ee 0308 power system analysis - srm university special attention is required while obtaining the...
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EE 0308 POWER SYSTEM ANALYSIS
CHAPTER 4
SEQUENCE NETWORKS AND UNSYMMETRICAL FAULTS ANALYSIS
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SEQUENCE NETWORKS AND UNSYMMETRICAL FAULTS ANALYSIS
1 SYMMETRICAL COMPONENTS AND SEQUENCE NETWORKS
2 UNSYMMETRICAL FAULTS AT THE GENERATOR TERMINALS
3 UNSYMMETRICAL FAULTS ON POWER SYSTEMS
4 CONSTRUCTION OF BUS IMPEDANCE MATRICES OF SEQUENCE
NETWORK
5 UNSYMMETRICAL FAULTS ANALYSIS
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1 SYMMETRICAL COMPONENTS AND SEQUENCE NETWORKS
When a symmetrical three phase fault occurs in a three phase system, the
power system remains in the balanced condition. Hence single phase
representation can be used to solve symmetrical three phase fault analysis.
But various types of unsymmetrical faults can occur on power systems. In
such cases, unbalanced currents flow in the system and this in turn makes
the bus voltages unbalanced. Now the power system is in unbalanced
condition and single phase representation can not be used.
Three phase unbalanced currents and voltages can be conveniently
handled by Symmetrical Components. Therefore unsymmetrical faults are
analyzed using symmetrical components. Some of the important aspects of
symmetrical components are presented in brief.
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bI
aI
cI
(1)
bI
(1)
aI
(2)
cI
(2)
bI (0)
cI
(0)
bI
(0)
aI
Sequence voltages and currents
According to symmetrical components method, a three phase unbalanced
system of voltages or currents may be represented by three separate system
of balanced voltages or currents known as zero sequence, positive sequence
and negative sequence as shown in Fig. 1
(1)
cI
= + +
Fig. 1
(2)
aI
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Defining operator ‘ a ‘ as
a = 01201 (1)
it is to be noted that
13601a;2401a0302 (2)
Also a = - 0.5 + j 0.866 ; 0.866j0.5a2 (3)
Hence 0aa12 (4)
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bI
cI
(1)
bI
(1)
aI
(2)
cI
(2)
bI (0)
cI
(0)
bI
(0)
aI
aI
(1)
cI
= + +
Further referring Fig. 1
(1)
a
2(1)
b IaI
(1)
a
(1)
c IaI
(2)
a
(2)
b IaI
(2)
a
2(2)
c IaI
Therefore (2)
a
(1)
a
(0)
aa IIII
(2)
a
(1)
a
2(0)
a
(2)
b
(1)
b
(0)
bb IaIaIIIII
(2)
a
2(1)
a
(0)
a
(2)
c
(1)
c
(0)
cc IaIaIIIII
Thus (2)
a
(1)
a
(0)
aa IIII (2)
a
(1)
a
2(0)
ab IaIaII (6) (2)
a
2(1)
a
(0)
ac IaIaII
(5)
(2)
aI
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i.e.
c
b
a
I
I
I
=
2
2
aa1
aa1
111
(2)
a
(1)
a
(0)
a
I
I
I
i.e. 2,1,0c,b,a IAI (7)
The inverse form of the above is
(2)
a
(1)
a
(0)
a
I
I
I
= 3
1
aa1
aa1
111
2
2
c
b
a
I
I
I
i.e. c,b,a
1
2,1,0 IAI (8)
Similarly, corresponding to voltage phasors
2,1,0c,b,a VAV (9)
and c,b,a
1
2,1,0 VAV (10)
Matrix A is known as symmetrical component transformation matrix. Similar
expressions can be written for line to line voltages and phase currents also.
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Sequence impedances and sequence networks
The impedance of any three phase element is of the form
cb,a,z =
cccbca
bcbbba
acabaa
zzz
zzz
zzz
(11)
Then cb,a,cb,a,cb,a, izv
i.e. 0,1,2cb,a,0,1,2 iAzvA
0,1,2cb,a,
1
0,1,2 iAzAv
0,1,20,1,20.1,2 izv
where z0,1,2 AzA cb,a,
1
Thus for any three phase element having the impedance cb,a,z the corresponding
sequence impedance 0,1,2z can be obtained from
0,1,2z = AzA cb,a,
1 (12)
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For power system components, sequence impedance 0,1,2z will be decoupled as
0,1,2z =
(2)
(1)
(0)
z00
0z0
00z
(13)
For static loads and transformers (2)(1)(0)zzz .
For transmission lines (2)(1)zz and (0)
z > (1)z .
For rotating machines (1)(0)z,z and (2)
z will have different values.
The single phase equivalent circuit composed of sequence voltages, sequence
currents and impedance to current of any one sequence is called the sequence
network for that particular sequence. The sequence network includes any
generated emf of like sequence.
Consider a star connected generator with its neutral grounded through an
impedance nZ as shown in Fig. 2. Assume that the generator is designed to
generate balanced voltage.
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+
+
+
b
nZ
c
a
ncE
nbE
cI
bI
aI
nI
bE
aE
cE
Fig. 2
Let anE be its generated voltage in phase a . Then
c
b
a
E
E
E
=
a
a
12
anE This gives
naE
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1Z 1Z
1Z
)1(
aI
1Z
Reference bus ( Neutral )
+
+
+
b
nZ
c
a
ncE
nbE
) 1 (
cI
0In
naE
)1(
aI
)1(
bI
(2)
a
(1)
a
(0)
a
E
E
E
= 3
1
aa1
aa1
111
2
2
a
a
12 anE =
0
E
0
an (14)
This shows that there is no zero sequence and negative sequence generated voltages.
The sequence networks of the generator are shown in Fig. 3.
__
+
)1(
aV
Positive sequence network
naE
Note that In = 0
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n
nZ3
0gZ nZ
)0(
an I3I
0gZ
0gZ
0gZ
2Z
2Z
2Z
)2(
aI
2Z
Reference bus ( Neutral )
b
nZ
c
a
0In
)2(
aI
)2(
bI
)2(
cI
)0(
aI
0Z
Reference bus ( Ground )
b c
a )0(
aI
)0(
bI
)0(
cI
Fig. 3
)2(
aV
Negative sequence network
)0(
aV
Zero sequence network
Note that In = 0
Note that In = 3 Ia(0)
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1Z and 2Z are the positive sequence and negative sequence impedance of the
generator. 0gZ is the zero sequence impedance of the generator. Total zero sequence
impedance 0Z = 0gZ + nZ3 .
Sequence components of the terminal voltage are
)2(
a2
)2(
a
)1(
a1na
)1(
a
)0(
a0
)0(
a
IZV
IZEV
IZV
(15)
As far as zero sequence currents are concerned, the three phase system behaves as
a single phase system. This is because of the fact that at any point the zero
sequence currents are same in magnitude and phase. Therefore, zero sequence
currents will flow only if a return path exists.
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nZ
Z
The connection diagram and the zero sequence equivalent circuit for star
connected load is shown in Fig. 4.
Z Z
Z
Fig. 4
The connection diagram and the zero sequence circuit for delta connected
load is shown in Fig. 5.
Z Z
Fig. 5
Reference
Z
nZ3
Reference
Z
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Special attention is required while obtaining the zero sequence
network of three phase transformers. The zero sequence network
will be different for various combination of connecting the
windings and also by the manner in which the neutral is
connected.
The zero sequence networks are drawn remembering that no
current flows in the primary of a transformer unless current flows
in the secondary
( neglecting the small magnetizing current ).
Five different cases are considered and the corresponding zero
sequence network are shown in Fig. 6. The arrows in the
connection diagram show the possible path for the flow of zero
sequence current. Absence of arrow indicates that the zero
sequence current can not flow there. Impedance 0Z accounts for
the leakage impedance Z and the neutral impedances NZ3 and
nZ3 where applicable.
