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Transcript
Circuit Theory Laws
Digital Electronics
Circuit Theory Laws
This presentation will
• Define voltage, current, and resistance.
• Define and apply Ohm’s Law.
• Introduce series circuits.
o Current in a series circuit
o Resistance in a series circuit
o Voltage in a series circuit
• Define and apply Kirchhoff’s Voltage Law.
• Introduce parallel circuits.
o Current in a parallel circuit
o Resistance in a parallel circuit
o Voltage in a parallel circuit
• Define and apply Kirchhoff’s Current Law.
2
Electricity – The Basics
An understanding of the basics of electricity
requires the understanding of three fundamental
concepts.
•Voltage
•Current
•Resistance
A direct mathematical relationship exists between
voltage, resistance, and current in all electronic
circuits.
3
Voltage, Current, & Resistance
Current – Current is the flow of electrical
charge through an electronic circuit. The
direction of a current is opposite to the
direction of electron flow. Current is
measured in AMPERES (AMPS).
Andre Ampere
1775-1836
French Physicist
4
Voltage
Voltage – Voltage is the electrical force that
causes current to flow in a circuit. It is
measured in VOLTS.
Alessandro Volta
1745-1827
Italian Physicist
5
Current
Current – Current is the flow of electrical
charge through an electronic circuit. The
direction of a current is opposite to the
direction of electron flow. Current is
measured in AMPERES (AMPS).
Andre Ampere
1775-1836
French Physicist
6
First, An Analogy
The flow of water from one tank to another is a good analogy for
an electrical circuit and the mathematical relationship between
voltage, resistance, and current.
Force: The difference in the water levels ≡ Voltage
Flow: The flow of the water between the tanks ≡ Current
Opposition: The valve that limits the amount of water ≡ Resistance
Force
Flow
7
Opposition
Anatomy of a Flashlight
Switch
Switch
Light
Bulb
Battery
Block Diagram
Light
Bulb
-
+
Battery
Schematic Diagram
8
Flashlight Schematic
Current
Resistance
-
+
Voltage
-
+
• Closed circuit (switch closed)
• Open circuit (switch open)
• Current flow
• No current flow
• Lamp is on
• Lamp is off
• Lamp is resistance, uses
energy to produce light (and
heat)
• Lamp is resistance, but is not
using any energy
9
Current Flow
• Conventional Current assumes
that current flows out of the
positive side of the battery,
through the circuit, and back to
the negative side of the battery.
This was the convention
established when electricity was
first discovered, but it is incorrect!
• Electron Flow is what actually
happens. The electrons flow out
of the negative side of the battery,
through the circuit, and back to
the positive side of the battery.
Conventional
Current
Electron
Flow
10
Engineering vs. Science
• The direction that the current flows does not affect what the
current is doing; thus, it doesn’t make any difference which
convention is used as long as you are consistent.
• Both Conventional Current and Electron Flow are used. In
general, the science disciplines use Electron Flow, whereas
the engineering disciplines use Conventional Current.
• Since this is an engineering course, we will use Conventional
Current .
Electron
Flow
Conventional
Current
11
Ohm’s Law
• Defines the relationship between voltage, current, and
resistance in an electric circuit
• Ohm’s Law:
Current in a resistor varies in direct proportion to the voltage
applied to it and is inversely proportional to the resistor’s value.
• Stated mathematically:
V
I
R
+
I
V
-
R
Where: I is the current (amperes)
V is the potential difference (volts)
R is the resistance (ohms)
Ohm’s Law Triangle
R
V
I
(amperes , A )
R
R
V
R
(ohms ,  )
I
V
I
V
I
V  I R ( volts , V )
V
I
R
Example: Ohm’s Law
Example:
The flashlight shown uses a 6 volt battery and has a bulb
with a resistance of 150 . When the flashlight is on, how
much current will be drawn from the battery?
14
Example: Ohm’s Law
Example:
The flashlight shown uses a 6 volt battery and has a bulb
with a resistance of 150 . When the flashlight is on, how
much current will be drawn from the battery?
Solution:
Schematic Diagram
VT =
IR
V
+
VR
I
R
-
IR 
VR
6V

