A particle just clear a wall of height b at a distance a and strikes the ground at a distance from the point of projection, the angle of projection is :

A particle just clears a wall of height b at distance a and strikes the ground at a distance c from the point of projection.The angle of projection is (1)tan^(-1)(b)/(ac)(2) (3) tan^(-1)(bc)/(a(c-a))(4)tan^(-1)(bc)/(a)

A ball is thrown from the ground so as to just clear a wall 10 m high at a distance of 20 m and falls at a distance of 40 m from the wall. The magnitude and direction of the projection velocity is

A particle is projected from the top of a tower of height H. Initial velocity of projection is u at an angle theta above the horizontal . Particle hits the ground at a distance R from the bottom of tower. What should be the angle of projection theta so that R is maximum ? What is the maximum value of R?

A body projected just crosses a wall of 4m height,at 6m distance from the point of projection and it hits the ground at 12m away from the wall. The angle of projection is nearly

An object is project with a speed 10ms^(-1) at an angle of 30^@ with the horizontal. It breaks into n equal fragments during its motion . One fragment strikes the ground at a distance of sqrt(3)m from the point of projection. The centre of mass of the remaining fragments strikes the ground at a distance of 7sqrt(3)m from the point of projection . If all fragments strike the ground at the same time , Find the value of n.

A ball is thrown from the ground to clear a wall 3 m high at a distance of 6 m and falls 18 m away from the wall. Find the angle of projection of ball.

A particle is projected from ground with some initial velocity making an angle of 45^(@) with the horizontal. It reaches a height of 7.5 m above the ground while it travels a horizontal distance of 10 m from the point of projection. The initial speed of the projection is

A ball is thrown from ground level so as to just clear a wall 4 m high at a distance of 4 m and fall at a distance of 14 m from the wall. Find the magnitude and direction of the velocity of the ball.

A ball is thrown from ground level so as to just clear a wall 4m high at a distance of 4 m and falls at a distance of 14 m from the wall. Find the magnitude and direction of the initial velocity.

A ball is projected at an angle 45^(@) with horizontal. It passes through a wall of height h at horizontal distance d_(1) from the point of projection and strikes the ground at a horizontal distance (d_(1) + d_(2)) from the point of projection, then