A point on the periphery of a rotating disc has its acceleration vector making angle of `30^(@)` with the velocity . The ratio `(a_(c)//a_(t) (a_(c)` is centripetal acceleration and `a_(t)` is tangential acceleration) equals

Find the relation between acceleration a_(1) and a_(2)

A particle is moving with a constant angular acceleration of 4rad//s^(2) in a circular path. At time t=0 , particle was at rest. Find the time at which the magnitudes of centripetal acceleration and tangential acceleration are equal.

A point starts from rest and moves along a circular path with a constant tangential acceleration. After one rotation, the ratio of its radial acceleration to its tangential acceleration will be equal to

Two blocks are arranged as shown in figure. Find the ratio of a_(1)//a_(2) . ( a_(1) is acceleration of m_(1) and a_(2) that of m_(2))

A point at the periphery of a disc rotating about a fixed axis moves so that its speed varies with time as v = 2 t^2 m//s The tangential acceleration of the point at t= 1s is

A particle is projected at t = 0 with velocity u at angle theta with the horizontal. Then the ratio of the tangential acceleration and the radius of curvature at the point of projection 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)

In given system a_(1) and a_(2) are the accelerations of blocks 1 and 2. Then constraint relation is

A particle moves in a circle with constant tangential acceleration starting from rest. At t = 1/2 s radial acceleration has a value 25% of tangential acceleration. The value of tangential acceleration will be correctly represented by

Calculate the relative acceleration of A w.r.t. B if B is moving with acceleration a_(0) towards right.