 0.04 A  40 mA
R 150 
15
Circuit Configuration
Components in a circuit can be connected in one
of two ways.
Series Circuits
Parallel Circuits
• Components are connected
end-to-end.
• There is only a single path for
current to flow.
• Both ends of the components are
connected together.
• There are multiple paths for current
to flow.
Components
(i.e., resistors, batteries, capacitors, etc.)
16
Series Circuits
Characteristics of a series circuit
• The current flowing through every series component is equal.
• The total resistance (RT) is equal to the sum of all of the resistances
(i.e., R1 + R2 + R3).
• The sum of all of the voltage drops (VR1 + VR2 + VR2) is equal to the
total applied voltage (VT). This is called Kirchhoff’s Voltage Law.
VR1
IT
+
-
+
+
VR2
VT
-
-
RT
-
+
VR3
17
Example: Series Circuit
Example:
For the series circuit shown, use the laws of circuit theory to calculate
the following:
• The total resistance (RT)
• The current flowing through each component (IT, IR1, IR2, & IR3)
• The voltage across each component (VT, VR1, VR2, & VR3)
• Use the results to verify Kirchhoff’s Voltage Law.
IT
+
VR1
-
IR1
+
+
VT
VR2
IR2
-
-
IR3
RT
-
+
VR3
18
Example: Series Circuit
Solution:
Total Resistance:
R T  R1  R2  R3
R T  220   470   1.2 k
R T  1890   1.89 k
Current Through Each Component:
IT 
VT
RT
IT 
12 v
 6.349 mAmp
1.89 k
(Ohm' s Law)
V
I
R
Since this is a series circuit :
IT  IR1  IR2  IR3  6.349 mAmp
19
Example: Series Circuit
Solution:
Voltage Across Each Component:
VR1  IR1  R1 
(Ohm' s Law)
VR1  6.349 mA  220 Ω  1.397 volts
VR2  IR2  R2 (Ohm' s Law)
VR2  6.349 mA  470 Ω  2.984 volts
VR3  IR3  R3 (Ohm' s Law)
V
I
R
VR3  6.349 mA  1.2 K Ω  7.619 volts
20
Example: Series Circuit
Solution:
Verify Kirchhoff’s Voltage Law:
VT  VR1  VR2  VR3
12 v  1.397 v  2.984 v  7.619 v
12 v  12 v
21
Parallel Circuits
Characteristics of a Parallel Circuit
• The voltage across every parallel component is equal.
• The total resistance (RT) is equal to the reciprocal of the sum of the
reciprocal: 1 1 1
1
1
RT

R1

R2

R3
RT 
1
1
1


R1 R 2 R 3
• The sum of all of the currents in each branch (IR1 + IR2 + IR3) is equal
to the total current (IT). This is called Kirchhoff’s Current Law.
IT
+
+
VR1
VT
VR2
-
-
+
+
VR3
-
-
22
RT
Example: Parallel Circuit
Example:
For the parallel circuit shown, use the laws of circuit theory to calculate
the following:
• The total resistance (RT)
• The voltage across each component (VT, VR1, VR2, & VR3)
• The current flowing through each component (IT, IR1, IR2, & IR3)
• Use the results to verify Kirchhoff’s Current Law.
IT
IR1
IR2
+
+
VR1
VT
+
VR2
-
-
IR3
+
VR3
-
-
23
RT
23
Example: Parallel Circuit
Solution:
Total Resistance:
1
RT 
1
1
1


R1 R 2 R 3
1
1
1
1


470  2.2 k 3.3 k
R T  346.59 
RT 
Voltage Across Each Component:
Since this is a parallel circuit :
VT  VR1  VR2  VR3  15 volts
24
Example: Parallel Circuit
Solution:
Current Through Each Component:
VR1
(Ohm' s Law)
R1
V
15 v
IR1  R1 
 31.915 mAmps
R1 470 
IR1 
IR2 
VR2
15 v

 6.818 mAmps
R2 2.2 k 
IR3 
VR3
15 v

 4.545 mAmp
R3 3.3 k 
IT 
VT
15 v

 43.278 mAmp
RT
346.59 
V
I
R
25
Example: Parallel Circuit
Solution:
Verify Kirchhoff’s Current Law:
IT  IR1  IR2  IR3
43.278 mAmps  31.915 mA  6.818 mA  4.545 mA
43.278 mAmps  43.278 mAmps
26
Summary of Kirchhoff’s Laws
Kirchhoff’s Voltage Law (KVL):
The sum of all of the voltage drops in a
series circuit equals the total applied
voltage.
Gustav Kirchhoff
1824-1887
German Physicist
Kirchhoff’s Current Law (KCL):
The total current in a parallel circuit equals
the sum of the individual branch currents.
27