From the top of 75 m high tower, the angle of depression of two points P and Q on opposite side of the base of the tower on level ground is `theta` and `psi` ,such that `tan theta=3/4` and `tan psi=5/8`.What is the distance between the points P and Q?

From the top of a tower,the angle of depression of a point P on the ground is 30^(@) . If the distance of the point P from the tower be 24 meters then height of the tower is

From the top of a 12 m high building, the angle of elevation of the top of a tower is 60^@ and the angle of depression of the foot of the tower is theta , such that tan theta = (3)/(4) What is the height of the tower (sqrt(3) = 1.73) ?

From the top of a tower of height 180 m the angles of depression of two objects on either sides of the tower are 30^(@)and45^(@) . Then the distance between the objects are

From the top of a 10 m high building, the angle of elevation of the top of a tower is 60^@ and the angle of depression of the foot of the tower is Theta , such that tan Theta = 2/3 . What is the height of the tower to nearest metres? 10 मी ऊँची इमारत से किसी मीनार के शीर्ष का उन्नयन कोण 60^@ है तथा मीनार के तल का अवनमन कोण Theta इस प्रकार है कि tan Theta = 2/3 है | निकटतम मीटर तक मीनार की ऊंचाई ज्ञात करें |

From the top of a tower, the angles of depression of two objects P and Q (situated on the ground on the same side of the tower) separated at a distance of 100(3-sqrt3) m are 45^@ and 60^@ respectively. The height of the tower is

The angle of depression of a point situated at a distance of 70 m from the base of a tower is 60^(@) .The height of the tower is :

From a tower 125 metres high the angle of depression of two objects ,which are in horizontal line through the base of the tower , are 45^(@)and30^(@) and they are on the same side of the tower The distance (in metres) between the objects is

From the top of a tower, the angles of depression of two objects on the same side of the tower are found to be alpha and beta(alpha gt beta) .If the distance between the objects is p metres, show that the height h of the tower is given by h=(p tan alpha tan beta)/(tan alpha - tan beta) metres.