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State and Prove Converse of Basic Proportionality Theorem (BPT)

Converse of the Basic Proportionality Theorem (BPT) – Exploring the Geometric Relationship

In the world of geometry, the Basic Proportionality Theorem (BPT) stands as a fundamental principle that helps us uncover the intricate connections between lines and their intersections within a triangle. This theorem, also known as the “Thales’ Theorem,” establishes a crucial proportionality relationship between the sides of a triangle and the line segments that intersect them. In this blog, we will delve into the converse of the Basic Proportionality Theorem, unveiling its significance and presenting a step-by-step proof.

Statement of the Converse of the Basic Proportionality Theorem:

If a line segment intersects two sides of a triangle and divides them proportionally, then the line segment is parallel to the third side of the triangle.

Proof of the Converse of the Basic Proportionality Theorem:

Let’s consider a triangle ABC, where DE is a line segment that intersects AB at point D and AC at point E. The line segment DE divides sides AB and AC proportionally if and only if:

AD/DB = AE/EC

Our goal is to prove that DE is parallel to BC.

Step 1: Establishing the Proportionality Condition

Given that AD/DB = AE/EC, we can denote both ratios as k, where k is a positive constant. This gives us:

AD/DB = k AE/EC = k

Step 2: Using the Converse of the Thales’ Theorem

According to the converse of the Thales’ Theorem, if a line is parallel to one side of a triangle, it divides the other two sides proportionally. Applying this theorem to line DE and triangle ABC:

If DE || BC, then AD/DB = AE/EC.

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Since we already have AD/DB = AE/EC (both equal to k), this implies that DE must indeed be parallel to BC.

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Step 3: Conclusion

Through the converse of the Thales’ Theorem, we’ve established that when a line segment DE intersects sides AB and AC of triangle ABC proportionally, it is parallel to the third side BC. This concludes the proof of the converse of the Basic Proportionality Theorem.

Exploring the Implications:

Understanding the converse of the Basic Proportionality Theorem is crucial for solving various geometric problems involving parallel lines and triangles. This theorem not only helps us identify parallel lines but also serves as a powerful tool in geometry proofs. By recognizing the proportional relationships within triangles, we can make accurate deductions about the configuration of lines and sides.

In conclusion, the converse of the Basic Proportionality Theorem unveils the fascinating connection between proportionality and parallel lines within a triangle. This theorem enriches our geometric toolkit and empowers us to decipher the intricate relationships that underlie various geometric constructions and proofs.

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