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===Answer 1===
 
===Answer 1===
 
Yes. Since the requirement for a system to be memoryless is that for any time
 
Yes. Since the requirement for a system to be memoryless is that for any time
<math>t_0 \in \Re</math>, <math>y(t_0)</math> depends only on the input <math>x(t_0)</math>.
+
<math class="inline">t_0 \in \Re</math>, <math>y(t_0)</math> depends only on the input <math>x(t_0)</math>.
  
 
In other words, since this system is dependent only on current values of t, not future or past values, we say it is a memoryless system. --[[User:Darichar|Darichar]] 14:41, 5 February 2011 (UTC)
 
In other words, since this system is dependent only on current values of t, not future or past values, we say it is a memoryless system. --[[User:Darichar|Darichar]] 14:41, 5 February 2011 (UTC)
 +
:Instructor's comment: Yes, the above definition (first part of the answer) is correct answer. Slight correction for the second part: <br> "In other words, since this system<span style="color:red">'s output </span> is dependent only on <span style="color:red"> the </span> current value of <span style="color:red"> the input</span>, not future or past values, we say it is a memoryless system." -pm,
 +
 
===Answer 2===
 
===Answer 2===
 
Write it here.
 
Write it here.

Revision as of 15:35, 5 February 2011

Practice Question on the Definition of a Memoryless System

The input x(t) and the output y(t) of a system are related by the equation

$ y(t)= t^2 x(t) $

Is the system memoryless? Justify your answer.


Share your answers below

You will receive feedback from your instructor and TA directly on this page. Other students are welcome to comment/discuss/point out mistakes/ask questions too!


Answer 1

Yes. Since the requirement for a system to be memoryless is that for any time $ t_0 \in \Re $, $ y(t_0) $ depends only on the input $ x(t_0) $.

In other words, since this system is dependent only on current values of t, not future or past values, we say it is a memoryless system. --Darichar 14:41, 5 February 2011 (UTC)

Instructor's comment: Yes, the above definition (first part of the answer) is correct answer. Slight correction for the second part:
"In other words, since this system's output is dependent only on the current value of the input, not future or past values, we say it is a memoryless system." -pm,

Answer 2

Write it here.

Answer 3

Write it here.


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Abstract algebra continues the conceptual developments of linear algebra, on an even grander scale.

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