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Q. No.The equation \(y(x,t) = 0.005 \cos (\alpha x- \beta t)\) describes a wave traveling along the \(x\text-\)axis. If the wavelength and the time period of the wave are \(0.08~\text{m}\) and \(2.0~\text{s}\), respectively, then \(\alpha\) and \(\beta\) in appropriate units are:
1. \(\alpha = 25.00\pi, \beta = \pi\)
2. \(\alpha = \frac{0.08}{\pi}, \beta = \frac{2.0}{\pi}\)
3. \(\alpha = \frac{0.04}{\pi}, \beta = \frac{1.0}{\pi}\)
4. \(\alpha = 12.50\pi, \beta = \frac{\pi}{2.0}\)
Subtopic: Wave Motion |
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A vibrating tuning fork of frequency \(n\) is placed near the open end of a long cylindrical tube.
The tube has a side opening and is also fitted with a movable reflecting piston. As the piston is moved through \(8.75~\text{cm}\), the intensity of sound changes from a maximum to a minimum. If the speed of sound is \(350\) metre per second, then \(n\) is:
1. \(500~\text{Hz}\)
2. \(1000~\text{Hz}\)
3. \(2000~\text{Hz}\)
4. \(4000~\text{Hz}\)
The tube has a side opening and is also fitted with a movable reflecting piston. As the piston is moved through \(8.75~\text{cm}\), the intensity of sound changes from a maximum to a minimum. If the speed of sound is \(350\) metre per second, then \(n\) is:
1. \(500~\text{Hz}\)
2. \(1000~\text{Hz}\)
3. \(2000~\text{Hz}\)
4. \(4000~\text{Hz}\)
Subtopic: Standing Waves |
60%
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In an experiment with a sonometer, a tuning fork of frequency \(256~\text{Hz}\) resonates with a length of \(25~\text{cm}\) and another tuning fork resonates with a length of \(16~\text{cm}\). If the tension of the string remains constant, then the frequency of the second tuning fork will be:
1. \(163.84~\text{Hz}\)
2. \(400~\text{Hz}\)
3. \(320~\text{Hz}\)
4. \(204.8~\text{Hz}\)
1. \(163.84~\text{Hz}\)
2. \(400~\text{Hz}\)
3. \(320~\text{Hz}\)
4. \(204.8~\text{Hz}\)
Subtopic: Standing Waves |
75%
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The rate of energy transfer in a wave depends:
| 1. | directly on the square of the wave amplitude and square of the wave frequency. |
| 2. | directly on the square of the wave amplitude and square root of the wave frequency. |
| 3. | directly on the wave frequency and square of the wave amplitude. |
| 4. | directly on the wave amplitude and square of the wave frequency. |
Subtopic: Energy of Waves |
72%
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Two identical wires are stretched by the same tension of \(100~\text{N}\) and each emits a note of \(200~\text{Hz}\). If tension in one wire is increased by \(1~\text{N}\), the number of beats heard per second when the wires are plucked will be:
| 1. | \(2\) | 2. | \(1\) |
| 3. | \(3\) | 4. | \(4\) |
Subtopic: Beats |
68%
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A tuning fork with a frequency of \(800\) Hz produces resonance in a resonance column tube with the upper end open and the lower end closed by the water surface. Successive resonances are observed at lengths of \(9.75\) cm, \(31.25\) cm, and \(52.75\) cm. The speed of the sound in the air is:
| 1. | \(500\) m/s | 2. | \(156\) m/s |
| 3. | \(344\) m/s | 4. | \(172\) m/s |
Subtopic: Speed of Sound |
74%
From NCERT
NEET - 2019
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Two waves represented by the following equations are travelling in the same medium \(y_1 = 5 \sin2\pi (75t-0.25x)\), \(y_2 = 10 \sin2\pi (150t-0.50x)\). The intensity ratio \(\frac{I_1}{I_2}\) of the two waves will be:
1. \(1:2\)
2. \(1:4\)
3. \(1:8\)
4. \(1:16\)
1. \(1:2\)
2. \(1:4\)
3. \(1:8\)
4. \(1:16\)
Subtopic: Energy of Waves |
From NCERT
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A standing wave is represented by \(y = A\sin(100t)\cos(0.01x)\) where \(y\) and \(A\) are in millimetres, \(t\) is in seconds and \(x\) is in metres. The velocity of the wave is:
| 1. | \(10^{4}~\text{m/s}\) |
| 2. | \(1~\text{m/s}\) |
| 3. | \(10^{-4}~\text{m/s}\) |
| 4. | Not derivable from the above data |
Subtopic: Standing Waves |
87%
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Two progressive waves are represented by, \(y_1=5\sin(200t-3.14x)\) and
\(y_2=10\sin\left(200t-3.14x+\frac{\pi}{3}\right)\) (\(x\) is in metres, and \(t\) is in seconds). Path difference between the two waves is:
1. \(\frac{100}{\pi}~\text{m}\)
2. \(\frac{1}{3}~\text{m}\)
3. \(3.14\times \frac{\pi}{3}~\text{m}\)
4. \(\frac{\pi^2}{9}~\text{m}\)
\(y_2=10\sin\left(200t-3.14x+\frac{\pi}{3}\right)\) (\(x\) is in metres, and \(t\) is in seconds). Path difference between the two waves is:
1. \(\frac{100}{\pi}~\text{m}\)
2. \(\frac{1}{3}~\text{m}\)
3. \(3.14\times \frac{\pi}{3}~\text{m}\)
4. \(\frac{\pi^2}{9}~\text{m}\)
Subtopic: Wave Motion |
72%
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Two organ pipes closed at one end produce \(5\) beats per second in fundamental mode. If the ratio of their lengths is \(10:11\), then their frequencies (in Hz) are:
| 1. | \(55,50\) | 2. | \(105,100\) |
| 3. | \(75,70\) | 4. | \(100,95\) |
Subtopic: Beats |
80%
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