The angle of elevation of the top of a vertical pole when observed from each vertex of a regular hexagon is `pi/3`. If the area of the circle circumscribing the hexagon be A `metre^2`, then the area of the hexagon is

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

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

Each side of a regular hexagon is 1 cm. The area of the hexagon is

Construct a regular hexagon of side 4 cm. Construct a circle circumscribing the hexagon.

Area of a regular hexagon with side ‘a’ is

Area of regular hexagon with side 'a' is

Draw a circle circumscribing a regular hexagon with side 5 cm.

Find the difference between the area of a regular hexagon whose sides is 72cm and the area of the circle inscribed in it.