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NZ nZ
NZ
Connection diagrams Zero sequence equivalent circuit
P Q
P Q
P Q
P Q
Reference
0Z
Reference
0Z
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P Q
P Q
P Q
P Q
NZ
Reference
0Z
Reference
0Z
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P Q
P Q
Fig. 6
Example 1
For the power system shown in Fig. 7, with the data given, draw the zero
sequence, positive sequence and negative sequence networks.
1T 2T
Fig. 7
Reference
G
1M
2M
0Z
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Per unit reactances are:
Generator 0.32X;0.05X ng0 ; 0.25X;0.2X 21
Transformer 1T 0.08XXX 210
Transformer 2T 0.09XXX 210
Transmission line 0.18XX0.52;X 210
Motor 1 0.27XX0.22;X0.06;X 21nom
Motor 2 0.55XX0.12;X 21om
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+ + +
gE
1T 2T
G
1M
2M
2mE 1mE
j0.18 j0.09 j0.08
j0.55 j0.27 j0.2
Reference
Positive sequence network
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j0.09 j0.18 j0.08
j0.55 j0.27
j0.25
1T 2T
G
1M
2M
Reference
Negative sequence network
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j0.52 j0.09 j0.08
j0.12 j0.06
j0.66
j0.05
j0.96
1T 2T
G
1M
2M
Reference
Zero sequence network
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2 UNSYMMETRICAL FAULTS AT GENERATOR TERMINALS
Single line to ground fault ( LG fault ), Line to line fault ( LL fault ) and Double
line to ground ( LLG fault ) are unsymmetrical faults that may occur at any
point in a power system. To understand the unsymmetrical fault analysis, let us
first consider these faults at the terminals of unloaded generator. This treatment
can be extended to unsymmetrical fault analysis when the fault occurs at any
point in a power system.
Consider a three phase unloaded generator generating balanced three phase
voltage. The sequence components of the terminal voltages are
1
(1)
ana
(1)
a ZIEV (16)
2
(2)
a
(2)
a ZIV (17)
0
(0)
a
(0)
a ZIV (18)
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1
(1)
ana
(1)
a ZIEV (16)
2
(2)
a
(2)
a ZIV (17)
0
(0)
a
(0)
a ZIV (18)
The above three equations apply regardless of the type of fault occurring at the
terminals of the generator.
For each type of fault there will be three relations in terms of phase components
of currents and voltages. Using these, three relations in terms of sequence
components of currents and voltages can be obtained. These three relations and
the eqns. (16), (17) and (18) are used to solve for the sequence currents (2)
a
(1)
a
(0)
a I,I,I and sequence voltages (2)
a
(1)
a
(0)
a V,V,V . Sequence components
relationship will enable to interconnect the sequence networks to represent the
particular fault.
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+ nbE
aI
b c
a
cI
bI
Single line to ground fault ( LG fault )
The circuit diagram is shown in Fig. 9.
nZ
_
Fig. 9
+
+
ncE naE
fZ
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The fault conditions are
0Ib (19)
0Ic (20)
afa IZV (21)
/3I)III(1/3I acba
(0)
a
/3I)IaIa(I1/3I ac
2
ba
(1)
a
/3I)IaIaI(1/3I acb
2
a
(2)
a
Thus (2)
a
(1)
a
(0)
a III (22)
Further from eqn. (21)
(1)
af
(2)
a
(1)
a
(0)
af
(2)
a
(1)
a
(0)
a IZ3)III(ZVVV (23)
Using eqns. (16) to (18) in the above
(1)
af2
(2)
a1
(1)
ana0
(0)
a IZ3ZIZIEZI i.e.
(1)
af2
(1)
a1
(1)
ana0
(1)
a IZ3ZIZIEZI i.e.
f021
na(1)
aZ3ZZZ
EI
(24)
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1Z
(2)
aI
(1)
aI
0Z
2Z
naE
(0)
aI
f021
na(1)
aZ3ZZZ
EI
(24)
Then the sequence networks are to be connected as shown in Fig. 10.
+
_
Fig. 10
+ (0)
aV
_
+ (2)
aV
_
+ (1)
aV
_
fZ3
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aI
nZ
c
a
nbE
b
bI
cI
Line to line fault
The circuit diagram is shown in Fig. 11
_
Fig. 11
The fault conditions are
0Ia (25)
0II cb (26)
cbfb VIZV (27)
+ ncE
naE
fZ
+
+
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0Ia (25)
0II cb (26)
cbfb VIZV (27)
Then 0)III(1/3I cba
(0)
a (28)
)aa(/3I)IaIa(I1/3I2
bc
2
ba
(1)
a
)aa(/3I)IaIaI(1/3I2
bcb
2
a
(2)
a
Since (0)
aI = 0 , (0)
aV = - Z0 (0)
aI = 0 (29)
Further (1)
a
(2)
a II (30)
From eqn. (27)
(2)
a
2(1)
a
(0)
a
(2)
a
(1)
a
2
f
(2)
a
(1)
a
2(0)
a VaVaV)IaIa(ZVaVaV
(2)
a
2(1)
a
2
f
(1)
a
2Va)a(I)aa(ZV)aa(
Thus (2)
a
(1)
af
(1)
a VIZV (31)
From the above eqn. (1)
a2
(2)
a2
(1)
af
(1)
a1na IZIZIZIZE
i.e. (1)
af21na I)ZZZ(E
Therefore f21
na(1)
aZZZ
EI
(32)
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(1)
aI (2)
aI
1Z 2Z
naE
Therefore f21
na(1)
aZZZ
EI
(32)
(2)
aI = - (1)
aI
and (0)
aI = 0; (0)
aV = 0
Sequence networks are to be connected as shown in Fig. 12.
+
_
Fig. 12
Va(0)
= 0 (2)
aV (1)
aV
fZ
0Z
(0)
aI
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aI
nZ
c
a
nbE
b cI
bI
Double line to ground fault
The circuit diagram is shown in Fig. 13.
_
Fig. 13
The fault conditions are
0Ia ; )II(ZV cbfb and )II(ZV cbfc (33)
+
+
+
ncE
naE
fZ
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The fault conditions are
0Ia ; )II(ZV cbfb and )II(ZV cbfc (33)
Because of )III(1/3I cba
(0)
a , (0)
acb I3II
Therefore (0)
afb IZ3V (34)
(0)
afc IZ3V (35)
]V)aa(V[1/3)VaVaV(1/3V b
2
ac
2
ba
(1)
a
]V)aa(V[1/3)VaVaV(1/3V b
2
acb
2
a
(2)
a
Therefore (2)
a
(1)
a VV (36)
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33
Further )VVV(1/3V cba
(0)
a i.e.
(0)
af
(0)
af
(2)
a
(1)
a
(0)
a
(0)
a IZ3IZ3VVVV3 i.e. (0)
af
(1)
a
(0)
a IZ6V2V2
i.e. (0)
af
(0)
a
(1)
a IZ3VV (0)
af
(0)
a0 IZ3IZ (0)
af0 I)Z3Z(
i.e. (1)
aV (0)
af0 I)Z3Z( (37)
From eqn. (33) 0III(2)
a
(1)
a
(0)
a i.e.
