Post on 06-Nov-2019
CIRCUIT ANALYSIS IN LAPLACE DOMAIN
“S” DOMAIN ANALYSIS
The Laplace Transform
The Laplace Transform of a function, f(t), is defined as;
0
)()()]([ dtetfsFtfLst
The Inverse Laplace Transform is defined by
j
j
tsdsesF
jtfsFL
)(2
1)()]([1
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The Laplace Transform
An important point to remember:
)()( sFtf
• The above is a statement that f(t) and F(s) are transform
pairs.
• What this means is that for each f(t) there is a unique F(s)
and for each F(s) there is a unique f(t).
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The Laplace Transform
Laplace Transform of the unit step.
|0
0
11)]([
stste
sdtetuL
stuL
1)]([
The Laplace Transform of a unit step is:s
1
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The Laplace Transform
Time Differentiation: Making the previous substitutions gives,
0
00
)()0(0
)()( |
dtetfsf
dtsetfetfdt
dfL
st
stst
So we have shown:
)0()()(
fssFdt
tdfL
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The Laplace Transform
If the function f(t) and its first derivative are Laplace transformable
and f(t) has the Laplace transform F(s),
and the exists, thens
)()(lim)(lim ftfssF0s t
Again, the utility of this theorem lies in not having to take the inverse
of F(s) in order to find out the final value of f(t) in the time domain.
This is particularly useful in circuits and systems.
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Final Value Theorem:
sF(s)lim
Circuit Element Modeling in “S” Domain
i(t) I(s)
+_ +
_v(t) V(s)
1.0 Energy Sources
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2.0 Resistance
Time Domain
Complex Frequency Domain
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3.0 Inductor
di(t)
v t =LL dt
L [VL(t)] = VL(S)
Mesh-Current Model
Nodal-Analysis Model
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4.0 Capacitor
1( ) ( ) (0)
0
tv t i t dt vc cC
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CIRCUIT ANALYSIS IN THE “S” DOMAIN
Summary
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Example
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• Find vo(t) in the circuit, assuming zero initial conditions
Solution
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Find Vo(t) assuming Vc(0) = 5 V
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The Transfer function
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The transfer function is a key concept in signal processing
because it indicates how a signal is processed as it passes
through a network.
It is a fitting tool for finding the network response, determining (or
designing for) network stability, and network synthesis.
The transfer function of a network describes how the output
behaves in respect to the input.
It specifies the transfer from the input to the output in the s
domain, assuming no initial energy.
The Transfer function
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• The transfer function is also known as the network function.
There are four possible transfer
functions:
Application
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• Determine the Transfer Function H(s) = Vo(s)/Io(s) of the circuit
Application
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find: (a) the transfer function H(s) = Vo/Vi ,
(b) the response when vi (t) =u(t) V
(b)
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SINUSOIDAL FREQUENCY ANALYSIS
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)cos(0 tB )(cos|)(|0 jHtjHB )(sH
Circuit represented by
network function
Application
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a) Calculate the transfer function Vo/Vi
b) if Vi = 2cost(400t) V, what is the steady state
expression of Vo
solution
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