A pole stands vertically inside a triangular park ABC. Let the angle of elevation of the top of the pole from corner of the park be `pi/3`. If the radius of the circumcircle of `triangleABC` is 2. then the height of the pole is equal to :

A pole stands vertically , inside a triangular park triangle ABC. If the angle of elevation of the top of the pole from each corner of the park is same, then in triangle ABC the foot of the pole is at the

A pole stands vertically ,inside a scalene triangular park ABC .If the angle of elevation of the top of the pole from each corner of tha park is same ,then in DeltaABC , the foot of the pole is at the

A pole is situated at the centre of a regular hexagonal park. The angle of elevation of the top of the vertical pole when observed from each vertex of the hexagon is (pi)/(3) . If the area of the circle circumscribing the hexagon is 27m^(2) , then the height of the tower is

The angle of elevation of the sun,when the height of the pole is sqrt(3) xx the length of the shadow of the pole is

The angle of elevation of the Moon when the length of the shadow of a pole is equal to its height, is