A wave given `xi = 10 sin[(80pit - 4pix)]` propagates in a wire of length `1m` fixed at both ends. If another wave is superimposed on this wave to produce a stationary wave then

Two waves y_1 = A sin (omegat - kx) and y_2 = A sin (omegat + kx) superimpose to produce a stationary wave, then

A streteched string of length l fixed at both ends can sustain stationary waves of wavelength lambda given by

The equation of a progressive wave is given by y = 5 sin(100pit - 0.4pix) where y and x are in m and t is in s. (1) The amplitude of the wave is 5 m. (2) The wavelength of the wave is 5 m. (3) The frequency of the wave is 50 Hz. ( 4) The velocity of the wave is 250 m s^(-1) Which of the following statements are correct?

Estimation of frequency of a wave forming a standing wave represented by y = A sin kx cos t can be done if the speed and wavelength are known using speed = "Frequency" xx "wavelength" . Speed of motion depends on the medium properties namely tension in string and mass per unit length of string . A string may vibrate with different frequencies . The corresponding wavelength should be related to the length of the string by a whole number for a string fixed at both ends . Answer the following questions: Speed of a wave in a string forming a stationary wave does not depend on

Consider a string fixed at one end . A travelling wave given by the wave equation y = A sin ( omega t - k x) is incident on it . ltbr gt Show that at the fixed end of a string the waves suffers a phase change of pi , i.e., as it travels back as if the wave is inverted.

A standing wave propagating with velocity 300ms^(-1) in an open pipe of length 4 m has four nodes. The frequency of the wave is

The equation of a plane progressive wave is given by y=2sin(100pit-(pix)/(20)) where x and y are in cm and t is in second. The amplitude and the initial phase of the wave are respectively.

A wave is represented by the equation y = a sin(kx - omega t) is superimposed with another wave to form a stationary wave such that the point x = 0 is a node. Then the equation of other wave is :-

A wire is stretched and fixed at two ends. Transverse stationary waves are formed in it. It oscillates in its third overtone mode. The equation of stationary wave is y= A sin kx cos omegat Choose the correct options.

Two identical sinusoidal waves travel in opposite direction in a wire 15 m long and produce a standing wave in the wire . If the speed of the wave is 12 ms^(-1) and there are 6 nodes in the standing wave . Find the frequency .