HW 23 - ECE201 - Due Oct 21 2011b

HW 23 - ECE201 - Due Oct 21 2011b - Homework 23 ECE201...

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ECE201: Linear Circuit Analysis Due in class: Friday, October 21, 2011 1. For the parallel RLC circuit shown below, determine the following. a. Write a symbolic second order differential equation for the system in terms of inductor current i L . Assume V C (0 + ) = V 0 and i L (0 + ) = i 0. b. Write a symbolic second order differential equation for the system in terms of resistor current i R . Assume V C (0 + ) = V 0 and i L (0 + ) = i 0. c. Write a symbolic second order differential equation for the system in terms of capacitor current i C . Assume V C (0 + ) = V 0 and i L (0 + ) = i 0. d. Write a symbolic second order differential equation for the system in terms of capacitor voltage V C . Assume V C (0 + ) = V 0 and i L (0 + ) = i 0. e. If R = 1 , C = 1F, and L = 1H, then is the system under damped, critically damped, or over damped? f. If C = (1/2)F and L = (1/2)H, then what does the resistance R need to be in order for the system to be critically damped? g.
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This note was uploaded on 11/16/2011 for the course ECE 201 taught by Professor All during the Fall '08 term at Purdue.

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HW 23 - ECE201 - Due Oct 21 2011b - Homework 23 ECE201...

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