A car is moving along a circular track with tangential acceleration of magnitude `a_(0)`. It just start to slip at speed `v_(0)` then find radius of circle (Coeffecient of friction is `mu`) ?

A car starts from rest with a constant tangential acceleration a_(0) in a circular path of radius r. At time t, the car kids, find the value of coefficient of friction.

A particle is moving in a circular orbit with a constant tangential acceleration. After a certain time t has elapsed after the beginning of motion, the between the total acceleration a and the direction along the radius r becomes equal to 45^(@) . What is the angular acceleration of the particle.

A point moves along a circle with speed v=at. The total acceleration of the point at a time when it has traced 1//8th of the circumference is:

Assertion:- A particle is moving in a circle with constant tangential acceleration such that its speed v is increasing. Angle made by resultant acceleration of the particle with tangential acceleration increases with time. Reason:- Tangential acceleration =|(dvecv)/(dt)| and centripetal acceleration =(v^(2))/(R)

A particle of mass 10 g moves along a circle of radius 6.4 cm with constant tangential acceleration. What is the magnitude of this acceleration if the kinetic energy of the particle becomes equal 8xx10^(-4)J by the end of the second revolution after the beginning of the motion?

A particle is moving on a circular path of radius 1.5 m at a constant angular acceleration of 2 rad//s^(2) . At the instant t=0 , angular speed is 60//pi rpm. What are its angular speed, angular displacement, linear velocity, tangential acceleration and normal acceleration and normal acceleration at the instant t=2 s .

A particle is moving along a circular path ofradius R in such a way that at any instant magnitude of radial acceleration & tangential acceleration are equal. 1f at t = 0 velocity of particle is V_(0) . Find the speed of the particle after time t=(R )//(2V_(0))

A car is moving on circular path of radius 100m such that its speed is increasing at the rate of 5m//s^(2) . At t=0 it starts from rest. What is the radial acceleration of car at the instant it makes one complete round trip ?

A car is moving along a banked road laid out as a circle of radius r . (a) What should be the banking angle theta so that the car travelling at speed v needs no frictional force from tyres to negotiate the turn ? (b) The coefficient of friction between tyres and road are mu_(s) = 0.9 and mu_(k) = 0.8 . At what maximum speed can a car enter the curve without sliding toward the top edge of the banked turn ?

a particle is moving in a circle of radius R in such a way that at any instant the normal and the tangential component of its acceleration are equal. If its speed at t=0 is v_(0) then time it takes to complete the first revolution is R/(alphav_(0))(1-e^(-betapi)) . Find the value of (alpha+beta) .