The Fourier series of a periodic function f(x) is given by1cos(nz) +6+sin(nz).6n=1The best approximation of f by a Fourier polynomial (or trigonometric polynomial) ofdegree 2 is1cos z + 2 sin x+11) F(z) =cos(2a) +36sin(2r).642) F(x)=cos(2r) +36sin(2a).6413) F(z) = 6+ cos z -1cos(2r)2 sin a +sin(2z).366414) F(x) = 6+ cos a + 2 sin z+1cos(2r) +36sin(2r).6415) F(r) = 6+sin r +cos(2r)- sin(2a).COs a3664

given fx=6+∑n=1∞16ncosnx+2n6sinnx to find best approximated of f by a fourier polynomial of degree…

The Fourier series of a periodic function f(x) is given by 6+ cos(nz) + sin(nz). 6" n-1 The best approximation of f by a Fourier polynomial (or trigonometric polynomial) of degree 2 is 1 1) F(x) = cos z + 2 sinx+ cos(22) + sin(2r). 64 36 2) F(z) = 36 cos(2z) + sin(2z). 64 1 3) F(z) = 6+ 1 2 sin z + 36 cos(2z) -sin(2z). 6COS 64 1 4) F(x)= 6+ cos z +2 sin z+ 1 cos(2z) + sin(2x).

The Fourier series of a periodic function f(x) is given by 6+ cos(nz) + sin(nz). 6" n-1 The best approximation of f by a Fourier polynomial (or trigonometric polynomial) of degree 2 is 1 1) F(x) = cos z + 2 sinx+ cos(22) + sin(2r). 64 36 2) F(z) = 36 cos(2z) + sin(2z). 64 1 3) F(z) = 6+ 1 2 sin z + 36 cos(2z) -sin(2z). 6COS 64 1 4) F(x)= 6+ cos z +2 sin z+ 1 cos(2z) + sin(2x).

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter6: The Trigonometric Functions

Section6.4: Values Of The Trigonometric Functions

Problem 22E

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Question

The Fourier series of a periodic function f(x) is given by
1
cos(nz) +
6+
sin(nz).
6
n=1
The best approximation of f by a Fourier polynomial (or trigonometric polynomial) of
degree 2 is
1
cos z + 2 sin x+
1
1) F(z) =
cos(2a) +
36
sin(2r).
64
2) F(x)=
cos(2r) +
36
sin(2a).
64
1
3) F(z) = 6+ cos z -
1
cos(2r)
2 sin a +
sin(2z).
36
64
1
4) F(x) = 6+ cos a + 2 sin z+
1
cos(2r) +
36
sin(2r).
64
1
5) F(r) = 6+
sin r +
cos(2r)
- sin(2a).
COs a
36
64

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