A particle simultaneously participates in two mutually perpendicular oscillations `x = sin pi t` & `y = 2cos 2 pit`. Write the equation of trajectory of the particle.

A particle is acted simultaneously by mutually perpendicular simple harmonic motions x=a cos omegat and y=asinomegat . The trajectory of motion of the particle will be

A particle is acted simultaneously by mutually perpendicular simple harmonic motions x=acos omegat and y =asinomegat. The trajectory of motion of the particle will be

A particle is acted simultaneously by mutally perpendicular simple harmonic motion x=acosomegat and y=asinomegat . The trajectory of motion of the particle will be

A particle moves in the the x-y plane according to the scheme x= 8 sin pit and y=-2 cos(^2)pit pit , where t is time. Find equation of the path of the particle. Show the path on a graph.

A particle move in x-y plane such that its position vector varies with time as vec r=(2 sin 3t)hat j+2 (1-cos 3 t) hat j . Find the equation of the trajectory of the particle.

A particle is moving in x-y plane with its x and y co-ordinates varying with time as, x=2t and y=10t-16t^2. Find trajectory of the particle.

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 :

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:

A particle of mass 50 g participates in two simple harmonic oscillations simultaneously as given by x_(1) = 10 (cm) cos [80 pi(s^(-1))t] and x_(2) = 5(cm) sin [(80 pi(s^(-1))t + pi//6] . The amplitude of particle's oscillations is given by 'A'. Find the value of A^(2) (in cm^(2)) .

A particle is subjected to two simple harmonic motion along x and y-directions according to equations x = 4sin 100pi t and y = 3sin 100pit Choose the correct statement –