The velocity of a particle moving in the `x-y` plane is given by
`(dx)/(dt) = 8 pi sin 2 pi t and (dy)/(dt) = 5 pi sin 2 pi t`
where, `t = 0, x = 8 and y = 0`, the path of the particle is.

The velocity of a particle moving in the x-y plane is given by dx/dt=8pisin2pit and dy/dt=5picos2pit where , t=0, x=8 and y=0, the path of the particle is

A partical moves in the x-y plane according to the scheme x=-8 sin pi t and y=-2 cos 2pi t , where t is time. Find the equation of path of the particle

A particle is subjected to two simple harmonic motions given by x_(1) = 2.0sin (100 pi t) and x_(2) = 2.0sin (120pi t + pi //3) where, x is in cm and t in second. Find the displacement of the particle at (a) t = 0.0125 , (b) t = 0.025 .

A particle is subjected to two simple harmonic motions given by x_(1) = 2.0sin (100 pi t) and x_(2) = 2.0sin (120pi t + pi //3) where, x is in cm and t in second. Find the displacement of the particle at (a) t = 0.0125 , (b) t = 0.025 .

A x and y co-ordinates of a particle are x=A sin (omega t) and y = A sin(omegat + pi//2) . Then, the motion of the particle is

A x and y co-ordinates of a particle are x=A sin (omega t) and y = A sin(omegat + pi//2) . Then, the motion of the particle is

The displacement of a particle from its mean position (in meter) is given by Y = 0.2 sin(10 pi t + 1.5 pi) cos (10 pi t + 1.5 pi) . The motion of the particle is