0Z
VI
3ZZ
Vi.e.0
Z
VI
3ZZ
V
2
(1)
a(1)
a
f0
(1)
a
2
(2)
a(1)
a
f0
(1)
a
Therefore )3ZZ(Z
3ZZZV)
Z
1
3ZZ
1(VI
f02
f02(1)
a
2f0
(1)
a
(1)
a
i.e. (1)
a
f02
f02(1)
a IZ3ZZ
)Z3Z(ZV
(38)
i.e. 1
(1)
ana ZIE (1)
a
f02
f02 IZ3ZZ
)Z3Z(Z
Thus
f02
f02
1
na(1)
a
Z3ZZ
)Z3Z(ZZ
EI
(39)
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34
0Z
(0)
aI (2)
aI (1)
aI
1Z 2Z
naE
Thus
f02
f02
1
na(1)
a
Z3ZZ
)Z3Z(ZZ
EI
(39)
From eqn. (38) (2)
a2
(2)
a
(1)
a IZVV (1)
a
f02
f02 IZ3ZZ
)Z3Z(Z
Therefore (1)
a
(2)
a II f02
f0
Z3ZZ
Z3Z
(40)
Again substituting eqn. (37) in eqn. (38)
(0)
af0 I)Z3Z( (1)
a
f02
f02 IZ3ZZ
)Z3Z(Z
Thus
f02
2(1)
a
(0)
aZ3ZZ
ZII
(41)
For this fault, the sequence networks are to be connected as shown in Fig. 14.
_
Fig. 14
+
fZ3
(0)
aV (1)
aV (2)
aV
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35
1Z
(2)
aI
(1)
aI
0Z
2Z
naE
(0)
aI
3 SUMMARY OF UNSYMMETRICAL FAULTS AT THE GENERATOR
TERMINALS
For any unsymmetrical fault
(1)
aV = aE - 1Z (1)
aI aI = (0)
aI + (1)
aI + (2)
aI
(2)
aV = - 2Z (2)
aI bI = (0)
aI + 2a
(1)
aI + a (2)
aI
(0)
aV = - 0Z (0)
aI cI = (0)
aI + a (1)
aI + 2a
(2)
aI
Single line to ground fault
Fault conditions are:
bI = 0
cI = 0
aV = fZ aI
cI
bI
aI
fZ
+ (2)
aV
_
fZ3
+ (0)
aV
_
+ (1)
aV
_
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36
f021
na(1)
aZ3ZZZ
EI
; (1)
a
(0)
a
(1)
a
(2)
a II;II
Corresponding phase components are cba IandI,I
Fault current (1)
aaf I3II
(1)
aV = aE - 1Z (1)
aI
(2)
aV = - 2Z (2)
aI
(0)
aV = - 0Z (0)
aI
Corresponding phase components are cb,a VandVV
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37
0Z
naE
(0)
aI (2)
aI (1)
aI
1Z 2Z
Line to line fault
Fault conditions are:
aI = 0
cI = - bI
bV - fZ bI = cV
cI
bI
aI
fZ
fZ
(1)
aV (2)
aV
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38
0I;II;ZZZ
EI
(o)
a
(1)
a
(2)
a
f21
na(1)
a
Corresponding phase components are cba IandI,I
Fault current
(1)aI3j
(1)aIa)
2a
(2)aIa
(1)aI
2a
(0)aIbI
fI (
(1)
aV = aE - 1Z (1)
aI
(2)
aV = - 2Z (2)
aI
(0)
aV = - 0Z (0)
aI
Corresponding phase components are cb,a VandVV
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39
naE
0Z
(0)
aI (2)
aI (1)
aI
1Z 2Z
Double line to ground fault
Fault conditions are:
fZ)II(V
Z)II(V
0I
cbc
fcbb
a
-
cI
bI
aI
fZ
+
fZ3
(0)
aV (1)
aV (2)
aV
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40
f02
f021
na(1)
a
Z3ZZ
)Z3Z(ZZ
EI
f02
f0(1)
a
(2)
aZ3ZZ
Z3ZII
f02
2(1)
a
(0)
aZ3ZZ
ZII
Fault current
(0)
acbf I3III
Corresponding phase components are cba IandI,I
(1)
aV = aE - 1Z (1)
aI
(2)
aV = - 2Z (2)
aI
(0)
aV = - 0Z (0)
aI
Corresponding phase components are cb,a VandVV
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41
Example 2
The reactances of an alternator rated 10 MVA, 6.9 kV are
1X = 2X = 15 % and g0X = 5 %. The neutral of the alternator is
grounded through a reactance of 0.38 . Single line to ground
fault occurs at the terminals of the alternator. Determine the line
currents, fault current and the terminal voltages.
Solution
1X = 2X = 0.15 p.u.
nX = 0.38 x 26.9
10 = 0.0798 p.u.
0X = g0X +3 nX = 0.05 + 0.2394 = 0.2894 p.u.
(1)
aI = (2)
aI = (0)
aI = 1.0 / j ( 0.2894 + 0.15 + 0.15 ) = - j 1.6966 p.u.
Corresponding phase components are
aI = -j 5.0898 p.u. bI = cI = 0
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42
Base current = 6.9x3
1000x10 = 836.7 A
Line currents are aI = - j 4258.8 A ; bI = cI = 0
Fault current, fI = aI = - j 4258.8 A
(1)
aV = 1.0 – ( j 0.15 ) (- j 1.6966 ) = 1.0 – 0.2545 = 0.7455 p.u. (2)
aV = - ( j 0.15 ) (- j 1.6966 ) = - 0.2545 p.u. (0)
aV = - ( j 0.2894 ) (- j 1.6966 ) = - 0.491 p.u.
Corresponding phase components are
aV = 0 ; bV = 1.1386 0
130.38 p.u. ; cV = 1.1386 0130.38 p.u.
Multiplying by 3
6.9
aV = 0; bV = 4.5359 0130.38 kV ; cV = 4.5359
0130.38 kV
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43
Example 3
The reactances of an alternator rated 10 MVA, 6.9 kV are
1X =15 %; 2X = 20 % and g0X = 5 %. The neutral of the
alternator is grounded through a reactance of 0.38 . Line to line
fault, with fault impedance j 0.15 p.u. occurs at the terminals of
the alternator. Determine the line currents, fault current and
the terminal voltages.
Solution
1X = 0.15 p.u. ; 2X = 0.2 p.u. ; FX = 0.15 p.u. 0X = ?
(1)
aI = 1.0 / j ( 0.15 + 0.2 + 0.15 ) = - j 2 p.u.
(2)
aI = - (1)
aI = j 2 p.u. and (0)
aI = 0
Corresponding phase components are
aI = 0 ; bI = - 3.4641 p.u. ; cI = 3.4641 p.u.
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44
Base current = 836.7 A
Line currents are aI = 0 ; bI = - 2898.4 A ; cI = 2898.4 A
Fault current fI = bI = - 2898.4 A
(1)
aV = 1.0 – ( j 0.15 ) (- j 2 ) = 0.7 p.u. (2)
aV = - ( j 0.3 ) ( j 2 ) = 0.4 p.u. (0)
aV = 0
Corresponding phase components are
aV = 1.1 ; bV = 0.6083 0
154.72 p.u. ; cV = 0.6083 0154.72 p.u.
Multiplying by 3
6.9, aV = 4.3821 kV
bV = 2.4233 0
154.72 kV
cV = 2.4233 0
154.72 kV
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45
Example 4
An unloaded, solidly grounded 10 MVA, 11 kV generator has
positive, negative and zero sequence impedances as j 1.2 Ω,
j 0.9 Ω and j 0.04 Ω respectively. A double line to ground fault
occurs at the terminals of the generator. Calculate the currents in
the faulted phases and voltage of the healthy phase.
Solution
Base impedance = 10
112
= 12.1 Ω ;
1Z = j 0.09917 p.u. ; 2Z = j 0.07438 p.u. ; 0Z = j 0.00331 p.u.
1Z + 02
02
ZZ
ZZ
= j 0.10234 p.u.
(1)
aI = 1.0/ j 0.10234 = -j 9.7714 p.u.
(2)
aI = j 9.7714 0.07769
0.00331 = j 0.4163 p.u.
(0)
aI = j 9.7714 0.07769
0.07438 = j 9.3551 p.u.
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46
(1)
aI = 1.0/ j 0.10234 = -j 9.7714 p.u.
