In an equilateral `DeltaABC,` the side BC is trisected at D. Prove that `9AD^(2)=7AB^(2).`(Hint : `AEbotBC`)

Solve the following sub question : In an equilateral triangle ABC, the side BC is trisected at D. prove that 9 AD^(2) = 7 AB^(2)

The perpendicular from A on side BC at a Delta ABC intersects BC at D such that DB=3 CD. Prove that 2 AB^(2)=2AC^(2)+BC^(2)

In quadrilateral ABCD, AB=AD, AC bisects angleA . Prove DeltaABC~ADC .

In figure DE|| BC and CD||EF. Prove that AD^(2)=AB xx AF .

In the adjoint figure, AD is the bisector of the exterior angleA" of "DeltaABC. Seg AD intersects the side BC produced in D. Prove that : (BD)/(CD)=(AB)/(AC)

In the given fig. if AD bot BC Prove that AB^(2) + CD^(2) = BD^(2) + AC^(2) .

In Delta ABC, "seg" AD bot "seg" BC, DB = 3CD . Prove that: 2 AB^(2) = 2AC^(2) + BC^(2)

In adjoining figure, seg AD bot side BC, B-D-C. Prove that AB^(2) + CD^(2) = BD^(2) + AC^(2)

In AD bot BC , prove that AB^(2)+CD^(2)=BD^(2)+AC^(2)

In the adjacent figure, ABC is a right angled triangle with right angle at B and points D, E trisect BC. Prove that 8AE^(2)=3AC^(2)+5AD^(2).