Problem 1 2. [The Matrix Exponential, Laplace Transforms and Solution to Linear Systems] In this question, we use the matrix exponential function defined by eAt = I + At+ The Laplace Transform defined by A²+² A³43 + 2! 3! F'(s) = L{f(t)} = f* f(t)e¯st dt. (a) Using the fact that the solution to the linear state equations à = Ax; x (to) = xo is x(t) = show that eª(t+¹) = eAteªr and (eªt) -¹ = e-At (b) Using the formula eAt = L-¹(sI - A)−¹ [] 1 system corresponding to an initial condition (0) =x0= calculate et for the linear system i = Ax with A = -3 -2 0 eA(t-to) xo, Also, calculate the solution to the linear

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Problem 1
2. [The Matrix Exponential, Laplace Transforms and Solution to Linear Systems] In this question, we
use the matrix exponential function defined by
The Laplace Transform defined by
eAt = I + At +
A²t² A³+3
+
2!
3!
F(s) = L{f(t)}
(a) Using the fact that the solution to the linear state equations = Ax; x (to) = xo is x(t) = e(t-to) xo,
show that e^(t+¹) = eªteª¹ and (eªt)−¹ = e-At
(b) Using the formula
calculate et for the linear system = Ax with A =
=
[ f(t)e-stdt.
eAt = L-¹ (sI - A)−¹
-3 -2
1
0
[B]
system corresponding to an initial condition x(0) = xo =
Also, calculate the solution to the linear
Transcribed Image Text:Problem 1 2. [The Matrix Exponential, Laplace Transforms and Solution to Linear Systems] In this question, we use the matrix exponential function defined by The Laplace Transform defined by eAt = I + At + A²t² A³+3 + 2! 3! F(s) = L{f(t)} (a) Using the fact that the solution to the linear state equations = Ax; x (to) = xo is x(t) = e(t-to) xo, show that e^(t+¹) = eªteª¹ and (eªt)−¹ = e-At (b) Using the formula calculate et for the linear system = Ax with A = = [ f(t)e-stdt. eAt = L-¹ (sI - A)−¹ -3 -2 1 0 [B] system corresponding to an initial condition x(0) = xo = Also, calculate the solution to the linear
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