The position of a particle moving along x- axis is given by `x=x_0 cos^2(omegat)` . Its when it is at mean position is

The position of a particle moving along x-axis is given by x = 10t - 2t^(2) . Then the time (t) at which it will momentily come to rest is

The position x of particle moving along x-axis varies with time t as x=Asin(omegat) where A and omega are positive constants. The acceleration a of particle varies with its position (x) as

Position of particle moving along x-axis is given as x=2+5t+7t^(2) then calculate :

The position-time relation of a particle moving along the x-axis is given by x=a-bt+ct^(2) where a, b and c are positive numbers. The velocity-time graph of the particle is

The potential energy U(x) of a particle moving along x - axis is given by U(x)=ax-bx^(2) . Find the equilibrium position of particle.

The position of a particle moving along x-axis given by x=(-2t^(3)-3t^(2)+5)m . The acceleration of particle at the instant its velocity becomes zero is

The position x of a particle moving along x - axis at time (t) is given by the equation t=sqrtx+2 , where x is in metres and t in seconds. Find the work done by the force in first four seconds

If the velocity of a particle moving along x-axis is given as v=(3t^(2)-2t) and t=0, x=0 then calculate position of the particle at t=2sec.

The velocity of a particle moving on the x-axis is given by v=x^(2)+x , where x is in m and v in m/s. What is its position (in m) when its acceleration is 30m//s^(2) .

Position of a particle moving along x-axis is given by x=2+8t-4t^(2) . The distance travelled by the particle from t=0 to t=2 is:-