| Line 3: | Line 3: | ||
the cascade | the cascade | ||
| − | x[n]----->Time delay ----> System -----> z[n] | + | *x[n]----->Time delay ----> System -----> z[n] |
yields the same output as | yields the same output as | ||
| − | x[n]----->system----->Time Delay-----> y[n] | + | *x[n]----->system----->Time Delay-----> y[n] |
Revision as of 11:10, 12 September 2008
Time invariance
A system is called time invariant if the cascade
- x[n]----->Time delay ----> System -----> z[n]
yields the same output as
- x[n]----->system----->Time Delay-----> y[n]
Time Invariance check
Let us check for y[n] = x[n]^2
- $ y[x[n-n0]] = x{[n-n0]^2} $
Also,
- $ y[n-n0] = x{[n-n0]^2} $
Thus the above system is time invariant
Time Variance check
Let us test for
y[n]=cos[nQ]*x[n]
- y[x[n-n0]]=cos[nQ]*x[n-n0]
Also,
- y[n-n0]= cos[n-n0]* x[n-n0]
Thus from above we can say that the system is time variant
