From the top a tower 'h' m high, the angles of depression of two objects, which are in line with the foot of the tower are `alpha" and "beta(betagtalpha)`. Find the distance between the two objects.

From the top of a tower h m high, angles of depression of two objects, which are in line with the foot of the tower are alpha and beta(betagtalpha) . Find the distance between the two objects.

From the top of a tower h m high, angles of depression of two objects, which are in line with the foot of the tower are alpha and beta(betagtalpha) . Find the distance between the two objects.

From the top of a tower h m high, angles of depression of two objects, which are in line with the foot of the tower are alpha and beta(betagtalpha) . Find the distance between the two objects.

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.

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 >beta) . If the distance between the objects is 'p' metres, show that the height 'h' of the tower is given by h=frac(p tan alpha tan beta)(tan alpha-tan beta) also determine the height of the tower, if p=50 m , alpha=60^@, beta=30^@

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

There are two points on the horizontal line passing through the foot of a tower in the same side of the tower. The angle of depression of these point from the top of the tower are 45^(@)" and "60^(@) respectively. Find the distance between the two point if the height if the tower is 150 metres.

There are two points on the horizontal line passing through the foot of a tower in the same side of the tower. The angle of depression of these point from the top of the tower are 45^(@)" and "60^(@) respectively. Find the distance between the two point if the height if the tower is 150 metres.

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