Line 2: | Line 2: | ||
[[Category:LTI systems]] | [[Category:LTI systems]] | ||
− | + | ||
+ | == 1. Example of: == | ||
'''a.) Linear and non-linear system''' | '''a.) Linear and non-linear system''' | ||
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[[Category:convolution]] | [[Category:convolution]] | ||
− | Graphical Convolution problem: | + | |
+ | == 2. Graphical Convolution problem: == | ||
+ | |||
x(t) = e^(-2t)u(t) | x(t) = e^(-2t)u(t) | ||
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[[Category:period]] | [[Category:period]] | ||
− | 3. What is the fundamental period of sin(6/5t)+e^(j3(1-t))? | + | |
+ | == 3. What is the fundamental period of sin(6/5t)+e^(j3(1-t))? == | ||
+ | |||
sin(6/5t) has period of 5pi/3 | sin(6/5t) has period of 5pi/3 |
Revision as of 10:55, 11 February 2013
1. Example of:
a.) Linear and non-linear system
Linear system: y[n] = x[n]+x[n-1]
Non-linear system: y(t) = ln(x(t))
b.) Casual and non-casual system
Causal system: y(t) = 1+ x(t)sin(πt)
Non-causal system: y(t) = x(-t)
c.) System with memory and without memory:
System with memory: y(t) = ∫ x(t)dt from 0 to t
System without memory: y[n] = √(x[n])
d.) Invertible and non-invertible system
Invertible system: y[n] = x[1-n]
Non-invertible system: y(t) = |x(t)|
e.) Stable and Unstable system
Stable system: y(t) = e^(-t)x(t)u(t)
Unstable system: y(t) = x(t) + y(t-1)
f.) Time variant and time invariant system
Time variant system y[n] = x[n]e^[jωn]
Time Invariant system y(t) = 2^(x(t))
2. Graphical Convolution problem:
x(t) = e^(-2t)u(t)
h(t) = u(t)-u(t-1)
Find y(t) = x(t) * h(t):
3. What is the fundamental period of sin(6/5t)+e^(j3(1-t))?
sin(6/5t) has period of 5pi/3
e^(j3(1-t)) = e^(j3)(cos(3t)-jsin(3t)) which has period of 2pi/3
The fundamental period is the LCM which is 10pi/3