Difference between revisions of "HW4.2 Shweta Saxena ECE301Fall2008mboutin" - Rhea

Latest revision as of 17:11, 26 September 2008

Let the DT siganl be

8 + sin $( \frac{2 pi n}{N} )$ + 8cos $( \frac{4 pi n}{N} )$

= 8 + $( \frac{1}{2j})$ { $( e^( \frac{j2 pi n}{N} )$ - $e^( \frac{-j2 pi n}{N} )$ } + 4 { $e^( \frac{j4 pi n}{N}$ + $e^( \frac{-j4 pi n}{N}$ }

= 8 + $( \frac{-1j}{2})$ $( e^( \frac{j2 pi n}{N} )$ + $( \frac{1j}{2})$ $( e^( \frac{-j2 pi n}{N} )$ +4 $( e^( \frac{j4 pi n}{N} )$ +4 $( e^( \frac{-j4 pi n}{N} )$

Therfore, we have the coefficients as

$$ a_0 $$ = 8

$$ a_1 $$ = $( \frac{-1 j }{2} )$

$$ a_-1 $$ = $( \frac{1 j }{2} )$

$$ a_2 $$ = 4

$$ a_-2 $$ = 4

@@ Line 4: / Line 4: @@
 + sin<math>( \frac{2  pi  n}{N} )</math> + 8cos<math>( \frac{4  pi  n}{N} )</math>
-= 8 + <math>( \frac{1}{2j})</math> <math>{ e^(<math>( \frac{j2  pi  n}{N} )</math>) </math>- e^(<math>( \frac{-j2 pi n}{N} )</math> } + 8 { e^(<math>( \frac{j4  pi  n}{N} )</math>) - e^(<math>( \frac{-j4  pi  n}{N} )</math> }
+= 8 + <math>( \frac{1}{2j})</math>  {<math>( e^( \frac{j2  pi  n}{N} ) </math> - <math>e^( \frac{-j2 pi n}{N} )</math>} + 4 {<math>e^( \frac{j4 pi n}{N} </math> + <math>e^( \frac{-j4 pi n}{N} </math>}
-= 8 + <math>( \frac{-1j}{2})</math> { e^(<math>( \frac{j2  pi  n}{N} )</math>)} + <math>( \frac{1j}{2})</math> { e^(<math>( \frac{-j2  pi  n}{N} )</math>)} +4 { e^(<math>( \frac{j4  pi   n}{N} )</math>)} +4 { e^(<math>( \frac{-j4  pi  n}{N} )</math>)}
+= 8 + <math>( \frac{-1j}{2})</math> <math>( e^( \frac{j2  pi  n}{N} ) </math> + <math>( \frac{1j}{2})</math> <math>( e^( \frac{-j2  pi  n}{N} ) </math> +4 <math>( e^( \frac{j4  pi  n}{N} ) </math> +4 <math>( e^( \frac{-j4  pi  n}{N} ) </math>
 Therfore, we have the coefficients as
@@ Line 21: / Line 21: @@
 <math>a_-2</math> = 4
-<math>a^2</math>

Difference between revisions of "HW4.2 Shweta Saxena ECE301Fall2008mboutin" - Rhea

Latest revision as of 17:11, 26 September 2008

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