The particle is moving such that its displacement along x-axis as a function of time is given by `x(x -6) = 1 - 10 cos omegat`. Find amplitude, time period and mean position.

A point moves such that its displacement as a function of times is given by x^(2)=t^(2)+1 . Its acceleration at time t is

The displacement x of a particle in motion is given in terms of time by x(x-4) =1 -5 cos omegat

Figure shows the position of a particle moving on the x - axis as a function of time

Figure shows the position of a particle moving on the x - axis as a function of time

Figure shows the position of a particle moving on the X-axis as a function of time.

Figure shows the position of a particle moving on the X-axis as a function of time.

Figure shows the position of a particle moving on the X-axis as a function of time.

The speed v of particle moving along x-axis is given by v^(2) = 8bx - x^(2) - 12 b^(2) , where 'b' is a constant. Find amplitude, maximum velocity and time period of oscillation.

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=x_0 cos^2(omegat) . Its when it is at mean position is