From an aeroplane above a straight road the angle of depression of two positions at a distance 20 m apart on the road are observed to be `30^(@)` and `45^(@)`. The height of the aeroplane above the ground is :

From an aeroplane above a straight road the angles of depression of two positions at a distance 20 m apart on the road are observed to be 30^(@) and 45^(@). The height of the aeroplane above the ground is

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 an aeroplane vertically over a straight horizontal road, the angles of depression of two consecutive milestones on opposite sides of the aeroplane are observed to be alpha and beta . The height of the aeroplane above the road is

From an aeroplane vertically over a straight horizontal road, the angles of depression of two consecutive kilometre-stones on the opposite sides of the aeroplane are observed to be alpha and beta. The height of the aeroplane above the road is

From an aeroplane flying, vertically above a horizontal road, the angels of depression of two consecutive stones on the same side of the aeroplane are observed to be 30^(@) and 60^(@) respectively. The height at which the aeroplane is flying in km is

From an aeroplaneflying,vertically above a horizontal road,the angles of depression of two consecutive stones on the same side of aeroplane are observed to be 30^@ and 60^@ respectively.The height at which the aeroplane is flying in km is

From a balloon vertically above a straight road, the angle of depression of two cars at an instant are found to be 45^(@) and 60^(@) . If the cars are 100 m apart, find the height of the balloon.

From an aeroplane vertically above a straight horizontal road, the angles of depression of two consecutive mile stones on opposite sides of the aeroplane are observed to be alphaa n dbeta . Show that the height in miles of aeroplane above the road is give by (tanalphatanbeta)/(tanalpha+tanbeta)