(New page: == Periodic and Non-Periodic Functions == '''Periodic''' In CT the cosine function cos(t) is a periodic function with fundamental period T = 2π. This comes from the definition of perio...)
 
 
Line 1: Line 1:
 
 
== Periodic and Non-Periodic Functions ==
 
== Periodic and Non-Periodic Functions ==
  
 
'''Periodic'''
 
'''Periodic'''
 +
 
In CT the cosine function cos(t) is a periodic function with fundamental period T = 2π.  This comes from the definition of periodic systems. A function x(t) is periodic if there exists some T > 0 for which x(t + T) = x(t). In our case x(t) = cos(t) and T = 2π * n where n is an integer.
 
In CT the cosine function cos(t) is a periodic function with fundamental period T = 2π.  This comes from the definition of periodic systems. A function x(t) is periodic if there exists some T > 0 for which x(t + T) = x(t). In our case x(t) = cos(t) and T = 2π * n where n is an integer.
 +
  
 
'''Non-Periodic'''
 
'''Non-Periodic'''
 +
 
In CT let x(t)=e^[1+j2)t]=(e^t)×[cos⁡(2t)+ jsin(2t)]  is a non-periodic signal because there is no T for which x(t+T)= x(t).  In this case the signals amplitude goes to ∞ as t goes to ∞.
 
In CT let x(t)=e^[1+j2)t]=(e^t)×[cos⁡(2t)+ jsin(2t)]  is a non-periodic signal because there is no T for which x(t+T)= x(t).  In this case the signals amplitude goes to ∞ as t goes to ∞.

Latest revision as of 08:23, 5 September 2008

Periodic and Non-Periodic Functions

Periodic

In CT the cosine function cos(t) is a periodic function with fundamental period T = 2π. This comes from the definition of periodic systems. A function x(t) is periodic if there exists some T > 0 for which x(t + T) = x(t). In our case x(t) = cos(t) and T = 2π * n where n is an integer.


Non-Periodic

In CT let x(t)=e^[1+j2)t]=(e^t)×[cos⁡(2t)+ jsin(2t)] is a non-periodic signal because there is no T for which x(t+T)= x(t). In this case the signals amplitude goes to ∞ as t goes to ∞.

Alumni Liaison

Ph.D. 2007, working on developing cool imaging technologies for digital cameras, camera phones, and video surveillance cameras.

Buyue Zhang