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Network Theorems

Network Theorems. Introductory Circuit Analysis Robert L. Boylestad. 1 – Introduction. This chapter introduces important fundamental theorems of network analysis. They are the Superposition theorem Thévenin’s theorem Norton’s theorem Maximum power transfer theorem Substitution Theorem

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Network Theorems

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  1. Network Theorems Introductory Circuit Analysis Robert L. Boylestad

  2. 1 – Introduction • This chapter introduces important fundamental theorems of network analysis. They are the • Superposition theorem • Thévenin’s theorem • Norton’s theorem • Maximum power transfer theorem • Substitution Theorem • Millman’s theorem • Reciprocity theorem

  3. 2 – Superposition Theorem • Used to find the solution to networks with two or more sources that are not in series or parallel. • The current through, or voltage across, an element in a network is equal to the algebraic sum of the currents or voltages produced independently by each source. • Since the effect of each source will be determined independently, the number of networks to be analyzed will equal the number of sources.

  4. Superposition Theorem • The total power delivered to a resistive element must be determined using the total current through or the total voltage across the element and cannot be determined by a simple sum of the power levels established by each source.

  5. 3 – Thévenin’s Theorem • Any two-terminal dc network can be replaced by an equivalent circuit consisting of a voltage source and a series resistor.

  6. Thévenin’s Theorem • Thévenin’s theorem can be used to: • Analyze networks with sources that are not in series or parallel. • Reduce the number of components required to establish the same characteristics at the output terminals. • Investigate the effect of changing a particular component on the behavior of a network without having to analyze the entire network after each change.

  7. Thévenin’s Theorem • Procedure to determine the proper values of RTh and ETh • Preliminary • Remove that portion of the network across which the Thévenin equation circuit is to be found. In the figure below, this requires that the load resistor RLbe temporarily removed from the network.

  8. Thévenin’s Theorem • Mark the terminals of the remaining two-terminal network. (The importance of this step will become obvious as we progress through some complex networks.) RTh: • Calculate RTh by first setting all sources to zero (voltage sources are replaced by short circuits, and current sources by open circuits) and then finding the resultant resistance between the two marked terminals. (If the internal resistance of the voltage and/or current sources is included in the original network, it must remain when the sources are set to zero.)

  9. Thévenin’s Theorem ETh: • Calculate ETh by first returning all sources to their original position and finding the open-circuit voltage between the marked terminals. (This step is invariably the one that will lead to the most confusion and errors. In all cases, keep in mind that it is the open-circuit potential between the two terminals marked in step 2.)

  10. Thévenin’s Theorem • Insert Figure 9.26(b) • Conclusion: • Draw the Thévenin equivalent circuit with the portion of the circuit previously removed replaced between the terminals of the equivalent circuit. This step is indicated by the placement of the resistor RL between the terminals of the Thévenin equivalent circuit.

  11. Thévenin’s Theorem Experimental Procedures • Two popular experimental procedures for determining the parameters of the Thévenin equivalent network: • Direct Measurement of ETh and RTh • For any physical network, the value of ETh can be determined experimentally by measuring the open-circuit voltage across the load terminals. • The value of RTh can then be determined by completing the network with a variable resistance RL.

  12. Thévenin’s Theorem • Measuring VOC and ISC • The Thévenin voltage is again determined by measuring the open-circuit voltage across the terminals of interest; that is, ETh = VOC. To determine RTh, a short-circuit condition is established across the terminals of interest and the current through the short circuit (Isc) is measured with an ammeter. • Using Ohm’s law: RTh = Voc / Isc

  13. 4 – Norton’s Theorem • Norton’s theorem states the following: • Any two-terminal linear bilateral dc network can be replaced by an equivalent circuit consisting of a current and a parallel resistor. • The steps leading to the proper values of IN and RN. • Preliminary steps: • Remove that portion of the network across which the Norton equivalent circuit is found. • Mark the terminals of the remaining two-terminal network.

  14. Norton’s Theorem • Finding RN: • Calculate RN by first setting all sources to zero (voltage sources are replaced with short circuits, and current sources with open circuits) and then finding the resultant resistance between the two marked terminals. (If the internal resistance of the voltage and/or current sources is included in the original network, it must remain when the sources are set to zero.) Since RN = RTh the procedure and value obtained using the approach described for Thévenin’s theorem will determine the proper value of RN.

  15. Norton’s Theorem • Finding IN : • Calculate INby first returning all the sources to their original position and then finding the short-circuit current between the marked terminals. It is the same current that would be measured by an ammeter placed between the marked terminals. • Conclusion: • Draw the Norton equivalent circuit with the portion of the circuit previously removed replaced between the terminals of the equivalent circuit.

  16. 5 – Maximum Power Transfer Theorem • The maximum power transfer theorem states the following: A load will receive maximum power from a network when its total resistive value is exactly equal to the Thévenin resistance of the network applied to the load. That is, RL = RTh

  17. Maximum Power Transfer Theorem • For loads connected directly to a dc voltage supply, maximum power will be delivered to the load when the load resistance is equal to the internal resistance of the source; that is, when: RL = Rint

  18. 6 – Millman’s Theorem • Any number of parallel voltage sources can be reduced to one. • This permits finding the current through or voltage across RL without having to apply a method such as mesh analysis, nodal analysis, superposition and so on. • Convert all voltage sources to current sources. • Combine parallel current sources. • Convert the resulting current source to a voltage source and the desired single-source network is obtained.

  19. 9.7 – Substitution Theorem • The substitution theorem states: • If the voltage across and the current through any branch of a dc bilateral network is known, this branch can be replaced by any combination of elements that will maintain the same voltage across and current through the chosen branch. • Simply, for a branch equivalence, the terminal voltage and current must be the same.

  20. 8 – Reciprocity Theorem • The reciprocity theorem is applicable only to single-source networks and states the following: • The current I in any branch of a network, due to a single voltage source E anywhere in the network, will equal the current through the branch in which the source was originally located if the source is placed in the branch in which the current I was originally measured. • The location of the voltage source and the resulting current may be interchanged without a change in current

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