Chapter 2: Fundamentals of Electric Circuit
Transcript of Chapter 2: Fundamentals of Electric Circuit
CHAPTER 2
FUNDAMENTALS OF
ELECTRIC CIRCUITS
EEE 1012 INTRODUCTION TO ELECTRICAL ENGINEERING
INDEPENDENT SOURCES
• The voltage/current sources that have the capability of
generating a prescribed voltage or current independent of
any other element within the circuit.
• These sources may output a constant voltage/current, or
they may output voltage/current that varies with time.
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PRINCIPAL ELEMENTS OF ELECTRICAL
CIRCUITS
1) Ideal Voltage Sources
An ideal voltage source is a two-terminal element thatmaintains the same voltage across its terminals regardlessof the current flowing through it.
• Vt = constant, no matter what the load current is.
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Vt
IL
Vo
L
t
+
-
Vo
2) Ideal Current Sources
An ideal current source is a two-terminal element thatmaintains the same current regardless of the voltageacross its terminals.
• IS = constant, no matter what the load voltage is.
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IO
VO
IS
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DEPENDENT (CONTROLLED) SOURCES
• Dependent sources are whose output (current or voltage)
is a function of some other voltage or current in a circuit.
• The symbols typically used to represent dependent
sources are in the shape of a diamond.
BRANCH, NODE, LOOP, MESH
• Branch : any portion of a circuit with two terminals
connected to it.
• A branch may consist of one or more circuit elements.
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• Node : the point of connection between two or more
branches.
• A node usually indicated by a dot in a circuit.
• Loop : any closed path through the circuit in which no
node is encountered more than once.
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• Mesh : a loop that does not contain other loops.
Electric Current
• Electric current is defined as the time rate of change of
charge passing through a predetermined area.
𝑖 =∆𝑞
∆𝑡𝑜𝑟 𝑖 =
𝑑𝑞
𝑑𝑡
• The units of current are called Amperes, where
1 Ampere (A) = 1 Coulomb/second (C/s).
• In order for current to flow, there must exist a closed
circuit.
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CURRENT AND KIRCHHOFF’S CURRENT
LAW
• In the circuit of this figure, the current i flowing from the
battery to the light bulb is equal to the current flowing from
the light bulb to the battery.
no current (and therefore no charge) is “lost” around
the closed circuit. This principle is known as
Kirchhoff’s current law (KCL).
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EEE 1012 INTRODUCTION TO ELECTRICAL ENGINEERING
Kirchhoff’s Current Law (KCL)
• One of the fundamental laws of circuit analysis.
• Establish in 1874 by G.R. Kirchhoff.
• “The sum of the currents at a node must equal zero.”
𝑛=1
𝑁
𝑖𝑛 = 0 𝑜𝑟
(𝐸𝑛𝑡𝑒𝑟𝑖𝑛𝑔 𝑐𝑢𝑟𝑟𝑒𝑛𝑡𝑠) = (𝐿𝑒𝑎𝑣𝑖𝑛𝑔 𝑐𝑢𝑟𝑟𝑒𝑛𝑡𝑠)
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• Example of Kirchhoff’s current law:
At node 1:
−𝑖 + 𝑖1 + 𝑖2 + 𝑖3 = 0
𝑖 = 𝑖1 + 𝑖2 + 𝑖3
• In this illustration, currents
entering a node are defined as
negative and currents leaving
the node as positive.
Voltage
• The total work per unit charge associated with the motion
of charge between two points.
• The units of voltage are called Volts, where
1 Volts (V) = 1 Joule (J)/Coulomb (C).
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VOLTAGE AND KIRCHHOFF’S VOLTAGE
LAW
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Kirchhoff’s Voltage Law (KVL)
• The second fundamental laws of circuit analysis introduced
by G.R. Kirchhoff.
• The principle underlying KVL is that no energy is lost or
created in an electric circuit.
• In circuit terms, the sum of all voltages associated with
source must equal the sum of the load voltages.
• “The net voltage around a closed circuit is zero.”
