x for -n Sx< 27 6. f(x) = for x<-n and for x> 2n

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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468
CHAPTER 14 The Fourier Integral and TransfornS
sin(x) for-4<x<0
4. f(x)= {cos(x) for 0 <x<4
[1/2 for-5<x<1
8. f(x) = {1
for 1<x<5
for |xi> 4
for |x> 5
* for -100 <r<100
0 for Jx) > 100
9. f(x) = eM
10. f(x)=xe
11. Show that the Fourier integral of s(x)
5. S(x)=
(1x| for -x S< 27
for x<-n and for x> 27
6. f(x) =
lim
f(t)
x-1)s
t-x
sin(x) for -3r <x<A
7. f(x)=
for x<-37 and for x>A
Transcribed Image Text:468 CHAPTER 14 The Fourier Integral and TransfornS sin(x) for-4<x<0 4. f(x)= {cos(x) for 0 <x<4 [1/2 for-5<x<1 8. f(x) = {1 for 1<x<5 for |xi> 4 for |x> 5 * for -100 <r<100 0 for Jx) > 100 9. f(x) = eM 10. f(x)=xe 11. Show that the Fourier integral of s(x) 5. S(x)= (1x| for -x S< 27 for x<-n and for x> 27 6. f(x) = lim f(t) x-1)s t-x sin(x) for -3r <x<A 7. f(x)= for x<-37 and for x>A
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