If BE and CF are 2 median of a `DeltaABC` and G is there intersecting point. Similarly O is intersecting point of EF and AG. Find AO : OG.

Let BE and CF be the two medians of a triangle ABC and G be the intersection. Also, let EF cut AG at O, then AO : OG is

In a DeltaABC, the bisectors of angleBandangleC intersect each other point O. Then angleBOC is ?

In triangle ABC, AD, BE and CF are the medians intersecting at point G and area of triangle ABC is 156 cm^(2) . What is the area (in cm^(2) ) of triangle FGE ?

In a Delta ABC, angle B=90^(@) , median AD and CF intersects at 'O' . Find the ratio of area of Delta AOC and BDOF .

Points E and F lie respectively on side AC and AB of a triangle ABC such that EF||BC and 2EF=BC . If G be the centroid of DeltaABC then find the area of triangle formed by joining mid points of sides of triangle EFG with respect to area of DeltaABC .

ABCD is a parallelogram and O is the point of intersection of its diagonals.If ar(/_AOD)=4cm^(2) find ar(/_AOB)