A projectile is thrown into space so as to have maximum horizontal range `R`. Taking the point of projection as origin, find out the co-ordinates of the point where the speed of the particle is minimum.

A projectile is thrwon into space so as to have the maximum possible horizontal range equal to 400m. Taking the point of projection as the origin, the coordinates of the point where the velocity of the projectile is minimum are:-

A man standing on a hill top projects a stone horizontally with speed v_0 as shown in figure. Taking the co-ordinate system as given in the figure. Find the co-ordinates of the point where the stone will hit the hill surface.

A man standing on a hill top projects a stone horizontally with speed v_0 as shown in figure. Taking the co-ordinate system as given in the figure. Find the co-ordinates of the point where the stone will hit the hill surface.

At which point should the origin be shifted so that co-ordinates of point (2,5) become (1,-4) ?

A particle is projected from ground at some angle with horizontal (Assuming point of projection to the origin and the horizontal and vertical directions to be the x and y axis) the particle passes through the points (3, 4) m and (4, 3) m during its motion then the range of the particle would be : (g=10 m//s^(2))

If a particle of mass m is thrown with speed at an angle 60° with horizontal, then angular momentum of particle at highest point about point of projection is

A projectile, thrown with velocity v_(0) at an angle alpha to the horizontal, has a range R. it will strike a vertical wall at a distance R//2 from the point of projection with a speed of

A projectile is projected with a speed = 20 m/s from the floor of a 5 m high room as shown. Find the maximum horizontal range of the projectile and the corresponding angle of projection theta .

A body has maximum range R_1 when projected up the plane. The same body when projected down the inclined plane, it has maximum range R_2 . Find the maximum horizontal range. Assume equal speed of projection in each case and the body is projected onto the inclined plane in the line of the greatest slope.

A particle of mass m is projected with a velocity v making an angle of 45^@ with the horizontal. The magnitude of the angular momentum of the projectile abut the point of projection when the particle is at its maximum height h is.