Please used attached laplace table and indicate which f(t) and F(s)=L[f] being used from attached table thank you Consider the initial value problem,0 if t< 2y'2 if t> 2with y(0) = 0.Use the Laplace Transform method to solve the initial value problem,Write the solution you found as a function defined piecewise and sketch a graph of the solution LAPLACE TRANSFORMSTransform of basic functionsf(t)L[ f(t) ]111eat8 - acos(at)s2 + a?asin(at)82 + a?cosh(at)82a2asinh(at)s2 – a?n!tngn+1e-csuc(t)8(t)18(t –c)e-csUc(t) f (t – c)e-c® F(s)where F = L[F]ect f(t)F(s – c)where F = L[f](f * g)(t)L[ f] L[g]Convolution(f * g)(t) =f(т) 9(t — т) dтTransform of derivativesL[y'(t)] = sL[y] – y(0)L[y"(t)] = s² L[y] – sy(0) – y'(0)L[y(")(t)] = s" L[y] – s(n-1)y(0) – s(n-2)y'(0) – y(n-1)(0)... -

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Consider the initial value problem, 0 if t<2 y' 2 if t> 2 with y(0) = 0. Use the Laplace Transform method to solve the initial value problem, Write the solution you found as a function defined piecewise and sketch a graph of the solut

Consider the initial value problem, 0 if t<2 y' 2 if t> 2 with y(0) = 0. Use the Laplace Transform method to solve the initial value problem, Write the solution you found as a function defined piecewise and sketch a graph of the solut

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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Question

Please used attached laplace table and indicate which f(t) and F(s)=L[f] being used from attached table thank you

Consider the initial value problem,
0 if t< 2
y'
2 if t> 2
with y(0) = 0.
Use the Laplace Transform method to solve the initial value problem,
Write the solution you found as a function defined piecewise and sketch a graph of the solution

LAPLACE TRANSFORMS
Transform of basic functions
f(t)
L[ f(t) ]
1
1
1
eat
8 - a
cos(at)
s2 + a?
a
sin(at)
82 + a?
cosh(at)
82
a2
a
sinh(at)
s2 – a?
n!
tn
gn+1
e-cs
uc(t)
8(t)
1
8(t –c)
e-cs
Uc(t) f (t – c)
e-c® F(s)
where F = L[F]
ect f(t)
F(s – c)
where F = L[f]
(f * g)(t)
L[ f] L[g]
Convolution
(f * g)(t) =
f(т) 9(t — т) dт
Transform of derivatives
L[y'(t)] = sL[y] – y(0)
L[y"(t)] = s² L[y] – sy(0) – y'(0)
L[y(")(t)] = s" L[y] – s(n-1)y(0) – s(n-2)y'(0) – y(n-1)(0)
... -

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