The speed `v` of a particle moving along a straight line is given by `a+bv^(2)=x^(2)`, where `x` is its distance from the origin. The acceleration of the particle is (1)b/x (2)x/a (3)x/b (4)x/ab

The equation of motion of a particle moving along a straight line is s=2t^(3)-9t^(2)+12t , where the units of s and t are cm and second. The acceleration of the particle will be zero after: a) 3/2 seconds b) 2/3 seconds c) 1/2 seconds d) 2 seconds

The potential energt of a particle of mass 0.1 kg, moving along the x-axis, is given by U=5x(x-4)J , where x is in meter. It can be concluded that

A particle moves in a straight line in such a way that its velocity at any point is given by v^2=2-3x , where x is measured from a fixed point. The acceleration is

The speed v of particle moving along a straight line, when it is at a distance x from a fixed point on the line is given by v^2= 108 x - 9x^2 . Then magnitude of its acceleration when it is a distance 3 metre from the fixed point is

The law of motion of a body moving along a straight line is x=1/2vt , x being its distance from a fixed point on the line at time t and v is its velocity there. Then

On the parabola y = x^(2), the point least distance from the straight line y =2x -4 is

The displacement of a particle along the x-axis is given by x = a sin^(2) omega t . The motion of the particle corresponds to

The displacement of a particle moving in a straight line is given by the expression x=At^3 + Bt^2 + Ct +D in metres, where t is in second and A, B, C and D are constants. The ratio between the initial acceleration and initial velocity is

A particle is executing a linear S.H.M. Its velocity at a distance x from the mean position is given by v^2=144-9x^2 . The maximum velocity of the particle is

Answer the following questions.Find the distance of the origin from the line x=-2