Find the discrete Fourier approximation g_{2}(x) for f(x)f(x) based on the table information. x |-\frac{\pi}{2} | 0 | \frac{\pi}{2} | \pi f(x) | 0 | 1

Trent Carpenter

Trent Carpenter

Answered question

2021-06-07

Find the discrete Fourier approximation g2(x) for f(x) based on the table information.
x|π2|0|π2|π
f(x)|0|1|3|2

Answer & Explanation

Liyana Mansell

Liyana Mansell

Skilled2021-06-08Added 97 answers

Find coefficients
a0=14(f(π2)+f(0)+f(π2)+f(π))=14(0+132)=12
a1=12(f(π2)cos(π2)+f(0)cos(0)+f(π2)cos(π2)+f(π)cos(π))
=12(0cos(π2)+1cos(0)+3cos(π2)2cos(π))=32
b1=12(f(π2)sin(π2)+f(0)sin(0)+f(π2)sin(π2)+f(π)sin(π))
=12(0sin(π2)+1sin(0)+3sin(π2)2sin(π))=32
The Fourier approximation is
g1=12+32cos(x)+32sin(x)

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