A particle moves in a circle in such a way that, its tangential deceleration is numerically equal to its radial acceleration. If the initial velocity of the particle is `V_(0)`, find the variation of its velocity with time

A particle executes SHM such that, the maximum velocity during the oscillation is numerically equal to half the maximum acceleration. What is the time period?

A particle of mass M moves in a circular path of radius r with a constant speed equal to V. Then its centripetal acceleration is

A particle moves with deceleration along the circle of radius R so that at any moment of time its tangential and normal acceleration are equal in moduli. At the initial moment t=0 the speed of the particle equals V_(0) then The total acceleration of the particle as function of velocity and distance covered

A particle moves with deceleration along the circle of radius R so that at any moment of time its tangential and normal acceleration are equal in moduli. At the initial moment t=0 the speed of the particle equals V_(0) then The speed of the particle as a function of the distance coverd will be

A particle moves so that its position vectors varies with time as vecr=Acosomegathati+Asinomegathatj . Find the (a)Initial velocity of the particle (b)angle between the position vector and velocity of the particle atony time. ©Speed at any instant .