(2)
aI = j 9.7714 0.07769
0.00331 = j 0.4163 p.u.
(0)
aI = j 9.7714 0.07769
0.07438 = j 9.3551 p.u.
Corresponding phase components are
aI = 0 ; bI = 16.5758 0122.16 p.u. ; cI = 16.5758 0
57.84 p.u.
Base current = 11x3
1000x10 = 542.86 A
Current in faulted phases are bI = 8998.3 0122.16 A
cI = 8998.3 0
57.84 A
(1)
aV = (2)
aV = (0)
aV = - ( j 0.07438 ) ( j 0.4163 ) = 0.03096 p.u.
Voltage of the healthy phase aV = 0.09288 x 3
11 = 0.5899 kV
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EE 0308 POWER SYSTEM ANALYSIS
SURPRISE TEST 1 March 2010
1 Obtain the bus admittance matrix of the transmission system with the
following data.
Line data
Line
No.
Between
buses Line Impedance HLCA
Off nominal
turns ratio
1 1 – 2 0.08 + j 0.37 j 0.007 ---
2 3 – 2 j 0.133 0 0.909
Shunt capacitor data
Bus No. 3 Admittance j 0.0096
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Line No. Between Line admittance HLCA Yp q / a Yp q / a2
1 1 - 2 0.5583 – j 2.582 j 0.007 ----- ----
2 3 – 2 - j 7.5188 ---- - j 8.2715 - j 9.0996
Y11 = 0.5583 – j 2.582 + j 0.007 = 0.5583 – j 2.575
Y22 = 0.5583 – j 2.582 - j 7.5188 + j 0.007 = 0.5583 – j 10.0938
Y33 = - j 9.0996 + j 0.0096 = - j 9.09
9.09j8.2716j0
8.2716j10.0938j0.55832.582j0.5583
02.582j0.55832.575j0.5583
1
1
2
2 3
3
YBus =
![Page 49: EE 0308 POWER SYSTEM ANALYSIS - SRM University Special attention is required while obtaining the zero sequence network of three phase transformers. The zero sequence network will be](https://reader036.vdocuments.us/reader036/viewer/2022081512/5ab343187f8b9ad9788dffb5/html5/thumbnails/49.jpg)
2. In a three bus power system, bus 1 is slack bus and buses 2 and 3 are P-Q
buses. Its bus admittance matrix is
5j1.72j0.73j1
2j0.78j2.76j2
The slack bus voltage is 1.04 00 . At bus 2, real power generation is 0.7,
real power load is 0.2, reactive power generation is 0.1 and reactive power
load is 0.3. Taking flat start and using Gauss Seidel method, find the bus
voltage V2 after first iteration.
3
1
1
2
2 3
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2. V1 = 1.04 00 ; V2 = 1.0 00 ; V3 = 1.0 00
PI2 = 0.7 – 0.2 = 0.5; QI2 = 0.1 – 0.3 = - 0.2; PI2 + j QI2 = 0.5 – j 0.2
V2(1) = ]VYVY
V
QIPI[
Y
1332112*(0)
2
22
22
= 2)j0.7((1.04)6)j2(0.2)j(0.5[8j2.7
1
= 8j2.7
2)j0.7(6.24)2.08(0.2)j(0.5
=
8j2.7
8.04j3.28
= 1.0265 + j 0.0636 = 1.0284 03.54
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51
4 UNSYMMETRICAL FAULTS ON POWER SYSTEMS
In a general power system fault can occur at any bus p. In such case, the fault
analysis discussed in previous section can be extended following one-to-one
correspondence shown below.
Fault at the terminals of the
generator
Fault occurs at bus p in the power
system
Positive sequence pre-fault voltage is naE Positive sequence pre-fault voltage is fV
Positive sequence impedance is 1Z
Thevenin’s equivalent impedance
between the fault point and the
reference bus in the positive sequence
network is 1Z
Negative sequence impedance is 2Z
Thevenin’s equivalent impedance
between the fault point and the
reference bus in the negative
sequence network is 2Z
Zero sequence impedance is 0Z
Thevenin’s equivalent impedance
between the fault point and the
reference bus in the zero sequence
network is 0Z
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52
Note that the Thevenin’s equivalent circuit of different sequence networks will
be similar to the sequence networks of the generator. Thevenin’s equivalent
circuit of the sequence networks are interconnected, much similar to the case
of fault occurring at the generator terminals, to represent different types of
faults.
This method is not suitable for large scale power systems as it involves
network reduction in positive, negative and zero sequence networks.
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53
5 UNSYMMETRICAL FAULT ANALYSIS USING busZ matrix
When an unsymmetrical fault occurs in a power system, three phase network has
to be considered. Any three phase element can be represented as shown in Fig.
15.
Fig. 15
It can be described as
cb,a,
qp
cb,a,
qp
cb,a,
qp izv i.e. (42)
c
qp
b
qp
a
qp
v
v
v
=
cc
qp
bc
qp
ac
qp
cb
qp
bb
qp
ab
qp
ca
qp
ba
qp
aa
qp
zzz
zzz
zzz
c
qp
b
qp
a
qp
i
i
i
(43)
c
qV
cb,a,
qpz
c
pV
q p
b
pV
a
pV b
qV a
qV
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54
Voltages at bus p and q can be denoted as
c
p
b
p
a
p
cb,a,
p
V
V
V
V ;
c
q
b
q
a
q
cb,a,
q
V
V
V
V (44)
Considering the impedance of each three phase element as cb,a,
qpz , using building
algorithm, the bus impedance matrix of transmission-generator can be obtained
as
1 2 N
cb,a,
busZ
cb,a,
NN
cb,a,
N2
cb,a,
N1
cb,a,
2N
cb,a,
22
cb,a,
21
cb,a,
1N
cb,a,
12
cb,a,
11
ZZZ
ZZZ
ZZZ
where cb,a,
jiZ i
cc
ji
bc
ji
ac
ji
cb
ji
bb
ji
ab
ji
ca
ji
ba
ji
aa
ji
ZZZ
ZZZ
ZZZ
The bus impedance matrix cb,a,
busZ will be normally full with non-zero entries.
Since impedance of any element in sequence frame, 0,1,2
qpz is decoupled,
computationally it is advantage to use the matrix 0,1,2
busZ instead of cb,a,
busZ .
N
1
2
j
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55
2
1
2
1
2
1
For two bus system
1 2 1 2 1 2
0
busZ
(0)
22
(0)
21
(0)
12
(0)
11
ZZ
ZZ ; 1
busZ
(1)
22
(1)
21
(1)
12
(1)
11
ZZ
ZZ ; 2
busZ
(2)
22
(2)
21
(2)
12
(2)
11
ZZ
ZZ
Then
0,1,2
busZ
(2)
22
(2)
21
(1)
22
(1)
21
(0)
22
(0)
21
(2)
12
(2)
11
(1)
12
(1)
11
(0)
12
(0)
11
ZZ2
ZZ1
ZZ0
ZZ2
ZZ1
ZZ0
210210
(45)
Normally 2
bus
1
bus
0
bus ZandZ,Z are constructed and stored independently. It is
evident that as compared to cb,a,
busZ , construction of 0,1,2
busZ requires less computer
time and less core storage. For a 100 bus system, cb,a,
busZ will be a 300 x 300 full
matrix; whereas for 0,1,2
busZ , we need 3 numbers of 100 x 100 matrices. Thus only
1/3 rd of the core storage is required for 0,1,2
busZ as compared to cb,a,
busZ . Hence for
unsymmetrical fault analysis, use of 0,1,2
busZ is more advantages than cb,a,
busZ .
1
1
2
2
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56
Further, when unsymmetrical faults occur, the currents
and voltages are unbalanced and using symmetrical
components transformation, we can handle them
conveniently. Therefore, symmetrical components are
invariably used in the study of unsymmetrical fault analysis.
