O' is any point inside a rectangle ABCD.
Prove that `OB^2+OD^2=OA^2+OC^2`

O' is any point in the interior of a triangle ABC. OD bot BC , OE bot AC and OF bot AB , Show that OA^2 + OB^2 + OC^2 overset(~)n OD^2 overset(~)n OF^2 = AF^2 + BD^2 + CE^2

O' is any point in the interior of a triangle ABC. OD bot BC , OE bot AC and OF bot AB , Show that AF^2 + BD^2 + CE^2 = AE^2 + CD^2 + BF^2 .

Area of the given Rectangle ABCD = ……… cm^2 .

Prove that 1/sin^2 O/ - cot^2 O/ = 1

Points A(1, 3) and C(5, 1) are oppsite vertices of a rectangle ABCD. If the slope of BD is 2, then its equation is

G is centroid of Delta ABC and a,b,c are the lengths of the sides BC, CA and AB respectively. Prove that a^(2)+b^(2)+c^(2) =3(bar(OA)^(2)+bar(OB)^(2)+bar(OC)^(2))-9(bar(OG))^(2) where O is any point.

A ( 3 , 6) , B ( 3 , 2) and C ( 8 , 2) are the vertices of a rectangle ABCD . Plot these points on a graph paper . From this find the coordinates of vertex D , so that ABCD will be a rectangle .