[" Kange ki honorary "],[" Mountain top से,पूर्व The direction की,और Two consecutive kilometer engaged "],[" A depression angle respectively "30^(@)" And "60^(@)" is. High mountain "]

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 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.

The angle of depression of two consecutive kilometer stones in opposite direction from an aeroplane lying above the horizontal line joining the two stones are respectively 60^(@) and 45^(@) . What is the height of the aeroplane ?

From an aeroplane just over a straight road, the angles of depression of two consecutive kilometer stones situated at opposite sides of the aeroplane were found to be 60^@ and 30^@ respectively. The height (in km) of the aeroplene from the road at that instant, is: एक विमान से ठीक सीधी सड़क पर, विमान की विपरीत दिशाओं में स्थित दो अनुक्रमिक किलोमीटर पत्थरों के अवनमन कोण क्रमशः 60^@ और 30^@ हैं। उस समय विमान की सड़क से ऊँचाई (किमी में) कितनी है?

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

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 depression of two consecute kilometer stones on a road from an aeroplane are 60^@ and 30^@ respectively, then find the height of the aeroplane when two km stones stand on the same side of the aeroplane.

From the top of a building 60m high the angles of depression of the top and the bottom of a tower are observed to be 30^(@) and 60^(@). Find the height of the tower.

A man on the top of a cliff 100 meter high, observes the angles of depression of two points on the opposite sides of the cliff as 30^(@) and 60^(@) respectively. Find the difference between the two points.