From the top of a lower the angles of depression of to ships on opposite sides of the tower are observed to be `30^(@) and 45^(@).` If the height of the tower be 300 metics, then the distance between the ships if the line joining the ships passes through the foot of the tower

From the top of a lighthouse, the angles of depression of two ships on the opposite sides of it are observed to be a and p. If the height of the lighthouse is h m etres and the line joining the ships passes through the foot of the lighthouse, show that the distance betw een the ships is (h(tan alpha + tan beta))/(tan alpha tan beta)

The angles of depression of two points from the top of a tower are 30^(@) and 60^(@) . If the height of the tower is 30 m, find the maximum possible distance between the two

An observer on the top of a cliff 200 m above the sea level, observes the angles of depression of two ships on opposite sides of the cliff to be 45^(@) and 30^(@) respectively. Then the distance between the ships if the line joining the points to the base of the cliff

From the top of a tower 100 m high, a man observes two cars on the opposite sides of the tower with angle of depression 30^(@) and 45^(@) respectively. Find the distance between the cars

From the top of a light house, angles of depression of two ships are 45^(@) and 60^(@) . The ships are on opposite sides of the ight house and in line with its foot. If the distance between the ships is 400 m, find the height of the light house.

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 cliff 25 m high the angle of elevation of a tower is found to be equal to the angle of depression of the foot of the tower. The height of the tower is

The angle of depression of the top of a tower at a point 70mts from the base is 45^(circ) , Then the height of the tower is