A balloon moving in a straight line passes vertically above two points A and B on a horizontal plane 1000ft apart. When above A it has an altitude of `60^@` as seen from B, when above B, `30^@` as seen from A. Find the distance from A at which it will strike the plane.

A balloon is slanting down in a straight line passes vertically above two points A and B on a horizontal plane 1000 meters apart. When above A it has an altitude 60^(@) as seen from B and when above B, altitude is 30^(@) as seen from A. What is the distance of the point from point A where the balloon strike the plane.

A balloon moving in a straight line passes vertically above two points A and B on a horizontal plane 300 ft apart. When above A it has an altitude of 30^(@) as seen from A. The distance of B it has an altitude of 30^(@) as seen from A. The distance of B from the point C where it will touch the plane is

A balloon moving in a straight line passes vertically above two points A and B on a horizontal plane 300 ft apart. When above A it has an altitude of 30^(@) as seen from A. The distance of B it has an altitude of 30^(@) as seen from A. The distance of B from the point C where it will touch the plane is

A balloon moving in a straight line passes vertically above two points A and B on a horizontal plane 10ft apart. When above A the balloon has an angle of elevation of 60^(@) as seen from B. When above B it has an angle of elevation of 45^(@) as seen from A. The distance of B from the point C where it will touch the plane is

A balloon moving in a straight line passes vertically above two points A and B on a horizontal plane 10ft apart. When above A the balloon has an angle of elevation of 60^(@) as seen from B. When above B it has an angle of elevation of 45^(@) as seen from A. The distance of B from the point C where it will touch the plane is

When a coin placed in a bowl of water and seen from above, it appears :

An aeroplane flying at a height of 3000 m passes vertically above another aeroplane at an instant when the angles of elevation of the two planes from some point on the ground are 60^(@) and 45^(@) respectively. Then the vertical distance between the two planes is

An aeroplane when flying at a height of 3125mfrom the ground passes vertically below another plane at an instant when the angles of elevation of the two planes from the same point on the ground are 30° and 60° respectively. Find the distance between the two planes at the instant.