A motion is described by `y = 3e^(x).e^(-3t)` where y,x are in metre and t is in second :

A motion is described by y = 3e^x.e^(-3t) where y,x arc in metrd and t is in seconds.

A motion is described by Y = 4e^(x) (e ^- (5t)) , Where y,x are in meters and t is in second .

A motion is described by Y = 4e^(x) (e ^- (5t)) , Where y,x are in meters and t is in second .

The motion of a particle along a straight line is described by the function x = (2t-3)^(2) where x is in metres and t is in seconds . The acceleration of the particle at =2s is

The motion of a particle along a straight line is described by the function x=(2t -3)^2, where x is in metres and t is in seconds. Find (a) the position, velocity and acceleration at t=2 s. (b) the velocity of the particle at origin.

The motion of a particle along a straight line is described by the function x=(2t -3)^2, where x is in metres and t is in seconds. Find (a) the position, velocity and acceleration at t=2 s. (b) the velocity of the particle at the origin .

The motion of a particle along a straight line is described by the function x=(2t -3)^2, where x is in metres and t is in seconds. Find (a) the position, velocity and acceleration at t=2 s. (b) the velocity of the particle at origin.

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.