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EE 372 Fundamentals of Power Systems

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1 EE 372 Fundamentals of Power Systems
Textbook: John J. Grainger, William D. Stevenson, Jr., “Power System Analysis”, McGraw-Hill, Inc., 1994. Objective: To teach the fundamental concepts of electric power system engineering.

2 Basics Power: Instantaneous consumption of energy Power Units
Watts = voltage x current for dc (W) kW – 1 x 103 Watt MW – 1 x 106 Watt GW – 1 x 109 Watt

3 Basics Energy: Amount of Work Energy Units (for electrical power)
Wh x 100 Watthour kWh – 1 x 103 Watthour MWh – 1 x 106 Watthour GWh – 1 x 109 Watthour Relationship of power and energy Energy Consumed Average Power Duration

4 Sinusoidal Signals Circular rotation of a magnetized rotor in Synchronous Generator produces sinusoidal voltage in stator windings due to FARADAY LAW. (Look at EE 471 Notes)

5 Sinusoidal Signals THREE-PHASE SYNCHRONOUS GENERATOR

6 ? ? Sinusoidal Signals How do you write the mathematical
equation for this periodic function? ? ?

7 Sinusoidal Signals Period : 0.01 s. Frequency : 100 Hz.

8 Sinusoidal Signals Period : 0.02 s. Frequency : 50 Hz. OR

9 Sinusoidal Signals

10 ? Sinusoidal Signals Peak voltage : 310 V. Period : 0.02 s.
-400 -300 -200 -100 100 200 300 400 0.0000 0.0025 0.0050 0.0075 0.0100 0.0125 0.0150 0.0175 0.0200 Time (seconds) Volts, Amperes Current Voltage Peak voltage : 310 V. Period : s. Frequency : 50 Hz. radian Peak current : 150 A. Period : s. Frequency : 50 Hz.

11 Complex Numbers Euler’s Formula : Relates exponential and sinusoidal functions Re Im Rectangular Notation Polar R Attention:

12 Complex Numbers Rectangular Polar
Addition and subtraction of complex numbers are easier with the rectangular notation. Multiplication and division of complex numbers are easier with the polar notation. Attention: Rectangular Polar

13 Phasors Phasors are complex numbers used to represent sinusoids.
Phasor representation of a sinusoidal function: Phasor If we multiply phasor by and apply Euler’s formula

14 Phasors Consider the derivative of sinusoidal signal represented as a phasor Derivative:

15 Phasors Examples: Inductor Capacitor

16 Phasors Ref. Important: In power systems, RMS values are used for the magnitudes.

17 Phasors v(t) i(t)

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