A particle is projected from the ground and simultaneously a wedge starts moving towards the right, as shown in the figure. The maximum height of the wedge for which the particle will not hit the wedge is (g = 10 ms-?] 1m/sec 10m/sec 53° 1m

Particle projected from tower fo heigh 10m as shown in figure. Find the time (in sec) after which particle will hit the ground.

A particle is projected at an angle 60^@ with speed 10(sqrt3)m//s , from the point A, as shown in the figure. At the same time the wedge is made to move with speed 10 (sqrt3) m//s towards right as shown in the figure. Then the time after which particle will strike with wedge is

Choose the correct option: A particle is projected at an angle 60^@ with speed 10(sqrt3)m//s , from the point A, as shown in the figure. At the same time the wedge is made to move with speed 10 (sqrt3) m//s towards right as shown in the figure. Then the time after which particle will strike with wedge is

A particle is projected at an angle 60^(@) with speed 10sqrt3 m/s from the point A as shown in the figure. At the same time the wedge is made to move with speed 10sqrt3 m/s toward right as shown in figure. Find the time after which particle will strike the wedge.

A particle of mass m is placed at rest on the top of a smooth wedge of mass M, which in turn is placed at rest on a smooth horizontal surface as shown in figure. Then the distance moved by the wedge as the particle reaches the foot of the wedge is :

A particle of mass m is placed at rest on the top of a smooth wedge of mass M, which in turn is placed at rest on a smooth horizontal surface as shown in figure. Then the distance moved by the wedge as the particle reaches the foot of the wedge is :

A particle is projected from point A at an angle of 53^(@) with horizontal.At the same time wedge starts from rest and moves with constant acceleration a as shown. The value of a for which the particle strikes the plane perpendicular to it at P is (tan53^(@)=4/3 g=10m/s^(2))