The s-t graph of a particle moving with constant acceleration at time t, makes an angle `45^(@)` with the time axis. After 1 second the angle changes to `60^(@)`. Find the acceleration of the particle.

In the s-t graph of a particle with uniform acceleration at time t makes an angle 45^(@) with the time axis. After one second it makes angle of 60^(@) . What is the acceleration of the particle?

In the s-t graph of a particle with uniform acceleration at time t makes an angle 45^@ with the time axis. After one second it makes angle of 60^@ . What is the acceleration of the particle?

s-t graph for a partical, moving with a constant acceleration, subtends 45^(@) angIe with the time axis at time t. That angle becomes 60^(@) 1s Iater. Find the acceleration of the partical.

If position of a particle at instant t is given by x = t^(4) find acceleration of the particle.

A particle of mass m, moving with a constant acceleration , acquires a velocity v_0 in time t_0 . Initially the particle was at rest. Find the average power and the instaneous power of the applied force.

A particle with constant acceleration travels x m in t th second and y m in (t+n)th second. Show that the acceleration is (y-x)/(n) "m.s"^(-2) .

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)) .