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It was mentioned in the discussion that it would be nice that a description of the mathematical notations used below was explained.  So, here it is: [[Mathematical Shorthand_ECE301Fall2008mboutin]]
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Edit: It was mentioned in the discussion that it would be nice that a description of the mathematical notations used below was explained.  So, here it is: [[Mathematical Shorthand_ECE301Fall2008mboutin]]
  
 
== Formal Definition of a Stable System ==
 
== Formal Definition of a Stable System ==

Revision as of 19:00, 17 September 2008

Edit: It was mentioned in the discussion that it would be nice that a description of the mathematical notations used below was explained. So, here it is: Mathematical Shorthand_ECE301Fall2008mboutin

Formal Definition of a Stable System

A system is called stable if for any bounded input $ \,x(t)\, $

( $ \,\exists \epsilon \in \mathbb{R}\, $ such that $ \,|x(t)|<\epsilon , \forall t\in\mathbb{R}\, $ )


yields a bounded output $ \,y(t)\, $.

( $ \,\exists \delta \in \mathbb{R}\, $ such that $ \,|y(t)|<\delta , \forall t\in\mathbb{R}\, $ )

Formal Definition of an Unstable System

A system is called unstable if there exists a bounded input $ \,x(t)\, $

( $ \,\exists \epsilon \in \mathbb{R}\, $ such that $ \,|x(t)|<\epsilon , \forall t\in\mathbb{R}\, $ )


that yields an unbounded output $ \,y(t)\, $.

( there is no $ \,\delta \in \mathbb{R}\, $ such that $ \,|y(t)|<\delta , \forall t\in\mathbb{R}\, $ )

Comments on Other Answers

Talk:HW3-A Derek Hopper_ECE301Fall2008mboutin

Talk:HW3.A Max Paganini_ECE301Fall2008mboutin

Talk:HW3.A Zachary Curosh_ECE301Fall2008mboutin

Alumni Liaison

Correspondence Chess Grandmaster and Purdue Alumni

Prof. Dan Fleetwood