Line 10: Line 10:
  
  
Rect<math>\left (\mathit{x}, \mathit{y}\right ) = <math>
+
Rect<math>\left (\mathit{x}, \mathit{y}\right ) = <math>\begin{cases}
 +
  1,  & \mbox{if }|x|&|y|\mbox{ is less than 1} \\
 +
  0, & \mbox{if }\mbox{ else}
 +
\end{cases}</math>

Revision as of 20:44, 5 November 2009

TWO DIMENSIONAL SIGNALS


Some 2D signals are $ \ \delta\left (\mathit{x}, \mathit{y}\right ) $,Rect$ \left (\mathit{x}, \mathit{y}\right ) $,Sinc$ \left (\mathit{x}, \mathit{y}\right ) $.One important property of 2D functions is that they are separable,when they are a product of two 1D signals.They are of the form :

  $ \ \mathbf{f}\left (\mathit{x}, \mathit{y}\right )=\mathbf{g}\left (\mathit{x}\right )\mathbf{h}\left (\mathit{y}\right) $




Rect$ \left (\mathit{x}, \mathit{y}\right ) = <math>\begin{cases} 1, & \mbox{if }|x|&|y|\mbox{ is less than 1} \\ 0, & \mbox{if }\mbox{ else} \end{cases} $

Alumni Liaison

To all math majors: "Mathematics is a wonderfully rich subject."

Dr. Paul Garrett