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Transcript
SEE1003
Circuit Theory
Chapter 6
Capacitors and Inductors
Copyright © The McGraw-Hill Companies, Inc. Permission required for reproduction or display.
1
Capacitors and Inductors
Chapter 6
6.1
6.2
6.3
6.4
Capacitors
Series and Parallel Capacitors
Inductors
Series and Parallel Inductors
2
6.1 Capacitors (1)
• A capacitor is a passive element designed
to store energy in its electric field.
• A capacitor consists of two conducting plates
separated by an insulator (or dielectric).
3
6.1 Capacitors (2)
• Capacitance C is the ratio of the charge q on one
plate of a capacitor to the voltage difference v
between the two plates, measured in farads (F).
qC v
and
C
 A
d
• Where  is the permittivity of the dielectric material
between the plates, A is the surface area of each
plate, d is the distance between the plates.
• Unit: F, pF (10–12), nF (10–9), and F (10–6)
4
6.1 Capacitors (3)
• If i is flowing into the +ve
terminal of C
– Charging => i is +ve
– Discharging => i is –ve
• The current-voltage relationship of capacitor
according to above convention is
dv
iC
dt
and
1
v
C

t
t0
i d t  v(t0 )
5
6.1 Capacitors (4)
• The energy, w, stored in
the capacitor is
1
w  C v2
2
• A capacitor is
– an open circuit to dc (dv/dt = 0).
– its voltage cannot change abruptly.
6
6.1 Capacitors (5)
Example 1
The current through a 100-F capacitor is
i(t) = 50 sin(120 t) mA.
Calculate the voltage across it at t =1 ms and
t = 5 ms.
Take v(0) =0.
Answer:
v(1ms) = 93.14mV
v(5ms) = 1.7361V
7
6.1 Capacitors (6)
Example 2
An initially uncharged 1-mF capacitor has the
current shown below across it.
Calculate the voltage across it at t = 2 ms and
t = 5 ms.
Answer:
v(2ms) = 100 mV
v(5ms) = 500 mV
8
Example 2a
Determine the current through a 200-F capacitor
whose voltage is shown below.
v(t)
50
0
1
2
3
4
t
-50
9
6.2 Series and Parallel
Capacitors (1)
• The equivalent capacitance of N parallelconnected capacitors is the sum of the individual
capacitances.
C eq  C1  C 2  ...  C N
10
6.2 Series and Parallel
Capacitors (2)
• The equivalent capacitance of N series-connected
capacitors is the reciprocal of the sum of the
reciprocals of the individual capacitances.
1
1
1
1


 ... 
Ceq C1 C2
CN
11
6.2 Series and Parallel
Capacitors (3)
Example 3
Find the equivalent capacitance seen at the
terminals of the circuit in the circuit shown below:
Answer:
Ceq = 40F
12
6.2 Series and Parallel
Capacitors (4)
Example 4
Find the voltage across each of the capacitors in
the circuit shown below:
Answer:
v1 = 30V
v2 = 30V
v3 = 10V
v4 = 20V
13
6.3 Inductors (1)
• An inductor is a passive element designed
to store energy in its magnetic field.
• An inductor consists of a coil of conducting wire.
14
6.3 Inductors (2)
• Inductance is the property whereby an inductor
exhibits opposition to the change of current
flowing through it, measured in henrys (H).
di
vL
dt
and
N2  A
L
l
• The unit of inductors is Henry (H), mH (10–3)
and H (10–6).
15
6.3 Inductors (3)
• The current-voltage relationship of an inductor:
1
i
L

t
t0
v (t ) d t  i (t 0 )
• The power stored by an inductor:
1
w  L i2
2
• An inductor acts like a short circuit to dc (di/dt = 0)
and its current cannot change abruptly.
16
6.3 Inductors (4)
Example 5
The terminal voltage of a 2-H
inductor is
v = 10(1-t) V
Find the current flowing through it at
t = 4 s and the energy stored in it
within 0 < t < 4 s.
Answer:
Assume i(0) = 2 A. i(4s) = -18V
w(4s) = 320J
17
6.3 Inductors (5)
Example 6
Determine vc, iL, and the energy stored in the
capacitor and inductor in the circuit of circuit shown
below under dc conditions.
Answer:
iL = 3A
vC = 3V
wL = 1.125J
wC = 9J
18
6.4 Series and Parallel
Inductors (1)
• The equivalent inductance of series-connected
inductors is the sum of the individual
inductances.
Leq  L1  L2  ...  LN
19
6.4 Series and Parallel
Inductors (2)
• The equivalent capacitance of parallel inductors
is the reciprocal of the sum of the reciprocals of
the individual inductances.
1
1
1
1


 ... 
Leq L1 L2
LN
20
6.4 Series and Parallel
Capacitors (3)
Example 7
Calculate the equivalent inductance for the
inductive ladder network in the circuit
shown below:
Answer:
Leq = 25mH
21
6.4 Series and Parallel
Capacitors (4)
• Current and voltage relationship for R, L, C
+
+
+
22
Capacitor and Inductor
 They both store electrical energy.
 The capacitor stores its energy in an
electric field, whereas an inductor
stores its energy in a magnetic filed.
 They both oppose changes in a
variable in a circuit. The capacitor
opposes changes in voltage, whereas
the inductor opposes changes in
current.
Capacitor and Inductor
In other words, the inductor likes to
maintain a constant current;
whereas the capacitor likes to
maintain a constant voltage.
 A capacitor behaves as a voltage
source, whereas an inductor behaves
as a current source.
Capacitor and Inductor
 The voltage across a capacitor can
not change abruptly, whereas the
current through an inductor cannot
change abruptly.
 There must be the continuity in the
capacitor voltage; there must be the
continuity in the inductor current.
Resistor, Capacitor, and Inductor
 Resistor: the ability to resist the
flow of electric current through it.
 Capacitor: the ability to oppose the
change of voltage across it.
 Inductor: the ability to oppose the
change of current flowing through it.
Resistor, Capacitor, and Inductor
In DC Circuits
Their effect:
 Resistor: Limit the current.
 Capacitor: Try to maintain the
voltage constant. Slow down the
increasing or decreasing of the
voltage.
 Inductor: Try to maintain the
current constant. Slow down the
increasing or decreasing of the
current