Let O be any point in the interior of `DeltaABC`, prove that :
`AB+BC+CA lt 2 (OA+OB+OC)`

P is any point in the interior of a triangle ABC. Prove that : PA+PB lt AC +BC

P is any point in the interior of a triangle ABC. Prove that : PA+PB lt AC +BC

O is any point in the interior of a triangle ABC. Prove that : OB + OC lt AB + AC. _Q01.png" width="60%">

In the adjoining figure, P is an interior point of DeltaABC . Then prove that : AB+BC+CA lt 2(PA + PB +PC)

If O is the circumcentre and P the orthocentre of Delta ABC , prove that vec(OA)+ vec(OB) + vec(OC) =vec(OP) .

A point O lies inside a DeltaABC . Show that OA+OB+OC gt (1)/(2)(AB+BC+CA) .

In DeltaABC, D is any point on side BC. Prove that AB+BC+CA gt 2AD

Let O be an interior point of DeltaABC such that bar(OA)+2bar(OB) + 3bar(OC) = 0 . Then the ratio of a DeltaABC to area of DeltaAOC is

Let O be an interior point of DeltaABC such that bar(OA)+2bar(OB) + 3bar(OC) = 0 . Then the ratio of a DeltaABC to area of DeltaAOC is

Let O, O' and G be the circumcentre, orthocentre and centroid of a Delta ABC and S be any point in the plane of the triangle. Statement -1: vec(O'A) + vec(O'B) + vec(O'C)=2vec(O'O) Statement -2: vec(SA) + vec(SB) + vec(SC) = 3 vec(SG)