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 balls are thrown horizontally from the top of a tower with velocities v_(1) and v_(2) in opposite directions at the same time. After how much time the angle between velocities of balls becomes 90^(@) ?

Statement-I : If two particles, moving with constant velocities are to meet, the relative velocity must be along the line joining the two particles. Statement-II : Relative velocity means motion of one particle as viewed from the other.

Assertion: If two particles, moving with constant velocities are to meet, the relative velocity must be along the line joining the two particles. Reason: Relative velocity means motion of one particle as viewed from the other.

Two particles 1 and 2 move with velocities vec v_1 and vec v_2 making the angles theta_1 and theta_2 with the line joining them, respectively. Find angular velocity of relative to 1 . .

Two particles A and B are moving with constant velocities v_1 and v_2 . At t = 0 , v_1 makes an angle theta_0 with the line joining A and B and v_2 makes an angle theta_2 with the line joining A and B . Find their velocity of approach. .

Two bodies A and B are moving with velocities v_A and v_B , making an angle theta with each other. Determine the relative velocity of A w.r.t. B. What will be the relative velocity when the two bodies move in same direction

Two bodies A and B are moving with velocities v_A and v_B , making an angle theta with each other. Determine the relative velocity of A w.r.t. B. What will be the relative velocity when the two bodies move in opposite directions ?

Two bodies of masses m_1 and m_2 are moving with velocity v_1 and v_2 respectively in the same direction. The total momentum of the system in the frame of reference attached to the centre of mass is ( v is relative velocity between the masses)

A particle moves with initial velocity v_(0) and retardation alphav , where v is velocity at any instant t. Then the particle