read : ch. 14, sect. 1-5; ch. 15, sect. 1-2; and app. d&e
DESCRIPTION
Lecture #16 EGR 261 – Signals and Systems. Read : Ch. 14, Sect. 1-5; Ch. 15, Sect. 1-2; and App. D&E in Electric Circuits, 9 th Edition by Nilsson. Bode Plots - Recall that there are 5 types of terms in H(s). The first four have already been covered. 5. Complex terms in H(s) - PowerPoint PPT PresentationTRANSCRIPT
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Bode Plots - Recall that there are 5 types of terms in H(s). The first four have already been covered.
Read: Ch. 14, Sect. 1-5; Ch. 15, Sect. 1-2; and App. D&Ein Electric Circuits, 9th Edition by Nilsson
5. Complex terms in H(s)A second order term in H(s) with complex roots has the general form s2 + 2s + wo
2 . After factoring out the constant has the wo2 , the corresponding term in
H(jw) is:2
2 20 0
2 w w1 j - (a 2nd-order pole or zero with complex roots)w w
Key point: The complex term above is identical to a double real pole or a double real zero in the Bode straight-line approximation, but they differ in the exact curves.
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Complex peaks and damping ratio
o
2 2
2 2 200 0 0
o
Recall that (zeta) = damping ratio where w
2 w w 2 w wthen H(jw) 1 j - is equal to H(jw) 1 j - ww w w
and at the break frequency (w w ) this yieldsH(jw) j2so LM 20
log(2 ) which yields a peak whose size depends on the value of
Exercise: Complete the table below showing the value of the complex peak (for a complex zero)
* = 1 is not complex. It corresponds to a double-zero.
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The following graphs from the text (Electric Circuits, 6th Edition, by Nilsson) below show the Bode straight-line approximation (Figure 14.41) and the exact curve for different values of (Figure 14.42).
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Example: Sketch the LM responses for H1(s), which has a double zero, and H2(s), which has a complex zero.
4 4
1 22 2 4
10 10 H (s) H (s) (s 100) (s 20s 10 )
A) Find H1(jw) and sketch the LM response
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Example: Sketch the LM responses for H1(s), which has a double zero, and H2(s), which has a complex zero.
4 4
1 22 2 4
10 10 H (s) H (s) (s 100) (s 20s 10 )
B) Find H2(jw) and sketch the LM response
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FiltersA filter is a circuit designed to have a particular frequency response, perhaps to alter the frequency characteristics of some signal. It is often used to filter out, or block, frequencies in certain ranges, much like a mechanical filter might be used to filter out sediment in a water line.
Basic Filter Types
• Low-pass filter (LPF) - passes frequencies below some cutoff frequency, wC
• High-pass filter (HPF) - passes frequencies above some cutoff frequency, wC
• Band-pass filter (BPF) - passes frequencies between two cutoff frequency, wC1 and wC2
• Band-stop filter (BSF) or band-reject filter (BRF) - blocks frequencies between two cutoff frequency, wC1 and wC2
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Ideal filtersAn ideal filter will completely block signals with certain frequencies and pass (with no attenuation) other frequencies. (To attenuate a signal means to decrease the signal strength. Attenuation is the opposite of amplification.)
LM
wwC
Ideal LPFLM
wwC
Ideal HPF
LM
wwC1
Ideal BPF
wC2
LM
wwC1
Ideal BSF
wC2
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Filter orderUnfortunately, we can’t build ideal filters. However, the higher the order of a filter, the more closely it will approximate an ideal filter. The order of a filter is equal to the degree of the denominator of H(s). (Of course, H(s) must also have the correct form.)
LM
wwC
Ideal LPFslope =
3rd-order LPFslope = -60dB/dec
2nd-order LPFslope = -40dB/dec
1st-order LPFslope = -20dB/dec
4th-order LPFslope = -80dB/dec
C
KH(s) = (s + w )
2C
KH(s) = (s + w )
3C
KH(s) = (s + w )
4C
KH(s) = (s + w )
C
KH(s) = (s + w )
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Low-pass filter (LPF) - Discuss the form of LM, H(jw), and H(s).
High-pass filter (HPF) - Discuss the form of LM, H(jw), and H(s).
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Band-pass filter (BPF) - Discuss the form of LM, H(jw), and H(s).
Band-stop filter (BSF) - Discuss the form of LM, H(jw), and H(s). Also define a “notch” filter.
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Practical Filter Examples: Discuss a stereo tuner, 5-band equalizer, FSK demodulator, 60 Hz interference block.
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Active and passive filtersPassive filter - a filter constructed using passive circuit elements (R’s, L’s, and C’s)Active filter - a filter constructed using active circuit elements (primarily op amps)
Analysis of active filtersActive filters are fairly easy to analyze. Recall that a resistive inverting amplifier circuit has the following relationship:
Vo +
_ Vin R1
R2
o 2CL
in 1
V RA = = -V R
Replacing the resistors with impedances yields a transfer function, H(s):
Vo(s) +
_ Vin(s) Z1
Z2
o 2
in 1
V ( ) ZH(s) = = -V ( ) Z
ss
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Vo +
_ Vin 200
10F
10F
Example: Find H(s) =Vo(s)/Vin(s) for the circuit below and sketch the LM response.
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Impedance and Frequency Scaling
Filter tables are commonly available that list component values for various types of filters. However, the tables could not possibly list component values for all possible cutoff frequencies. Typically, filter tables will list cutoff frequencies of perhaps 1 Hz or 1 kHz. The user can then scale the cutoff frequencies to the desired values using frequency scaling. Similarly, component values may be too large or too small (for example, a filter might be shown using 1 ohm resistors or
1F capacitors) so the components need to be scaled using impedance scaling.
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Impedance Scaling – a procedure used to change the impedance of a circuit without affecting its frequency response. Consider the series RLC circuit shown below.
R sL
Z(s) 1sC
Show that to scale the impedance by a factor KZ :
1Note that Z(s) R sL sC
Z
Z
Z
R' K RL' K L
CC' K
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Frequency Scaling – a procedure used to scale all break frequencies in the frequency response of a circuit. The frequency response is scaled without affecting the circuit impedance (the impedance is the same at the original and new break frequencies). Consider the series RLC circuit shown below.
Note that H(s) described above is the transfer function of a band-pass filter. The LM is shown on the following page.
Vo(s) R
sL +
_
Vi(s)
+
_
1sC
o
2i
R sV (s) LH(s)
R 1V (s) s s L LC
As seen in an earlier class, H(s) is described below.
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LM of the frequency-scaled band-pass filter (center frequency = KFwo):
|H(jw)|
wo
|H(jwo)|
w
|H(jw/KF)|
KFwo
|H(jwo)|
w wo
LM of the original band-pass filter (center frequency = wo):
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Show that to scale the frequency by a factor KF :
F
F
R' RLL'
KCC'
K
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Example: Impedance and frequency scaling.
A) Determine H(s) = Vo(s)/Vi(s)
B) Sketch the LM response
1
1 F Vo(s)
+
_
Vi(s)
+
_
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Example: (continued)C) A cutoff frequency of 1 rad/s and component values of 1 ohm and 1 Farad are
not very useful. Scale the frequency so that the cutoff frequency is 500 rad/s. Also increase the impedance of the circuit by a factor of 1000.
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Example: (continued)D) Draw the new circuit. Determine the new H(s) and verify that the LM response
has been shifted as planned.E) Calculate the circuit impedance at the break frequency for the new circuit and
compare it to the circuit impedance at the break frequency for the original circuit.
Lecture #16 EGR 261 – Signals and Systems