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21 June, 12:11

As a data acquisition anti-alias filter, an RC Butterworth filter is designed with a cutoff frequency of 100 Hz using a single-stage topology. Determine the attenuation of the filtered analog signal at 10, 50, 75, and 200 Hz

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  1. 21 June, 12:31
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    Using the improved Butterworth filter design.

    Given that,

    Attenuation (dB) = 10log (1 + (f/fc) ^2k)

    k is the stage of the filter

    For this case it is a single stage

    Then k=1.

    fc is the cutoff frequency and it is given as 100Hz

    fc=100Hz

    f is frequency at attenuation

    Then taking the frequency one after the other

    1. When f=10Hz

    Then,

    Attenuation (dB) = 10log (1 + (f/fc) ^2k)

    k=1, fc=100Hz and f=10Hz

    Attenuation (dB) = 10log (1 + (10/100) ^2)

    Attenuation (dB) = 10log (1+0.1²)

    Attenuation (dB) = 10log (1.01)

    Attenuation (dB) = 0.0432dB

    2. When f=50Hz

    Then,

    Attenuation (dB) = 10log (1 + (f/fc) ^2k)

    k=1, fc=100Hz and f=50Hz

    Attenuation (dB) = 10log (1 + (50/100) ^2)

    Attenuation (dB) = 10log (1+0.5²)

    Attenuation (dB) = 10log (1.25)

    Attenuation (dB) = 0.969dB

    3. When f=75Hz

    Then,

    Attenuation (dB) = 10log (1 + (f/fc) ^2k)

    k=1, fc=100Hz and f=75Hz

    Attenuation (dB) = 10log (1 + (75/100) ^2)

    Attenuation (dB) = 10log (1+0.75²)

    Attenuation (dB) = 10log (1.5625)

    Attenuation (dB) = 1.938dB

    4. When f=200Hz

    Then,

    Attenuation (dB) = 10log (1 + (f/fc) ^2k)

    k=1, fc=100Hz and f=200Hz

    Attenuation (dB) = 10log (1 + (200/100) ^2)

    Attenuation (dB) = 10log (1+2²)

    Attenuation (dB) = 10log (5)

    Attenuation (dB) = 6.99dB
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