CHAPTER 12 Filter Circuits. Objectives Describe and Analyze: Filter types: LPF, HPF, BPF, BSF Passive filters Active filters LC tuned amplifiers Other.
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CHAPTER 12
Filter
Circuits
Objectives
Describe and Analyze:• Filter types: LPF, HPF, BPF, BSF• Passive filters• Active filters• LC tuned amplifiers• Other filter topics• Troubleshooting
IntroductionA filter is a circuit designed to separate signals from each other
based on their frequency. There are four basic types:
• Low-Pass Filter (LPF): passes signals below some frequency
• High-Pass Filter (HPF): passes signals above some frequency
• Bandpass Filter (BPF): passes signals between two frequencies
• Bandstop Filter (BSF): blocks signals between two frequencies
Frequency Response
Bands are measured to the 3dB points.
Passive RC Filters• All four types of filter can be made with just resistors
and capacitors. They are not “high performance”, but they work.
RC FiltersThe frequency f = 1/(2RC) has several names:
• Break frequency• Corner frequency• Cutoff frequency• Roll-off frequency• 3dB frequency (or -3dB frequency)• 0.707 frequency
• f0 (“eff-zero”)
• fB (“eff-bee”)
RC Filters
Bode plot for a”single-stage” LPF (one R and one C)
RC LPF Example
What is the cutoff frequency for a LPF with
R = 1.59 k and C = 0.01 F ?
Time constant = RC = (1.59 k) (0.01 F) = 15.9 s
f0 = 1 / (2 ) = 10 kHz
Bode Plots
Note that 6 dB /octave is equal to 20 dB /decade.
Order• The term order used to describe filters tells us how
fast the Bode plot rolls off. A first-order filter, such as an RC filter made with one capacitor, has a roll-off of 20 dB/decade, a second-order filter has a roll-off of 40 dB/decade, and so on.
• The roll-off is N 20 dB/decade where N is the order of the filter.
• You will see the word pole used to mean the same thing: a 1-pole filter is a first-order filter, a 2-pole filter is a second-order filter, and so on.
Order
<insert figure 12-10 here>
The Bode plot says it all.
Active Filters
• When you make a filter, you want its Bode plot to have a shape appropriate to the application. While a second-order filter can be made with two resistors and two capacitors, its Bode plot will not have a “clean” break-point. That’s where active filters come in.
• Active filters use an op-amp together with Rs and Cs. The op-amp’s feedback loop allows you to control the shape of the Bode plot.
• Feedback RC filters are often called “Sallen & Key” filters after the two men who first described them in the 1950s. Of course, they used vacuum tubes!
Active Filters
(a) is a LPF, (b) is a HPF
Active Filters
<insert figure 12-16 here>
Active Filters
Switched Capacitor Filters
Break-point is controlled by clock rate.
LC Tuned Amplifier
)π/(= LCfo 21
• A tuned circuit amplifier is essentially a bandpass filter with a very narrow pass band. The parameter Q (stands for “Quality”) measures the narrowness of the pass band. How high is high depends on the application, but usually Q = 10 or more is high Q. The width of the pass band is the center frequency
divided by Q.
• Q = REQ /(2 fo L) where REQ is the equivalent resistance across the parallel LC circuit.
LC Tuned Amps and Q
)π/(= LCfo 21
Piezoelectric Filters
Piezoelectric crystals and ceramics act like tuned circuits.
Troubleshooting• Determine the filter type you are working on.• Use an oscilloscope to look at inputs and outputs to
check for correct filter response.• If necessary, inject a sine wave and vary the
frequency to test the filter response.• Tuned-circuits sometimes “drift”, and may have a
small trimmer capacitor to make adjustments.• Active filters either work or the op-amp is dead.• Crystals and ceramics do not drift, but they can
crack from rough handling or too much current.
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