Respuesta :
Answer:
Speed, v = 312.34 m/s
Explanation:
The equation that describes a transverse wave on the string is given by :
[tex]y=0.0120\ msin[(927\ rad/s)t-(3\ rad/m)x][/tex]..............(1)
Where
y = displacement of a string particle
x = position of the particle on the string
The wave is travelling in the +x direction. We have to find the speed of the wave.
The general equation of traverse wave is given by :
[tex]y=A\ sin(kx-\omega t)[/tex]................(2)
On comparing equation (1) and (2) we get,
k = 3 rad/m
Since, [tex]k=\dfrac{2\pi}{\lambda}[/tex]
[tex]\lambda=\dfrac{2\pi}{3}[/tex] ..............(3)
Also, [tex]\omega=927\ rad/s[/tex]
Since, [tex]\omega=2\pi \nu[/tex]
[tex]\nu=\dfrac{927}{2\pi}[/tex]...............(4)
Speed of the wave is the product of frequency and wavelength i.e.
[tex]v=\nu\times \lambda[/tex]
Using equation (3) and (4), the speed of the wave can be calculated as :
[tex]v=\dfrac{927}{2\pi}\times \dfrac{2\pi}{3}[/tex]
v = 312.34 m/s
Hence, the speed of the transverse wave is 312.34 m/s
