A traveling wave is produced on a long horizontal string by vibrating and ends up and down sinusoidally. The amplitude of vibration is $1.0 c m$ and the displacement becomes zero $200$ times per second. The linear mass density of the string is $0.10 k g m^{- 1}$ and it is kept under a tension of $90 N$ .
(a) Find the speed and the wavelength of the wave.
(b) Assume that the wave moves in the position x-direction and at $t = 0$ , the end $x = 0$ is at its positive extreme position. Write the wave equation.
(c) Find the velocity and acceleration of the particle at $x = 50$ $c m$ at time $t = 10 m s .$

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Solution

Step 1. Given data :
Amplitude, $A = 1 c m,$
Tension, $T = 90 N,$
Frequency, $f = 200 / 2$
$= 100 H z$
Mass density, $μ = 0.1 k g / m$
Step 2. Find the speed $(v)$ and the wavelength $(λ)$ of the wave :
$v = \sqrt (\frac{T}{μ})$
$= \sqrt{\frac{90}{0.1}}$
$= 30 m / s$
Again, $λ = \frac{v}{f}$
$= \frac{30}{100}$
$= 0.3 m$
$= 30 c m$ .
Hence, the speed of the wave is $30 m / s$ , and the wavelength is $30 c m$ .
Step 3. Find the wave equation :
Assume that the wave moves in the position x-direction and at $t = 0$ , the end $x = 0$ is at its positive extreme position.
$y = A \cos (w t - k x)$
$[w = 2 πf, k = \frac{2 π}{λ}]$
$y = (0.1) \cos (2 π (100) t - \frac{2 π}{30} x)$
Hence, above is the required wave equation.
Step 3. Find the velocity and acceleration of the particle at $x = 50$ $c m$ at time $t = 10 m s .$
The velocity $(V)$ of the particle,
$y = A \cos (w t - k x) V = \frac{d y}{d t} = - A \sin (w t - k x) w = - (1 c m) \sin (2 π (100) \times 10 \times 10^{- 3} - \frac{2 π}{30} \times 50) \frac{2 π}{10 \times 10^{- 3}} = - (1 c m) \sin (2 π - \frac{10 π}{3}) \frac{2 π}{10 \times 10^{- 3}} = - (1 cm) \sin (- \frac{4 π}{3}) \frac{2 π}{10 \times 10^{- 3}} = - (1 cm) \sin (π + \frac{π}{3}) \frac{2 π}{10 \times 10^{- 3}} = - (1 cm) \sin (\frac{π}{3}) \frac{2 π}{10 \times 10^{- 3}} = - 1 cm \times \frac{\sqrt{3}}{2} \frac{2 π}{10 \times 10^{- 3}} = - 5.4 m / s$
Now the acceleration $(a)$ is :
$a = \frac{d^{2} y}{d t} = - A w^{2} \cos (w t - k x) = - (1 c m) (\frac{2 π}{10 \times 10^{- 3}}) \cos (2 π \times 100 \times 10 \times 10^{- 3} - \frac{2 π}{30} \times 50) a = 2 km / s$
Hence, velocity of the particle is $- 5.4 m / s$ and acceleration is $2 k m / s$ .

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Q. A travelling wave is produced on a long horizontal string by vibrating an end up and down sinusoidally. The amplitude of vibration is 1⋅0 and the displacement becomes zero 200 times per second. The linear mass density of the string is 0⋅10 kg m⁻¹ and it is kept under a tension of 90 N. (a) Find the speed and the wavelength of the wave. (b) Assume that the wave moves in the positive x-direction and at t = 0, the end x = 0 is at its positive extreme position. Write the wave equation. (c) Find the velocity and acceleration of the particle at x = 50 cm at time t = 10 ms.

A traveling wave is produced on a long horizontal string by vibrating ends up and down sinusoidally. The amplitude of vibration is $1.0 c m$ and the displacement becomes zero $200$ times per second. The linear mass density of the string is $0.10 k g m^{- 1}$ and is kept under a tension of $90 N$ .

(a) Find the speed and the wavelength of the wave.

(b) Assume that the wave moves in the position $x -$ direction and at $t = 0$ , the end $x = 0$ is at its positive extreme position. Write the wave equation.