An observer finds that the angular eleva...

An observer finds that the angular elevation of a tower is `theta`. On advancing 3m towards the tower, the elevation is `45^(@)` and on advancing 2m further more towards the tower, the elevation is `90^(@)-theta`. The height of the tower is (assume the height of observer is negligible and observer lies on the same level as the foot of the tower)

Similar Questions

Explore conceptually related problems

An obserever finds that the angular elevation of a tower is theta . On advancing a metres towards the tower the elevation is 45^(@) and an advancing 'b' metres nearer the elevation is 90^(@)-theta then the height of the tower in metres is

On the level ground, the angle of elevation of a tower is 30^(@) . On moving 20 m nearer, the angle of elevation is 60^(@) . The height of the tower is

The angle of elevation of the top of a tower from a point on the same level as the foot of the tower is 15^@ . On moving 100 metres towards the tower, the angle of elevation increases to 30^@ . The height of the tower is

The angle of elevation of the top of a tower at a point G on the ground is 30^(@) . On walking 20 m towards the tower the angle of elevation becomes 60^(@) . The height of the tower is equal to :

The angle of elevation of the top of a tower at a point on level ground is 45^(@). When moved 20 m towards the tower, the angle of elevation becomes 60^(@). What is the height of the tower ?

Similar Questions

Recommended Questions