The cutoff angular frequency ωc of an RC low-pass filter is given by what expression?

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Prepare for your Electrical Engineering Fundamentals Test with multiple choice questions and thorough explanations. Hone your skills with detailed answers and practice your way to success!

Multiple Choice

The cutoff angular frequency ωc of an RC low-pass filter is given by what expression?

Explanation:
In an RC low-pass filter, the frequency response of the output across the capacitor is described by H(jω) = 1 / (1 + jωRC). The magnitude of this response is |H(jω)| = 1 / sqrt[1 + (ωRC)^2]. The cutoff is defined where the output is down by 3 dB, i.e., |H(jωc)| = 1/√2 of the DC gain (which is 1). Setting 1 / sqrt[1 + (ωcRC)^2] = 1/√2 gives 1 + (ωcRC)^2 = 2, so (ωcRC)^2 = 1 and ωc = 1/(RC). This shows the cutoff angular frequency is the reciprocal of the time constant τ = RC. The other expressions don’t match the -3 dB condition or have incorrect units, so they don’t represent the correct cutoff.

In an RC low-pass filter, the frequency response of the output across the capacitor is described by H(jω) = 1 / (1 + jωRC). The magnitude of this response is |H(jω)| = 1 / sqrt[1 + (ωRC)^2]. The cutoff is defined where the output is down by 3 dB, i.e., |H(jωc)| = 1/√2 of the DC gain (which is 1). Setting 1 / sqrt[1 + (ωcRC)^2] = 1/√2 gives 1 + (ωcRC)^2 = 2, so (ωcRC)^2 = 1 and ωc = 1/(RC). This shows the cutoff angular frequency is the reciprocal of the time constant τ = RC. The other expressions don’t match the -3 dB condition or have incorrect units, so they don’t represent the correct cutoff.

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