From the top of a vertical tower, the angles of depression of two cars, in the same straight line with the base of the tower, at an instant are found to be 45° and 60°. If the cars are 100 m apart and are on the same side of the tower, find the height of the tower.

From the top of a vertical tower, the angle of depression of two cars on the same straight line with the base of the tower, at an instant, is found to be 45^(@) and 60^(@) . If the cars are 100 m apart and are on the same side of the tower, find the height of the tower

From a tower 128 m high, the angle of depression of a car is 30°. Find the distance of the car from the tower

From the top of a 96 m tower, the angles of depression of two cars, on the same side of the tower are alpha" and "beta respectively. If tanalpha=1/4" and "tanbeta=1/7 , then find the distance between two cars.

From the top of a 96 m tower, the angles of depression of two cars, on the same side of the tower are alpha" and "beta respectively. If tanalpha=1/4" and "tanbeta=1/7 , then find the distance between two cars.

From the top of a tower, the angles of depression of two objects P and Q (situated on the ground on the same side of the tower) separated at a distance of 100(3-sqrt3) m are 45^@ and 60^@ respectively. The height of the tower is

The angles of elevation of the top of an inaccessible tower from two points on the same straight line from the base of the tower are 30° and 60° respectively. If the points are separated at a distance of 100 m, then the height of the tower is close to :

The angles of elevation of e top of an inaccessible tower from two points on the same straight line from the base of the tower are 30^@ and 60^@ , respectively. If the points are separated at a distance of 100 m, then the height of the tower is close to

If the angles of elevation of the top of a tower from two points at a distance of 4m and 9m from the base of the tower and in the same straight line with it are complementary, find the height of the tower.

If the angles of elevation of the top of a tower from two points at a distance of 4m and 9m from the base of the tower and in the same straight line with it are complementary,find the height of the tower.