Small Mersenne Prime Factors (page 4334/5070)

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
11983059119	95864472953	11	~2011
11983347683	23966695367	11	~2010
11983357979	23966715959	11	~2010
11983531753	71901190519	11	~2011
11983654211	23967308423	11	~2010
11984612141	71907672847	11	~2011
11985465703	287651176873	12	~2012
11985537671	23971075343	11	~2010
11985585971	23971171943	11	~2010
11985673481	95885387849	11	~2011
11985688031	23971376063	11	~2010
11986463579	23972927159	11	~2010
11986781483	23973562967	11	~2010
11986796489	95894371913	11	~2011
11987263583	23974527167	11	~2010
11987702651	95901621209	11	~2011
11987812631	23975625263	11	~2010
11988331391	23976662783	11	~2010
11988983459	23977966919	11	~2010
11989135969	1004...942023	14	2023
11989605443	23979210887	11	~2010
11990033171	23980066343	11	~2010
11990039111	95920312889	11	~2011
11990173439	23980346879	11	~2010
11990597519	23981195039	11	~2010

Exponent	Prime Factor	Dig.	Year
11990712551	23981425103	11	~2010
11993226071	23986452143	11	~2010
11994106261	71964637567	11	~2011
11994666119	23989332239	11	~2010
11994749321	95957994569	11	~2011
11994884339	23989768679	11	~2010
11995440269	95963522153	11	~2011
11995565591	23991131183	11	~2010
11995796531	23991593063	11	~2010
11996052599	23992105199	11	~2010
11996081521	71976489127	11	~2011
11996131177	71976787063	11	~2011
11998234991	23996469983	11	~2010
11999964023	23999928047	11	~2010
12000221483	24000442967	11	~2010
12000738203	24001476407	11	~2010
12000956237	72005737423	11	~2011
12001340159	24002680319	11	~2010
12002424373	72014546239	11	~2011
12002918831	24005837663	11	~2010
12003620099	24007240199	11	~2010
12003740849	168052371887	12	~2012
12003744359	24007488719	11	~2010
12004201679	24008403359	11	~2010
12004543703	24009087407	11	~2010

Exponent	Prime Factor	Dig.	Year
12004752059	24009504119	11	~2010
12005280011	24010560023	11	~2010
12005449523	24010899047	11	~2010
12005681711	24011363423	11	~2010
12005728583	24011457167	11	~2010
12005975623	120059756231	12	~2011
12006436979	24012873959	11	~2010
12006840551	24013681103	11	~2010
12006925751	24013851503	11	~2010
12008146679	24016293359	11	~2010
12008441051	24016882103	11	~2010
12008680417	72052082503	11	~2011
12009109319	24018218639	11	~2010
12009269159	24018538319	11	~2010
12009690733	72058144399	11	~2011
12010179959	24020359919	11	~2010
12010733543	24021467087	11	~2010
12011257619	24022515239	11	~2010
12011353433	168158948063	12	~2012
12012257639	24024515279	11	~2010
12012947363	24025894727	11	~2010
12013205207	288316924969	12	~2012
12013626721	72081760327	11	~2011
12014305577	96114444617	11	~2011
12014712043	1021...236551	14	2023

Exponent	Prime Factor	Dig.	Year
12016172053	192258752849	12	~2012
12016458431	24032916863	11	~2010
12016881923	24033763847	11	~2010
12017338979	24034677959	11	~2010
12017438471	216313892479	12	~2012
12018082679	24036165359	11	~2010
12018168359	24036336719	11	~2010
12019334303	24038668607	11	~2010
12019783733	72118702399	11	~2011
12019834583	24039669167	11	~2010
12020216051	24040432103	11	~2010
12020236463	24040472927	11	~2010
12020240279	24040480559	11	~2010
12021385769	96171086153	11	~2011
12021393253	192342292049	12	~2012
12021577619	24043155239	11	~2010
12022101431	24044202863	11	~2010
12022239277	72133435663	11	~2011
12022831703	24045663407	11	~2010
12023156759	24046313519	11	~2010
12023413163	24046826327	11	~2010
12023750237	72142501423	11	~2011
12023771041	72142626247	11	~2011
12023928179	24047856359	11	~2010
12024905771	24049811543	11	~2010

4.768.925 digits

25-05-04