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Shouldn't one of the bounds in the first part of question 1 be non-inclusive since if you plug in <math>\frac{\pi}{2}</math> for the top part, you get <math> \frac{2}{\pi} - 1</math> instead of '''0''' ?  - pclay  
 
Shouldn't one of the bounds in the first part of question 1 be non-inclusive since if you plug in <math>\frac{\pi}{2}</math> for the top part, you get <math> \frac{2}{\pi} - 1</math> instead of '''0''' ?  - pclay  
  
 
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*The bounds are correct. The expression over the interval <math> | \omega | \leq \pi / 2 </math> is the following: <math> 1 - \frac{|\omega|}{\pi / 2} </math> It appears that you have read it as <math> \frac{1 - |\omega |}{\pi / 2} </math>  -[[user:crtaylor|crtaylor]]
  
 
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Revision as of 12:29, 27 September 2009


hw4 discussion (ECE438BoutinFall09)

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Shouldn't one of the bounds in the first part of question 1 be non-inclusive since if you plug in $ \frac{\pi}{2} $ for the top part, you get $ \frac{2}{\pi} - 1 $ instead of 0 ? - pclay

  • The bounds are correct. The expression over the interval $ | \omega | \leq \pi / 2 $ is the following: $ 1 - \frac{|\omega|}{\pi / 2} $ It appears that you have read it as $ \frac{1 - |\omega |}{\pi / 2} $ -crtaylor

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

Dr. Paul Garrett