1. 5.4 Circuit Analysis Using Phasors and Complex Impedances
Replace the time descriptions of the voltage and current sources with the corresponding phasors. (All of the sources must have the same frequency.)
2. Replace inductances by their complex impedances ZL = jωL. Replace capacitances by their complex impedances ZC = 1/(jωC). Resistances have complex impedances equal to their resistances
3. Analyze the circuit using any of the techniques studied earlier in Chapter 2, performing the calculations with complex arithmetic.

2. Find the steady-state current for the circuit as follows, and also find the phasor voltage across each element and construct a phasor diagram.
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4. Find the steady-state voltage uC(t) for the circuit as follows, and also find the phasor current through each element and construct a phasor diagram showing the currents and source voltage.
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6. To find u1(t) in steady state.
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7. To find i(t) in steady state; construct a phasor diagram showing all three voltages and current; what is the phasor relationship between us(t) and i(t)?
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8. To find phasor voltage and the phasor current through each element in the circuit.
j200Ω
-j50Ω
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9. Steady-state Response of RLC in Series
Reactance

10. Steady-state Response of RLC in Series
Voltage Triangle

11. Steady-state Response of RLC in Series
Impedances Triangle

12. Power and Power Factor
Power Factor
功率因数

13. Three Triangles S Q P R

14. Example 5.6: Computer the power and reactive power taken from the source and each element in the circuit.
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15. Example 5.7:Find the power, reactive power and power factor for the source, find the phasor current i.
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16. 5.6 THÉVENIN EQUIVALENT CIRCUITS

17. 5.6 THÉVENIN EQUIVALENT CIRCUITS
The Thévenin voltage is equal to the open-circuit phasor voltage of the original circuit.
We can find the Thévenin equivalent impedance by zeroing the independent sources and determining the complex impedance looking into the circuit terminals.

18. 5.6 THÉVENIN EQUIVALENT CIRCUITS
The Thévenin impedance equals the open-circuit voltage divided by the short-circuit current.

19. Example 5.9: Find Thevenin equivalent circuit for the circuit.
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20. Maximum Average Power Transfer
If the load can take on any complex value, maximum power transfer is attained for a load impedance equal to the complex conjugate of the Thévenin impedance.
If the load is required to be a pure resistance, maximum power transfer is attained for a load resistance equal to the magnitude of the Thévenin impedance.

21. Example 5.10: Determine the maximum power delivered to a load (a) the load can have any complex value; (b) the load must be a pure resistance.
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22. 5.7 BALANCED THREE-PHASE CIRCUITS
Much of the power used by business and industry is supplied by three-phase distribution systems.
BALANCED THREE-PHASE CIRCUITS：
Three equal-amplitude ac voltages have phases that are 1200 apart.
Chapter 17 tells us how three-phase voltages are generated.

23. Positive phase sequence： a → b → c
Wye (Y)-connected
Line a、b、c
火线、相线
Neutral n
零线、中线
Positive phase sequence：
a → b → c
Phase voltage 相电压VY

24. Phase Sequence
Three-phase sources can have either a positive or negative phase sequence.
The direction of rotation of certain three-phase motors can be reversed by changing the phase sequence.

25. Wye–Wye Connection
Three-phase sources and loads can be connected either in a wye (Y) configuration or in a delta (Δ) configuration.
The key to understanding the various three-phase configurations is a careful examination of the wye–wye (Y-Y) circuit.

26. sources Line currents 线电流
Balanced loads
对称负载
sources
Line currents
线电流
Neutral currents
中线电流
Four-wire connection
Balanced loads:
All three load impedances are equal.
Under balanced three-phase sources and loads,
Therefore, we can omit the neutral wire.

27. Wye–Wye Connection
In a balanced three-phase system, neutral current is zero.
we can eliminate the neutral wire. Then, compared with single phase circuit, only three wires are needed to connect the sources to the loads , it is less expensive.

28. Wye–Wye Connection
Compared with single-phase circuit, the total instantaneous power in a balanced three-phase system is constant rather than pulsating.
Reactive power

29. (线电压)
A(相电压)
B(相电压)

31. A balanced positive-sequence wye-connected 60 Hz three-phase source has phase voltage UY=1000V. Each phase of the load consists of a 0.1-H inductance in series with a 50-Ω resistance.
Find the line currents, the line voltages, the power and the reactive power delivered to the load. Draw a phasor diagram showing line voltages, phase voltages and the line currents. Assuming that the phase angle of Uan is zero.

33. Delta (Δ)-connected Sources
According to KVL,
Thus, the current circulating in the delta is zero.

34. Wye (Y) and Delta (Δ)-connected Loads
Two balanced loads are equal.

35. Wye (Y) and Delta (Δ)-connected Loads

36. Delta - Delta (Δ- Δ) connection
Line current
Assuming line voltage
Then, we get phase current

37. A delta-connected source supplies power to a delta-connected load through wires having impedances of Zline=0.3+j0.4Ω, the load impedance are ZΔ=30+j6 Ω, the balanced source A voltage is
Find the line current, the line volatge at the load, the current in each phase of the load, the power delivered to the load, and dissipated in the line.

38. Homework 5
P5.24
P5.34
P5.43
P5.53
P5.68
P5.72