In order to obtain 0,1,2
busZ , first the three sequence networks
are be drawn as discussed earlier. Considering the zero
sequence, positive sequence and negative sequence networks
separately, using bus impedance building algorithm,
are to be constructed independently . Of course special
attention is necessary while drawing the zero sequence network.
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57
j0.52 j0.09 j0.08
j0.12 j0.06
j0.66
j0.05
j0.96
Example 5
Consider the system described in Example 1. Obtain the matrices 2
bus
1
bus
0
bus ZandZ,Z .
Solution
Required bus impedance matrices can be constructed using bus impedance
building algorithm.
First consider the zero sequence network shown in Fig. 8(a).
Reference
1 2 3 4
0
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58
3
1
2
2
1
Element 0-1 is added: 0
busZ j 1 1.01
1 2
Element 0 – 2 is added: 0
busZ j
0.080
01.01
1 2 3
Element 0 – 3 is added: 0
busZ j
0.0900
00.080
001.01
Element 2 – 3 is added: With th bus
1 2 3
0
busZ j
0.690.090.080
0.090.0900
0.0800.080
0001.01
1
2
3
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3
1
2
1 2 3
Eliminating the th bus, 0
busZ j
0.080.010
0.010.070
001.01
Element 0 – 4 is added: The final 0
busZ is obtained as
1 2 3 4
0
busZ j
0.72000
00.080.010
00.010.070
0001.01
Consider the positive sequence network shown in Fig. 8(b)
1
2
3
4
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j0.18 j0.09 j0.08
j0.55 j0.27 j0.2
+ + +
1 2 3 4
gE
Element 0 – 1 is added: 1
busZ j 1 0.2
1 2
Element 1 – 2 is added: 1
busZ j
0.280.2
0.20.2
1 2 3
Element 2 – 3 is added: 1
busZ j
0.460.280.2
0.280.280.2
0.20.20.2
2
1
1
3
2
2mE 1mE
Reference
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1 2 3 4
Element 3 – 4 is added: 1
busZ j
0.550.460.280.2
0.460.460.280.2
0.280.280.280.2
0.20.20.20.2
Element 0 – 4 is added: It has an impedance of j0.18. With the th bus
1 2 3 4
1
busZ j
0.730.550.460.280.2
0.550.550.460.280.2
0.460.460.460.280.2
0.280.280.280.280.2
0.20.20.20.20.2
Eliminating the th bus, final
1
busZ is obtained as
1 2 3 4
1
busZ = j
0.13560.11340.06900.0493
0.11340.17010.10360.0740
0.06900.10360.17260.1233
0.04930.07400.12330.1452
1
2
3
4
1
2
3
4
1
2
3
4
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62
j0.55 j0.27
j0.25
Similarly, considering the negative sequence network shown in Fig. 8(c)
j0.08 j0.18 j0.09
Its bus impedance 2
busZ can be obtained as
1 2 3 4
2
busZ = j
0.13840.11770.07610.0577
0.11770.17650.11430.0866
0.07610.11430.19040.1442
0.05770.08660.14420.1699
1
2
3
4
Reference
1 2 3 4
0
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N
6 UNSYMMETRICAL FAULT ANALYSIS USING 0,1,2
busZ MATRIX
For unsymmetrical fault analysis using 0,1,2
busZ the first step is to construct 1
busZ ,
2
busZ and 0
busZ by considering the positive sequence, negative sequence and zero
sequence network of the power system. They are
1 2 p N
1
busZ
(1)
NN
(1)
Np
(1)
N2
(1)
N1
(1)
pN
(1)
pp
(1)
p2
(1)
p1
(1)
2N
(1)
2p
(1)
22
(1)
21
(1)
1N
(1)
1p
(1)
12
(1)
11
ZZZZ
ZZZZ
ZZZZ
ZZZZ
(46)
1
2
p
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1 2 p N
2
busZ
(2)
NN
(2)
Np
(2)
N2
(2)
N1
(2)
pN
(2)
pp
(2)
p2
(2)
p1
(2)
2N
(2)
2p
(2)
22
(2)
21
(2)
1N
(2)
1p
(2)
12
(2)
11
ZZZZ
ZZZZ
ZZZZ
ZZZZ
and (47)
1 2 p N
0
busZ
(0)
NN
(0)
Np
(0)
N2
(0)
N1
(0)
pN
(0)
pp
(0)
p2
(0)
p1
(0)
2N
(0)
2p
(0)
22
(0)
21
(0)
1N
(0)
1p
(0)
12
(0)
11
ZZZZ
ZZZZ
ZZZZ
ZZZZ
(48)
1
2
p
N
1
2
p
N
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65
Suitable assumptions are made so that prior to the occurrence of the fault, there
will not be any current flow in the positive, negative and zero sequence networks
and the voltages at all the buses in the positive sequence network are equal to
fV .
The currents flowing out of the original balanced system from phases candba,
at the fault point are designated as cfbfaf IandI,I . We can visualize these
currents by referring to Fig. 16 which shows the three lines candba, of the
three phase system where the fault occurs.
Fig. 16
P
bfI
afI
cfI
c
a
b
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66
2
The currents flowing out in hypothetical stub are cfbfaf IandI,I . The
corresponding sequence currents are (0)
afI , (1)
afI and (2)
afI . These sequence currents
(1)
afI , (2)
afI and (0)
afI are flowing out as shown in Fig. 17. The line to ground voltages
at any bus j of the system during the fault are ajV , bjV and cjV . Corresponding
sequence components of voltages are (0)
ajV , (1)
ajV and (2)
ajV .
(1)
afI
1
- V f +
- V f +
- V f +
Positive
sequence
network
having
bus
impedance
matrix
(1)
busZ
N
p
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67
2 2
Fig. 17
(2)
afI
1
Negative
sequence
network
having
bus
impedance
matrix
(2)
busZ
N
p
(0)
afI
1
Zero
sequence
network
having
bus
impedance
matrix
(0)
busZ
N
p
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68
Consider the Positive Sequence Network:
In the faulted system, there are two types of sources.
1 Current injection at the faulted bus.
2 Pre-fault voltage sources.
The bus voltages in the faulted system namely
(1)
busV
(1)
aN
(1)
ap
(1)
2a
(1)
1a
V
V
V
V
(49)
can be obtained using Superposition Theorem.
N
1
2
p
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69
It is to be noted that
(1)
busI
0
0
I
0
0
0
(1)
af
and pre-fault voltage =
1
1
1
1
1
1
fV (50)
Using these we get
(1)
aN
(1)
ap
(1)
2a
(1)
1a
V
V
V
V
=
(1)
NN
(1)
Np
(1)
N2
(1)
N1
(1)
pN
(1)
pp
(1)
p2
(1)
p1
(1)
2N
(1)
2p
(1)
22
(1)
21
(1)
1N
(1)
1p
(1)
12
(1)
11
ZZZZ
ZZZZ
ZZZZ
ZZZZ
0
I
0
0
(1)
fa
+
1
1
1
1
fV =
(1)
af
(1)
pNf
(1)
af
(1)
ppf
(1)
af
(1)
2pf
(1)
af
(1)
1pf
IZV
IZV
IZV
IZV
(51)
p
1
2
N
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70
Consider the Negative Sequence and Zero Sequence Networks:
In a much similar manner, the negative sequence and the zero sequence bus
voltages in the faulted system, namely (2)
busV and (0)
busV , can be obtained considering
the negative sequence and the zero sequence networks. Knowing the pre-fault
voltages are zero in the negative and zero sequence networks we get
(2)
aN
(2)
ap
(2)
2a
(2)
1a
V
V
V
V
=
(2)
af
(2)
pN
(2)
af
(2)
pp
(2)
af
(2)
2p
(2)
af
(2)
1p
IZ
IZ
IZ
IZ
and
(0)
aN
(0)
ap
(0)
2a
(0)
1a
V
V
V
V
=
(0)
af
(0)
pN
(0)
af
(0)
pp
(0)
af
(0)
2p
(0)
af
(0)
1p
IZ
IZ
IZ
IZ
(52)
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When the fault occurs at bus p , it is to be noted that only the thp column of
1
busZ , 2
busZ and 0
busZ are involved in the calculations. If the symmetrical
components of the fault currents , namely (1)
afI , (2)
afI and (0)
afI , are known, than the
sequence voltages at any bus j can be computed from
(0)
af
(0)
pj
(0)
aj IZV (53)
(1)
af
(1)
pjf
(1)
aj IZVV (54)
(2)
af
(2)
pj
(2)
aj IZV (55)
It is important to remember that the (1)
afI , (2)
afI and (0)
afI are the symmetrical
component currents in the stubs hypothetically attached to the system at the
fault point. These currents take on values determined by the particular type of
fault being studied, and once they are calculated, they can be regarded as
negative injection into the corresponding sequence networks.
