656251	45861312503	11	~2012
22931415181	137588491087	12	~2013
22932534011	183460272089	12	~2013
22933612211	45867224423	11	~2012
22933654397	183469235177	12	~2013
22933995013	137603970079	12	~2013
22934149019	45868298039	11	~2012
22934380499	45868760999	11	~2012
22935533633	137613201799	12	~2013
22935854789	183486838313	12	~2013
22936548671	45873097343	11	~2012
22936623881	183492991049	12	~2013
22937923213	137627539279	12	~2013
22938178877	183505431017	12	~2013
22940116691	45880233383	11	~2012
22940296103	45880592207	11	~2012
22943005601	137658033607	12	~2013
22943038933	137658233599	12	~2013
22943090039	45886180079	11	~2012
22945413059	45890826119	11	~2012
22946613083	45893226167	11	~2012
22946830723	229468307231	12	~2014

Exponent	Prime Factor	Dig.	Year
22949449927	550786798249	12	~2015
22951586341	504934899503	12	~2014
22952823143	45905646287	11	~2012
22953173783	45906347567	11	~2012
22953227471	45906454943	11	~2012
22953240071	45906480143	11	~2012
22953547343	45907094687	11	~2012
22953702911	45907405823	11	~2012
22954117271	45908234543	11	~2012
22956362183	45912724367	11	~2012
22958494859	45916989719	11	~2012
22958652179	45917304359	11	~2012
22961213003	45922426007	11	~2012
22964799421	367436790737	12	~2014
22965853271	183726826169	12	~2013
22966160521	137796963127	12	~2013
22967133239	45934266479	11	~2012
22967705021	183741640169	12	~2013
22969108181	183752865449	12	~2013
22969674029	183757392233	12	~2013
22969955483	45939910967	11	~2012
22971220451	45942440903	11	~2012
22972049291	45944098583	11	~2012
22974477359	45948954719	11	~2012
22974510683	45949021367	11	~2012

Exponent	Prime Factor	Dig.	Year
22975152451	229751524511	12	~2014
22978484279	45956968559	11	~2012
22978705679	45957411359	11	~2012
22978898399	45957796799	11	~2012
22981052051	45962104103	11	~2012
22981976063	45963952127	11	~2012
22982069699	45964139399	11	~2012
22982997083	45965994167	11	~2012
22984097243	45968194487	11	~2012
22984292003	45968584007	11	~2012
22984727159	735511269089	12	~2015
22984989551	45969979103	11	~2012
22985222531	45970445063	11	~2012
22985289839	45970579679	11	~2012
22985935403	45971870807	11	~2012
22986108503	45972217007	11	~2012
22986330371	45972660743	11	~2012
22988688851	45977377703	11	~2012
22988695721	137932174327	12	~2013
22989361931	45978723863	11	~2012
22990888751	45981777503	11	~2012
22991646911	45983293823	11	~2012
22993907159	45987814319	11	~2012
22996887731	45993775463	11	~2012
22997132351	45994264703	11	~2012

Exponent	Prime Factor	Dig.	Year
22997171159	45994342319	11	~2012
22998472361	183987778889	12	~2013
22999387651	367990202417	12	~2014
22999483649	183995869193	12	~2013
22999576163	45999152327	11	~2012
22999949513	137999697079	12	~2013
23000650703	46001301407	11	~2012
23001188369	184009506953	12	~2013
23001699299	46003398599	11	~2012
23002845251	46005690503	11	~2012
23003267879	46006535759	11	~2012
23004256871	46008513743	11	~2012
23007647543	46015295087	11	~2012
23009678339	46019356679	11	~2012
23009805503	46019611007	11	~2012
23011376711	46022753423	11	~2012
23012038739	46024077479	11	~2012
23012182211	46024364423	11	~2012
23012203211	46024406423	11	~2012
23014896143	46029792287	11	~2012
23015503919	46031007839	11	~2012
23015664263	46031328527	11	~2012
23016160217	184129281737	12	~2013
23016783143	46033566287	11	~2012
23018142683	46036285367	11	~2012

4.724.182 digits

25-04-13