[" A cyclic quadrilateral "ABCD" of area "(3sqrt(3))/(4)" is inscribed in a unit circle.If "AB=1,BD=sqrt(3)" ."],[" then perimeter of cyclic quadrilateral is "]

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 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 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.

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

Quadrilateral ABCD is inscribed in a circle with AD as diameter. If AD=4, AB=BC=1 then perimeter of quadrilateral ABCD is______

In cyclic quadrilateral ABCD, AD|| BC. Prove that AB = CD.

A quadrilateral ABCD is inscribed in a circle . If AB is parallel to CD and AC=BD, then the quadrilateral must be a

The area of a cyclic quadrilateral ABCD is (3sqrt3)/4 . The radius of the circle circumscribing cyclic quadrilateral is 1.If AB =1 and BD =sqrt3 , then BC*CD is equal to

The area of a cyclic quadrilateral ABCD is (3sqrt3)/4 . The radius of the circle circumscribing cyclic quadrilateral is 1.If AB =1 and BD =sqrt3 , then BC*CD is equal to