Two loudspeakers S1 and S2, 2.20 m apart, emit the same single-frequency tone in phase at the speakers. A listener L is located directly in

Question

Two loudspeakers S1 and S2, 2.20 m apart, emit the same single-frequency tone in phase at the speakers. A listener L is located directly in front of speaker S1, in other words, the lines LS1 and S1S2 are perpendicular. L notices that the intensity is at a minimum when L is 5.50 m from speaker S1. What is the lowest possible frequency of the emitted tone

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Nick 3 years 2021-08-18T22:50:19+00:00 1 Answers 7 views 0

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    2021-08-18T22:51:26+00:00

    Answer:

    the lowest possible frequency of the emitted tone is 404.79 Hz

    Explanation:

       Given the data in the question;

    S₁ ←  5.50 m → L

    2.20 m

    S₂

    We know that, the condition for destructive interference is;

    Δr = ( 2m + \frac{1}{2} ) × λ

    where m = 0, 1, 2, 3 …….

    Path difference between the two sound waves from the two speakers is;

    Δr = √( 5.50² + 2.20² ) – 5.50

    Δr = 5.92368 – 5.50

    Δr = 0.42368 m

    v = f × λ

    f = ( 2m + \frac{1}{2})v / Δr

    m = 0, 1, 2, 3, ….

    Now, for the lowest possible frequency, let m be 0

    so

    f = ( 0 + \frac{1}{2})v / Δr

    f = \frac{1}{2}(v) / Δr

    we know that speed of sound in air v = 343 m/s

    so we substitute

    f = \frac{1}{2}(343) / 0.42368

    f = 171.5 / 0.42368

    f = 404.79 Hz

    Therefore, the lowest possible frequency of the emitted tone is 404.79 Hz

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