Small Mersenne Prime Factors (page 4757/5070)

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
63068989463	126137978927	12	~2015
63074880677	504599045417	12	~2017
63078730679	126157461359	12	~2015
63083290079	126166580159	12	~2015
63088144631	126176289263	12	~2015
63089223971	126178447943	12	~2015
63090196277	504721570217	12	~2017
63094620371	126189240743	12	~2015
63094742699	126189485399	12	~2015
63095787877	378574727263	12	~2017
63100439219	126200878439	12	~2015
63102097979	126204195959	12	~2015
63102339071	126204678143	12	~2015
63103605599	126207211199	12	~2015
63107358971	126214717943	12	~2015
63108157379	126216314759	12	~2015
63108462479	126216924959	12	~2015
63109025051	126218050103	12	~2015
63117031331	126234062663	12	~2015
63117273673	378703642039	12	~2017
63122556863	126245113727	12	~2015
63124701791	126249403583	12	~2015
63124932037	378749592223	12	~2017
63127019183	126254038367	12	~2015
63129135131	126258270263	12	~2015

Exponent	Prime Factor	Dig.	Year
63134107511	126268215023	12	~2015
63134592971	126269185943	12	~2015
63146152463	126292304927	12	~2015
63146184443	126292368887	12	~2015
63147724319	126295448639	12	~2015
63149838551	126299677103	12	~2015
63151640821	378909844927	12	~2017
63151958099	126303916199	12	~2015
63152320991	5506...904153	14	2024
63154240517	378925443103	12	~2017
63155359259	126310718519	12	~2015
63155714173	378934285039	12	~2017
63157041791	126314083583	12	~2015
63162120503	126324241007	12	~2015
63164004503	126328009007	12	~2015
63170999543	126341999087	12	~2015
63173815193	379042891159	12	~2017
63174020219	126348040439	12	~2015
63175755059	126351510119	12	~2015
63186732467	505493859737	12	~2017
63191504471	126383008943	12	~2015
63198177719	126396355439	12	~2015
63199363163	126398726327	12	~2015
63206666953	379240001719	12	~2017
63211926311	126423852623	12	~2015

Exponent	Prime Factor	Dig.	Year
63212808863	126425617727	12	~2015
63214611731	126429223463	12	~2015
63216660779	126433321559	12	~2015
63217379243	3502...100623	14	2023
63223042391	126446084783	12	~2015
63228568631	505828549049	12	~2017
63229281197	505834249577	12	~2017
63229649459	126459298919	12	~2015
63231112523	126462225047	12	~2015
63236202671	126472405343	12	~2015
63236369039	126472738079	12	~2015
63240970571	126481941143	12	~2015
63241077059	126482154119	12	~2015
63243839861	379463039167	12	~2017
63255435527	506043484217	12	~2017
63260316473	379561898839	12	~2017
63261740279	506093922233	12	~2017
63265461419	126530922839	12	~2015
63268564637	506148517097	12	~2017
63277203233	379663219399	12	~2017
63279549611	126559099223	12	~2015
63281130383	126562260767	12	~2015
63281697119	126563394239	12	~2015
63281764499	126563528999	12	~2015
63285114383	126570228767	12	~2015

Exponent	Prime Factor	Dig.	Year
63287771159	126575542319	12	~2015
63289162679	126578325359	12	~2015
63292665251	126585330503	12	~2015
63293678381	506349427049	12	~2017
63298446539	126596893079	12	~2015
63301190483	126602380967	12	~2015
63307686119	126615372239	12	~2015
63308127059	126616254119	12	~2015
63311949271	1772...795881	14	2024
63315028559	126630057119	12	~2015
63320713601	506565708809	12	~2017
63324019799	126648039599	12	~2015
63326424179	126652848359	12	~2015
63337006919	126674013839	12	~2015
63337878599	126675757199	12	~2015
63340138859	126680277719	12	~2015
63340559099	126681118199	12	~2015
63342509183	126685018367	12	~2015
63349732643	126699465287	12	~2015
63357203269	2737...812209	14	2024
63359175059	126718350119	12	~2015
63359438783	126718877567	12	~2015
63361060079	126722120159	12	~2015
63370163243	126740326487	12	~2015
63370680463	633706804631	12	~2017

4.768.925 digits

25-05-04