Small Mersenne Prime Factors (page 4438/5025)

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
19822855513	475748532313	12	~2014
19822945501	118937673007	12	~2013
19823388239	39646776479	11	~2011
19824120619	356834171143	12	~2014
19824593291	39649186583	11	~2011
19825622423	39651244847	11	~2011
19825626923	39651253847	11	~2011
19825780823	39651561647	11	~2011
19825957267	317215316273	12	~2014
19826384159	39652768319	11	~2011
19826800237	118960801423	12	~2013
19827856991	39655713983	11	~2011
19829105111	39658210223	11	~2011
19830838199	158646705593	12	~2013
19831854239	39663708479	11	~2011
19832252641	317316042257	12	~2014
19832428043	39664856087	11	~2011
19832663639	39665327279	11	~2011
19832805437	118996832623	12	~2013
19833582347	158668658777	12	~2013
19833796403	39667592807	11	~2011
19836255311	39672510623	11	~2011
19837520851	198375208511	12	~2013
19840784921	119044709527	12	~2013
19841173063	198411730631	12	~2013

Exponent	Prime Factor	Dig.	Year
19841297291	39682594583	11	~2011
19842378683	39684757367	11	~2011
19843897043	39687794087	11	~2011
19844009411	39688018823	11	~2011
19845056941	119070341647	12	~2013
19846638191	39693276383	11	~2011
19847341103	39694682207	11	~2011
19847789411	39695578823	11	~2011
19848024803	39696049607	11	~2011
19848207629	277874906807	12	~2014
19848310259	39696620519	11	~2011
19848336127	2223...462241	14	2023
19848359039	39696718079	11	~2011
19849542659	39699085319	11	~2011
19849598339	39699196679	11	~2011
19849687687	357294378367	12	~2014
19850505431	39701010863	11	~2011
19850537617	317608601873	12	~2014
19851051217	317616819473	12	~2014
19851366461	119108198767	12	~2013
19852385411	39704770823	11	~2011
19853100719	39706201439	11	~2011
19855290929	158842327433	12	~2013
19855633643	39711267287	11	~2011
19855979939	39711959879	11	~2011

Exponent	Prime Factor	Dig.	Year
19856000063	39712000127	11	~2011
19856393113	119138358679	12	~2013
19857315557	158858524457	12	~2013
19857606239	158860849913	12	~2013
19859513363	39719026727	11	~2011
19859975771	39719951543	11	~2011
19860448589	158883588713	12	~2013
19861708613	278063920583	12	~2014
19862940563	39725881127	11	~2011
19863920831	39727841663	11	~2011
19864374311	39728748623	11	~2011
19866578783	39733157567	11	~2011
19867553731	198675537311	12	~2013
19868249123	39736498247	11	~2011
19868946371	39737892743	11	~2011
19869398189	158955185513	12	~2013
19869494377	119216966263	12	~2013
19870376641	119222259847	12	~2013
19872540911	39745081823	11	~2011
19873771763	39747543527	11	~2011
19874682791	39749365583	11	~2011
19875371051	39750742103	11	~2011
19875626413	119253758479	12	~2013
19876124363	39752248727	11	~2011
19876397797	119258386783	12	~2013

Exponent	Prime Factor	Dig.	Year
19876964483	39753928967	11	~2011
19878026183	39756052367	11	~2011
19878406003	318054496049	12	~2014
19879520627	159036165017	12	~2013
19879688951	159037511609	12	~2013
19879738537	2381...767327	14	2023
19880247311	39760494623	11	~2011
19881295163	39762590327	11	~2011
19882999751	39765999503	11	~2011
19883044823	39766089647	11	~2011
19883197241	119299183447	12	~2013
19883316839	159066534713	12	~2013
19884555233	119307331399	12	~2013
19884911471	39769822943	11	~2011
19885456807	198854568071	12	~2013
19886596013	636371072417	12	~2014
19886604443	39773208887	11	~2011
19887604993	119325629959	12	~2013
19887632113	119325792679	12	~2013
19887770471	39775540943	11	~2011
19889202731	39778405463	11	~2011
19889907083	39779814167	11	~2011
19890273083	39780546167	11	~2011
19890775453	119344652719	12	~2013
19891048981	119346293887	12	~2013

4.724.182 digits

25-04-13