The three medians AD, BE and CF of `Delta`ABC intersect at point G. If the area of `DeltaABC` is 60 sq.cm. then the area of the quadrilateral BDGF is :

Three medians AD, BE and CF of DeltaABC intersect at G. If area of DeltaABC is 36 sq cm, then the area of DeltaCGE is

Three medians AD, BE and CF of Delta ABC intersect at G. The area of Delta ABC is 36 sq. cm. Then the area of Delta CGE is

The medians BE and CF of a /_\ABC intersect at G. Then choose the correct option.

In a Delta ABC all three medians AD, BE and CF intersects at o. If area of ABC IS 10 z sq units, then find area of quadrilateral BDOF .

In an equilateral DeltaABC , the medians AD, BE and CF interest to each other at point G. If the area of quadrilateral BDGF is 12sqrt(3)"cm"^(3) , then the side of DeltaABC is:

The median BE and CF of a triangle ABC intersect at G. Prove that the area of DeltaGBC = area of the quadrilateral AFGE.

Two triangles ABC PQR are congruent. If the area of Delta ABC is 60 sq. cm, then area of DeltaPQR will be

The medians of a triangle ABC meet at G. If the area of the triangle be 120 sq cm, then the area of the triangle GBC is

The medians of Delta ABC intersect at point G. Prove that: area of Delta AGB = (1)/(3) xx " area of " Delta ABC

The centroid of a triangle Delta ABC is G. If the area of DeltaABC = 72 sq. units, then the area of Delta BGC is