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Title: f(x) = 1/(1+e^x) Post by william wu on Oct 24th, 2004, 12:06am Given f(x) = 1/(1+ex), find f(100)(0). [ The f(n) notation denotes repeated application of the function. So f(2)(x) = f(f(x)). ] Edit: corrected a typo |
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Title: Re: f(x) = 1/(1+e^x) Post by Barukh on Oct 24th, 2004, 12:49am Isn't it just [hide]the solution of the equation x = 1/(1+e^x)[/hide]? :-/ |
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Title: Re: f(x) = 1/(1+e^x) Post by william wu on Oct 24th, 2004, 10:26am Sorry, I had a typo: it should read f(100)(0). I should warn beforehand that I haven't been able to solve this myself; hopefully the problem is legit. |
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Title: Re: f(x) = 1/(1+e^x) Post by Grimbal on Oct 24th, 2004, 3:26pm It still tends quite fast to the solution of x=1/(1+e^x). It is not there yet, but close enough. |
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Title: Re: f(x) = 1/(1+e^x) Post by Icarus on Oct 24th, 2004, 3:26pm According to Excel, it is 0.401058138.... Repeated application converges to this value fairly fast. As Barukh indicates, this is the solution to x = 1/(1+ex). I would imagine it is highly unlikely that f(100)(0) is exactly the value of x solving the equation. It is very close, however. Whether or not there is "nice" expression for the number is another matter. |
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