A particle moves in a straight line with acceleration described by equation given below:
`a = m x - \frac { v _ { 0 } ^ { 2 } } { x_0 }`
The value of constant m is

The straight line given by the equation x=11 is

A particle moves in a straight line according to the relation: x = t ^ { 3 } - 4 t ^ { 2 } + 3 t Find the acceleration of the particle at displacement equal to zero.

A particle moves in a straight line with a constant acceleration. It changes its velocity from 10ms^(-1) to 20ms^(-1) while passing through a distance 135m in t second. The value of t is:

The straight line given by the equation x=11 is ………

The velocity v of a particle moving along a straight line when at a distance x from the origin is given by a + bv^(2) = x^(2) where a and b are constants then the acceleration is:

A particle of mass m moves on a straight line with its velocity varying with the distance travelled according to the equation v=asqrtx , where a is a constant. Find the total work done by all the forces during a displacement from x=0 to x=d .

A particle moves on the X-axis according to the equation x=x_0 sin^2omegat . The motion simple harmonic

A particle movesin the X-Y plane with a constasnt acceleration of 1.5 m/s^2 in the direction making an angle of 37^0 with the X-axis.At t=0 the particle is at the orign and its velocity is 8.0 m/s along the X-axis. Find the velocity and the position of the particle at t=4.0 s.