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?

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=(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=(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 defined as y=10/(5+(x+2t)^2) . In which direction and with what velocity is the pulse propagating?

If at t = 0 , a travelling wave pulse in a string is described by the function, y = (10)/((x^(2) + 2 )) Hence, x and y are in meter and t in second. What will be the wave function representing the pulse at time t , if the pulse is propagating along positive x-axix with speed 2 m//s ?

If at t = 0 , a travelling wave pulse in a string is described by the function, y = (10)/((x^(2) + 2 )) Hence, x and y are in meter and t in second. What will be the wave function representing the pulse at time t , if the pulse is propagating along positive x-axix with speed 2 m//s ?