pi/e={2041141/1100}^(1/52)
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From: Jon on 27 Jul 2010 13:35 pi/e={2041141/1100}^(1/52) Good to 9 decimal places. I knew it had to be a perfect fraction when the 27 started repeating. http://jons-math.bravehost.com/eandpi.html
From: Christopher Henrich on 27 Jul 2010 13:55 In article <pNWdnQEeb95XhdLRnZ2dnUVZ_oqdnZ2d(a)earthlink.com>, "Jon" <jon8338(a)peoplepc.com> wrote: > pi/e={2041141/1100}^(1/52) > > Good to 9 decimal places. > > I knew it had to be a perfect fraction when the 27 started repeating. > > http://jons-math.bravehost.com/eandpi.html At least 11 places, I would say. (e/pi){2041141/1100}^(1/52) -1 ia about 4.5E-12. -- Christopher J. Henrich chenrich(a)monmouth.com http://www.mathinteract.com "A bad analogy is like a leaky screwdriver." -- Boon
From: bert on 27 Jul 2010 15:52
On 27 July, 18:35, "Jon" <jon8...(a)peoplepc.com> wrote: > pi/e={2041141/1100}^(1/52) > > Good to 9 decimal places. > > I knew it had to be a perfect fraction when the 27 started repeating. But to almost the same precision, pi/e = (809927/900)^(1/47), so what can there be special about either of them? -- |