In the diagram above, ABC is a triangle - NSC Mathematics - Question 9 - 2021 - Paper 2

The area of triangle ABC can be expressed using the height and base relationships. Since DE || BC, we have: $\frac{\text{area of } ADE}{\text{area of } ABC} = \frac{AD \cdot h1}{AB \cdot h}$ and $\frac{\text{area of } DEC}{\text{area of } ABC} = \frac{EC \cdot h2}{AC \cdot h}$ By the property of the ratios of areas, we conclude that: $\frac{AD}{DB} = \frac{AE}{EC}$

Since we have established the proportionality through the area ratios, we can conclude that: $\frac{AD}{DB} = \frac{AE}{EC}$ This completes the proof for the theorem that a line drawn parallel to one side of a triangle divides the other two sides proportionally.