Tasks
ROC
Stability and Causality
Pole-Zero (R)
Pole-Zero (I)
Filtering
ROCs
Instructions
Enter the number of ROCs for the given pole zero plot
Then enter the ROCs in increasing annular order, as \( [R1, R2] \) for the ROC \( R1 < |z| < R2 \)
Truncate your answer to two decimals, for example, 0.1283 should be entered as 0.12
Number of ROCs
Add
Check Number
Check ROCs
Given
Observations
Stability and Causality
Instructions
Enter the ROC number in the field as referenced in the ROC List on the left, corresponding to stable and causal
ROCs
Stabe
Causal
Check
Given
Observations
Pole-Zero and Magnitude Response (Real)
Instructions
Z-Transform is
H(z) = \( \frac{(z-a)(z-b)(z-c)}{(z-d)(z-e)(z-f)} \)
Fill the values of a, b, c, d, e, f (all real)
a:
b:
c:
d:
e:
f:
Pole-Zero Plot
Filter Response Plot
Plot
Pole-Zero and Magnitude Response (Imaginery)
Instructions
Z-Transform is
H(z) = \( \frac{(z-z_{1})(z-z_{1}^{*})}{(z-z_{2})(z-z_{2}^{*})} \)
Here \(z_{1}\) and \(z_{2}\) are complex numbers with \(z_{1} = a + jb\) and \(z_{2} = c + jd\)
Fill the values of a, b, c, d (all real)
a:
b:
c:
d:
Pole-Zero Plot
Filter Response Plot
Plot
Filtering
Instructions
Z-Transform is
H(z) = \( \frac{(z-z_{1})(z-z_{1}^{*})}{(z-z_{2})(z-z_{2}^{*})} \)
Here \(z_{1}\) and \(z_{2}\) are complex numbers with \(z_{1} = a + jb\) and \(z_{2} = c + jd\)
Fill the values of a, b, c, d (all real) such that the system follows the filter specified on the left
Filter to implement
Check
a
b
c
d
Observations
Observations