In an equilateral triangle ABC, AD`bot`BC meeting BC in D then `AD^2`=…………..

In an equilateral triangle ABC, if AD is the altitude prove that 3AB^2 = 4AD^2 .

In an equilateral Triangle ABC,D is a point on side BC such that BD=1/3BC . Prove that 9AD^2=7AB^2 .

In an equilateral triangle ABC, AL, BM and CN are medians. Forces along BC and BA represented by them will have a resultant represented by

Equilateral triangle DEF is inscribed in equilateral triangle ABC as shown with DE bot^("lar")B C then ratio of Area of triangle DEF to the Area of Delta^("le") ABC is then

Altitude AD of an equilateral triangle ABC is a diameter of circle. If circle intersect AB and AC at E and F then (EF)/(BC) =

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 .

A(3, 2, 0), B(5, 3, 2), C(-9, 6, -3) are three points forming a triangle and AD, the external bisector of BAC, meeting BC at D then find D.

The side of BC of an equilateral triangle Delta ABC is parallel to X-axis. Find the slopes of line along sides BC, CA and AB.

The median AD of the triangle ABC is bisected at E. BE meets AC in F then AF : AC is