A travelling wave is given by
`y=(0.8)/((3x^(2)+24xt+48t^(2)+4))`
where `x` and `y` are in metres and `t` is in seconds. Find the velocity in `m//s`.

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 :-

A travelling wave pulse is given by y = (10)/(5 + (x + 2t)^(2)) Here, x and y are in meter and t in second. In which direction and with what velocity is the pulse propagation. What is the ampitude of pulse?

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 moving progressive wave is given by y= 1/(x^2-4xt+4t^2+8) , where x and y are in metre and t is in second . Hence speed and direction of propagation of pulse is

The wave function of a pulse is given by y= (3)/((2x+3t)^(2)) where x and y are in metre and t is in second (i) Identify the direction of propagation. (ii) Determine the wave velocity of the pulse.

The wave function of a pulse is given by y=(5)/((4x+6t)^(2)) where x and y are in metre and t is in second :- (i) Identify the direction of propagation (ii) Determine the wave velocity of the pulse

At t=0, the shape of a travelling pulse is given by y(x,0)=(4xx10^(-3))/(8-(x)^(-2) where x and y are in metres. The wave function for the travelling pulse if the velocity of propagation is 5 m//s in the x direction is given by

The equation of a simple harmonic wave is given by y = 3 sin"(pi)/(2) (50t - x) where x and y are in meters and x is in second .The ratio of maximum particle velocity to the wave velocity is

The equation of a simple harmonic wave is given by y = 3 sin"(pi)/(2) (50t - x) where x and y are in meters and x is in second .The ratio of maximum particle velocity to the wave velocity is

The equation of a transverse wave propagating through a stretched string is given by y=2 sin 2pi ((t)/(0.04) -x/(40)) where y and x are in centimeter and t in seconds. Find the velocity of the wave, maximum velocity of the string and the maximum acceleration.