[" he just observation point."],[" ide of a tower,two objects are located.When observed from the to "],[" angles of depression are "45^(@)" and "60^(@)." If the height of the to "],[" e distance between the objects."]

On the same side of a tower,two objects are located.When observed from the top of the tower,their angles of depression are 45o and 60o. If the height of the tower is 150m, find the distance between the objects.

On the same side of a tower, two objects are located. When observed from the top of the tower, their angles of depression are 45o and 60o . If the height of the tower is 150m, find the distance between the objects.

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

On the same side of a tower 300 m high, the angles of depression of two objects are 45^(@) and 60^(@) respectively The distance between the objects is _______m

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

From the top of a 120 m hight tower a man observes two cars on the opposite sides of the tower and in straight line with the base of tower with angles of depression as 60^(@) and 45^(@) . Find the distance between the cars.

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

Two points A and B are on the same side of a tower and in the same straight line with its base. The angles of depression of these points from the top of the tower are 60^(@)" and "45^(@) respectively. If the height of the tower is 15 m, then find the distance between these points.

Two points A and B are on the same side of a tower and in the same straight line with its base. The angles of depression of these points from the top of the tower are 60^(@)" and "45^(@) respectively. If the height of the tower is 15 m, then find the distance between these points.