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APM346-2012
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APM346 Math
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Term Test 2
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TT2--Problem 4
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Topic: TT2--Problem 4 (Read 7941 times)
Victor Ivrii
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TT2--Problem 4
«
on:
November 15, 2012, 08:23:51 PM »
Find Fourier transform of the function
\begin{equation*}
f(x)= \left\{\begin{aligned}
&1-|x| &&|x|<1\\
&0 &&|x|>1.
\end{aligned}\right.
\end{equation*}
and write this function $f(x)$ as a Fourier integral.
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Ian Kivlichan
Sr. Member
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Karma: 17
Re: TT2--Problem 4
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Reply #1 on:
November 15, 2012, 11:46:03 PM »
Hopeful solution attached!
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Victor Ivrii
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Re: TT2--Problem 4
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Reply #2 on:
November 16, 2012, 07:02:54 AM »
Actually since $f$ is an even function so is $\hat{f}$ and $f(x)$ could be written as $\cos$-Fourier integral.
BTW plugging $x=0$ we can calculate $\int_0^\infty \frac{1-\cos(\omega)}{\omega^2}\,d\omega$.
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Toronto Math Forum
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APM346-2012
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APM346 Math
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Term Test 2
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TT2--Problem 4