(Defining an LTI System)
(Computing the Impulse Response and System Function)
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==Computing the Impulse Response and System Function==
 
==Computing the Impulse Response and System Function==
Inputting a delta into the system yeilds:
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Inputting a delta into the system yields:
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<math>\ y(t)=h(t)=0.5 \delta(t-5) u(t) </math>
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The System Function is defined by:

Revision as of 16:04, 26 September 2008

Defining an LTI System

For an input x(t), let the LTI system be defined as:

$ \ y(t)=0.5 x(t-5) u(t) $

Computing the Impulse Response and System Function

Inputting a delta into the system yields:

$ \ y(t)=h(t)=0.5 \delta(t-5) u(t) $

The System Function is defined by:

Alumni Liaison

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

Dr. Paul Garrett