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General procedure for unsymmetrical fault analysis
when fault occurs at a point in a
power system
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PRELIMINARY CALCULATIONS 1. Draw the positive sequence, negative sequence and zero sequence
networks.
2. Using bus impedance building algorithm, construct ZBus (1), ZBus
(2) and
ZBus(0).
DATA REQUIRED Type of fault, fault location (Bus p) and fault impedance (Zf) TO COMPUTE FAULT CURRENTS I f a , I f b and I f c 1. Extract the columns of ZBus
(1), ZBus(2) and ZBus
(0) corresponding to the
faulted bus.
2. Depending on the type of fault interconnect the sequence networks.
3. Calculate I f a(1), I f a
(2) and I f a(0)
4. Compute the corresponding phase components I f a. I f b and I f c using
cf
bf
af
I
I
I
=
2
2
aa1
aa1
111
(2)
af
(1)
af
(0)
af
I
I
I
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TO COMPUTE FAULTED BUS VOLTAGES V p a, V p b and V p c 1. Compute the sequence components V p a
(1), V p a(2) and V p a
(0) from V p a
(!) = Vf – Z p p(1) I f a
(1)
V p a(2) = – Z p p
(2) I f a(2)
V p a(0) = – Z p p
(0) I f a(0)
2. Calculate the corresponding phase components V p a, V p b and V p c from
cp
bp
ap
V
V
V
=
2
2
aa1
aa1
111
(2)
ap
(1)
ap
(0)
ap
V
V
V
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75
TO COMPUTE BUS VOLTAGES AT BUS j i.e V j a, V j b and V j c
1. Compute the sequence components V j a(!), V j a
(2) and V j a(0) from
V j a
(!) = Vf – Z j p(1) I f a
(1)
V j a(2) = – Z j p
(2) I f a(2)
V j a(0) = – Z j p
(0) I f a(0)
2. Calculate the corresponding phase components V j a, V j b and V j c from
cj
bj
aj
V
V
V
=
2
2
aa1
aa1
111
(2)
aj
(1)
aj
(0)
aj
V
V
V
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76
fV
(2)
afI
1)(
afI
0)(
afI
Single line to ground fault
(1)
afI = (2)
afI = (0)
afI
(2)
ppZ
(1)
ppZ +
_
fZ3
(0)
ppZ
(1)
apV
(2)
apV
(0)
apV
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77
(0)
afI (2)
afI (1)
afI
(1)
ppZ (2)
ppZ
Line to line fault
(2)
apV (1)
apV _
+
fV
fZ
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78
(0)
ppZ
(0)
afI (2)
afI (1)
afI
(1)
ppZ (2)
ppZ
Double line to ground fault
fV _
+
fZ3
(0)
apV (1)
apV (2)
apV
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79
SINGLE LINE TO GROUND FAULT
For a single line to ground fault through impedance fZ , the hypothetical stubs
on the three lines will be as shown in Fig. 18 The fault conditions are
Fig. 18
0I bf
0I cf (56)
affap IZV
a
afI fZ
P
c
b bfI
cfI
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80
Using the above conditions ( similar to conditions for the LG fault at generator
terminals through impedance ) and also knowing that
(1)
af
(1)
ppf
(1)
ap IZVV (57)
(2)
af
(2)
pp
(2)
ap IZV (58)
(0)
af
(0)
pp
(0)
ap IZV (59)
from eqns. (51) and (52), similar to eqns. (22) and (23), we can get the relations
(1)
afI = (2)
afI = (0)
afI and (60)
(1)
aff
(0)
ap
(2)
ap
(1)
ap IZ3VVV = 0 (61)
Therefore
f
(0)
pp
(2)
pp
(1)
pp
f(1)
afZ3ZZZ
VI
(62)
The above relationships are satisfied by connecting the sequence networks as
shown in Fig. 19
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81
fV
(2)
afI
1)(
afI
2)(
afI
(1)
afI = (2)
afI = (0)
afI
Fig. 19
The series connection of Thevenin equivalents of the sequence networks, as
shown in the above Fig. 18, is a convenient means of remembering the equations
for the solution of single line to ground fault.
(2)
ppZ
(1)
ppZ +
_
fZ3
(0)
ppZ
(1)
apV
(2)
apV
(0)
apV
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82
Once the currents (1)
afI , (2)
afI and (0)
afI are known, the sequence components of
voltage at the faulted bus are calculated as
(1)
af
(1)
ppf
(1)
ap IZVV
(2)
af
(2)
pp
(2)
ap IZV (63)
(0)
af
(0)
pp
(0)
ap IZV
Thereafter the sequence components of voltage at any bus j can be calculated as
(1)
af
(1)
pjf
(1)
aj IZVV
(2)
af
(2)
pj
(2)
aj IZV (64)
(0)
af
(0)
pj
(0)
aj IZV
Phase components of voltage and current can be calculated from the relations
2,1,0c,b,a VAV
2,1,0c,b,a IAI
pj
N.1,2,......j
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83
Example 6
The positive sequence, negative sequence and zero sequence bus impedance
matrices of a power system are shown below.
1 2 3 4
(2)
bus
(1)
bus ZZ j
0.14370.12110.07890.0563
0.12110.16960.11040.0789
0.07890.11040.16960.1211
0.05630.07890.12110.1437
1 2 3 4
(0)
busZ j
0.15530.14070.04930.0347
0.14070.19990.07010.0493
0.04930.07010.19990.1407
0.03470.04930.14070.1553
A bolted single line to ground fault occurs on phase ‘a’ at bus 3. Determine the
fault current and the voltage at buses 3 and 4.
1
2
4
3
1
2
3
4
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Solution
(1)
afI = (2)
afI = (0)
afI = (0)
33
(2)
33
(1)
33
f
ZZZ
V
Let 0
f 01.0V
Then (1)
afI = (2)
afI = (0)
afI = )0.19990.1696(0.1696j
01.00
= 1.8549j
The fault current (1)
af
(2)
af
(1)
af
(0)
afaf I3IIII = - j 5.5648; bfI = cfI = 0
The sequence components of voltage at bus 3 are calculated as
0.3708)1.8549j()0.1999j(IZV(0)
af
(0)
33
(0)
a3
0.6854)1.8549j()0.1696j(1.0IZVV(1)
af
(1)
33f
(1)
a3
0.3146)j1.8549()j0.1696(IZV(2)
af
(2)
33
(2)
a3
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85
Phase components of line to ground voltage of bus 3 are computed as
c3
b3
a3
V
V
V
=
2
2
aa1
aa1
111
0.3146
0.6854
0.3708
=
The sequence components of voltage at bus 4 are calculated as
0.2610)1.8549j()0.1407j(IZV(0)
af
(0)
43
(0)
a4
0.7754)1.8549j()0.1211j(1.0IZVV(1)
af
(1)
43f
(1)
a4
0.2246)j1.8549()j0.1211(IZV(2)
af
(2)
43
(2)
a4
Phase components of line to ground voltage of bus 4 are computed as
c4
b4
a4
V
V
V
=
2
2
aa1
aa1
111
0.2246
0.7754
0.2610
=
0.289800
1.01870
121.8
1.01870
121.8
0
1.0292 0122.71
1.0187 0122.71
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LINE TO LINE FAULT
To represent a line to line fault through impedance fZ the hypothetical stubs on
the three lines at the fault are connected as shown in Fig. 20.
