Small Mersenne Prime Factors (page 5308/5610)

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
87886482059	175772964119	12	~2017
87894274931	175788549863	12	~2017
87897616043	175795232087	12	~2017
87901538891	175803077783	12	~2017
87905052401	527430314407	12	~2018
87905961743	175811923487	12	~2017
87911321159	175822642319	12	~2017
87915946337	527495678023	12	~2018
87916718303	175833436607	12	~2017
87927243983	175854487967	12	~2017
87935401259	175870802519	12	~2017
87945540077	527673240463	12	~2018
87961359197	703690873577	12	~2018
87965305859	175930611719	12	~2017
87968750993	527812505959	12	~2018
87970592693	527823556159	12	~2018
87972138251	175944276503	12	~2017
87974084603	175948169207	12	~2017
87976158911	175952317823	12	~2017
87976701023	175953402047	12	~2017
87977864501	703822916009	12	~2018
87978713783	175957427567	12	~2017
87992471771	175984943543	12	~2017
87998738819	175997477639	12	~2017
87999239519	175998479039	12	~2017

Exponent	Prime Factor	Dig.	Year
88000400483	176000800967	12	~2017
88008180803	176016361607	12	~2017
88009585513	528057513079	12	~2018
88011593291	176023186583	12	~2017
88012200623	176024401247	12	~2017
88019105591	176038211183	12	~2017
88022600621	528135603727	12	~2018
88023291311	704186330489	12	~2018
88025492543	176050985087	12	~2017
88030025939	176060051879	12	~2017
88031549051	176063098103	12	~2017
88039423453	528236540719	12	~2018
88040183047	880401830471	12	~2018
88048918871	176097837743	12	~2017
88056054263	176112108527	12	~2017
88057941539	176115883079	12	~2017
88062359939	176124719879	12	~2017
88065193871	176130387743	12	~2017
88066355483	176132710967	12	~2017
88068656831	176137313663	12	~2017
88069226503	880692265031	12	~2018
88069285319	176138570639	12	~2017
88078091639	176156183279	12	~2017
88080367093	528482202559	12	~2018
88080629303	176161258607	12	~2017

Exponent	Prime Factor	Dig.	Year
88093348751	176186697503	12	~2017
88093978499	176187956999	12	~2017
88095957143	176191914287	12	~2017
88096420283	176192840567	12	~2017
88102737263	176205474527	12	~2017
88107973433	528647840599	12	~2018
88127545673	528765274039	12	~2018
88128829057	528772974343	12	~2018
88133339159	176266678319	12	~2017
88135151579	176270303159	12	~2017
88135986929	705087895433	12	~2018
88137305699	176274611399	12	~2017
88140656963	176281313927	12	~2017
88142130599	176284261199	12	~2017
88143000923	176286001847	12	~2017
88148011799	176296023599	12	~2017
88162940717	528977644303	12	~2018
88168685027	705349480217	12	~2018
88179569921	529077419527	12	~2018
88185076163	176370152327	12	~2017
88189463893	529136783359	12	~2018
88191408731	176382817463	12	~2017
88196117797	529176706783	12	~2018
88196233043	176392466087	12	~2017
88198763963	176397527927	12	~2017

Exponent	Prime Factor	Dig.	Year
88201024259	176402048519	12	~2017
88210011479	176420022959	12	~2017
88211351171	176422702343	12	~2017
88211647661	705693181289	12	~2018
88214829011	176429658023	12	~2017
88220446439	176440892879	12	~2017
88222493027	4464...471663	14	2023
88222873217	529337239303	12	~2018
88226916131	176453832263	12	~2017
88228135379	176456270759	12	~2017
88234633379	176469266759	12	~2017
88247419223	176494838447	12	~2017
88249280459	176498560919	12	~2017
88255257743	2135...373807	14	2023
88255468859	176510937719	12	~2017
88259582531	176519165063	12	~2017
88260325019	176520650039	12	~2017
88270765223	176541530447	12	~2017
88273737361	529642424167	12	~2018
88276554011	176553108023	12	~2017
88278169163	176556338327	12	~2017
88279184677	529675108063	12	~2018
88279640171	176559280343	12	~2017
88286633471	176573266943	12	~2017
88289005859	176578011719	12	~2017

5.307.017 digits

26-01-11