[" From the top of a hill,the angles of depression of two consecutive "],[" kilometre stones due east are found to be "45^(@)" and "30^(@)" respectively."],[" Find the height of the hill."]

From the top of a hill,the angles of depression of two consecutive kilometre stones due east are found to be 30^(@) and 45^(@). Find the height of the hill.

From the top of a hill, the angles of depression of two consecutive kilometre stones, due east, are found to be 30^(@) and 45^(@) respectively. Find the distance of the two from the foot of the hill

From the top of the hill; the angle of depressions of two consecutive kilometre stones due east are found to be 30^(@) and 45^(@) Find the height of the hill.

From the top of a hill, the angles of depression of two consecutive kilometre stones due east are found to be 30^0a n d45^0 . Find the height of the hill.

From the top of a cliff, 150 metres high, the angles of depression of the top and bottom of a pillar are found to be 30^@ and 60^@ respectively, find the height of the pillar.

From an aeroplane just over a straight road, the angles of depression of two consecutive kilometre is stones situated at opposite sides of the aeroplane were found to be 60^@ and 30^@ respectively. The height (in km) of the aerophlane from the road at that instant was (Given sqrt(3)= 1.732 )

If the angle of depression of two consecutive kilometer stones on a road from an aeroplane are 60^@ and 30^@ respectively. Find the height of the areroplance when the two kilometre stones stand on the same side of aeroplane.

If the angle of elevation of a baloon from two consecutive kilometre -stones along a road are 30^(@)and60^(@) respectively , then the height of the balloon above the ground will be

From an aeroplane vertically above a straight road the angles of depression of two consecutive mile stones on the road are observed to be 45^@ and 30^@ . Find the height of the aeroplane above the road.

From the top of a hill 200 m high, the angles of depression of the top and the bottom of a pillar are 30^@ and 60^@ respectively. Find the height of the pillar and its distance from the hill.