In a RC high-pass filter, as ω approaches infinity, the magnitude of the transfer function approaches which value?

Study for the EPE301C Course 1 Test. Hone your skills with interactive exercises and comprehensive questions, each with detailed explanations. Boost your chances of success!

Multiple Choice

In a RC high-pass filter, as ω approaches infinity, the magnitude of the transfer function approaches which value?

Explanation:
High-pass RC filters pass high-frequency signals with almost no attenuation. The magnitude of its transfer function is |H(jω)| = ωRC / sqrt(1 + (ωRC)^2). When ω becomes very large, the term (ωRC)^2 dominates, so sqrt(1 + (ωRC)^2) ≈ ωRC, and the ratio tends to 1. So the magnitude approaches 1, meaning the output follows the input in amplitude at high frequencies. This contrasts with low frequencies, where the magnitude tends to 0, and the cutoff occurs at ωc = 1/RC.

High-pass RC filters pass high-frequency signals with almost no attenuation. The magnitude of its transfer function is |H(jω)| = ωRC / sqrt(1 + (ωRC)^2). When ω becomes very large, the term (ωRC)^2 dominates, so sqrt(1 + (ωRC)^2) ≈ ωRC, and the ratio tends to 1. So the magnitude approaches 1, meaning the output follows the input in amplitude at high frequencies. This contrasts with low frequencies, where the magnitude tends to 0, and the cutoff occurs at ωc = 1/RC.

More Multiple Choice Questions
Subscribe

Get the latest from Examzify

You can unsubscribe at any time. Read our privacy policy