Post on 31-Dec-2015
Chapter 15 – Series & Parallel ac Circuits
Lecture 19
by Moeen Ghiyas
19/04/23 1
Chapter 15 – Series & Parallel ac Circuits
(Series ac Circuits)
Impedance and Phasors Diagram
Series Configuration
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Resistive Elements - For the purely resistive circuit,
Time domain equations: v = Vm sin ωt and i = Im sin ωt
In phasor form:
Where V = 0.707Vm and where I = 0.707Im
Applying Ohm’s law and using phasor algebra, we have
Since i and v are in phase, thus, θR = 0°, if phase is to be same.
Thus, we define a new term, ZR as impedance of a resistive
element (which impedes flow of current)19/04/23 4
Inductive Reactance - For the inductive circuit,
Time domain equations: v = Vm sin ωt and i = Im sin ωt
In phasor form:
Where V = 0.707Vm and where I = 0.707Im
Applying Ohm’s law and using phasor algebra, we have
Since i lags v by 90°, thus, θL = 90°, for condition to be true.
Thus, we define term, ZL as impedance of an inductive element
(which impedes flow of current) 19/04/23 5
Capacitive Reactance - For a capacitive circuit,
Time domain equations: v = Vm sin ωt and i = Im sin ωt
In phasor form:
Where V = 0.707Vm and where I = 0.707Im
Applying Ohm’s law and using phasor algebra, we have
Since i leads v by 90°, thus, θC = –90°, for condition to be true.
Thus, we define term, ZC as impedance of a capacitive element
(which impedes flow of current) 19/04/23 6
However, it is important to realize that ZR is not a phasor,
even though the format is very similar to
the phasor notations for sinusoidal currents and voltages.
The term phasor is basically reserved for quantities that vary
with time, whereas R and its associated angle of 0° are
fixed, i.e. non-varying quantities.
Similarly ZL and ZC are also not phasor quantities
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Example – Find the current i for the circuit of fig. Sketch the
waveforms of v and i.
Solution:
In phasor form
From ohm’s law
Converting to time domain
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Sketch of waveform and Phasor Diagram
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Example – Find the voltage v for the circuit of fig. Sketch the
waveforms of v and i.
Solution:
In phasor form
From ohm’s law
Converting to time domain
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Sketch of waveform and Phasor Diagram
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Example – Find the voltage v for the circuit of fig. Sketch the
waveforms of v and i.
Solution:
In phasor form
From ohm’s law
Converting to time domain
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Sketch of waveform and Phasor Diagram
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Impedance Diagram - For any network,
Resistance is plotted on the positive real axis,
Inductive reactance on the positive imaginary axis, and
Capacitive reactance on the negative imaginary axis.
Impedance diagram reflects the individual and total impedance
levels of ac network.
Impedance Diagram
The magnitude of total impedance of a network defines the
resulting current level (through Ohm’s law)
For any configuration (series, parallel, series-parallel, etc.), the
angle associated with the total impedance is the angle by
which the applied voltage leads the source current.
Thus angle of impedance reveals whether the network is primarily
inductive or capacitive or simply resistive.
For inductive networks θT will be positive, whereas for capacitive
networks θT will be negative, and θT will be zero for resistive cct.
Overall properties of series ac circuits are the same as those
for dc circuits
For instance, the total impedance of a system is the sum of
the individual impedances:
EXAMPLE - Determine the input impedance to the series
network of fig. Draw the impedance diagram.
Solution:
EXAMPLE - Determine the input impedance to the series
network of fig. Draw the impedance diagram.
Solution:
Current is same in ac series circuits just like it is in dc circuits.
Ohm’s law applicability is same.
KVL applies in similar manner.
The power to the circuit can be determined by
where θT is the phase angle between E and I.19/04/23 19
Impedance Relation with Power Factor
We know that
Reference to figs and equations
θT is not only the impedance angle of ZT but also
θT is the phase angle between the input voltage
and current for a series ac circuit.
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Phasor Diagram
Impedance Diagram
Note: θT of ZT is with reference to voltage unlike FP . Also current I
is in phase with VR, lags the VL by 90°, and leads the VC by 90°.
R-L-C Example
Step 1 – Convert Available information to Phasor Notation
R-L-C Example
. Step 2 – Find ZT and
make impedance
diagram
R-L-C Example
Step 3 – Find I or E
R-L-C Example
Step 4 – Find phasor voltages across each element
R-L-C Example
I =
VR =
VL =
VC =
. Step 5 – Make phasor diagram
and
. apply KVL (for verification or if
req)Note: Current I in phase with VR,
lags the VL by 90°, and leads the VC
by 90°
R-L-C Example
Step 6 – Convert phasor values to time domain
R-L-C Example
Step 7 – Plot all
the voltages and
the current of the
circuit
R-L-C Example
Step 8 – Calculation of total power in watts delivered to the circuit
or
or
R-L-C Example
Step 9 – The power factor of the circuit is
or
(Series ac Circuits)
Impedance and Phasors Diagram
Series Configuration
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