A ship of height 24 m is sighted from a lighthouse. From the top of the lighthouse the angle of depression to the top of the mast and base of the ship is `30^@ and 45^@` respectively. How far is the ship from the lighthouse ? (`sqrt3 = 1.73`)

(8) From the top of a lighthouse, an observer looks at a ship and finds the angle of depression to be 60^@ . If the lighthouse is 90 m, then find how far is that ship from the lighthouse? (sqrt3 = 1.73)

From the top of a building 60m high the angles of depression of the top and the bottom of a tower are observed to be 30^0 and 60^0 . Find the height of the tower.

From the top of a lighthouse, an observer looking at a ship makes an angle of depression of 60^@ . If the height of the lighthouse is 90 metre, then find how far the ship is from the lighthouse. ( sqrt3 = 1,73 )

(12) From a point on the roof of a house, 11m high, it is observed that the angles of depression of the top and foot of a lamp ost are 30^@ and 60^@ respectively. What is the height of the lamp post?

From the top of a lighthouse, an observer looks at a ship and finds the angle of depression to be 30^@ . If the height of the lighthouse is 100 m, then find how far is that ship from the lighthouse.

From the top of a lighthouse, an observer looking at a boat makes an angle of depression of 60^(@) . If the height of the lighthouse is 90m , then find how far is the boat from the lighthouse. (sqrt(3)=1.73)

(10) A straight road leads to the foot of a tower of height 50m. From the top of the tower, the angle of depression of two cars standing on the road are 30^@ and 60^@ . What is the distance between the two cars?

The angle of depression of a ship as observed from the top of a lighthouse is 45^(@) . If the height of the lighthouse is 200 m , then what is the distance of the ship from the foot of the lighthouse ?

An observer at a distance of 10 m from a tree looks at the top of the tree , the angle of elevation is 60^(@) . What is the height of the tree ? ( sqrt(3) = 1 .73 )

Two buildings are in front of each other on either side of a road of width 10 metres. From the top of the first building which is 30 metres high, the angle of elevation to the top of the second is 45^(@) . What is the height of the second building?