Small Mersenne Prime Factors (page 4784/5070)

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
71239239971	142478479943	12	~2016
71239537763	142479075527	12	~2016
71239647179	142479294359	12	~2016
71240031671	142480063343	12	~2016
71246324837	427477949023	12	~2017
71247626903	142495253807	12	~2016
71249862539	142499725079	12	~2016
71262039371	142524078743	12	~2016
71262890141	427577340847	12	~2017
71265951817	427595710903	12	~2017
71266076471	142532152943	12	~2016
71266429847	570131438777	12	~2017
71266810597	427600863583	12	~2017
71268217259	142536434519	12	~2016
71274114083	142548228167	12	~2016
71274233003	142548466007	12	~2016
71278024463	142556048927	12	~2016
71284076351	142568152703	12	~2016
71284319591	3036...145767	14	2023
71285520731	142571041463	12	~2016
71285950199	142571900399	12	~2016
71287009537	427722057223	12	~2017
71291338403	142582676807	12	~2016
71292127463	142584254927	12	~2016
71297262119	142594524239	12	~2016

Exponent	Prime Factor	Dig.	Year
71303209751	142606419503	12	~2016
71306933017	427841598103	12	~2017
71310098291	142620196583	12	~2016
71312160131	142624320263	12	~2016
71318993519	142637987039	12	~2016
71321266811	142642533623	12	~2016
71328428573	427970571439	12	~2017
71330229959	142660459919	12	~2016
71331713597	427990281583	12	~2017
71335338719	142670677439	12	~2016
71335635557	428013813343	12	~2017
71340564007	713405640071	12	~2017
71341892339	142683784679	12	~2016
71342672563	713426725631	12	~2017
71351750663	142703501327	12	~2016
71353213097	428119278583	12	~2017
71353806983	142707613967	12	~2016
71358194879	142716389759	12	~2016
71367000359	570936002873	12	~2017
71373544019	142747088039	12	~2016
71376951623	142753903247	12	~2016
71378181131	142756362263	12	~2016
71380956611	142761913223	12	~2016
71381235259	3497...276911	14	2023
71384716043	142769432087	12	~2016

Exponent	Prime Factor	Dig.	Year
71387848379	142775696759	12	~2016
71388064109	571104512873	12	~2017
71390274731	142780549463	12	~2016
71390591873	428343551239	12	~2017
71392165121	428352990727	12	~2017
71396258831	142792517663	12	~2016
71400724079	142801448159	12	~2016
71401623851	142803247703	12	~2016
71404731323	142809462647	12	~2016
71411381399	571291051193	12	~2017
71411658337	428469950023	12	~2017
71413494371	142826988743	12	~2016
71417773019	142835546039	12	~2016
71419009619	142838019239	12	~2016
71420580551	142841161103	12	~2016
71422955111	142845910223	12	~2016
71424814739	142849629479	12	~2016
71428130219	142856260439	12	~2016
71428423919	142856847839	12	~2016
71436119939	142872239879	12	~2016
71436834193	428621005159	12	~2017
71439231179	142878462359	12	~2016
71439288491	142878576983	12	~2016
71442764279	142885528559	12	~2016
71444021123	142888042247	12	~2016

Exponent	Prime Factor	Dig.	Year
71444583803	142889167607	12	~2016
71450658527	571605268217	12	~2017
71451077471	5706...683407	15	2025
71458625957	428751755743	12	~2017
71459749043	142919498087	12	~2016
71461371203	142922742407	12	~2016
71461541699	142923083399	12	~2016
71463931691	142927863383	12	~2016
71471879711	142943759423	12	~2016
71477517347	571820138777	12	~2017
71480389997	571843119977	12	~2017
71481532763	142963065527	12	~2016
71482063799	142964127599	12	~2016
71483006537	428898039223	12	~2017
71489319299	142978638599	12	~2016
71491433003	142982866007	12	~2016
71493678533	428962071199	12	~2017
71499067163	142998134327	12	~2016
71499730331	142999460663	12	~2016
71501785931	143003571863	12	~2016
71503487339	143006974679	12	~2016
71513085283	715130852831	12	~2017
71515367303	143030734607	12	~2016
71520606623	143041213247	12	~2016
71520946043	143041892087	12	~2016

4.768.925 digits

25-05-04