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+ | [[Homework 2_ECE301Fall2008mboutin|<< Back to Homework 2]] | ||
+ | |||
Homework 2 Ben Horst: [[HW2-A Ben Horst _ECE301Fall2008mboutin| A]] :: [[HW2-B Ben Horst _ECE301Fall2008mboutin| B]] :: [[HW2-C Ben Horst _ECE301Fall2008mboutin| C]] :: [[HW2-D Ben Horst _ECE301Fall2008mboutin| D]] :: [[HW2-E Ben Horst _ECE301Fall2008mboutin| E]] | Homework 2 Ben Horst: [[HW2-A Ben Horst _ECE301Fall2008mboutin| A]] :: [[HW2-B Ben Horst _ECE301Fall2008mboutin| B]] :: [[HW2-C Ben Horst _ECE301Fall2008mboutin| C]] :: [[HW2-D Ben Horst _ECE301Fall2008mboutin| D]] :: [[HW2-E Ben Horst _ECE301Fall2008mboutin| E]] | ||
---- | ---- | ||
− | + | Given the system | |
+ | |||
+ | <table> | ||
+ | <tr> | ||
+ | <td>Input</td><td> </td><td>Output</td> | ||
+ | </tr> | ||
+ | <tr> | ||
+ | <td>X0[n]=δ[n]</td><td> -> </td><td> Y0[n]=δ[n-1]</td> | ||
+ | </tr> | ||
+ | <tr> | ||
+ | <td>X1[n]=δ[n-1]</td><td> -> </td><td> Y1[n]=4δ[n-2]</td> | ||
+ | </tr> | ||
+ | <tr> | ||
+ | <td>X2[n]=δ[n-2]</td><td> -> </td><td> Y2[n]=9 δ[n-3]</td> | ||
+ | </tr> | ||
+ | <tr> | ||
+ | <td>X3[n]=δ[n-3]</td><td> -> </td><td> Y3[n]=16 δ[n-4]</td> | ||
+ | </tr> | ||
+ | <tr> | ||
+ | <td>...</td><td> </td><td> ...</td> | ||
+ | </tr> | ||
+ | <tr> | ||
+ | <td>Xk[n]=δ[n-k]</td><td> -> </td><td> Yk[n]=(k+1)2 δ[n-(k+1)] </td> | ||
+ | </tr> | ||
+ | </table> | ||
+ | For any non-negative integer k | ||
+ | |||
+ | ==Test for Time Invariance== | ||
+ | Start with X2[n]=δ[n-2] | ||
+ | |||
+ | Delay the signal by 2 => X2[n] = δ[n-4] | ||
+ | |||
+ | Then run the signal through the system: | ||
+ | |||
+ | X2[n] = δ[n-4] -> system -> Y2 = 25δ[n-5] | ||
+ | |||
+ | |||
+ | Repeat in reverse... | ||
+ | |||
+ | Run the signal through the system: | ||
+ | |||
+ | X2[n]=δ[n-2] -> system -> Y2 = 9δ[n-3] | ||
+ | |||
+ | Then delay the signal by 2 => Y2 = 9δ[n-5] | ||
+ | |||
+ | |||
+ | Since 9δ[n-5] ≠ 25δ[n-5], the system is not Time Invariant. | ||
+ | |||
+ | |||
+ | |||
+ | ==Second Part== | ||
+ | |||
+ | Question: Assuming that this system is linear, what input X[n] would yield the output Y[n]=u[n-1]? | ||
+ | |||
+ | X[n] = u[n] would yield Y[n]=u[n-1] since u[n] is simply the sum of shifted delta functions, and linearity dictates that they could be sent through the system (producing δ[n-1]'s) and then summed after the fact to give Y[n]=u[n-1]. |
Latest revision as of 13:22, 11 September 2008
Homework 2 Ben Horst: A :: B :: C :: D :: E
Given the system
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
Test for Time Invariance
Start with X2[n]=δ[n-2]
Delay the signal by 2 => X2[n] = δ[n-4]
Then run the signal through the system:
X2[n] = δ[n-4] -> system -> Y2 = 25δ[n-5]
Repeat in reverse...
Run the signal through the system:
X2[n]=δ[n-2] -> system -> Y2 = 9δ[n-3]
Then delay the signal by 2 => Y2 = 9δ[n-5]
Since 9δ[n-5] ≠ 25δ[n-5], the system is not Time Invariant.
Second Part
Question: Assuming that this system is linear, what input X[n] would yield the output Y[n]=u[n-1]?
X[n] = u[n] would yield Y[n]=u[n-1] since u[n] is simply the sum of shifted delta functions, and linearity dictates that they could be sent through the system (producing δ[n-1]'s) and then summed after the fact to give Y[n]=u[n-1].