Question:
In a sound wave, the displacement of the air particles follows the equation \( y = A \cos(kx - \omega t) \). What is the wave velocity?
In a sound wave, the displacement of the air particles follows the equation \( y = A \cos(kx - \omega t) \). What is the wave velocity?
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For a wave, the velocity is related to the angular frequency \( \omega \) and the wave number \( k \) by \( v = \frac{\omega}{k} \).
Updated On: Jan 14, 2026
- \( v = \frac{\omega}{k} \)
- \( v = \frac{k}{\omega} \)
- \( v = \frac{A}{k} \)
- \( v = \frac{\omega}{A} \)
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The Correct Option is A
Solution and Explanation
The general wave equation for a sound wave is \( y = A \cos(kx - \omega t) \), where:
- \( A \) is the amplitude,
- \( k \) is the wave number,
- \( \omega \) is the angular frequency.
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