Calculations
of fault current at different busses of complex power system and contributions
of fault current by different elements in the power system are done using
computer programs. These computer program utilizes matrix models of power
systems. Using this program we can have fault currents at various busses in power
system (for 3-Ph and 1-Ph faults at that busses). However for radial network or
very small network under consideration we can do the calculations manually (or
using Excel) using network element modeling discussed above and by using normal
network reduction techniques. To explain the method let us use same power
system as discussed above. Let us find the fault MVA (and current) for 3-Ph
fault at 132kV bus.
Formula for calculating
3-Ph fault current
It
is customary to calculate short circuit MVA. Hence-
Once we know the short circuit MVA
it can be converted to corresponding short circuit current simply by multiplying
this value by a conversion factor for respective voltage. The conversion factor
for most common voltage levels are as shown in flowing table
SrNo
|
Voltage
Level
|
Ampere
equivalent to 1 MVA
|
1.
|
400kV
|
1.44
|
2.
|
220kV
|
2.625
|
3.
|
132kV
|
4.375
|
4.
|
33kV
|
17.5
|
+Ve Sequence Impedance
of the Grid Source.
As discussed previously the fault currents for
faults at busses in a complex grid are calculated using computer programs.
Hence using reverse engineering the complete grid for which such fault currents
already known can be replaced with a source in series with reactance having
value
Here
subscript 1 represents +Ve sequence reactance of the grid. More about sequence
impedances is explained through respective sections.
.
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