In an equilateral triangle ABC, the side BC is trisected at D. Find the value of `AD^(2)` :

In an equilateral triangle ABC the side BC is trisected at D. Prove that 9AD^(2)=7AB^(2)

In an equilateral triangle ABC, the side BC is trisected at D. Then the correct relation is

In an equilateral triangle ABC of side 10cm, the side BC is trisected at D. Then the length (in cm) of AD is

DeltaABC is an equilateral triangle. D divides BC in the ratio 1 : 2. Then find the value of 7AB^(2) -

ABCD is a square. Draw an equilateral triangle PBC on side BC considering BC is a base and an equilateral triangle QAC on diagonal AC considering AC is a base. Find the value of ("Area of " Delta PBC)/("Area of " Delta QAC) .

The side AB of an equilateral triangle ABC is produced to D such that BD=2AC the value of (CD^(2))/(AB^(2))is

In an equilateral triangle ABC, If ADbotBC, B-D-C and AB = 12 cm, then the value of AD is

Let ABC be an equilateral triangle. If the side BC is produced to the point D so that BC = 2CD, then AD^(2) is equal to