Difference between revisions of "Active Filters"

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</math>|{{EquationRef|9}}}}
 
</math>|{{EquationRef|9}}}}
  
For <math>Q_\text{ind}=40</math>, <math>L^\prime \approx L</math>, we can then redraw our band-pass filter with the lossy inductor model, as shown in Fig. 4. Thus, the new transfer function is then:
+
For <math>Q_\text{ind}=40</math>, we get almost no change in the inductor value, or equivalently <math>L^\prime \approx L</math>. We can then redraw our band-pass filter with the lossy inductor model, as shown in Fig. 4. Thus, the new transfer function is then:
  
 
{{NumBlk|::|<math>
 
{{NumBlk|::|<math>
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Note that <math>\omega_0</math> remains approximately the same, the overall quality factor, <math>Q^\prime</math>, becomes:
 
Note that <math>\omega_0</math> remains approximately the same, the overall quality factor, <math>Q^\prime</math>, becomes:
 +
 +
{{NumBlk|::|<math>
 +
\begin{align}
 +
\frac{\omega_0}{Q^\prime} & = \frac{1}{C}\cdot \left(\frac{1}{R} + \frac{1}{R_p} \right) = \frac{1}{R C} + \frac{1}{R_p C}\\
 +
\frac{1}{Q^\prime} & = \frac{1}{\omega_0 R C} + \frac{1}{\omega_0 R_p C} = \frac{1}{Q} + \frac{1}{\omega_0 R_p C} \\
 +
& = \frac{1}{Q} + \frac{1}{\omega_0 R_s \left(1 + Q_\text{ind}^2\right) C}\\
 +
& = \frac{1}{Q} + \frac{Q_\text{ind}}{1 + Q_\text{ind}^2} \\
 +
& \approx \frac{1}{Q} + \frac{1}{Q_\text{ind}}
 +
\end{align}
 +
</math>|{{EquationRef|10}}}}
 +
 +
We can then plot the magnitude response of the LC band-pass filter, as shown in Fig. 5.

Revision as of 11:54, 26 March 2021

Passive RLC filters are simple and easy to design and use. However, can we implement them on-chip? Let us look at a simple example to give us a bit more insight regarding this question.

Example: A passive band-pass filter

Consider the filter shown in Fig. 1.

We can write the transfer function as:

 

 

 

 

(1)

If we let and , then we can rewrite our expression for as:

 

 

 

 

(2)

Notice that the transfer function has two zeros, , and two poles located at:

 

 

 

 

(3)

We get complex conjugate poles if or when , or equivalently, when . If the band-pass filter has , , and :

 

 

 

 

(4)

 

 

 

 

(5)

Let us now consider a lossy inductor with . The loss can then be modeled by the series resistance, , as shown in Fig. 2, with:

 

 

 

 

(6)

We can convert the series RL circuit to its parallel circuit equivalent in Fig. 3 for frequencies around by first writing out the admittance of the series RL circuit as:

 

 

 

 

(7)

Thus, we get:

 

 

 

 

(8)

 

 

 

 

(9)

For , we get almost no change in the inductor value, or equivalently . We can then redraw our band-pass filter with the lossy inductor model, as shown in Fig. 4. Thus, the new transfer function is then:

 

 

 

 

(10)

Note that remains approximately the same, the overall quality factor, , becomes:

 

 

 

 

(10)

We can then plot the magnitude response of the LC band-pass filter, as shown in Fig. 5.