Let `A_(0) A_(1)A_(2)A_(3)A_(4)A_(5)` be a regular hexagon inscribed in a circle of unit radius. Then the product of the lengths of the line segments `A_(0) A_(1), A_(0)A_(2) and A_(0) A_(4)` is

Let A_(0)A_(1)A_(2)A_(3)A_(4)A_(5) be a regular hexagon inscribed in a circle of unit radius.Then the product of the lengths the line segments A_(0)A_(1),A_(0)A_(2) and A_(0)A_(4) is

A_(0),A_(1),A_(2),A_(3),A_(4),A_(5) be a regular hexagon inscribed in a circle of unit radius,then the product of (A_(0)A_(1)*A_(0)A_(2)*A_(0)A_(4) is equal to

Let A_(1)A_(2)A_(3)………………. A_(14) be a regular polygon with 14 sides inscribed in a circle of radius 7 cm. Then the value of (A_(1)A_(3))^(2) +(A_(1)A_(7))^(2) + (A_(3)A_(7))^(2) (in square cm) is……………..

Let A_(1),A_(2),A_(3),...A_(12) are vertices of a regular dodecagon. If radius of its circumcircle is 1, then the length A_(1)A_(3) is-

A regular pentagons is inscribed in a circle. If A_(1) and A_(2) represents the area of circle and that of regular pentagon respectively, then A_(1) : A_(2) is

Let A_(1),A_(2),A_(3),.........,A_(14) be a regular polygon with 14 sides inscribed in a circle of radius R. If (A_(1)A_(3))^(2)+(A_(1)A_(7))^(2)+(A_(3)A_(7))^(2)=KR^(2) , then K is equal to :

let A_(1),A_(2),A_(3),...A_(n) are the vertices of a regular n sided polygon inscribed in a circle of radius R.If (A_(1)A_(2))^(2)+(A_(1)A_(3))^(2)+...(A_(1)A_(n))^(2)=14R^(2) then find the number of sides in the polygon.

Five boys A_(1),A_(2),A_(3),A_(4),A_(5) , are sitting on the ladder in this way -A_(5) is above A_(1),A_(3) under A_(2),A_(2) , under A_(1) and A_(4) above A_(3) . Who sits at the bottom?