Post on 14-Dec-2015
Unit 8 Combination Circuits
Unit 8 Combination Circuits
Objectives:
• Define a combination circuit.
• List the rules for parallel circuits.
• List the rules for series circuits.
• Solve for combination circuit values.
Unit 8 Combination Circuits
Characteristics
• There are multiple current paths.• Resistors may be in series or parallel with
other resistors.• A node is where three or more paths come
together.• The total power is the sum of the resistors’
power.
Unit 8 Combination Circuits
A simple combination circuit.
Unit 8 Combination Circuits
Series Circuit Rules
1. The current is the same at any point in the circuit.
2. The total resistance is the sum of the individual resistances.
3. The sum of the voltage drops or the individual resistors must equal the applied (source) voltage.
Unit 8 Combination Circuits
Parallel Circuit Rules
1. The voltage across any circuit branch is the same as the applied (source) voltage.
2. The total current is the sum of the current through all of the circuit branches.
3. The total resistance is equal to the reciprocal of the sum of the reciprocals of the branch resistances.
Unit 8 Combination Circuits
Simplifying the Circuit
• Resistors in series can be combined to form an equivalent resistance.
• Resistors in parallel can be combined to form an equivalent resistance.
• The equivalent resistances are used to draw simplified equivalent circuits.
Unit 8 Combination Circuits
Solving Combination Circuits
E = ? VI = 1 AR = ? Ω
E1 = ? VI1 = ? A R1 = 325 Ω
E2 = ? VI2 = ? A R2 = 275 Ω
E3 = ? VI3 = ? A R3 = 150 Ω
E4 = ? VI4 = ? A R4 = 250 Ω
Unit 8 Combination CircuitsReducing Combination Circuits
Combine R1 & R2, and R3 & R4.
R = ? Ω
R1 = 325 Ω
R2 = 275 Ω
R3 = 150 Ω
R4 = 250 Ω
Unit 8 Combination Circuits
Reducing Combination CircuitsRedraw simplified circuit.
R1 + R2 = R1&2 = 600 ohmsR3 + R4 = R3&4 = 400 ohms
R = ? Ω R1&2 = 600 Ω R3&4 = 400 Ω
Unit 8 Combination Circuits
Solving Combination CircuitsSolve for the applied voltage using Ohm’s law.
Note that the I (total) was given data.
E (source) = I (total) x R (total) = 1 x 240 = 240 V
E = 240 VI = 1 AR = 240 Ω
R1&2 = 600 Ω R3&4 = 400 Ω
Unit 8 Combination Circuits
Solving Combination CircuitsSolve for the branch currents using Ohm’s law.
E (source) = E1&2 = E3&4
I1&2 = E1&2 / R1&2 = 240/600 = 0.4 A
E = 240 VI = 1 AR = 240 Ω
E = 240 VI = 0.4 AR1&2 = 600 Ω
R3&4 = 400 Ω
Unit 8 Combination Circuits
Solving Combination CircuitsSolve for the branch currents using Ohm’s law.
E (source) = E1&2 = E3&4
I3&4 = E3&4 / R3&4 = 240/400 = 0.6 A
E = 240 VI = 1 AR = 240 Ω
E1&2 = 240 VI = 0.4 AR1&2 = 600 Ω
E3&4 = 240 V I = 0.6 AR3&4 = 400 Ω
Unit 8 Combination Circuits
Solving Combination CircuitsExpand the circuit back to the original circuit.
Branch currents remain the same.
E = 240 VI = 1 AR = 240 Ω
E1 = ? VI1 = 0.4 AR1 = 240 Ω
E2 = ? VI2 = 0.4 AR2 = 240 Ω
E3 = ? VI3 = 0.6 AR3 = 240 Ω
E4 = ? VI4 = 0.6 AR4 = 240 Ω
Unit 8 Combination Circuits
Solving Combination CircuitsSolve for each voltage drop using Ohm’s law.
E1 = I1 x R1 = 0.4 x 325 = 130 V
E = 240 VI = 1 AR = 240 Ω
E1 = 130 VI1 = 0.4 AR1 = 325 Ω
E2 = ? VI2 = 0.4 AR2 = 275 Ω
E3 = ? VI3 = 0.6 AR3 = 150 Ω
E4 = ? VI4 = 0.6 AR4 = 250 Ω
Unit 8 Combination Circuits
Solving Combination CircuitsSolve for each voltage drop using Ohm’s law.
E2 = I2 x R2 = 0.4 x 275 = 110 V
E = 240 VI = 1 AR = 240 Ω
E1 = 130 VI1 = 0.4 AR1 = 325 Ω
E2 = 110 VI2 = 0.4 AR2 = 275 Ω
E3 = ? VI3 = 0.6 AR3 = 150 Ω
E4 = ? VI4 = 0.6 AR4 = 250 Ω
Unit 8 Combination Circuits
Solving Combination CircuitsSolve for each voltage drop using Ohm’s law.
E3 = I3 x R3 = 0.6 x 150 = 90 V
E = 240 VI = 1 AR = 240 Ω
E1 = 130 VI1 = 0.4 AR1 = 325 Ω
E2 = 110 VI2 = 0.4 AR2 = 275 Ω
E3 = 90 VI3 = 0.6 AR3 = 150 Ω
E4 = ? VI4 = 0.6 AR4 = 250 Ω
Unit 8 Combination Circuits
Solving Combination CircuitsSolve for each voltage drop using Ohm’s law.
E4 = I4 x R4 = 0.6 x 250 = 150 V
E = 240 VI = 1 AR = 240 Ω
E1 = 130 VI1 = 0.4 AR1 = 325 Ω
E2 = 110 VI2 = 0.4 AR2 = 275 Ω
E3 = 90 VI 3= 0.6 AR3 = 150 Ω
E4= 150 VI4 = 0.6 AR4 = 250 Ω
Unit 8 Combination CircuitsReview:
1. The three rules for series circuits are:a. The current is the same at any point in
the circuit.b. The total resistance is the sum of the
individual resistances.c. The applied voltage is equal to the sum
of the voltage drops across the individual components.
Unit 8 Combination Circuits
Review:
2. The three rules for parallel circuits are:a. The total voltage is the same as the
voltage across any branch.b. The total current is the sum of the
individual currents.c. The total resistance is the reciprocal of
the sum of the reciprocals of the branch resistances.
Unit 8 Combination Circuits
Review:
3. Combination circuits are circuits that contain both series and parallel branches.
4. A node is where three or more paths come together.
5. The total power is the sum of all the circuit resistors’ power.
Unit 8 Combination Circuits
Review:
6. When solving combination circuits, simplify, reduce, and redraw equivalent value circuits.
7. Apply the series rules and the parallel rules selectively to various parts of the combination circuit.