(ii) AD is median of the equilateral `DeltaABC and G` is its centroid. The side of the triangle is `3sqrt3` cm, then find the length of AG.

(iv) AD is a median of the DeltaABC and G is its centroid. Then AD:AG=

(i) G is the centroid of the equilateral ABC. If AB=10 cm, then the length of AG is

The length of the sides of an equilateral Delta ABC is 2 a units.Find the height of the triangle.

(ii) AD is median of the DeltaABC and the centroid of DeltaABC is O. If AO=10 cm, then the length of OD is

(vi) Delta ABC is an equilateral triangle of sides 6 cm. If G be its centroid, find the length of AG.

If the length of the sides of an equilateral triangle be increased by 1 cm each, then the area of the triangle increases by sqrt(3) sq-cm. Find the length of the equilateral triangle.

(1, -2) and (-2, 3) are the points A and B of the DeltaABC . If the centroid of the triangle be at the origin, then find the coordinates of C.

The perimeter of two similar triangles are 20 cm and 16 cm respectively. If the length of one side of the first triangle is 9 cm, then find the length of the length corresponding side of second triangle.

If the sides of an equilateral triangle be increased by 2 cm each, the area of the triangle is increased by 2sqrt(3)cm^(2). Determine the length of each sides of the equilateral triangle.

The area of an equilateral triangle is 4sqrt(3)cm^(2). Then the of each of the sides of the triangle is