A particle has a velocity u towards east at `t=0`. Its acceleration is towards west and is constant. Let `x_A` and `x_B` be the magnitude of displacements in the first 10 seconds and the next 10 seconds

A particle is moing with a velocity of 10m//s towards east. After 10s its velocity changes to 10m//s towards north. Its average acceleration is:-

A particle experiences a constant acceleration for 20 sec after starting from rest. If it travels distance S_1 in the first 10 sec and a distance S_2 in the next 10 sec, Then

A particle goes along a quadrant of a circle of radius 10m from A to B as shown in fig. Find the magnitude of displacement and distance along the path AB, and angle between displacement vector and x-axis ?

A particle has initial velocity (5hati+7hatj) and acceleration (0.7hati+0.5hatj) . The magnitude of velocity after 10 second will be

A particle starts from rest with uniform acceleration a . Its velocity after 'n' second is 'v'. The displacement of the body in the last two second is

A particle moving with constant acceleration of 2m/ s^(2) due west has an initial velocity of 9 m/s due east. Find the distace covered in the fifth second of its motion.

For a particle moving with constant acceleration, prove that the displacement in the n^(th) second is given by s_(n^(th)) = u + (a)/(2)(2n-1)

The position vector of a particle is determined by the expression vec r = 3t^2 hat i+ 4t^2 hat j + 7 hat k . The displacement traversed in first 10 seconds is :

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?