The equetion of a wave travelling on a string is
`y = 4 sin(pi)/(2)(8t-(x)/(8))`
if x and y are in centimetres, then velocity of waves is

The equation of a progressive wave travelling along a string is given by y=10 sinpi(0.01x-2.00t) where x and y are in centimetres and t in seconds. Find the (a) velocity of a particle at x=2 m and t=5//6 s. (b) acceleration of a particle at x=1 m and t=1//4 s. also find the velocity amplitude and acceleration amplitude for the wave.

The equation of a wave travelling on a string is given by Y(mn) = 8 sin[ (5m^(-1)x-(4s^(-1)t ]. Then

The equation of a wave is y=4 sin[(pi)/(2)(2t+(1)/(8)x)] where y and x are in centimeres and t is in seconds.

The equation of stationary wave along a stretched string is given by y = 5 sin(pi/3 x) cos 40pi t where x and y are in centimetre and t in second. The separation between two adjacent nodes is :

The equation of a wave travelling in a string can be written as y = 3 cos pi (10t-x) . Its wavelength is

The equation for the transverse wave travelling along a string is y = 4 sin 2pi ((t)/(0.05) -(x)/(60)) lengths expressed in cm and time period in sec. Calculate the wave velocity and maximum particle velocity.

The equation of a wave is given by y=a sin (100t-x/10) where x and y are in metre an t in second, the velocity of wave is

A travelling wave pulse is given by y=(4)/(3x^(2)+48t^(2)+24xt+2) where x and y are in metre and t is in second. The velocity of wave is :-

Equation of a progressive wave is given by, y=4sin[pi((t)/(5)-(x)/(9))+(pi)/(6)] where x and y are in metre. Then :

The equation of a progressive wave is y=0.02sin2pi[(t)/(0.01)-(x)/(0.30)] here x and y are in metres and t is in seconds. The velocity of propagation of the wave is