126 Chapter 1 Fourier Series and Integrals
e.odd periodic extension;
f.the one corresponding tof(x)=x,−a<x<0.
8.Perform the same task as in Exercise 7, butf(x)=0, 0<x<a.
9.Find the Fourier series of the function given byf(x)={ 0 , −a<x<0,
2 x, 0 <x<a.Sketch the graph off(x)and its periodic extension. To what values does
the series converge atx=−a,x=−a/2,x=0,x=a,andx= 2 a?
10.Sketch the odd periodic extension and find the Fourier sine series of the
function given byf(x)={
1 , 0 <x<π 2 ,
1
2 ,π
2 <x<π.
To what values does the series converge atx=0,x=π/2,x=π,x=
3 π/2, andx= 2 π?
11.Sketch the even periodic extension of the function given in Exercise 10.
Find its Fourier cosine series. To what values does the series converge at
x=0,x=π/2,x=π,x= 3 π/2, andx= 2 π?
12.Find the Fourier cosine series of the functiong(x)={ 1 −x, 0 <x<1,
0 , 1 <x<2.Sketch the graph of the sum of the cosine series.
13.Find the Fourier sine series of the function defined byf(x)= 1 − 2 x,
0 <x<1. Sketch the graph of the odd periodic extension off(x),and
determine the sum of the sine series at points where the graph has a
jump.
14.Following the same requirements as in Exercise 13, use the cosine series
and the even periodic extension.
15.Find the Fourier series of the function given byf(x)=
0 , −π<x<−π 2 ,
sin( 2 x), −π 2 <x<π 2 ,
0 , π 2 <x<π.Sketch the graph of the function.