Fig. 20
Fault conditions are
0I af
0II cfbf (65)
cpbffbp VIZV
( c
b
a
bfI
afI
fZ
P
cfI
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87
Using the above conditions along with the relations
(1)
af
(1)
ppf
(1)
ap IZVV
(2)
af
(2)
pp
(2)
ap IZV (66)
(0)
af
(0)
pp
(0)
ap IZV
we can get the following relations.
(2)
ap
(1)
aff
(1)
ap
(2)
af
(1)
af
(0)
af
VIZV
II
0I
(68)
and hence f
(2)
pp
(1)
pp
f(1)
afZZZ
VI
(70)
(67)
(69)
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88
(0)
afI (2)
afI (1)
afI
(1)
ppZ (2)
ppZ
To satisfy the above relations the sequence networks are to be connected as
shown in Fig. 21.
(0)
ppZ
Fig. 21
Once (1)
afI , (2)
afI and (0)
afI are calculated, (2)
ap
(1)
ap V,V and (0)
apV can be computed from
eqn. (63). Thereafter (2)
aj
(1)
aj V,V and (0)
ajV for pj;N1,2,....,j can be calculated
using eqn. (63). The corresponding phase components are then calculated using
the symmetrical component transformation matrix.
(2)
apV (1)
apV _
+
fV
fZ
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89
Example 7
Consider the power system described in example 6. A bolted line to line fault
occurs at bus 3. Determine the currents in the fault, voltages at the fault bus
and the voltages at bus 4.
Solution
For line to line fault 0I(0)
af
2.9481j0.1696j0.1696j
1.0
ZZ
VII
(2)
33
(1)
33
f(2)
af
(1)
af
The phase components of the currents in the fault are
(2)
af
(1)
af
(0)
afaf IIII 0
(1)
af
(2)
af
(1)
af
2
bf I3jIaIaI - 5.1061
bfcf II 5.1061
Sequence components of voltage at bus 3 are
0V(0)
a3 ; 0.5)2.9481(j)0.1696j(IZVV(2)
af
(2)
33
(2)
a3
(1)
a3
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90
Phase components of voltage at bus 3 are
a3V (0)
a3V (2)
a3
(1)
a3 VV 1.0
(1)
a3
(2)
a3
(1)
a3
2
c3b3 VVaVaVV -0.5
Sequence components of voltage at bus 4 are
0IZV(0)
af
(0)
43
(0)
a4
0.643)2.9481j()0.1211j(1IZVV(1)
af
(1)
43f
(1)
4a
0.357)2.9481j()0.1211j(IZV(2)
af
(2)
43
(2)
a4
Phase components of voltage at bus 4 are
(2)
a4
(1)
a4
(0)
a44a VVVV 1.0
(2)
a4
(1)
a4
2
b4 VaVaV - 0.5
(2)
a4
2(1)
a4c4 VaVaV - 0.5
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91
fZ
DOUBLE LINE TO GROUND FAULT
For a double line to ground fault, the hypothetical stubs are connected as shown
in Fig. 22.
Fig. 22
The relations at the fault bus are
)II(ZV
)II(ZV
0I
cfbffcp
cfbffbp
af
(71)
cfI
( c
b
a
bfI
afI
P
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92
Further the relations are also applicable.
(1)
af
(1)
ppf
(1)
ap IZVV
(2)
af
(2)
pp
(2)
ap IZV (72)
(0)
af
(0)
pp
(0)
ap IZV
Using eqns. (71) and (62) the following relations can be obtained.
(2)
ap
(1)
ap VV
(0)
aff
(0)
ap
(1)
ap IZ3VV
0III(2)
af
(1)
af
(0)
af
On further simplification we get
f
(0)
pp
(2)
pp
f
(0)
pp
(2)
pp(1)
pp
f(1)
af
Z3ZZ
)Z3Z(ZZ
VI
(73)
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93
(0)
ppZ
(0)
afI (2)
afI (1)
afI
(1)
ppZ (2)
ppZ
To represent the above relations, the sequence networks must be interconnected
as shown in Fig. 23.
Fig. 23
The sequence currents (2)
afI and (0)
afI can be obtained from
f
(0)
pp
(2)
pp
f
(0)
pp(1)
af
(2)
afZ3ZZ
Z3ZII
(74)
f
(0)
pp
(2)
pp
(2)
pp(1)
af
(0)
afZ3ZZ
ZII
(75)
fV _
+
fZ3
(0)
apV (1)
apV (2)
apV
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94
Knowing (1)
afI , (2)
afI and (0)
afI sequence components of voltage at fault point are
calculated from
(1)
af
(1)
ppf
(1)
ap IZVV
(2)
af
(2)
pp
(2)
ap IZV (76)
(0)
af
(0)
pp
(0)
ap IZV
Thereafter, sequence components of voltage at any other bus can be obtained
from
(1)
af
(1)
pjf
(1)
aj IZVV
(2)
af
(2)
pj
(2)
aj IZV (77)
(0)
af
(0)
pj
(0)
aj IZV
Knowing the sequence components, corresponding phase conponents are obtained
as
21,0,cb,a, IAI or 21,0,cb,a, VAV (78)
pj
N.1,2,......j
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95
Example 8
The positive sequence, negative sequence and zero sequence bus impedance
matrices of a power system are shown below.
1 2 3 4
(2)
bus
(1)
bus ZZ j
0.14370.12110.07890.0563
0.12110.16960.11040.0789
0.07890.11040.16960.1211
0.05630.07890.12110.1437
1 2 3 4
(0)
busZ j
0.19000
00.580.080
00.080.080
0000.19
1
2
4
3
1
2
3
4
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96
A double line to ground fault with 0Zf occurs at bus 4. Find the fault
current and voltages at the fault bus.
Solution
Sequence components of fault current are
4.4342j
0.19j0.1437j
)0.19j()0.1437j(0.1437j
1.0
ZZ
ZZZ
VI
(0)
44
(2)
44
(0)
44
(2)
44(1)
44
f(1)
af
j2.5247j0.19j0.1437
j0.19)j4.4342(
ZZ
ZII
(0)
44
(2)
44
(0)
44(1)
af
(2)
af
j1.9095j0.19j0.1437
j0.1437)j4.4342(
ZZ
ZII
(0)
44
(2)
44
(2)
44(1)
af
(0)
af
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Phase components of current at the fault bus are
(2)
af
(1)
af
(0)
afaf IIII 0
00(2)
af
(1)
af
2(0)
afbf 2102.52471504.4342j1.9095IaIaII
= - 6.0266 + j 2.8642 0
302.5247304.4342j1.9095IaIaII0(2)
af
2(1)
af
(0)
afcf
= 6.0266 + j 2.8642
Fault current cfbff III j 5.7285
Sequence components of voltage at the faulted bus are calculated as follows.
Noting that 0Zf
0.3628)j4.4342()j0.1437(1.0IZVVVV(1)
af
(1)
44f
(0)
a4
(2)
a4
(1)
a4
Phase components of faulted bus voltage are:
(2)
a4
(1)
a4
(0)
a4a4 VVVV 1.0884
b4V 0
c4V 0
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PROBLEMS – UNSYMMETRICAL FAULTS
1. In an unbalanced circuit the three line currents are measured as
0
c
0
b
0
a
160.752.6810I
203.844.3733I
59.857.0311I
Obtain the corresponding sequence components of currents and draw
them to scale.
