Small Mersenne Prime Factors (page 4696/5490)

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
13701240659	27402481319	11	~2010
13701669659	27403339319	11	~2010
13702583579	27405167159	11	~2010
13702798751	27405597503	11	~2010
13703168579	27406337159	11	~2010
13703658791	27407317583	11	~2010
13704543613	82227261679	11	~2011
13705095913	219281534609	12	~2012
13705113743	27410227487	11	~2010
13705539539	27411079079	11	~2010
13705616159	27411232319	11	~2010
13705696859	27411393719	11	~2010
13705914197	109647313577	12	~2012
13706113691	27412227383	11	~2010
13706496599	27412993199	11	~2010
13706656021	219306496337	12	~2012
13707273071	27414546143	11	~2010
13707571931	27415143863	11	~2010
13707857063	27415714127	11	~2010
13708446659	27416893319	11	~2010
13708979107	137089791071	12	~2012
13709066603	27418133207	11	~2010
13709678231	27419356463	11	~2010
13709785571	27419571143	11	~2010
13710064073	82260384439	11	~2011

Exponent	Prime Factor	Dig.	Year
13710319379	27420638759	11	~2010
13711543991	27423087983	11	~2010
13711889183	27423778367	11	~2010
13713008219	109704065753	12	~2012
13713556463	27427112927	11	~2010
13713945683	27427891367	11	~2010
13713981551	27427963103	11	~2010
13714190387	109713523097	12	~2012
13714269311	27428538623	11	~2010
13714635611	109717084889	12	~2012
13714746179	27429492359	11	~2010
13715367983	27430735967	11	~2010
13715961023	27431922047	11	~2010
13716103631	27432207263	11	~2010
13716187679	27432375359	11	~2010
13716196877	192026756279	12	~2012
13716663053	192033282743	12	~2012
13717118231	27434236463	11	~2010
13717556123	27435112247	11	~2010
13718496899	27436993799	11	~2010
13719695939	27439391879	11	~2010
13719720743	27439441487	11	~2010
13720791191	27441582383	11	~2010
13720952891	27441905783	11	~2010
13721389823	27442779647	11	~2010

Exponent	Prime Factor	Dig.	Year
13721469401	82328816407	11	~2011
13721635523	27443271047	11	~2010
13721710319	27443420639	11	~2010
13723075241	439138407713	12	~2013
13723102399	137231023991	12	~2012
13724377867	466628847479	12	~2013
13724534743	329388833833	12	~2013
13725859319	27451718639	11	~2010
13725979921	82355879527	11	~2011
13726343117	109810744937	12	~2012
13726521311	27453042623	11	~2010
13726946591	27453893183	11	~2010
13727001083	27454002167	11	~2010
13727025239	27454050479	11	~2010
13729075907	247123366327	12	~2013
13729095431	27458190863	11	~2010
13730522483	27461044967	11	~2010
13731109033	82386654199	11	~2011
13731399589	659107180273	12	~2014
13731527123	27463054247	11	~2010
13731641717	192242984039	12	~2012
13733808973	82402853839	11	~2011
13734231743	27468463487	11	~2010
13734356579	27468713159	11	~2010
13734837419	27469674839	11	~2010

Exponent	Prime Factor	Dig.	Year
13734853403	27469706807	11	~2010
13735007063	27470014127	11	~2010
13735303573	82411821439	11	~2011
13735453463	27470906927	11	~2010
13735645151	27471290303	11	~2010
13735798619	27471597239	11	~2010
13736877179	27473754359	11	~2010
13737690443	27475380887	11	~2010
13737703823	27475407647	11	~2010
13737828431	27475656863	11	~2010
13738233479	27476466959	11	~2010
13738816079	247298689423	12	~2013
13739279483	27478558967	11	~2010
13739771999	27479543999	11	~2010
13739799851	27479599703	11	~2010
13739800667	357234817343	12	~2013
13740577439	27481154879	11	~2010
13740672601	82444035607	11	~2011
13742976899	27485953799	11	~2010
13743227999	27486455999	11	~2010
13743360523	467274257783	12	~2013
13743749819	27487499639	11	~2010
13743774059	27487548119	11	~2010
13743841997	192413787959	12	~2012
13744280611	219908489777	12	~2012

5.187.277 digits

25-11-17