𝑛=1
𝑁
𝑣𝑛 = 0
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• Example of Kirchhoff’s voltage law:
𝑣1 = 𝑣2 where
𝑣2 = 𝑣𝑎𝑏 = 𝑣𝑎 − 𝑣𝑏
• In general, elements that provide
energy are referred as sources
and elements that dissipate energy
as loads.
Power
• The electric power generated by an active element, or
that dissipated or stored by a passive element, is equal to
the product of the voltage across the element and the
current flowing through it.
• The units of power are called Watts (Joules/second).
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ELECTRIC POWER AND SIGN
CONVENTION
𝑷 = 𝑽𝑰
Passive Sign Convention
• State that if current flows from a higher to a lower voltage
(plus to minus), the power is dissipated and will be a positive
quantity.
• Example:
• Power generated (supplied) always equals power dissipated.
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Power dissipated = vi Power dissipated = - vi
Power generated = vi
• An ideal resistor is a device that exhibits linear resistance
properties according to Ohm’s law,
which states that the
voltage across a
resistance is directly
proportional to the current
flowing through it.
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RESISTANCE AND OHM’S LAW
𝑽 = 𝑰𝑹
FUNDAMENTAL OF ELECTRICAL ENGINEERING, First Edition, by Giorgio Rizzoni, © 2009 McGraw-Hill Companies, Inc.
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• The value of the resistance R is measured in units of
ohm’s (), where
1 = 1 V/A
• For a resistor R, the power dissipated can be expressed
by
𝑷 = 𝑽𝑰 = 𝑰𝟐𝑹 =𝑽𝟐
𝑹
Open and Short Circuits
• Open circuit : a circuit element whose resistance
approaches infinity.
• Short circuit : a circuit element with resistance
approaching zero.
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Series Circuit
• Two or more circuit elements are said to be in series if the
current from one element exclusively flows into the next
elements.
• All series elements have the same current.
Series Resistors
• Equivalent series resistance:
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𝑹𝑬𝑸 =
𝒏=𝟏
𝑵
𝑹𝒏 = 𝑹𝟏 + 𝑹𝟐 +⋯+ 𝑹𝑵
• Example 2.1:
For the circuit shown,
a) Find the equivalent resistance seen by the source.
b) Find the current I .
c) Calculate the voltage drop in each resistor.
d) Calculate the power dissipated by each resistor.
e) Find the power output of the source.
Given: V = 24 V, R1 = 1 , R2 = 3 , and R3 = 4 .
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EEE 1012 INTRODUCTION TO ELECTRICAL ENGINEERING
b) 𝐼 =𝑉
𝑅𝐸𝑄=
24 𝑉
8 Ω= 3 𝐴
c) 𝑉1 = 𝐼𝑅1 = 3 𝐴 1 Ω = 3 𝑉
𝑉2 = 𝐼𝑅2 = 3 𝐴 3 Ω = 9 𝑉
𝑉3 = 𝐼𝑅3 = 3 𝐴 4 Ω = 12 𝑉
Solution:
a) 𝑅𝐸𝑄 = 𝑅1 + 𝑅2 + 𝑅3
= 1 + 3 + 4
= 8
REQ
Note: 𝑉1 + 𝑉2 + 𝑉3 = 3 + 9 + 12 = 24 𝑉
The total voltage drop is equal to the voltage output of the source.
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Note: 𝑃1 + 𝑃2 + 𝑃3 = 9 + 27 + 36 = 72 𝑉
The total power dissipated by the resistors is the same as the power output by the source.
e) 𝑃 = 𝐼𝑉 = 3 𝐴 24 𝑉 = 72𝑊
d) 𝑃1 = 𝐼2𝑅1
= 3 𝐴 2 1 Ω
= 9𝑊
𝑃2 = 𝐼2𝑅2
= 3 𝐴 2 3 Ω
= 27 𝑊
𝑃3= 𝐼2𝑅3
= 3 𝐴 2 4 Ω
= 36 𝑊
Parallel Circuit
• Two or more circuit elements are said to be in parallel if
the elements share the same terminals.
• All parallel elements have the same voltage.
