04 AE Frequency Behavior
22
Analogue Electronics Paolo Colantonio A.A. 2015-16 Università degli Studi di Roma Tor Vergata Dipartimento di Ingegneria Elettronica
Transcript of 04 AE Frequency Behavior
Analogue ElectronicsPaolo Colantonio
A.A. 2015-16
Università degli Studi di Roma Tor VergataDipartimento di Ingegneria Elettronica
P. Colantonio – Analogue Electronics 2|22A.A. 2015/16
Linear permanent (LP) systemThe output signal Su(t) is a replica of the input signal Si(t), eventually amplified and phase shifted
The transfer function H() represents the in‐out relationship in frequency domain
P. Colantonio – Analogue Electronics 3|22A.A. 2015/16
Frequency response
• The frequency response of a network is identified by the variation of its transfer function (i.e., voltage, current or power) vs. frequency, both in terms of amplitude and phase shift.Example
Transfer function
The frequency response is characterized by the Bode diagrams
P. Colantonio – Analogue Electronics 4|22A.A. 2015/16
High Pass RC filter
Defining the resonating frequency
f << fC f = fC f >> fCIm(AV)
Re(AV)
Im(AV)
Re(AV)
Im(AV)
Re(AV)
1
12
1
1
1
1
tan
11 1
→0
→1
12
0,707 3→90°
→0°45°
P. Colantonio – Analogue Electronics 5|22A.A. 2015/16
High Pass RC filter
P. Colantonio – Analogue Electronics 6|22A.A. 2015/16
Low Pass RC filterDefining the resonating frequency
f << fC f = fC f >> fCIm(AV)
Re(AV)
Im(AV)
Re(AV)
Im(AV)
Re(AV)
1
11
11
21
1
1
1tan
111
→0
→1 1
20,707 3
→90°
→0° 45°
P. Colantonio – Analogue Electronics 7|22A.A. 2015/16
Low Pass RC filter
P. Colantonio – Analogue Electronics 8|22A.A. 2015/16
RL Filters: Low Pass
P. Colantonio – Analogue Electronics 9|22A.A. 2015/16
RL Filters: High Pass
P. Colantonio – Analogue Electronics 10|22A.A. 2015/16
A Comparison of RC and RL Networks
• Circuits using RC and RL techniques have similar characteristics
P. Colantonio – Analogue Electronics 11|22A.A. 2015/16
Bode Diagrams• Straight‐line approximations
P. Colantonio – Analogue Electronics 12|22A.A. 2015/16
Bode Diagrams• Creating more detailed Bode diagrams
P. Colantonio – Analogue Electronics 13|22A.A. 2015/16
Cascade of networks: example of HP‐LP
If fC1<<fc2 Band pass filter
P. Colantonio – Analogue Electronics 14|22A.A. 2015/16
Band Pass and Band Stop (Notch filter)
P. Colantonio – Analogue Electronics 15|22A.A. 2015/16
Parallel RLC
Defining the resonating frequency
And the parameter Q (quality factor)
P. Colantonio – Analogue Electronics 16|22A.A. 2015/16
Parallel RLC
The frequency behavior of the transfer function AI is reported in the followingamplitude and phase plots
The resonating phenomenon is highlighted in the amplitude plot and the frequencybehavior is strictly depending on the value of Q, that is also referred as resonatingcoefficient.
P. Colantonio – Analogue Electronics 17|22A.A. 2015/16
Series RLC
The voltage across each component and the currentcan be easily determined in frequency domain
Defining the resonating frequency
And the parameter Q (quality factor)
The same consideration as for theparallel RLC case can be applied.
P. Colantonio – Analogue Electronics 18|22A.A. 2015/16
Summary of resonances in RLC circuits
Series RLC
• The impedance is given by
• if the magnitude of the reactance of theinductor and capacitor are equal, theimaginary part is zero, and the impedance issimply R. This occurs when
• This situation is referred to as resonance• The frequency at which is occurs is the
resonant frequency• In the series resonant circuit, the
impedance is at a minimum at resonance while the current is at a maximum
• The series RLC circuit is an acceptor circuit
P. Colantonio – Analogue Electronics 19|22A.A. 2015/16
Summary of resonances in RLC circuits
Parallel RLC
• The admittance is given by
• if the magnitude of the reactance of theinductor and capacitor are equal, theimaginary part is zero, and the admittance issimply 1/R. This occurs when
• This situation is referred to as resonance• The frequency at which is occurs is the
resonant frequency• In the parallel resonant circuit, the
impedance is at a maximum at resonance while the current is at a minimum
• The parallel RLC circuit is a rejector circuit
P. Colantonio – Analogue Electronics 20|22A.A. 2015/16
Filters
• The RC networks considered earlier are first‐order or single‐pole filters.• These have a maximum roll‐off of 6 dB/octave• they also produce a maximum of 90° phase shift
• Combining multiple stages can produce filters with a greater ultimate roll‐off rates (12 dB, 18 dB, etc.) but such filters have a very soft ‘knee’
• An ideal filter would have constant gain and zero phase shift for frequencies within its pass band, and zero gain for frequencies outside this range (its stop band)
• Real filters do not have these idealized characteristics
P. Colantonio – Analogue Electronics 21|22A.A. 2015/16
FiltersThe use of combination of inductors and capacitors can produce very high performance filters.
Common forms include:• Butterworth
• optimised for a flat response• Chebyshev
• optimised for a sharp ‘knee’• Bessel
• optimised for its phase response
• The use of inductors is inconvenient since they are expensive, bulky and suffer from greater losses than other passive components.
• Actually, active filters are realized by using operational amplifiers
P. Colantonio – Analogue Electronics 22|22A.A. 2015/16
Notes
• All circuits have losses (i.e., intrinsically resistors)
• All circuits have stray capacitance and stray inductance
• These unintended elements can dramatically affect circuit operation and have to be carefully and properly taken into account
Cs adds an unintended low‐pass filter
Ls adds an unintended low‐pass filter
Cs produces an unintended resonant circuit and can produce instability
