At t=0, a transverse wave pulse travelling in the + ve x-direction with a speed of `2 m//s` in a wire is described by `y=6//x^(2)`, given that `x!= 0`. Transverse velocity of a particle at x=2 m and t=2 s is

At t=0,a transverse wave pulse travelling in the positive x direction with a speed of 2 m//s in a wire is described by the function y=6//x^(2) given that x!=0 . Transverse velocity of a particle at x=2 m and t= 2 s is

At t=0,a transverse wave pulse travelling in the positive x direction with a speed of 2 m//s in a wire is described by the function y=6//x^(2) given that x!=0 . Transverse velocity of a particle at x=2 m and t= 2 s is

A wave pulse is travelling positive x direction with a speed of 4.5 m/s. At time t= 0, the wave pulse is given as y= 6/(x^2-3) . Here x and y are in metre. Then which function represents the equation of pulse just after 2 second?

A wave is represented by the equation y = A sin (10 pi x + 15 pi t + pi//3) Where x is in metre and t is in second. a wave travelling in the positive x-direction with a velocity of 1.5 m/s a wave travelling in the negative x-direction with a velocity 1.5 m/s a wave travelling in the negative x-direction with a wavelength of 0.2 m a wave travelling in the positive x-direction with a wavelength 0.2 m

A pulse is started at a time t=0 along the +x direction on a long, taut string. The shape of the pulse at t=0 is given by function f(x) with here f and x are in centimeters. The linear mass density of the string is 50 g//m and it is under a tension of 5N . The transverse velocity of the particle at x=13 cm and t=0.015 s will be

A transverse wave travelling in a string produce maximum transverse velocity of 3 m//s and maximum transverse acceleration 90 m//s^(2) in a particle. If the velocity of wave in the string is 20 m//s . Datermine the equation of the wave ?

A transverse wave travelling on a stretched string is is represented by the equation y =(2)/((2x - 6.2t)^(2)) + 20 . Then ,

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.

A pulse is started at a time t = 0 along the +x directions an a long, taut string. The shaot of the puise at t = 0 is given by funcation y with y = {{:((x)/(4)+1fo r-4ltxle0),(-x+1fo r0ltxlt1),("0 otherwise"):} here y and x are in centimeters. The linear mass density of the string is 50 g//m and it is under a tension of 5N , The transverse velocity of the particle at x = 13 cm and t = 0.015 s will be

A wave propagates in a string in the positive x-direction with velocity v. The shape of the string at t=t_0 is given by f(x,t_0)=A sin ((x^2)/(a^2)) . Then the wave equation at any instant t is given by