A cyclic quadrilateral `A B C D` of areal `(3sqrt(3))/4` is inscribed in unit circle. If one of its side `A B=1,` and the diagonal `B D=sqrt(3),` find the lengths of the other sides.

A circle is inscribed in a square. An equilateral triangle of side 4sqrt(3) cm is inscribed in that circle. The length of the diagonal of the square (in centimetres) is

A regular hexagon and regular dodecagon (12 sides) are inscribed in the same circle.If the side of the dodecagon is sqrt(3)-1. Then the side of the hexagon is:

A rectangle of sides a and b is inscribed in a circle.Then its radius is

A regular hexagon & a regular dodecagon are inscribed in the same circle if the side of the dodecagon is (sqrt(3)-1) then the side of the hexagon is

In a cyclic quadrilateral A B C D if A B C D a n d /_B=70^0, find the remaining angles.

The area of a cyclic quadrilateral ABCD is (3sqrt(3))/(4). The radius of the circle circumscribing cyclic quadrilateral is 1. If AB=1 and BD=sqrt(3), then BC*CD is equal to

A circle is inscribed in a square.An equilateral triangle of side 4sqrt(3)cm is inscribed in that circle.The length of the diagonal of the square is 4sqrt(2)cm(b)8backslash cm(c)8sqrt(2)cm(d)16backslash cm

The lengths of two adjacent sides of a cyclic quadrilateral are 2 units and 5 units and the angle between them is 60^(@) . If the area of the quadrilateral is 4sqrt(3) sq. units, then the perimeter of the quadrilateral is