2. For the sequence components calculated in Problem 1, find the
corresponding phase components of line currents and verify the results
graphically.
3. A three phase transmission line has the phase impedance of
2166
6216
6621
jcb,a,
z
Calculate its sequence impedances.
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4. A 20 MVA, 13.8 kV alternator has the following reactances:
X1 = 0.25 p.u. X2 = 0.35 p.u. Xg0 = 0.04 p.u. Xn = 0.02 p.u.
A single line to ground fault occurs at its terminals. Draw the
interconnections of the sequence networks and calculate
i) the current in each line
ii) the fault current
iii) the line to neutral voltages
iv) the line to line voltages
Denoting the neutral point as n and the ground as o , draw the phasor
diagram of line to neutral voltages.
5. Repeat Problem 4 for line to line fault.
6. Repeat Problem 4 for double line to ground fault.
7. Repeat Problem 4 for symmetrical three phase fault.
8. Consider the alternator described in Problem 4. It is required to limit the
fault current to 2500 A for single line to ground fault. Find the additional
reactance necessary to be introduced in the neutral.
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9. Two synchronous machines are connected through three-phase
transformers to the transmission line as shown.
The ratings and reactances of the machines and transformers are:
Machines 1 and 2: 100 MVA, 20 kV, X1 = X2 = 20 %, Xm0 = 4 %, Xn = 5 %
Transformers T1 and T2: 100 MVA, 20 Δ / 345 Y kV, X = 8 %
On a chosen base of 100 MVA, 345 kV in the transmission line circuit, the
line reactances are X1 = X2 = 15 % and X0 = 50 %. Draw each of the three
sequence networks and find Zbus0, Zbus
1 and Zbus2.
2 1
1
T1
4 3
2
T2
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101
10. The one-line diagram of a power system is shown below.
The following are the p.u. reactances of different elements on a common
base.
Generator 1: Xg0 = 0.075; Xn = 0.075; X1 = X2 = 0.25
Generator 2: Xg0 = 0.15; Xn = 0.15; X1 = X2 = 0.2
Generator 3: Xg0 = 0.072; X1 = X2 = 0.15
Transformer 1: X0 = X1 = X2 = 0.12
Transformer 2: X0 = X1 = X2 = 0.24
Transformer 3: X0 = X1 = X2 = 0.1276
Transmission line 2 – 3 X0 = 0.5671; X1 = X2 = 0.18
Transmission line 3 – 5 X0 = 0.4764; X1 = X2 = 0.12
Draw the three sequence networks and determine Zbus0, Zbus
1 and Zbus2.
6 5
4
3 2 1
1 3
2
T1
T2
T3
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102
11. The single line diagram of a small power system is shown below.
Generator: 100 MVA, 20 kV, X1 = X2 = 20 %, Xg0 = 4 %, Xn = 5 %
Transformers T1 and T2: 100 MVA, 20 Δ / 345 Y kV, X = 10 %
On a chosen base of 100 MVA, 345 kV in the transmission line circuit, the
line reactances are:
From T1 to P: X1 = X2 = 20 %; X0 = 50%
From T2 to P: X1 = X2 = 10 %; X0 = 30%
A bolted single lone to ground occurs at P. Determine
i) fault current IfA, IfB and IfC.
ii) currents flowing towards P from T1.
iii) currents flowing towards P from T2.
iv) current supplied by the generator.
Note that the positive sequence current in Δ winding of transformer lags
that in Y winding by 300; the negative sequence current in Δ winding leads
that in Y winding by 300.
2 1
1
T1
4 3
T2
P
S
Switch open
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103
12. In the power system described in Problem 10, a single line to ground fault
occurs at bus 2 with a fault impedance of j0.1. Determine the bus currents
at the faulted bus and the voltages at buses 1 and 2.
ANSWERS
1. 0
c0b0a0 1202III ; 0
a1 303.5I ; 0
b1 2703.5I ; 0
c1 1503.5I
0
a2 603I ; 0
b2 1803I ; 0
c2 3003I
2. 0
a 59.857.0311I ; 0
b 203.844.3733I ; 0
c 160.752.681I
3. 15jZZ;33jZ 210
4. Ia = -j 3586.1 A Ib = 0 Ic = 0 If = -j 3586.1 A
Va = 0 Vb = 8.0694 0102.22 kV Vc = 8.0694 0102.22 kV
Vab = 8.0694 077.78 kV; Vbc= 15.7724 090 kV; Vca= 8.0694 0102.22 kV
5. Ia = 0 Ib = -2415.5 A Ic = 2415.5 A If = -2415.5 A
Va = 9.2948 kV Vb = -4.6474 kV Vc = -4.6474 kV
Vab = 13.9422 kV Vbc = 0 Vca = 13.9422 0180 kV
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j0.5 j0.08 j0.08
j0.04
j0.15
j0.04
j0.15
4 3 2 1
6. Ia = 0 Ib = 4020.95 0132.22 A Ic = 4020 047.78 A If = 5956.08 090 A
Va = 5.6720 kV Vb = 0 Vc = 0
Vab = 5.6720 kV Vbc = 0 Vca = 5.6720 0180 kV
7. Ia = 3347 090 A Ib = 3347 0150 A Ic = 3347 030 A
If = 3347 090 A
Va = Vb = Vc = 0
Vab = Vbc = Vca = 0
8. 0.9655 Ω
9. Zero sequence network:
Reference
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105
1 2 j0.15 j0.08 j0.08
j0.2 j0.2
3 4
1
+
2
-
j0.15 j0.08 j0.08
j0.2 j0.2
3 4
-
+
Positive sequence network:
Negative sequence network:
Reference
Reference
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4
3
2
1
j
4
3
2
1
j
1 2 3 4
j0.5671
1
j0.4764 j0.12
j0.075
j0.225
4
3 2 1
j0.15
5 6 j0.1276
j0.24
j0.45
j0.072
Zbus0 =
0.19000
00.580.080
00.080.080
0000.19
Zbus1 = Zbus
2 =
0.14370.12110.07890.0563
0.12110.16960.11040.0789
0.07890.11040.16960.1211
0.05630.07890.12110.1437
10. Zero sequence network:
Reference
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2
3
4
5
j0.18 j0.12 j0.12
j0.25 4
3 2 1
j0.2
5 6 j0.1276
j0.24
j0.15
Zbus0 = j
0.65427100.1778710.0310650
00.6000
0.17787100.1778710.0310650
0.03106500.0310650.1044680
00000.3
Negative sequence network:
Reference
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1 2 3 4 5 6
1
2
3
4
5
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Zbus1 = Zbus
2 =
j
0.1149560.0851450.0259590.0571090.0384190.025959
0.0851450.1575740.0480410.1056900.0711010.048041
0.0259590.0480410.1403670.0688080.0462890.031276
0.0571090.1056900.0688080.1513770.1018360.068808
0.0384190.0711010.0462890.1018360.1895000.128108
0.0259590.0480410.0312760.0688080.1281080.167640
11. IfA = - j 2.4195 p.u.; IfB = 0; IfC = 0
IA = - j 1.9356 p.u.; IB = j 0.4839 p.u.; IC = j 0.4839 p.u.
IA = - j 0.4839 p.u.; IB = - j 0.4839 p.u.; IC = - j 0.4839 p.u.
Ia = - j 1.3969 p.u.; IB = j 1.4969 p.u.; IC = 0
12. I2a = j 3.828162 p.u.; I2b = 0; I2c = 0
V2a = 0.382815 p.u.; V2b = 0.950352 245.680 p.u.
V2c = 0.950352 114.320 p.u.
V1a = 0.673054 p.u.; V1b = 0.929112 248.760 p.u.
V1c = 0.929112 111.2360 p.u.