An object is moving in `x-y` plane its velocity and acceleration at `t=0` are represented in figure.

The ratio of magnitude of velocity to magnitude of component of acceleration along velocity at `t=0` :-

An object is moving in x-y plane its velocity and acceleration at t=0 are represented in figure. After how much time object crosses the y- axis:-

A particle moves in such a way that its position vector at any time t "is" t "is" hati+ 1/2 t^(2) hatj + thatK Find a function of time (a) the velocity, (b) the speed, (c) the acceleration, (d) the magnitude of the acceleration, (e) the magnitude of the component of acceleration along velocity (called tangential' acceleration), (f) the magnitude of the component ofacceleration perpendicular to velocity (called normal acceleration).

In (Q. 24.) the tension in string is T and the linear mass density of string is mu . The ratio of magnitude of maximum velocity of particle and the magnitude of maximum acceleration is

A particle moves in such a way that its position vector at any time t is vec(r)=that(i)+1/2 t^(2)hat(j)+that(k) . Find as a function of time: (i) The velocity ((dvec(r))/(dt)) (ii) The speed (|(dvec(r))/(dt)|) (iii) The acceleration ((dvec(v))/(dt)) (iv) The magnitude of the acceleration (v) The magnitude of the component of acceleration along velocity (called tangential acceleration) (v) The magnitude of the component of acceleration perpendicular to velocity (called normal acceleration).

The velocity-time graph of a body is shown in figure. The ratio of magnitude of average acceleration during the intervals OA and AB is

A body moves with constant angular velocity on a circle. Magnitude of angular acceleration

For the acceleration - time (a - t) graph shown in figure, the change in velocity of particle from t = 0 to t = 6 s is

A particle is moving eastwards with a velocity 5ms^(-1) , changes its direction northwards in 10 seconds and moves with same magnitude of velocity. The average acceleration is

A particle moves in the x-y plane with the velocity bar(v)=ahati-bthatj . At the instant t=asqrt3//b the magnitude of tangential, normal and total acceleration are _&_.

A particle is moving in x–y plane. The x and y components of its acceleration change with time according to the graphs given in figure. At time t = 0 , its velocity is v_(0) directed along positive y direction. if a_(0) = (v_(0))/(t_(0)) , find the angle that the velocity of the particle makes with x axis at time t = 4t_(0) .