Small Mersenne Prime Factors (page 4803/5235)

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
41814815831	83629631663	11	~2014
41816482451	83632964903	11	~2014
41816758331	83633516663	11	~2014
41821261903	418212619031	12	~2016
41821678091	83643356183	11	~2014
41823009251	83646018503	11	~2014
41825252411	83650504823	11	~2014
41825866661	250955199967	12	~2015
41826810023	83653620047	11	~2014
41826998123	83653996247	11	~2014
41827040639	83654081279	11	~2014
41827619903	83655239807	11	~2014
41829567077	250977402463	12	~2015
41831752517	250990515103	12	~2015
41832455663	83664911327	11	~2014
41832743021	250996458127	12	~2015
41834190371	83668380743	11	~2014
41834294521	669348712337	12	~2016
41836244531	83672489063	11	~2014
41838018037	251028108223	12	~2015
41838715517	251032293103	12	~2015
41840403743	83680807487	11	~2014
41842082173	251052493039	12	~2015
41843178961	251059073767	12	~2015
41846064947	334768519577	12	~2015

Exponent	Prime Factor	Dig.	Year
41849235143	83698470287	11	~2014
41852335541	334818684329	12	~2015
41856933263	83713866527	11	~2014
41857149121	251142894727	12	~2015
41857440671	83714881343	11	~2014
41861746811	334893974489	12	~2015
41864045231	83728090463	11	~2014
41864424127	418644241271	12	~2016
41865038051	83730076103	11	~2014
41866780919	83733561839	11	~2014
41868018683	83736037367	11	~2014
41869057847	334952462777	12	~2015
41871616799	83743233599	11	~2014
41871659779	2587...743423	14	2023
41871865811	83743731623	11	~2014
41872635263	83745270527	11	~2014
41872830383	83745660767	11	~2014
41872882693	669966123089	12	~2016
41872917419	83745834839	11	~2014
41877345701	251264074207	12	~2015
41885099339	83770198679	11	~2014
41886433811	83772867623	11	~2014
41889184391	83778368783	11	~2014
41890548863	83781097727	11	~2014
41892372491	83784744983	11	~2014

Exponent	Prime Factor	Dig.	Year
41892819457	6937...020793	14	2024
41893172171	5306...717887	15	2023
41894732003	83789464007	11	~2014
41897962643	83795925287	11	~2014
41899371119	83798742239	11	~2014
41901842377	251411054263	12	~2015
41904276391	419042763911	12	~2016
41905549583	83811099167	11	~2014
41906052239	83812104479	11	~2014
41907728957	335261831657	12	~2015
41908981151	83817962303	11	~2014
41910393263	83820786527	11	~2014
41912408519	335299268153	12	~2015
41914300433	251485802599	12	~2015
41915617091	335324936729	12	~2015
41916754493	586834562903	12	~2016
41918740931	83837481863	11	~2014
41919466079	83838932159	11	~2014
41919512231	335356097849	12	~2015
41920083193	670721331089	12	~2016
41923410937	251540465623	12	~2015
41926235951	83852471903	11	~2014
41927768579	83855537159	11	~2014
41928782123	2121...754239	14	2023
41929318241	251575909447	12	~2015

Exponent	Prime Factor	Dig.	Year
41930607503	83861215007	11	~2014
41932475803	419324758031	12	~2016
41934297131	83868594263	11	~2014
41934453971	83868907943	11	~2014
41934756551	83869513103	11	~2014
41935417571	83870835143	11	~2014
41937873599	83875747199	11	~2014
41938027919	83876055839	11	~2014
41939908079	83879816159	11	~2014
41939988539	83879977079	11	~2014
41940039863	83880079727	11	~2014
41940567563	83881135127	11	~2014
41940770429	335526163433	12	~2015
41941048403	83882096807	11	~2014
41944290539	83888581079	11	~2014
41944295843	83888591687	11	~2014
41946359111	83892718223	11	~2014
41949429383	83898858767	11	~2014
41949600263	83899200527	11	~2014
41950156151	83900312303	11	~2014
41952553319	83905106639	11	~2014
41952751739	335622013913	12	~2015
41953996237	251723977423	12	~2015
41955046537	251730279223	12	~2015
41955703961	335645631689	12	~2015

4.933.056 digits

25-07-20