A particle is moving with speed `v=b sqrt(x)` along positive x-axis. Calculate the speed of the particle at time `t= tau` (assume tha the particle is at origin at t= 0).
A particle is moving with speed v=bsqrt(x) along positive x-axis. Calculate the speed of the particle at time t=tau (assume that the particle is at origin at t = 0).
A particle moves with a velocity v(t)= (1/2)kt^(2) along a straight line . Find the average speed of the particle in a time t.
A particle is moving in a circle of radius R with constant speed. The time period of the particle is T. In a time t=(T)/(6) Average speed of the particle is ……
A particle is moving with constant speed v along x - axis in positive direction. Find the angular velocity of the particle about the point (0, b), when position of the particle is (a, 0).
A particle is moving in a circle of radius R with constant speed. The time period of the particle is T. In a time t=(T)/(6) Average velocity of the particle is…..
A particle moves with constant speed v along a circular path of radius r and completes the circle in time T. The acceleration of the particle is
A particle moves in the x-y plane according to the law x=t^(2) , y = 2t. Find: (a) velocity and acceleration of the particle as a function of time, (b) the speed and rate of change of speed of the particle as a function of time, (c) the distance travelled by the particle as a function of time. (d) the radius of curvature of the particle as a function of time.
A particle starts at the origin and moves out along the positive x-axis for a while then stops and moves back towards the origin. The distance of the particle from the origin at the end of t seconds is given by x(t)=2t^3-9t^2+12t Find (i) the time t_1, when particle stops for the first time. (i)acceleration at time t_2 when the particle stops for the seconds time
A particle is moving along positive X direction and is retarding uniformly. The particle crosses the origin at time t = 0 and crosses the point x = 4.0 m at t = 2 s . (a) Find the maximum speed that the particle can possess at x = 0 . (b) Find the maximum value of retardation that the particle can have.
The coordinates of a moving particle at any time t are given by x = ct and y = bt. The speed of the particle at time t is given by