Parallel Resistors
• Equivalent parallel resistance:
or
where
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𝟏
𝑹𝑬𝑸=
𝟏
𝑹𝟏+
𝟏
𝑹𝟐+⋯+
𝟏
𝑹𝑵
𝑹𝑬𝑸 =𝟏
𝟏 𝑹𝟏+ 𝟏 𝑹𝟐
+⋯+ 𝟏 𝑹𝑵
𝑉1 = 𝑉2 = 𝑉3 = 𝑉4
Various Parallel Resistors Networks
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• Example 2.2:
For the circuit shown,
a) Find the equivalent resistance seen by the source.
b) Find the total current I .
c) Calculate the currents in each resistor.
d) Calculate the power dissipated by each resistor.
e) Find the power output of the source.
Given: V = 24 V, R1 = 1 , R2 = 3 , and R3 = 4 .
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Solution:
a) 1
𝑅𝐸𝑄=
1
𝑅1+
1
𝑅2+
1
𝑅3=
1
1+
1
3+
1
4= 1.583 Ω
∴ 𝑅𝐸𝑄 =1
1.583= 0.632 Ω
b) 𝐼 =𝑉
𝑅𝐸𝑄=
24 𝑉
0.632 Ω= 37.975 𝐴 ≈ 38 𝐴
REQ
I
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c) 𝐼1 =𝑉
𝑅1=
24 𝑉
1 Ω= 24 𝐴
REQ
I
𝐼2 =𝑉
𝑅2=
24 𝑉
3 Ω= 8 𝐴
𝐼3 =𝑉
𝑅3=
24 𝑉
4 Ω= 6 𝐴
Note: 𝐼1 + 𝐼2 + 𝐼3 = 24 + 8 + 6 = 38 𝐴
The sum of the individual current is equal to the current output of the
source.
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Note: 𝑃1 + 𝑃2 + 𝑃3 = 576 + 192 + 144 = 912 𝑉
The total power dissipated by the resistors is the same as the power output by the source.
e) 𝑃 = 𝐼𝑉 = 38 𝐴 24 𝑉 = 912 𝑊
d) 𝑃1 = 𝐼12𝑅1
= 24 𝐴 2 1 Ω
= 576 𝑊
𝑃2 = 𝐼22𝑅2
= 8 𝐴 2 3 Ω
= 192𝑊
𝑃3= 𝐼32𝑅3
= 6 𝐴 2 4 Ω
= 144 𝑊
Series and Parallel Resistor Combinations
• Example 2.3:
The Wheatstone Bridge consists of two series circuits that are connected
in parallel with each other.
1) Find the value of the voltage
Vab = Vad - Vbd in terms of the four
resistances and the source voltage Vs.
2) If R1 = R2 = R3 = 1 k, Vs = 12 V,
and Vab = 12 mV, what is the value
of Rx.
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EEE 1012 INTRODUCTION TO ELECTRICAL ENGINEERING
Solution:
1) 𝑉𝑎𝑑 =𝑅2
𝑅1+𝑅2𝑉𝑠 and 𝑉𝑏𝑑 =
𝑅𝑥
𝑅3+𝑅𝑥𝑉𝑠
Thus,
𝑉𝑎𝑏 = 𝑉𝑎𝑑 − 𝑉𝑏𝑑 = 𝑅2
𝑅1+𝑅2−
𝑅𝑥
𝑅3+𝑅𝑥𝑉𝑠
2) 0.012 =1000
1000+1000−
𝑅𝑥
1000+𝑅𝑥12
𝑅𝑥 = 996 Ω
R1
R2
R3
RX
Vs
a Vab b
c
d
R1
R2
R3
RX
Voltage Divider Rule (VDR)
• VDR is useful in determining the voltage drop across a
resistance within a series circuit.
where VX = the voltage drop across the measured resistor,
RX = the resistance value of the measured resistor,
REQ = the circuit total resistance,
VS = the circuit applied voltage
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𝑽𝑿 =𝑹𝑿
𝑹𝑬𝑸𝑽𝑺
+ V1 -
+ V3 -
+
V2
-S
• Example 2.4:
Determine the voltage across the R2 and the R3.
