s2 + 11s + 20 1-J = (1)h (q) (s² + 4s + 8)(s + 1)² J* %3D

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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Can you help me with question 3b?

II
WSJ What You Ne X
QZ Microsoft is
QF-200 Grou X
About iD Tec X
QF200-A: Fin. X
H (62) 2021 Sui X
OFile C:/Users/rbese/Downloads/ma221-20F-Hw08-PROB.pdf
2. Determine the inverse Laplace transforms.
1-J = (1)f (
-3s + 4
1-J = (1)6 (q)
6 + zs
-3s + 4
1-J = (1)4 (ɔ)
|s² + 4s + 20
3. Determine the inverse Laplace transforms.
3s2 + 8s + 9
1-J = (1)f (B)
(s + 2)3
%3D
s2 + 11s + 20
1-J = (1)h (q)
(s² + 4s + 8)(s + 1)²
Transcribed Image Text:II WSJ What You Ne X QZ Microsoft is QF-200 Grou X About iD Tec X QF200-A: Fin. X H (62) 2021 Sui X OFile C:/Users/rbese/Downloads/ma221-20F-Hw08-PROB.pdf 2. Determine the inverse Laplace transforms. 1-J = (1)f ( -3s + 4 1-J = (1)6 (q) 6 + zs -3s + 4 1-J = (1)4 (ɔ) |s² + 4s + 20 3. Determine the inverse Laplace transforms. 3s2 + 8s + 9 1-J = (1)f (B) (s + 2)3 %3D s2 + 11s + 20 1-J = (1)h (q) (s² + 4s + 8)(s + 1)²
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