Post on 05-Jan-2016
CIRCUITS and SYSTEMS – part II
Prof. dr hab. Stanisław Osowski
Electrical Engineering (B.Sc.) Projekt współfinansowany przez Unię Europejską w ramach Europejskiego Funduszu Społecznego. Publikacja dystrybuowana jest bezpłatnie
Lecture 9
Transient states in electrical circuits – differential equation
approach
3
Basic notionsSteady state – the sdtate in the circuit when the response of circuit is of the same shape as the excitation.
Transient state – the response of the circuit following the commutation in the circuit. In this state the response is of different character than the excitation. Transient response is the superposition of steady state and natural response.
Natural response - response of circuit deprived of external excitation, following the nonzero initial conditions)
Commutation – arbitrary change in the circuit.0t - the time point prior to commutation (left side limit)
0t - the time point directly after commutation (right side limit)
4
Commutation laws
Commutation law for capacitors
Determination of initial conditions: Calculate the steady state response of circuit before commutation Write the response in time form Calculate the currents of inductors and voltages of capacitors at the
time t0 of commutation
Commutation law for inductors
)0()0( )0()0( CCi
ii
i uuorqq
)0()0( )0()0( LLi
ii
i iior
5
Example
Determine the initial conditions in the circuit. Assume: L=1H, C=0,5F, R=1, AttiVtte oo )45sin(2)( ,)45sin(210)(
Solution:
Complex represenation of elements:
2/ ,1 Z,1 ,2
2 ,10 L
4545 jCjZjLjeIeE Cjj oo
6
Initial conditions
Circuit equations in steady state
Initial conditions
)135sin(4)( ),31,11sin(221,7)(
solution form Time
2
4 ,21,7 , 13531,11
oC
oL
ojCC
oj
LLLLL
ttutti
eIZUeZR
RIEIIIRIZE
22)0( ,2)0( CL ui
7
State space decription of the circuitThe general differential form description of the linear circuit
)(...
..................
)(...
)(...
2211
222221212
112121111
tfxaxaxadt
dx
tfxaxaxadt
dx
tfxaxaxadtdx
nnnnnnn
nn
nn
The variables x of the minimal quantity form the state variables.
8
Matrix form of state description
The normal state description
)()()(
ttdt
tdBuAx
x
A, B – state matrices
Response matrix equation y(t)
)()()( ttt DuCxy
C, D – output matrices.
9
Example
Determine the state description of the circuit in normal form
From Kirchhof laws and definition of elements
CLLCC iiiuuRie ,dt
duCi
dtdi
Lu CC
LL ,
iidt
duCu
dtdi
LiiRe LC
CL
L ,)(
we get
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Example (cont.)Matrix form of state equations
State vector x and excitation vector u
Assuming: R=2, L=1H, C=1F we get
i
e
C
LR
Lu
i
C
LLR
dtdudtdi
C
L
C
L
10
1
01
1
i
e
u
i
C
L ux ,
10
21 ,
01
12
BA
11
Solution of transient state using classical method
In the first step we transform the system of n first order state space equations into one nth order differential equation of one variable x.
The solution of it is composed of two components: the steady state xu and natural response xp. The steady state corresponds to the external excitation and natural response to nonzero initial conditions only.
)(... 012
2
21
1
1 tfxadtdx
adt
xda
dtxd
adt
xda n
n
nn
n
nn
n
n
12
Natural responseThe natural response corresponds to the solution of the homogenous differential equation (zero excitation)
Characteristic equation
The roots of this equation si (i=1, 2, ..., n) are the poles of the system.
0... 012
2
21
1
1
pp
np
n
nnp
n
nnp
n
n xadt
dxa
dt
xda
dt
xda
dt
xda
0... 012
21
1
asasasasa n
nn
nn
n
13
Final solutionThe general solution of the homogenous differential equation of nth order is in the form
Ai – constants of integration calculated on the basis of initial conditions (solution of system of linear equations).
The final solution of the nonhomogenous differential equation is the sum of steady state and natural response solutions
This method is called the classical method of solution of the differential equations. It is very easy in application to the first order differential equations only.
tisn
iip eAtx
1
)(
)()()( txtxtx pu
14
Consider the transient response in RL circuit at DC excitation.
The steady state current in the circuit
RE
tiLu )(
Transient in RL circuit at DC excitation
15
Solution of transient stateThe homogenous differential equation
Characteristic equation
0 LpLp Ri
dt
diL
0 RLs
RL
t
Lp eAiL
Rs /
11 ,
General form of solution of natural response
The final (general) form of transient
RL
t
LpLuL eARE
tititi /1)()()(
16
Solution of transient state (cont.)
Commutation law 10)0()0( ARE
ii LL
Hence REA /1
Current of inductor
RL
t
L eRE
ti /1)(
The current in RL circuit at different time constants
RL Time constant
of RL circuit
17
Voltage of inductor
Transient voltage of the inductor
RL
tL
L Eedt
tdiLtu /)(
)(
The voltage of the inductor in RL circuit at different time constants
18
Transient in RC circuit at DC excitation
Consider the transient response in RC circuit at DC excitation
The voltage of capacitor in steady state
EtuCu )(
19
Solution of transient state
After eliminating the source we get the homogenous equation
0 CpCp u
dt
duRC
Characteristic equation
General solution of natural response
Final general form of solution of transient
01RCs
RC
tts
Cp eAeAuRCs
11
11 ),/(1
RC
t
CpCuC eAEtututu
1)()()(
20
Solution of transient state (cont.)
Commutation law
Hence
Final solution
10)0()0( AEuu CC
EA 1
RC
t
C eEtu 1)(
Graphical presentation of capacitor voltage at different time constants
RCTime constant
of RC circuit
21
Current of the capacitor
Current of capacitor in transient form
RC
tc
C eRE
dttdu
Cti
)()(
Graphical presentation of capacitor current at different time constants