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− | [[Category: | + | [[Category:ECE201]] |
+ | [[Category:ECE]] | ||
+ | [[Category:ECE201Spring2015Peleato]] | ||
+ | [[Category:circuits]] | ||
+ | [[Category:linear circuits]] | ||
+ | [[Category:problem solving]] | ||
− | = | + | =Critically Damped Practice= |
+ | <center><font size= 4> | ||
+ | '''Practice question for [[ECE201]]: "Linear circuit analysis I" ''' | ||
+ | </font size> | ||
+ | By: Chinar Dhamija | ||
+ | Topic: Critically Damped Second Order Equation | ||
− | + | </center> | |
+ | ---- | ||
+ | ==Question== | ||
+ | Find the value for C that will make the zero input response critically damped with roots at -4. | ||
+ | [[File:ECE201P6.png|500px|center]] | ||
+ | ---- | ||
+ | ---- | ||
+ | ===Answer === | ||
+ | For a response to be critically damped we know that:<br /> | ||
+ | <math>b^2 - 4c = 0\\</math> | ||
+ | The next step would be to simplify the circuit as shown in the image below. Once simplified it becomes a parallel RLC circuit where we know: | ||
+ | <math> b = \frac{1}{RC} and c = \frac{1}{LC}\\</math> | ||
+ | [[File:ECE201P6_1.png|500px|center]] | ||
+ | Since the root was given to be -4 we can find b.<br /> | ||
+ | <math> \frac{-b}{2} = s\\ so we get: \frac{-b}{2} = -4\\ therefore b = 8</math><br /> | ||
+ | Once we know b we can use the critically damped equation to solve for C. | ||
+ | <math>\begin{align} | ||
+ | 8^2 - \frac{4}{2C} = 0// | ||
+ | 64 = \frac{2}{C}// | ||
+ | C = \frac{1}{32}// | ||
+ | \end{align} | ||
+ | </math> | ||
− | [[ 2015 Spring ECE 201 Peleato|Back to 2015 Spring ECE 201 Peleato]] | + | ---- |
+ | ==Questions and comments== | ||
+ | If you have any questions, comments, etc. please post them below | ||
+ | *Comment 1 | ||
+ | **Answer to Comment 1 | ||
+ | *Comment 2 | ||
+ | **Answer to Comment 2 | ||
+ | ---- | ||
+ | [[2015 Spring ECE 201 Peleato|Back to 2015 Spring ECE 201 Peleato]] | ||
+ | |||
+ | [[ECE201|Back to ECE201]] |
Revision as of 13:44, 2 May 2015
Critically Damped Practice
Practice question for ECE201: "Linear circuit analysis I"
By: Chinar Dhamija
Topic: Critically Damped Second Order Equation
Question
Find the value for C that will make the zero input response critically damped with roots at -4.
Answer
For a response to be critically damped we know that:
$ b^2 - 4c = 0\\ $
The next step would be to simplify the circuit as shown in the image below. Once simplified it becomes a parallel RLC circuit where we know:
$ b = \frac{1}{RC} and c = \frac{1}{LC}\\ $
Since the root was given to be -4 we can find b.
$ \frac{-b}{2} = s\\ so we get: \frac{-b}{2} = -4\\ therefore b = 8 $
Once we know b we can use the critically damped equation to solve for C.
$ \begin{align} 8^2 - \frac{4}{2C} = 0// 64 = \frac{2}{C}// C = \frac{1}{32}// \end{align} $
Questions and comments
If you have any questions, comments, etc. please post them below
- Comment 1
- Answer to Comment 1
- Comment 2
- Answer to Comment 2