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Homework 3 Ben Horst:  [[HW2.A Ben Horst _ECE301Fall2008mboutin| A]]  ::  [[HW2.B Ben Horst _ECE301Fall2008mboutin| B]]  ::  [[HW2.C Ben Horst _ECE301Fall2008mboutin| C]]
 
Homework 3 Ben Horst:  [[HW2.A Ben Horst _ECE301Fall2008mboutin| A]]  ::  [[HW2.B Ben Horst _ECE301Fall2008mboutin| B]]  ::  [[HW2.C Ben Horst _ECE301Fall2008mboutin| C]]
 
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==Formal Definition of Linearity==
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A system is linear if the following conditions are met:
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  An input x1 yields output y1.
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  An input x2 yields output y2.
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  An input that is the sum of a*x1 and b*x2 yields output that is the sum of a*y1 and b*y2.
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  a and b are any complex constants.
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==Formal Definition of Non-Linearity==
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  An input x1 yields output y1.
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  An input x2 yields output y2.
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  An input that is the sum of a*x1 and b*x2 yields output that cannot be expressed as the sum of a*y1 and b*y2.
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  a and b are any complex constants.

Revision as of 09:33, 19 September 2008

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Homework 3 Ben Horst: A  :: B  :: C


Formal Definition of Linearity

A system is linear if the following conditions are met:

 An input x1 yields output y1.
 An input x2 yields output y2.
 An input that is the sum of a*x1 and b*x2 yields output that is the sum of a*y1 and b*y2.
 a and b are any complex constants.


Formal Definition of Non-Linearity

 An input x1 yields output y1.
 An input x2 yields output y2.
 An input that is the sum of a*x1 and b*x2 yields output that cannot be expressed as the sum of a*y1 and b*y2.
 a and b are any complex constants.

Alumni Liaison

Basic linear algebra uncovers and clarifies very important geometry and algebra.

Dr. Paul Garrett