19.18. Let a> 0, 2a h(y) = ely| and H(x) = %3D a+472x2 From the work in this and the previous chapter, we know that both of these functions are in A and that H = Filh]. Thus, by the fundamental theorem on invertibility, 2a h(y) = F,'H], %3D %3D a² + 4x²x? Use this fact in doing the following exercises. a. Find the following transforms: 1. i. ii. F1 4-x 42x2 iii. Fi (Hint: Multiply the numerator and denominator by 4x² .)

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
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19.18. Let a > 0,
2a
h(y) = elyl
H(x) =
and
%3D
%3D
a-+ 472r2
From the work in this and the previous chapter, we know that both of these functions are in
A and that H = Filh]. Thus, by the fundamental theorem on invertibility,
%3D
2a
h(y) = F,'\H]), = |
!!
%3D
a² + 4x2x?
Use this fact in doing the following exercises.
a. Find the following transforms:
1
i. Fi
ii. Fi
a+4x2
- 4x?x?
iii. F1
(Hint: Muluply the numerator and denominator by 4x.)
b. Evaluate the following integrals:
12x
dx
T+4,72,2
i.
ii.
9447 x
sin(27 x)
iii.
iv.
1+472x2
1+4x?x2
cos(27x)
1+472x2
v.
7.
Transcribed Image Text:19.18. Let a > 0, 2a h(y) = elyl H(x) = and %3D %3D a-+ 472r2 From the work in this and the previous chapter, we know that both of these functions are in A and that H = Filh]. Thus, by the fundamental theorem on invertibility, %3D 2a h(y) = F,'\H]), = | !! %3D a² + 4x2x? Use this fact in doing the following exercises. a. Find the following transforms: 1 i. Fi ii. Fi a+4x2 - 4x?x? iii. F1 (Hint: Muluply the numerator and denominator by 4x.) b. Evaluate the following integrals: 12x dx T+4,72,2 i. ii. 9447 x sin(27 x) iii. iv. 1+472x2 1+4x?x2 cos(27x) 1+472x2 v. 7.
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