Solution:
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𝑉2 =𝑅2𝑅𝐸𝑄
𝑉𝑆 =20
10 + 20 + 3060 = 20 V
𝑉3 =𝑅3𝑅𝐸𝑄
𝑉𝑆 =30
10 + 20 + 3060 = 30 V
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Current Divider Rule (CDR)
• CDR is useful in determining the current flow through one
branch of a parallel circuit.
where IX = the current flow through any parallel branches,
RX = the resistance of the branch through which the
current is to be determined,
REQ = the total resistance of the parallel branch,
IS = the circuit applied current
𝑰𝑿 =𝑹𝑬𝑸
𝑹𝑿𝑰𝑺
• Example 2.5:
Find each of the branch currents in the figure shown below.
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Solution:
𝑅1 𝑅2 𝑅3
1
𝑅𝐸𝑄=
1
𝑅1+
1
𝑅2+
1
𝑅3=
1
3 𝑘Ω+
1
8 𝑘Ω+
1
24 𝑘Ω=
1
2 𝑘Ω
𝑅𝐸𝑄 = 2 𝑘Ω
Thus,
𝐼𝑅1 =𝑅𝐸𝑄𝑅1
∙ 𝐼 =2 𝑘Ω
3 𝑘Ω12 𝑚𝐴 = 8 𝑚𝐴
𝐼𝑅2 =𝑅𝐸𝑄𝑅2
∙ 𝐼 =2 𝑘Ω
8 𝑘Ω12 𝑚𝐴 = 3 𝑚𝐴
𝐼𝑅3 =𝑅𝐸𝑄𝑅3
∙ 𝐼 =2 𝑘Ω
24 𝑘Ω12 𝑚𝐴 = 1 𝑚𝐴
𝐼𝑅1 + 𝐼𝑅2 + 𝐼𝑅3 = 8 + 3 + 1 = 12 𝑚𝐴 ( KCL )
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• For the particular case of two parallel resistors,
and, the current passing through
R1 and R2 are
𝐼1 =𝑅𝐸𝑄
𝑅1∙ 𝐼 =
𝑅1𝑅2𝑅1+𝑅2
𝑅1∙ 𝐼
𝐼2 =𝑅𝐸𝑄
𝑅2∙ 𝐼 =
𝑅1𝑅2𝑅1+𝑅2
𝑅2∙ 𝐼
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𝑹𝑬𝑸 = 𝑹𝟏 𝑹𝟐 =𝑹𝟏𝑹𝟐
𝑹𝟏 + 𝑹𝟐
I
I1 I2
𝑰𝟏 =𝑹𝟐
𝑹𝟏 + 𝑹𝟐∙ 𝑰
𝑰𝟐 =𝑹𝟏
𝑹𝟏 + 𝑹𝟐∙ 𝑰
Note: It only works for two parallel resistors.
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MEASURING DEVICES
Ohmmeter
• The ohmmeter is a device that, when
connected across a circuit element,
can measure the resistance of the
element.
• The resistance of an element can be
measured only when the element is
disconnected from any other circuit.
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Ammeter
• The ammeter is a device that, when connected in series
with a circuit element, can measure the current flowing
through the element.
1. The ammeter must be placed in series with the
element whose current is to be measured (e.g.,
resistor R2).
2. The ammeter should not restrict the flow of current
(i.e., cause a voltage drop), or else it will not be
measuring the true current flowing in the circuit. An
ideal ammeter has zero internal resistance.
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Measurement of current
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Voltmeter
• The voltmeter is a device that can measure the voltage
across a circuit element.
1. The voltmeter must be placed in parallel with the
element whose voltage it is measuring.
2. The voltmeter should draw no current away from the
element whose voltage it is measuring, or else it will not
be measuring the true voltage across that element.
Thus, an ideal voltmeter has infinite internal resistance.
Measurement of voltage
EEE 1012 INTRODUCTION TO ELECTRICAL ENGINEERING