In `triangle ABC` , the medians AD, BE and CF meet at O. What is the ratio of the area of `triangle ABD` to the area of `triangle AOE` ?

In Fig. 9.29 ratio of the area of triangle ABC to the area of triangle ACD is the same as the ratio of base BC of triangle ABC to the base CD of triangle ACD.

The sides AD, BC of a trapezium. ABCD are parallel and the diagonals AC and BD meet at O. If the area of triangle AOB is 3 cm and the area of triangle BDC is 8 cm2, then what is the area of triangle AOD?

In triangle ABC AD, BE, CF are medians. If the area of the triangle DGC is 20cm^2 , then the area of triangle AGF + the area of triangle BGF is equal to: त्रिभुज ABC में, AD, BE और CF मध्यरेखा हैं और G त्रिभुज का केन्द्रक है। यदि त्रिभुज DGC का क्षेत्रफल 20cm^2 है, तो त्रिभुज AGF का क्षेत्रफल+ त्रिभुज BGF का क्षेत्रफल किसके बराबर है:

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

ABC is a triangle with base AB. D is a point on AB such that AB = 5 and DB = 3. What is the ratio of the area of Delta ADC to the area of Delta ABC ?

In the triangle ABC, the base BC is trisected at D and E. The line through D, parallel to AB, meets AC at F and the line through E parallel to AC meets AB at G. Let EG and DF intersect at H. What is the ratio of the sum of the area of parallelogram AGHF and the area of the triangle DHE to the area of the triangle ABC ?