Question:
Two loudspeakers (\(L_1\) and \(L_2\)) are placed with a separation of \(10 \, \text{m}\), as shown in the figure. Both speakers are fed with an audio input signal of the same frequency with constant volume. A voice recorder, initially at point \(A\), at equidistance to both loudspeakers, is moved by \(25 \, \text{m}\) along the line \(AB\) while monitoring the audio signal. The measured signal was found to undergo \(10\) cycles of minima and maxima during the movement. The frequency of the input signal is _____________ Hz.
(Speed of sound in air is \(324 \, \text{m/s}\) and \( \sqrt{5} = 2.23 \))
Two loudspeakers (\(L_1\) and \(L_2\)) are placed with a separation of \(10 \, \text{m}\), as shown in the figure. Both speakers are fed with an audio input signal of the same frequency with constant volume. A voice recorder, initially at point \(A\), at equidistance to both loudspeakers, is moved by \(25 \, \text{m}\) along the line \(AB\) while monitoring the audio signal. The measured signal was found to undergo \(10\) cycles of minima and maxima during the movement. The frequency of the input signal is _____________ Hz.
(Speed of sound in air is \(324 \, \text{m/s}\) and \( \sqrt{5} = 2.23 \))
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In interference problems, each complete cycle of loudness variation corresponds to a change of one wavelength in path difference.
Updated On: Feb 4, 2026
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Correct Answer: 648
Solution and Explanation
At point \(A\), the recorder is equidistant from both loudspeakers, so the path difference is zero.
As the recorder moves from \(A\) to \(B\), the path difference between the two sound waves changes, producing alternating maxima and minima due to interference.
Step 1: Determine the change in path difference.
Horizontal distance of point \(A\) from the midpoint of the speakers is \(40 \, \text{m}\).
Vertical displacement from \(A\) to \(B\) is \(25 \, \text{m}\).
Distance of \(B\) from the upper speaker \(L_1\):
\[ BL_1 = \sqrt{40^2 + (25 - 5)^2} = \sqrt{1600 + 400} = \sqrt{2000} = 20\sqrt{5} \] Distance of \(B\) from the lower speaker \(L_2\):
\[ BL_2 = \sqrt{40^2 + (25 + 5)^2} = \sqrt{1600 + 900} = \sqrt{2500} = 50 \] Hence, path difference at point \(B\) is:
\[ \Delta = BL_2 - BL_1 = 50 - 20\sqrt{5} \] Using \( \sqrt{5} = 2.23 \):
\[ \Delta = 50 - (20 \times 2.23) = 50 - 44.6 = 5.4 \, \text{m} \] Step 2: Relate path difference to number of cycles.
One complete cycle of maxima and minima corresponds to a path difference change of one wavelength \( \lambda \).
Given number of cycles \( = 10 \):
\[ 10\lambda = 5.4 \] \[ \lambda = 0.54 \, \text{m} \] Step 3: Calculate frequency.
Using \( v = f\lambda \):
\[ f = \frac{v}{\lambda} = \frac{324}{0.5} \] \[ f = 648 \, \text{Hz} \] Final Answer: \[ \boxed{648} \]
As the recorder moves from \(A\) to \(B\), the path difference between the two sound waves changes, producing alternating maxima and minima due to interference.
Step 1: Determine the change in path difference.
Horizontal distance of point \(A\) from the midpoint of the speakers is \(40 \, \text{m}\).
Vertical displacement from \(A\) to \(B\) is \(25 \, \text{m}\).
Distance of \(B\) from the upper speaker \(L_1\):
\[ BL_1 = \sqrt{40^2 + (25 - 5)^2} = \sqrt{1600 + 400} = \sqrt{2000} = 20\sqrt{5} \] Distance of \(B\) from the lower speaker \(L_2\):
\[ BL_2 = \sqrt{40^2 + (25 + 5)^2} = \sqrt{1600 + 900} = \sqrt{2500} = 50 \] Hence, path difference at point \(B\) is:
\[ \Delta = BL_2 - BL_1 = 50 - 20\sqrt{5} \] Using \( \sqrt{5} = 2.23 \):
\[ \Delta = 50 - (20 \times 2.23) = 50 - 44.6 = 5.4 \, \text{m} \] Step 2: Relate path difference to number of cycles.
One complete cycle of maxima and minima corresponds to a path difference change of one wavelength \( \lambda \).
Given number of cycles \( = 10 \):
\[ 10\lambda = 5.4 \] \[ \lambda = 0.54 \, \text{m} \] Step 3: Calculate frequency.
Using \( v = f\lambda \):
\[ f = \frac{v}{\lambda} = \frac{324}{0.5} \] \[ f = 648 \, \text{Hz} \] Final Answer: \[ \boxed{648} \]
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