STATEMENT-1: Two particles starts moving with velocities `vecV_(1) & vecV_(2)` respectively in `xy`-plane. They can meet only if component of their velocity perpendicular to line joining them are equal.
STATEMENT-2: Realative velocity of a body w.r.t. other body is calculated along line joining two bodies.

If two bodies are in motion with velocity vec(v)_(1) and vec(v)_(2) :

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 of same mass 'm' moving with velocities vecv_1= vhati, and vecv_2 = (v/2)hati + (v/2)hatj collide in-elastically. Find the loss in kinetic energy

Two particles A and B start moving with velocities 20 m/s and 30 sqrt(2) m/s along x-axis and at an angle 45^(@) with x- axis respectively in xy-plane from origin the relative velocity of B w.r.t A

STATEMENT -1 : For an observer looking out through the window of a fast moving train , the nearby objects appear to move in the opposite direction to the train , while the distant objects appear to be stationary . STATEMENT - 2 : If the observer and the object are moving at velocities vec v_(1) and vec v_(2) respecttively with refrence to a laboratory frame , the velocity of the object with respect to a laboratory frame , the velocity of the object with respect to the observer is vecv_(2) - vecv(1) . (a) Statement -1 is True, statement -2 is true , statement -2 is a correct explanation for statement -1 (b) Statement 1 is True , Statement -2 is True , statement -2 is NOT a correct explanation for statement -1 (c) Statement - 1 is True , Statement -2 is False (d) Statement -1 is False, Statement -2 is True

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

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. .

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.