Two objects are moving along the same straight line. They cross a point A With an acceleration a, 2a and velocity 2u, u at time `t = 0.` The distance moved by the object when one overtakes the

Average velocity of a particle moving in a straight line, with constant acceleration a and initial velocity u in first t seconds is.

Average velocity of a particle moving in a straight line, with constant acceleration a and initial velocity u in first t seconds is.

A particle moving along a straight line with initial velocity u and acceleration a continues its motion for n seconds. What is the distance covered by it in the last n^(th) second ?

A particle is moving in a straight line according to graph given below : (a is acceleration, v is velocity, x is position, t is time) :

Two particles start moving from the same point along the same straight line. The first moves with constant velocity v and the second with constant acceleration a . During the time that elapses before the sound catches the first, the greatest distance between the particle is.

For a particle moving along straight line with constant acceleration (a), we define velocity of the particle with time as v=u+at , (u = initial velocity) Draw the velocity-time graph of the particle in following situations. (i) Velocity is decresing with time (i.e., acceleration in negative) (ii) Initial velocity is negative but acceleration is positive

A body moving in a straight line with constant acceleration covers distances a and b in successive equal time interval of t. The acceleration of the body is

A particle of mass m is moving along the line y-b with constant acceleration a. The areal velocity of the position vector of the particle at time t is (u=0)

Statement-I : A particle moves in a straight line with constant acceleration. The average velocity of this particle cannot be zero in any time interval. Statement-II : For a particle moving in straight line with constant acceleration, the average velocity in a time interval is (u+v)/(2) , where u and v are initial and final velocity of the particle of the given time interval.

The velocity-time graph of a particle moving along a straight line is shown is . The rate of acceleration and deceleration is constant and it is equal to 5 m s^(-2) . If the a average velocity during the motion is 20 m s^(-1) , Then . The value of t is.