The velocity v of a particle is related to time t as `v = 4+2 (c_(1)+c_(2)t)`, where `c_(1)` and `c_(2)` are constants . Find out the initial velocity and acceleration.

The velocity of a particle in time t is v = at + (b)/(t+c) . The dimension of a, b and c are

Displacement (x) and time (t) of a particle in motion are related as x = at + bt^(2) -ct^(3) where a,b, and c, are constants. Velocity of the particle when its acceleration becomes zero is

The displacement x of a particle in rectilinear motion at time t is represented as x^(2) = at^(2) +2bt+c , where a ,b, and c are constants. Show that the acceleration of this particle varies (1)/(x^(3)) .

The velocity V of a particle at time t is given by V = at + b/(t+c) . The dimensions of a, b and c are respectively--------.

The relation between the time taken and the displacement of a moving body is s = 2t - 3t^(2) + 4t^(3) , where the unit of s is in metre and that of t is in second. Find out the displacement, velocity and acceleration of the body 2s after initiation of the journey.

The velocity of a particle (v) at an instant 't' is given by v = at + bt^(2) , the dimension of b is

The velocity of a particle moving along the positive direction of x-axis is v= Asqrt(x) , where A is a positive constant. At time t = 0 , the displacement of the particle is taken as x = 0 . (i) Express velocity and acceleration as functions of time , and (ii) find out the average velocity of the particle in the period when it travels through a distance s ?

The velocity of a particle moving in a straight path is given by v=16t-4t^(2) where v and t measured in ft/s and second units respectively. If the initial displacement be 10 ft, find the displacement of the particle in t seconds.