Small Mersenne Prime Factors (page 4766/5070)

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
65673151513	394038909079	12	~2017
65676725293	394060351759	12	~2017
65681059271	131362118543	12	~2015
65682999839	131365999679	12	~2015
65683108781	394098652687	12	~2017
65686866743	131373733487	12	~2015
65690047331	131380094663	12	~2015
65690214263	131380428527	12	~2015
65691440183	131382880367	12	~2015
65691889259	525535114073	12	~2017
65692325459	131384650919	12	~2015
65693044139	131386088279	12	~2015
65694821099	131389642199	12	~2015
65699455439	131398910879	12	~2015
65701348991	131402697983	12	~2015
65704004489	525632035913	12	~2017
65708170553	394249023319	12	~2017
65711759303	131423518607	12	~2015
65715774419	131431548839	12	~2015
65716770131	131433540263	12	~2015
65724230639	131448461279	12	~2015
65725266151	657252661511	12	~2017
65726032871	131452065743	12	~2015
65728801331	131457602663	12	~2015
65735264519	131470529039	12	~2015

Exponent	Prime Factor	Dig.	Year
65735303279	131470606559	12	~2015
65735347571	131470695143	12	~2015
65736184823	131472369647	12	~2015
65739869053	394439214319	12	~2017
65742221459	131484442919	12	~2015
65744462939	131488925879	12	~2015
65746471223	131492942447	12	~2015
65748713183	131497426367	12	~2015
65750060171	131500120343	12	~2015
65753195771	131506391543	12	~2015
65753199581	394519197487	12	~2017
65762727341	526101818729	12	~2017
65763600433	394581602599	12	~2017
65766126623	131532253247	12	~2015
65766784619	131533569239	12	~2015
65766817019	131533634039	12	~2015
65773364291	131546728583	12	~2015
65774127707	526193021657	12	~2017
65778940691	131557881383	12	~2015
65790099899	131580199799	12	~2015
65794098857	394764593143	12	~2017
65796835463	131593670927	12	~2015
65797438043	131594876087	12	~2015
65802505091	131605010183	12	~2016
65804063581	394824381487	12	~2017

Exponent	Prime Factor	Dig.	Year
65804124013	394824744079	12	~2017
65815970981	394895825887	12	~2017
65817950171	131635900343	12	~2016
65819329679	131638659359	12	~2016
65821105997	526568847977	12	~2017
65827292819	131654585639	12	~2016
65836338803	131672677607	12	~2016
65837162543	131674325087	12	~2016
65840025323	131680050647	12	~2016
65842419733	395054518399	12	~2017
65842700333	395056201999	12	~2017
65842931831	131685863663	12	~2016
65845553723	131691107447	12	~2016
65847756839	131695513679	12	~2016
65849654219	131699308439	12	~2016
65852125103	131704250207	12	~2016
65853068219	131706136439	12	~2016
65854874759	526838998073	12	~2017
65855071823	131710143647	12	~2016
65855565983	131711131967	12	~2016
65856636709	2002...559537	14	2023
65856994079	526855952633	12	~2017
65861507531	131723015063	12	~2016
65865781703	131731563407	12	~2016
65866406519	131732813039	12	~2016

Exponent	Prime Factor	Dig.	Year
65868362051	131736724103	12	~2016
65869837739	131739675479	12	~2016
65874604079	131749208159	12	~2016
65875352111	131750704223	12	~2016
65880645119	527045160953	12	~2017
65881738319	131763476639	12	~2016
65886611513	395319669079	12	~2017
65890220477	1515...709711	14	2023
65892035039	131784070079	12	~2016
65892443471	131784886943	12	~2016
65892667943	131785335887	12	~2016
65894925671	131789851343	12	~2016
65895747193	395374483159	12	~2017
65896494263	131792988527	12	~2016
65901072371	131802144743	12	~2016
65901555491	131803110983	12	~2016
65906369939	131812739879	12	~2016
65906622011	131813244023	12	~2016
65907261073	395443566439	12	~2017
65908368023	131816736047	12	~2016
65911068733	395466412399	12	~2017
65912200597	395473203583	12	~2017
65913466499	131826932999	12	~2016
65919732071	131839464143	12	~2016
65923150679	131846301359	12	~2016

4.768.925 digits

25-05-04