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

(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

(v) Delta ABC is equilateral and AD is a median of it. If G be the centroid of Delta ABC and GD=10 cm. find the length of GB.

(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.

(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 point D and E are situated on the sides AB and AC of DeltaABC in such a way that DE||BC and AD : DB=3 :1 , If EA=3.3cm , then the length of AC is

D is any point on the side BC of the DeltaABC . P and Q are the centroids of DeltaABD and DeltaACD . Prove that PQ||BC .

D, E and F are the mid-points of the sides of BC, CA and AB of the DeltaABC . If DeltaABC=16Sq.cm., then the area of the trapezium FBCE is-