TI-M: Re: Integral of x^x
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TI-M: Re: Integral of x^x
integral of a power number mostly x^n, would become x^(n+1)/n, Yes? So the
integral of x^x is x^x .
Sinse the first part becomes x^(x+1) and x/x is the same as x^(1-1) So
x^(x+1-1) becomes x^x. Yes? So I don't really understand the question? It
can also be written e^(x ln x). The integral of e^n is e^n.
----- Original Message -----
From: "Christoph Bergemann" <mathwizard@gmx.de>
To: <ti-math@lists.ticalc.org>
Sent: Sunday, May 28, 2000 1:12 AM
Subject: TI-M: Integral of x^x
>
> A friend of mine came to the problem of integrating f(x)=x^x and we both
> didnīt know how to solve it. I wonder if one of you can do that and tell
me
> the answer and the way he got it.
> Thanx.
>
> --
> Sent through GMX FreeMail - http://www.gmx.net
>
>
>
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