The distance between two moving particles at any time is `alpha`. If `v` be their relative velocity and `v_(1)` and `v_(2)` be the component of `v` along and perpendicular to `a`. The time when they are closest to each other are

The distance between two moving particles P and Q at any time is a.If v_(r) be their relative velocity and if u and v be the components of v_(r) , along and perpendicular to PQ .The closest distance between P and Q and time that elapses before they arrive at their nearest distance is

The displacement-time graphs of two particles P and Q are as shown in the figure. The ratio of their velocities V_P and V_Q will be

A particle move with velocity v_(1) for time t_(1) and v_(2) for time t_(2) along a straight line. The magntidue of its average acceleration is

The displacement time graph of two moving particles make angles of 30^(@) and 45^(@) with the x-axis. The ratio of the two velocities V _(A) and V_(B) is

A particle is moving with velocity v=100m s^(-1) . If one of the rectangular components of a velocity is 50m s^(-1) . Find the other component of velocity and its angle with the given component of velocity.

Two particles are moving with velocities v_(1) and v_2 . Their relative velocity is the maximum, when the angle between their velocities is

Two identical particles move towards each other with velocity 2v and v, respectively. The velocity of the centre of mass is:

Two particles move in a uniform gravitational field with an acceleration g. At the intial moment the particles were located at one point and moved with velocity v_(1)=1" "ms^(-1)" and "v_(2)=4" "ms^(-1) horizontally in opposite directions. Find the time interval after their velocity vectors become mutually perpendicular

A man traversed half the distance with a velocity v_(0) . The remaining part of the distance was covered with velocity v_(1) . For half the time and with velocity v_(2) for the other half of the time . Find the average speed of the man over the whole time of motion. .

At any instant, the velocity and acceleration of a particle moving along a straight line are v and a. The speed of the particle is increasing if