Two SHMs directed along x-axis and y-axis are superimposed on a particle of mass m. If `x=A_1sinomegat` and `y= A_2 sin(omegat+pi),then path of the particle will be.

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

Two simple harmonic motions y_(1) = Asinomegat and y_(2) = Acos omega t are superimposed on a particle of mass m. The total mechanical energy of the particle is

A particle is subjected to two mutually perpendicualr simple harmonic motions such that its x and y-coordinates are given by x=sinomegat , y=2cosomegat The path of the particle will be :

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

A particle is subjected to two mutually perpendicular simple harmonic motions such that its X and y coordinates are given by X=2 sin omegat , y=2 sin (omega+(pi)/(4)) The path of the particle will be:

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

A particle is subjected to two simple harmonic motions x_1=A_1 sinomegat and x_2=A_2sin(omegat+pi/3) Find a the displacement at t=0, b. the maxmum speed of the particle and c. the maximum acceleration of the particle

A particle m starts with zero velocity along a line y=4d . The position of particle m varies as x=A sin omegat , At omegat=pi//2 , its angular momentum with respect to the origin

A particle moves on y-axis according to the equation y = 3A +B sin omegat . Amplitude of motion is

A particle is subjected to SHM as given by equations x_1 = A_1 sin omegat and x_2 = A_2 sin (omega t + pi//3) .The maximum acceleration and amplitude of the resultant motion are it a_("max") and A ,respectively , then