ABC is a given triangle. AD, BE and CF are altitudes of `DeltaABC`.
Assertion (A) : `(AB^(2)+BC^(2)+CA^(2)) gt (AD^(2)+BE^(2)+CF^(2))`
Reason (R) : `(AE^(2)-AF^(2))+(BF^(2)-BD^(2))+(CD^(2)-CE^(2))=0`

If AD, BE and CF are the medians of a Delta ABC, then evaluate (AD^(2)+BE^(2)+CF^(2)): (BC^(2) +CA^(2) +AB^(2)).

In triangle ABC, AD, BE and CF are altitudes. Prove I, that, AD + BE + CF lt AB + BC + CA

If AD, BE and CF are the medians of a ABC ,then (AD^(2)+BE^(2)+CF^(2)):(BC^(2)+CA^(2)+AB^(2)) is equal to

In DeltaABC if AD is the median the show that AB^(2) +AC^(2)=2(AD^(2)+BD^(2))

AD BE and CF are the medians of a Delta ABC .Prove that 2(AD+BE+CF)<3(AB+BC+CA)<4(AD+BE+CF)

Let ABC and A'B'C' be two triangles in which AB gt A'B', BC gt B'C' and CA gt C'A' . Let D, E and F be the midpoints of the sides BC, CA and AB respectively. Let D', E' and F' be the midpoints of the sides B'C', C'A' and A'B' respectively. Consider the following statements : Statement I: AD gt A'D', BE gt B'E' and CF gt C'F' are always true. Statement II : (AB^(2)+BC^(2)+CA^(2))/(AD^(2)+BE^(2)+CF^(2)) =(A'B'^(2)+B'C'^(2)+C'A'^(2))/(A'D'^(2) +B'E'^(2) +C'F'^(2)) Which one of the following is correct in respect of the above statements?

If ABC is an isosceles triangle and D is a point on BC such that AD perp BC, then AB^(2)-AD^(2)=BDdot DC( b) AB^(2)-AD^(2)=BD^(2)-DC^(2)(c)AB^(2)+AD^(2)=BDdot DC(d)AB^(2)+AD^(2)=BD^(2)-DC^(2)

From a point O in the interior of a ABC, perpendiculars OD,OE and OF are drawn to the sides BC,CA and AB respectively. Prove that: (i) AF^(2)+BD^(2)+CE^(2)=OA^(2)+OB^(2)+OC^(2)-OD^(2)-OE^(2)-OF^(2) (ii) AF^(2)+BD^(2)+CE^(2)=AE^(2)+CD^(2)+BF^(2)

In a right triangle ABC, right angled at A, AD is drawn perpendicular to BC. Prove that: AB^(2)-BD^(2)= AC^(2)-CD^(2)