From the top of a 75m high lighthouse from the sea level the angles of depression of two ships are `30^@` and `45^@`. If the two ships are on the opposite sides of the light house then find the distance between the two ships.

As observed from the top of a 75m high lighthouse from the sea-level,the angles of depression of two ships are 30^(@) and 45^(@) .If one ship is exactly behind the other on the same side of the lighthouse,find the distance between the two sh

As observed from the top of a 100m high light house from the sea level,the angles of depression of two ships are 30^(@) and 45^(@) If one ship is exactly behind the other one on the same side of the light house,find the distance between the two ships.

As observed from the top of a 75m tall lighthouse,the angles of depression of two ships are 30 and 450. If one ship is exactly behind the other on the same side of the lighthouse,find the distance between the two ships.

From the top of a lighthouse. 100 m high, the angle of depression of two ships are 30° and 45°, if both ships are on same side find the distance between the ships ?

From the top of a light -house at a height 20 metres above sea -level,the angle of depression of a ship is 30^(@) .The distance of the ship from the foot of the light house is

As observed from the top of a 150m tall light house,the angles of depression of two ships approaching it are 30o and 45o .If one ship is directly behind the other,find the distance between the two ships.

From the top of a lighthouse 60 meters high with its base at the sea level, the angle of depression of a boat is 15^(@) . The distance of the boat from the foot of the lighthouse is

Two ships are there in the sea on either side of a light house in such a way that the ships and the light house are in the same straight line. The angles of depression of two ships are observed from the top of the light house are 60o and 45o respectively. If the height of the light house is 200 m, find the distance between the two ships. (U s e sqrt(3)=1. 73)

From the top of a lighthouse 70 m high with its base at sea level, the angle of depression of a boat is 15^(@) . The distance of the boat from the foot of the lighthouse is :

From the top of a light house 60 metre high, with its base at the sea leave, the angel of depression of a boat is 30^(@) . The distance of the boat from the foot of the light - house is