Waves Chapter-Wise Test 3

Speed: \( v = \sqrt{\frac{T}{\mu}} = \sqrt{\frac{225}{0.025}} = \sqrt{9000} \approx 94.87 \, \text{m/s} \).

Wavelength: \( \lambda = \frac{v}{v} = \frac{94.87}{30} \approx 3.16 \, \text{m} \).

Form: \( y = A \sin (kx) \cos (\omega t) \), \( k = 2\pi \, \text{rad/m} \).

Wavelength: \( \lambda = \frac{2\pi}{k} = \frac{2\pi}{2\pi} = 1 \, \text{m} \).

Distance between nodes: \( \frac{\lambda}{2} = \frac{1}{2} = 0.5 \, \text{m} \).

Speed: \( v = v \lambda = 100 \times 0.6 = 60 \, \text{m/s} \).

For closed pipe: \( v_n = (n + \frac{1}{2}) \frac{v}{2L} \), \( n = 1 \) for second harmonic.

\( v_1 = (1 + \frac{1}{2}) \frac{340}{2 \times 0.85} = 1.5 \times \frac{340}{1.7} = 300 \, \text{Hz} \).

\( \mu = \frac{0.025}{2.5} = 0.01 \, \text{kg/m} \).

\( v_1 = \frac{v}{2L} \Rightarrow 40 = \frac{v}{2 \times 2.5} \Rightarrow v = 40 \times 5 = 200 \, \text{m/s} \).

\( v = \sqrt{\frac{T}{\mu}} \Rightarrow 200 = \sqrt{\frac{T}{0.01}} \Rightarrow 200^2 = \frac{T}{0.01} \).

\( T = 40000 \times 0.01 = 400 \, \text{N} \).

\( v_n = \frac{n v}{2L} \).

Fifth harmonic (\( n = 5 \)): \( v_5 = \frac{5 \times 72}{2 \times 2.4} = \frac{360}{4.8} = 75 \, \text{Hz} \).

Let \( v_2 \) be the original frequency.

\( |440 - v_2| = 8 \Rightarrow v_2 = 432 \, \text{Hz or } 448 \, \text{Hz} \).

Increasing tension increases frequency. If \( v_2 = 432 \), new \( v_2’ > 432 \), beat = \( 440 - v_2’ < 8 \), becomes 6 Hz (\( v_2’ = 434 \)), consistent.

If \( v_2 = 448 \), beat increases, contradicts.

So, \( v_2 = 432 \, \text{Hz} \).

Amplitude: \( A = 2a \cos \frac{\phi}{2} \), \( a = 3 \, \text{m} \), \( \phi = \frac{\pi}{4} \).

\( A = 2 \times 3 \cos \frac{\pi}{8} \approx 6 \times 0.9239 \approx 5.54 \, \text{m} \).

For open pipe: \( v_n = \frac{n v}{2L} \).

Given: \( v = 340 \, \text{m/s} \), \( L = 0.5 \, \text{m} \), \( v_n = 340 \, \text{Hz} \).

\( 340 = \frac{n \times 340}{2 \times 0.5} \Rightarrow 340 = 340n \Rightarrow n = 1 \).

First harmonic (fundamental mode).

For closed pipe: \( v_n = (n + \frac{1}{2}) \frac{v}{2L} \), \( n = 0, 1, 2, \ldots \).

Third harmonic: \( n = 2 \).

\( v_2 = (2 + \frac{1}{2}) \frac{340}{2 \times 0.25} = 2.5 \times \frac{340}{0.5} = 1700 \, \text{Hz} \).