Small Mersenne Prime Factors (page 4868/5025)

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
134840253371	269680506743	12	~2018
134854820519	269709641039	12	~2018
134881820891	269763641783	12	~2018
134885550043	3156...710063	14	2024
134893298231	269786596463	12	~2018
134894034239	269788068479	12	~2018
134905995743	269811991487	12	~2018
134910221531	269820443063	12	~2018
134936613419	269873226839	12	~2018
134945454131	269890908263	12	~2018
134962529459	269925058919	12	~2018
134969014079	9312...714511	14	2025
134973643523	269947287047	12	~2018
134995771271	269991542543	12	~2018
135004133279	4779...180767	14	2023
135023765231	270047530463	12	~2018
135036156551	270072313103	12	~2018
135038935331	270077870663	12	~2018
135039920063	270079840127	12	~2018
135050513291	270101026583	12	~2018
135061670603	270123341207	12	~2018
135061905239	270123810479	12	~2018
135063269843	270126539687	12	~2018
135077741723	270155483447	12	~2018
135105924203	270211848407	12	~2018

Exponent	Prime Factor	Dig.	Year
135132584423	270265168847	12	~2018
135137031959	270274063919	12	~2018
135147172991	270294345983	12	~2018
135155363471	270310726943	12	~2018
135157900079	270315800159	12	~2018
135159107003	270318214007	12	~2018
135162012239	270324024479	12	~2018
135168276563	270336553127	12	~2018
135192570659	270385141319	12	~2018
135197561399	270395122799	12	~2018
135199668119	270399336239	12	~2018
135199948811	270399897623	12	~2018
135202424723	270404849447	12	~2018
135204992939	5543...104991	14	2023
135223755083	270447510167	12	~2018
135232032899	270464065799	12	~2018
135232690331	270465380663	12	~2018
135244169639	270488339279	12	~2018
135246059951	270492119903	12	~2018
135249224471	270498448943	12	~2018
135251953643	270503907287	12	~2018
135272530091	270545060183	12	~2018
135274451111	270548902223	12	~2018
135275764763	270551529527	12	~2018
135277134659	270554269319	12	~2018

Exponent	Prime Factor	Dig.	Year
135287526251	1875...383887	15	2024
135290977043	270581954087	12	~2018
135305116883	270610233767	12	~2018
135305464319	270610928639	12	~2018
135312559619	270625119239	12	~2018
135313009451	270626018903	12	~2018
135327798899	270655597799	12	~2018
135331195019	270662390039	12	~2018
135334820399	270669640799	12	~2018
135346694963	270693389927	12	~2018
135349634999	270699269999	12	~2018
135352544963	270705089927	12	~2018
135359740559	270719481119	12	~2018
135360858683	270721717367	12	~2018
135366165563	270732331127	12	~2018
135370857311	270741714623	12	~2018
135371422019	270742844039	12	~2018
135377901419	270755802839	12	~2018
135380522759	270761045519	12	~2018
135396934081	1516...617073	14	2025
135399818819	270799637639	12	~2018
135404156351	270808312703	12	~2018
135408936263	270817872527	12	~2018
135411345323	270822690647	12	~2018
135414604931	270829209863	12	~2018

Exponent	Prime Factor	Dig.	Year
135414906983	270829813967	12	~2018
135420688223	270841376447	12	~2018
135439193531	270878387063	12	~2018
135440391539	270880783079	12	~2018
135491533319	270983066639	12	~2018
135498050183	270996100367	12	~2018
135507817859	271015635719	12	~2018
135509131931	271018263863	12	~2018
135511108091	271022216183	12	~2018
135511922459	271023844919	12	~2018
135513579983	271027159967	12	~2018
135522663011	271045326023	12	~2018
135523759583	271047519167	12	~2018
135524880971	271049761943	12	~2018
135532393523	271064787047	12	~2018
135538795811	271077591623	12	~2018
135543075443	271086150887	12	~2018
135544638083	271089276167	12	~2018
135557316299	271114632599	12	~2018
135568818923	271137637847	12	~2018
135571585139	271143170279	12	~2018
135575495903	271150991807	12	~2018
135578581343	271157162687	12	~2018
135586556783	271173113567	12	~2018
135594553019	271189106039	12	~2018

4.724.182 digits

25-04-13