Alexander-Sadiku
Fundamentals of Electric Circuits
Basic Laws - Chapter 2
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2.1
Ohm’s Law. |
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2.2
Nodes, Branches, and Loops. |
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2.3
Kirchhoff’s Laws. |
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2.4
Series Resistors and Voltage Division. |
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2.5
Parallel Resistors and Current Division. |
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2.6
Wye-Delta Transformations. |
2.1 Ohms Law (1)
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Ohm’s law states that the voltage
across a resistor is directly proportional to the current I flowing through
the resistor. |
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Mathematical expression for Ohm’s
Law is as follows: |
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Two extreme possible values of R: 0 (zero) and ¥ (infinite) are related
with two basic circuit concepts: short circuit and open circuit. |
2.1 Ohms Law (2)
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Conductance is the ability of an
element to conduct electric current; it is the reciprocal of resistance R and is measured in
mhos or siemens. |
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The power dissipated by a resistor: |
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2.2 Nodes, Branches and
Loops (1)
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A branch represents a single element
such as a voltage source or a resistor. |
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A node is the point of connection
between two or more branches. |
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A loop is any closed path in a circuit. |
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A network with b branches, n nodes, and
l independent loops will satisfy the fundamental theorem of network topology: |
2.2 Nodes, Branches and
Loops (2)
2.2 Nodes, Branches and
Loops (3)
2.3 Kirchhoff’s Laws (1)
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Kirchhoff’s current law (KCL) states
that the algebraic sum of currents entering a node (or a closed boundary) is zero. |
2.3 Kirchhoff’s Laws (2)
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Example 4 |
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Determine the current I for the circuit
shown in the figure below. |
2.3 Kirchhoff’s Laws (3)
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Kirchhoff’s voltage law (KVL) states
that the algebraic sum of all voltages around a closed path (or loop) is
zero. |
2.3 Kirchhoff’s Laws (4)
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Example 5 |
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Applying the KVL equation for the
circuit of the figure below. |
2.4 Series Resistors and
Voltage Division (1)
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Series: Two or more elements are in
series if they are cascaded or connected sequentially and consequently carry
the same current. |
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The equivalent resistance of any number
of resistors connected in a series is the sum of the individual resistances. |
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The voltage divider can be expressed as |
"Example 3"
2.5 Parallel Resistors
and Current Division (1)
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Parallel: Two or more elements are in
parallel if they are connected to the same two nodes and consequently have
the same voltage across them. |
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The equivalent resistance of a circuit
with N resistors in
parallel is: |
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The total current i is shared by the
resistors in inverse proportion to their resistances. The current divider can
be expressed as: |
"Example 4"
2.6 Wye-Delta
Transformations