At the foot of the mountain the elevation of its summit is `45^(@)` After ascnding 100 mt towards the mountain up a slope of `30^(@)` inclination is found to be `60^(@)`. The height of the mountain is

The elevation of top of a hill is observed from a certain point in the horizontal plane through its base, to be 30^(@) . After walking 120 meters towards it on level ground the elevation is found to be 60^(@) . Then the height of the object (in meters) is

The elevation of an object on a hill is observed from a certain point in the horizontal plane through its base, to be 30^@ . After walking 120 metres towards it on level ground the elevation is found to be 60^@ . Then the height of the object (in metres ) is

The angle of elevation of the top of a tower from a point on the same level as the foot of the tower is 15^@ . On moving 100 metres towards the tower, the angle of elevation increases to 30^@ . The height of the tower is

Find the height of a mountain cliff, if the angle of elevation of its top, from a point 200 mts from its foot is found to be 60^@

The angle of elevation of the top of the tower is 45^(@) on walking up a slope inclinde at an angle of 30^(@) to the horizontal a distance 20 meters, the angle of elevation of top of tower is observed to be 60^(@) . The height of the tower is

If the angle of elevation of a tower from a distance of 100 m from its foot is 60^(@) . Then the height of the tower is ……….m.

Two pillars of equal height stand at a distance of 100 metres. At a point between them the elevation of their tops are found to be 30^(@) and 60^(@) . Then height of the each pillar in metres is

The height of a hill is 3300 mts. From the point p on the ground the angle of elevation of the top of the hill is 60^(@) . A balloon is moving with constant speed vertically upwards from P. After 5 Minutes of its movement a person sitting in it observers the angle of elevation of the top of hill as 30^(@) . The speed of balloon is

From the top of a building, the angle of elevation of the top of a cell tower is 60^(@) and the angle of depression to its foot is 45^(@) . If distance of the building from the tower is 7m, then find the height of the tower.