Line 25: | Line 25: | ||
</tr> | </tr> | ||
</table> | </table> | ||
+ | |||
== Can This System Be Time Invariant? == | == Can This System Be Time Invariant? == | ||
+ | Let the system be defined according to the first line, input: X0[n]=δ[n] and output: Y0[n]=δ[n-1] |
Revision as of 13:28, 11 September 2008
Part E. Linearity and Time Invariance
A discrete-time system is such that when the input is one of the signals in the left column, then the output is the corresponding signal in the right column:
Input | Output | |
X0[n]=δ[n] | Y0[n]=δ[n-1] | |
X1[n]=δ[n-1] | Y1[n]=4δ[n-2] | |
X2[n]=δ[n-2] | Y2[n]=9 δ[n-3] | |
X3[n]=δ[n-3] | Y3[n]=16 δ[n-4] | |
... | ... | |
Xk[n]=δ[n-k] | Yk[n]=(k+1)$ ^{2} $ δ[n-(k+1)] For any non-negative integer k |
Can This System Be Time Invariant?
Let the system be defined according to the first line, input: X0[n]=δ[n] and output: Y0[n]=δ[n-1]