Difference between revisions of "Frequency Response Visualization"

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The magnitude response of a linear system is the intersection of the magnitude of the transfer function, <math>\left|H\left(s\right)\right|</math>, in the <math>s=\sigma + j\omega</math>-plane and the plane containing the <math>j\omega</math>-axis, as shown by the dashed green lines in Figs. 1-4. Note that the poles are the values of <math>s</math> that makes <math>\left|H\left(s\right)\right|\rightarrow\infty</math>, and the zeros are values of <math>s</math> that result in <math>\left|H\left(s\right)\right|=0</math>.
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The magnitude response of a linear system is the intersection of the magnitude of the transfer function, <math>\left|H\left(s\right)\right|</math>, in the <math>s=\sigma + j\omega</math> plane and the plane containing the <math>j\omega</math>-axis, as shown by the dashed green lines in Figs. 1-4. Note that the poles are the values of <math>s</math> that makes <math>\left|H\left(s\right)\right|\rightarrow\infty</math>, and the zeros are values of <math>s</math> that result in <math>\left|H\left(s\right)\right|=0</math>.
  
 
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Latest revision as of 00:21, 19 March 2021

The magnitude response of a linear system is the intersection of the magnitude of the transfer function, , in the plane and the plane containing the -axis, as shown by the dashed green lines in Figs. 1-4. Note that the poles are the values of that makes , and the zeros are values of that result in .

Figure 1: The low-pass Butterworth filter frequency response.
Figure 2: The low-pass Chebyshev Type-I filter frequency response.
Figure 3: The low-pass Chebyshev Type-II filter frequency response.
Figure 4: The low-pass Elliptic filter frequency response.
Figure 5: The low-pass Bessel filter frequency response.
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