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

(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.

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

AD is a median of the DeltaABC .If AE and AFare medians of the triangles ABD respectively, and AD= m_1,AE=m_2AF=m_3, then find the value of a^2/8 .

AD is a medium of DeltaABC and P is a point on the side AC of DeltaABC such that area of DeltaADP : area of DeltaABD = 2 : 3, Determine the ratio (area of DeltaPDC : area of DeltaABC ).

(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.

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 .

The coordinates of A of the DeltaABC are (2,5) and the coordinates of its centroid are (-2,1). Find the coordinates of the mid-point of BC.

E is the mid-point of AD , a median of the Delta ABC . The extended BE intersects AC at F. prove that AF=(1)/(3)AC.

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