Small Mersenne Prime Factors (page 4423/5340)

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
8255952359	16511904719	11	~2008
8256117791	16512235583	11	~2008
8256248111	16512496223	11	~2008
8256330611	16512661223	11	~2008
8256542471	16513084943	11	~2008
8256666839	16513333679	11	~2008
8256721463	16513442927	11	~2008
8256924419	16513848839	11	~2008
8256988997	49541933983	11	~2010
8257248119	16514496239	11	~2008
8257311389	66058491113	11	~2010
8257406771	16514813543	11	~2008
8257456523	16514913047	11	~2008
8257465823	16514931647	11	~2008
8257475879	16514951759	11	~2008
8257506899	16515013799	11	~2008
8257586819	16515173639	11	~2008
8257640999	16515281999	11	~2008
8257789283	16515578567	11	~2008
8258659751	16517319503	11	~2008
8259769643	16519539287	11	~2008
8260205453	49561232719	11	~2010
8260359643	82603596431	11	~2010
8260463411	16520926823	11	~2008
8260804859	16521609719	11	~2008

Exponent	Prime Factor	Dig.	Year
8260889363	16521778727	11	~2008
8260900643	16521801287	11	~2008
8261105543	16522211087	11	~2008
8261487791	346982487223	12	~2012
8262034673	198288832153	12	~2011
8262262583	16524525167	11	~2008
8263233899	66105871193	11	~2010
8263319891	16526639783	11	~2008
8263565339	16527130679	11	~2008
8264728523	16529457047	11	~2008
8264834197	49589005183	11	~2010
8264968091	16529936183	11	~2008
8265548653	49593291919	11	~2010
8265614243	16531228487	11	~2008
8266052891	16532105783	11	~2008
8267204843	16534409687	11	~2008
8267237651	16534475303	11	~2008
8267360939	66138887513	11	~2010
8267967443	16535934887	11	~2008
8268205763	16536411527	11	~2008
8268375853	49610255119	11	~2010
8268492101	66147936809	11	~2010
8268504653	49611027919	11	~2010
8268752201	49612513207	11	~2010
8268792317	49612753903	11	~2010

Exponent	Prime Factor	Dig.	Year
8269276751	16538553503	11	~2008
8269300597	132308809553	12	~2011
8269362539	16538725079	11	~2008
8269479899	16538959799	11	~2008
8269646531	16539293063	11	~2008
8269793783	16539587567	11	~2008
8269914203	16539828407	11	~2008
8269997819	16539995639	11	~2008
8270227811	16540455623	11	~2008
8271557363	16543114727	11	~2008
8271918593	264701394977	12	~2011
8272181711	66177453689	11	~2010
8272317331	82723173311	11	~2010
8272328819	16544657639	11	~2008
8272373953	49634243719	11	~2010
8272732043	16545464087	11	~2008
8272765087	82727650871	11	~2010
8273769877	49642619263	11	~2010
8273796059	66190368473	11	~2010
8273989271	744659034391	12	~2013
8275111583	16550223167	11	~2008
8275152299	16550304599	11	~2008
8275436461	49652618767	11	~2010
8275804451	16551608903	11	~2008
8276107681	49656646087	11	~2010

Exponent	Prime Factor	Dig.	Year
8276326763	16552653527	11	~2008
8276432051	16552864103	11	~2008
8277214937	49663289623	11	~2010
8277777773	49666666639	11	~2010
8278040483	16556080967	11	~2008
8278141423	281456808383	12	~2011
8278195463	16556390927	11	~2008
8278270991	16556541983	11	~2008
8278276703	16556553407	11	~2008
8278365731	16556731463	11	~2008
8280033473	49680200839	11	~2010
8280037691	16560075383	11	~2008
8280069491	16560138983	11	~2008
8280302759	16560605519	11	~2008
8280378611	16560757223	11	~2008
8280459923	16560919847	11	~2008
8280465337	49682792023	11	~2010
8280685823	16561371647	11	~2008
8280705731	16561411463	11	~2008
8280753419	149053561543	12	~2011
8281364999	16562729999	11	~2008
8281659041	49689954247	11	~2010
8281887899	16563775799	11	~2008
8282014523	16564029047	11	~2008
8282254919	16564509839	11	~2008

5.037.460 digits

25-09-07