A particle is moving on top of a 2-dimensional. plane with its coordinates given incartesian system asx(t) = a sin ωt, y(t) = a cos ωt.Express the motion of the particle in terms of polar coordinates (ρ, φ). What is the minimum numberof generalised coordinates required to describe. its motion? Draw the. trajectory of the particle.Now if the particle trajectory is changed to the followings, repeat the exercise.x(t) = 2a sin ωt, y(t) = a cos 2ωt Problem 2A particle is moving on top of a 2-dimensional. plane with its coordinates given incartesian system asx(t) = a sin wt,y(t) = a cos wt.Express the motion of the particle in terms of polar coordinates (p, ø). What is the minimum numberof generalised coordinates required to describe. its motion? Draw the. trajectory of the particle.Now if the particle trajectory is changed to the followings, repeat the exercise.x(t) = 2a sin wt,y(t) = a cos 2wt

Given: The coordinates given in the cartesian system are: xt=asinωt, y=acosωt Introduction: The…

A particle is moving on top of a 2-dimensional. plane with its coordinates given in cartesian system as x(t) = a sin ωt, y(t) = a cos ωt. Express the motion of the particle in terms of polar coordinates (ρ, φ). What is the minimum number of generalised coordinates required to describe. its motion? Draw the. trajectory of the particle. Now if the particle trajectory is changed to the followings, repeat the exercise. x(t) = 2a sin ωt, y(t) = a cos 2ωt

A particle is moving on top of a 2-dimensional. plane with its coordinates given in cartesian system as x(t) = a sin ωt, y(t) = a cos ωt. Express the motion of the particle in terms of polar coordinates (ρ, φ). What is the minimum number of generalised coordinates required to describe. its motion? Draw the. trajectory of the particle. Now if the particle trajectory is changed to the followings, repeat the exercise. x(t) = 2a sin ωt, y(t) = a cos 2ωt