Consider a harmonic wave travelling on a string of mass per unit length mu. The wave has a velocity v, amplitude A and frequency if. The power transmitted by a harmonic wave on the string is proportional to (take constant of proportionality as `2pi^(2)`)

A transverse wave is propagating on a stretched string of mass per unit length 32 gm^(-1) . The tension on the string is 80 N. The speed of the wave over the string is

A harmonic wave is travelling along +ve x-axis, on a stretched string. If wavelength of the wave gets doubled, then

The figure represents two snaps of a travelling wave on a string of mass per unit length mu=0.25 kg//m . The first snap is taken at t=0 and the second is taken at t=0.05 s . Determine the equation of the wave.

The figure represents two snaps of a travelling wave on a string of mass per unit length mu=0.25 kg//m . The first snap is taken at t=0 and the second is taken at t=0.05 s . Determine the frequency of the wave.

An harmonic wave has been set up on a very long string which travels along the length of the string. The wave has a frequency of 50 Hz, amplitude 1 cm and wavelength 0.5 m. find (a) the time taken by the wave to travel a distance of 8 m along the length of string (b) the time taken by a point on the string to travel a distance of 8 m, once the wave has reached the point and sets it into motion (c ) also. consider the above case when the amplitude gets doubled

A standing wave arises on a string when two waves of equal amplitude , frequency and wavelength travelling in opposite superimose. If the frequency of oscillation of the standing waves

A harmonic wave has been set up on a very long string which travels along the length of string. The wave has frequency of 50 Hz. Amplitude 1 cm and wavelength 0.5 m. for the above described wave. Statement (i): time taken by a point on the string to travel a distance of 8 m along the length of string is 0.32 s. Statement (ii): time taken by a point in the string to travel a distance of 8m, once the wave has reached at that point and sets it into motion is 0.32 s.

Two waves of same amplitude a and frequency v and having a phase difference of pi//2 radian, are superposed. The amplitude of resultant wave is

Consider a standing wave formed on a string . It results due to the superposition of two waves travelling in opposite directions . The waves are travelling along the length of the string in the x - direction and displacements of elements on the string are along the y - direction . Individual equations of the two waves can be expressed as Y_(1) = 6 (cm) sin [ 5 (rad//cm) x - 4 ( rad//s)t] Y_(2) = 6(cm) sin [ 5 (rad//cm)x + 4 (rad//s)t] Here x and y are in cm . Answer the following questions. Amplitude of simple harmonic motion of a point on the string that is located at x = 1.8 cm will be

Two waves of equal frequency f and velocity v travel in opposite directions along the same path. The waves have amplitudes A and 3 A . Then: