(Part 1)
(Part 1)
 
Line 3: Line 3:
 
I'll use the signal that I picked for the last homework to demonstrate the sampling rate idea.  My signal was tan(t).  If you sample this function at a rate of <math>\pi</math>, every sample will be identical, as long as it's not shifted by  
 
I'll use the signal that I picked for the last homework to demonstrate the sampling rate idea.  My signal was tan(t).  If you sample this function at a rate of <math>\pi</math>, every sample will be identical, as long as it's not shifted by  
  
<math>\frac{\pi}{2}</math> since  
+
<math>\frac{\pi}{2}</math>  
 +
 
 +
since  
  
 
<math>\tan(\frac{\pi}{2}+n*\pi)</math> for any integer n is undefined.
 
<math>\tan(\frac{\pi}{2}+n*\pi)</math> for any integer n is undefined.

Latest revision as of 13:07, 11 September 2008

Part 1

I'll use the signal that I picked for the last homework to demonstrate the sampling rate idea. My signal was tan(t). If you sample this function at a rate of $ \pi $, every sample will be identical, as long as it's not shifted by

$ \frac{\pi}{2} $

since

$ \tan(\frac{\pi}{2}+n*\pi) $ for any integer n is undefined.

However, if you sample this function with a period of anything OTHER than $ \pi $ then you get random dots all over the place.

Part 2

I picked a pretty easy function for a non-periodic one for homework 1, so I'll use it again! :) I chose $ y=x $ According to the definition,

$ y(t+k*T) $

should be periodic for any k and constant T, so lets see. We get a sum that looks about like

$ (t-5) + (t-4) + (t-3) + (t-2) + (t-1) + t + (t+1) + (t+2) + (t+3) + ... $ for T=1 and k=...-5,-4,-3,-2,-1,0,1,2,3,4... When you shift this by 1 you get $ (t-4) + (t-3) + (t-2) + (t-1) + (t) + (t+1) + (t+2) + (t+3) + (t+4) $ As you can see if this sum were taken to infinity, the shift of 1 would result in the exact same signal, thus it would be periodic.

Alumni Liaison

Questions/answers with a recent ECE grad

Ryne Rayburn