CHAPTER 6: INTRODUCTION TO PASSIVE FILTERS

Name: CHAPTER 6: INTRODUCTION TO PASSIVE FILTERS
Uploaded: 2017-10-10T19:57:59+00:00
Duration: PTM10S26
Channel: Milo Roberts
Description: CHAPTER 6: INTRODUCTION TO PASSIVE FILTERS

CHAPTER 6: INTRODUCTION TO PASSIVE FILTERS
Series & Parallel Resonance Passive Filter DEE2113 : Chap 6 - Introduction to Passive Filters AHBMH

Resonance Resonance is a condition in an RLC circuit in which the capacitive and inductive reactances are equal in magnitude, thereby resulting in a purely resistive impedance. The series resonant circuit AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

DEE2113 : Chap 6 - Introduction to Passive Filters
Series Resonance Input impedance: Resonance occurs when imaginary part is 0 Resonant/center frequency: AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Series Resonance At resonance: The impedance is purely resistive, Z = R The voltage and the current are in phase, pf=1 The magnitude of transfer function H(w) = Z(w) is minimum The inductor voltage and capacitor voltage can be much more than the source voltage AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Series Resonance Average power dissipated by the RLC circuit: Where: AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Series Resonance The current amplitude vs. frequency for the series resonant circuit Maximum power: Power at certain frequency: AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Series Resonance Half power frequency: AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Series Resonance The “sharpness” of the resonance in a resonant circuit is measured quantitatively by the quality factor Q The quality factor of a resonant circuits is the ratio of its resonant frequency to its bandwidth AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Series Resonance Relation between Q and bandwidth B:
The higher the circuit Q, the smaller the bandwidth AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Series Resonance High Q circuit if, and half power frequency can be approximated as: AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Example 1 R=2Ω, L=1mH, C=0.4μF. Determine : The resonant frequency and the half-power frequency The quality factor and bandwidth The amplitude of the current at ω0, ω1 and ω2 AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Parallel Resonance The parallel-resonant circuit AHBMH
DEE2113 : Chap 6 - Introduction to Passive Filters

Parallel Resonance Input admittance: Resonance occurs when imaginary part is 0 Resonant frequency: AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Parallel Resonance Half power frequency: AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Parallel Resonance AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Parallel Resonance High Q circuit if, and half power frequency can be approximated as: AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Example 2 R=8 kΩ, L=0.2 mH, C=8 μF. Determine : The resonant frequency, quality factor and bandwidth The half-power frequencies The power dissipated at ω0, ω1 and ω2 AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

A filter is a circuit that is designed to pass signals with desired frequencies and reject or attenuate others. 4 types of filters: Lowpass filter: passes low frequencies and stops high frequencies Highpass filter: passes high frequencies and rejects low frequencies Bandpass filter: passes frequencies within a frequency band and blocks or attenuates frequencies outside the band Bandstop filter: passes frequencies outside a frequency band and blocks or attenuates frequencies within the band AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Filters Ideal frequency response of four types of filters: a) lowpass
b) highpass d) bandstop c) bandpass AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Lowpass Filters A lowpass filter is designed to pass only frequencies from dc up to the cutoff frequency ωc AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Lowpass Filters Transfer function: Cutoff frequency: AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Highpass Filter A highpass filter is designed to pass all frequencies above its cutoff frequency ωc AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Highpass Filters Transfer function: Cutoff frequency: AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Bandpass Filter A bandpass filter is designed to pass all frequencies within a band of frequencies, ω1 < ω0 < ω2 AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Bandpass Filters Transfer function: Center frequency: AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Bandstop Filter A bandstop filter is designed to stop or eliminate all frequencies within a band of frequencies, ω1 < ω0 < ω2 AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Bandstop Filters Transfer function: Center frequency: AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Example 3 Bandstop filter rejects 200 Hz while passing other frequencies. For R=150 Ω and bandwidth 100 Hz, determine: L C AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

Exercise 1 For a series RLC bandstop filter, R=2 kΩ, L=0.1 mH, C=40 pF. Determine : The center frequency The bandwidth The half-power frequencies The quality factor AHBMH DEE2113 : Chap 6 - Introduction to Passive Filters

CHAPTER 6: INTRODUCTION TO PASSIVE FILTERS

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CHAPTER 6: INTRODUCTION TO PASSIVE FILTERS

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