If P be any point in the plane of square ABCD, prove that
`PA^(2)+PC^(2)=PB^(2)+PD^(2)`

If G be the centroid of a triangle ABC and P be any other point in the plane prove that PA^(2)+PB^(2)+PC^(2)=GA^(2)+GB^(2)+GC^(2)+3GP^(2)

Let ABCD be a rectangle and P be any point in its plane.Show that AP^(2)+PC^(2)=PB^(2)+PD^(2)

ABC is an equilateral triangle where AB = a and P is any point in its plane such that PA = PB + PC. Then (PA^(2)+PB^(2)+PC^(2))/(a^(2)) is

P is an interior point of square ABCD. Prove that PA+PB+PC+PD gt 2 AB .

If P is a point in th e plane of D ABCD such that bar(AP) + bar(PB) + bar(CP) + bar(PD) = bar0 , then the quadrilateral is in general, a

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

An equilateral triangle ABC is inscribed in a circle of radius r if P be any point on the circle then find the value of PA^(2)+PB^(2)+PC^(2)