Implement singlephase transmission line with lumped parameters
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The PI Section Line block implements a singlephase transmission line with parameters lumped in PI sections.
For a transmission line, the resistance, inductance, and capacitance are uniformly distributed along the line. An approximate model of the distributed parameter line is obtained by cascading several identical PI sections, as shown in the following figure.
Unlike the Distributed Parameter Line block, which has an infinite number of states, the PI section linear model has a finite number of states that permit you to compute a linear statespace model. The number of sections to be used depends on the frequency range to be represented.
An approximation of the maximum frequency range represented by the PI line model is given by the following equation:
$${f}_{\mathrm{max}}=\frac{N\cdot v}{8\cdot ltot}$$
where
N  Number of PI sections 
v  Propagation speed (km/s) = $$1=\sqrt{lc}$$; l in H/km, c in F/km 
ltot  Line length (km) 
For example, for a 100 km aerial line having a propagation speed of 300,000 km/s, the maximum frequency range represented with a single PI section is approximately 375 Hz. For studying interactions between a power system and a control system, this simple model could be sufficient. However for switching surge studies involving highfrequency transients in the kHz range, much shorter PI sections should be used. In fact, you can obtain the most accurate results by using a distributed parameters line model.
The powergui block provides the RLC Line Parameters tool, which calculates resistance, inductance, and capacitance per unit of length based on the line geometry and the conductor characteristics.
For short line sections (approximately lsec <50 km) the RLC elements for each line section are simply given by:
$$\begin{array}{l}R=r\cdot l\mathrm{sec}\\ L=l\cdot l\mathrm{sec}\\ C=c\cdot l\mathrm{sec}\end{array}$$
where
r  Resistance per unit length (Ω/km) 
l  Inductance per unit length (H/km) 
c  Capacitance per unit length (F/km) 
f  Frequency (Hz) 
lsec  Line section length = ltot / N (km) 
However, for long line sections, the RLC elements given by the above equations must be corrected in order to get an exact line model at a specified frequency. The RLC elements are then computed using hyperbolic functions as explained below.
$$\omega =2\pi f$$
Per unit length series impedance at frequency f is
$$z=r+j\omega l$$
Per unit length shunt admittance at frequency f is
$$y=j\omega c$$
Characteristic impedance is
$${Z}_{c}=\sqrt{z/y}$$
Propagation constant is
$$\gamma =\sqrt{z\cdot y}$$
$$Z=R+j\omega L={Z}_{c}\cdot \mathrm{sinh}\left(\gamma \cdot l\mathrm{sec}\right)$$
$$R=\text{real}\left(Z\right)$$
$$L=\text{imag}\left(Z\right)/\omega $$
$$Y=\frac{2}{{Z}_{c}}\cdot \mathrm{tanh}\left(\gamma \cdot \frac{l\mathrm{sec}}{2}\right)$$
$$C=\text{imag}\left(Y\right)/\omega $$
Hyperbolic corrections result in RLC values slightly different from the noncorrected values. R and L are decreased while C is increased. These corrections become more important as line section length is increasing. For example, let us consider a 735 kV line with the following positivesequence and zerosequence parameters (these are the default parameters of the ThreePhase PI Section Line block and Distributed Parameter Line block):
Positive sequence 
 
Zero sequence 

For a 350 km line section, noncorrected RLC positivesequence values are:
$$\begin{array}{l}R=0.01273\times 350=4.455\text{}\Omega \\ L=0.9337\times {10}^{3}\times 350=0.3268\text{H}\\ C=12.74\times {10}^{9}\times 350=4.459\times {10}^{6}\text{F}\end{array}$$
Hyperbolic correction at 60 Hz yields:
$$\begin{array}{l}R=4.153\text{}\Omega \\ L=0.3156\text{H}\\ C=4.538\times {10}^{6}\text{F}\end{array}$$
For these particular parameters and long line section (350 km), corrections for positivesequence RLC elements are relatively important (respectively −6.8%, −3.4%, and + 1.8%). For zerosequence parameters, you can verify that even higher RLC corrections must be applied (respectively −18%, −8.5%, and +4.9%).
The PI Section Line block always uses the hyperbolic correction, regardless of the line section length.
Frequency f, in hertz (Hz), at which per unit length
r, l, c parameters are specified.
Hyperbolic correction is applied on RLC elements of each line section using this frequency.
Default is 60
.
The resistance per unit length of the line, in ohms/km (Ω/km). Default is
0.01273
.
The inductance per unit length of the line, in henries/km (H/km). This parameter cannot
be zero, because it would result in an invalid propagation speed computation. Default is
0.9337e3
.
The capacitance per unit length of the line, in farads/km (F/km). This parameter cannot
be zero, because it would result in an invalid propagation speed computation. Default is
12.74e9
.
The line length in km. Default is 100
.
The number of PI sections. The minimum value is 1. Default is
1
.
Select Input and output voltages
to measure the sending end (input
port) and receiving end (output port) voltages of the line model.
Select Input and output currents
to measure the sending end and
receiving end currents of the line model.
Select All pisection voltages and currents
to measure voltages and
currents at the start and end of each pisection.
Select All voltages and currents
to measure the sending end and
receiving end voltages and currents of the line model.
Default is None
.
Place a Multimeter block in your model to display the selected measurements during the simulation. In the Available Measurements list box of the Multimeter block, the measurement is identified by a label followed by the block name.
Measurement  Label 

Sending end voltage (block input) 

Receiving end voltage (block output) 

Sending end current (input current) 

Receiving end current (output current) 

The power_piline
example
shows the line energization voltages and currents of a PI section line.