Two straight roads OA and OB intersect at O. A tower is situated within the angle formed by them and subtends angles of `45^(@) and 30^(@)` at the points A and B where the roads are nearest to it. If OA = 100 meters and OB = 50 meters, then the height of the tower is

Two straight roads OA and OB intersect at O. A tower is situated within the angle formed by them and subtends angles of 45^(@) and 30^(@) at the points A and B where the roads are nearest to it. If OA = 400 meters and OB = 300 meters, than the height of the tower is

A tower subtends and angle 60^(@) at a point A in the plane of its base and the angle of depression of the foot of the tower at a point 10 meters just above A is 30^(@). The height of the tower is

A vertical tower PQ subtends the same anlgle of 30^@ at each of two points A and B ,60 m apart on the ground .If AB subtends an angle of 120^@ at p the foot of the tower ,then find the height of the tower .

A vertical tower PQ subtends the same anlgle of 30^@ at each of two points A and B ,60 m apart on the ground .If AB subtends an angle of 120^@ at p the foot of the tower ,then find the height of the tower .

A vertical tower PQ subtends the same anlgle of 30^@ at each of two points A and B ,60 m apart on the ground .If AB subtends an angle of 120^@ at p the foot of the tower ,then find the height of the tower .

A vertical tower PQ subtends the same anlgle of 30^@ at each of two points A and B ,60 m apart on the ground .If AB subtends an angle of 120^@ at P the foot of the tower ,then find the height of the tower .

A vertical tower subtends an angle of 60^(@) at a point on the same level as the foot of the tower. On moving 100 m further in line with the tower, it subtends an angle of 30^(@) at the point. Then, the height of the tower, it subtends an angle of 30^(@) at the point. Then, the height of the tower is

The angle of elevation of the top of a tower from a point situated at a distance of 100 m from the base of tower is 30 degrees. find the height of the tower is

If the angles of elevation of a tower from two points distance a and b (agtb) from its foot and in the same straight line from it are 30^@ and 60^@ , then the height of the towers

The angle of elevation of the peak of a tower from a point P of the land is 30^@ and the angle of elevation of the peak of a flag on the tower is 45^@ . If the length of the flag is 5 meters, find the height of the tower.