Two particles are projected from a point at the same instant with velocities whose horizontal components and vertical components and vertical components are `(u_(1), v_(1)) and (u_(2), v_(2))` respectively. The time interval between their passing through the other common point of their path (other than origin) in

Two particles are projected from a point at the same instant with velocities whose horizontal and vertical components are u_(1), v_(1) and u_(2), v_(2) respectively. Prove that the interval between their passing through the other common point of their path is (2(v_(1)u_(2) - v_(2) u_(1)))/(g (u_(1) + u_(2))

Two particles A and B are projected from the same point in different directions in such a manner that vertical components of their initial velocities are same (Fig. 5.8). Find the ratio of range. .

A stone is projectef from level ground such that its horizontal and vertical components of initial velocity are u_x=10(m)/(s) and u_y=20(m)/(s) respectively. Then the angle between velocity vector of stone one second before and one second after it attains maximum height is:

A stone is projected from level ground at t=0 sec such that its horizontal and vertical components of initial velocity are 10(m)/(s) and 20(m)/(s) respectively. Then the instant of time at which tangential and normal components of acceleration of stone are same is: (neglect air resistance) g=10(m)/(s^2) .

A stone is projected from level ground at t=0 sec such that its horizontal and vertical components of initial velocity are 10(m)/(s) and 20(m)/(s) respectively. Then the instant of time at which tangential and normal components of acceleration of stone are same is: (neglect air resistance) g=10(m)/(s^2) .

Two particles are projected simultaneously in the same vertical plane, with speed u_(1) and u_(2) at angle of projection theta_(1) and theta_(2) respectively with the horizontal. The path followed by one, as seen by other (as long as both are in flight), is

Two particles are projected with same initial velocity one makes angle theta with horizontal while other makes an angle theta with vertical. If their common range is R then product of their time of flight is directly proportional to :

Let V and H be the vertical and horizontal components of earth's magnetic field at any point on earth. Near the north pole

If v_(1) and v_(2) be the velocities at the end of focal chord of projectile path and u is the velocity at the vertex of the path, then

Two particles of charges +Q and -Q are projected from the same point with a velocity v in a region of unifrom magnetic filed B such that the velocity vector makes an angle 'theta' with the magnetic filed Their masses are M and 2M respectively Then, they will meet again for the first time at a point whose distane from the point of projection is .