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.

From the top of a tower of height 180 m the angles of depression of two objects on either sides of the tower are 30^(@)and45^(@) . Then the distance between the objects are

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.

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

Two man are on the opposite sides of a tower. They measure the angles of elevation the top of the tower as 30^(@)" and "60^(@) . If the height of the tower is 150 m, find the distance between the two men.

Two man are on the opposite sides of a tower. They measure the angles of elevation the top of the tower as 30^(@)" and "60^(@) . If the height of the tower is 150 m, find the distance between the two men.

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.

Two men are on the opposite sides of a tower. They measure the angles of elevation of the top of the tower as 45^(@) and 30^(@) respectively. If the height of the tower is 40 m, then the distance between the men is

Two men are on the opposite sides of a tower. They measure the angles of elevation of the top of the tower as 45^(@) and 30^(@) respectively. If the height of the tower is 40 m, then the distance between the men is