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Question
In ΔABC, P is any point inside it. Prove that ∠BPC > ∠A.
[Hint: Extend BP to meet AC in Q. Ext. ∠BPC > Int. opp. ∠PQC and Ext. ∠PQC > ∠A]
Theorem
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Solution
Given:
- Triangle ABC and a point P lies inside triangle ABC.
- We are to prove that ∠BPC > ∠A.
Hint provided:
- Extend BP to meet AC at point Q.
- Use exterior angle properties.
Proof (Using Exterior Angle Properties):
1. Extend BP to meet AC at point Q, forming triangle PQC.
2. In triangle PQC, angle BPC becomes an exterior angle at vertex Q.
Hence, ∠BPC > ∠PQC ... (1) (Exterior Angle Theorem)
3. Now consider triangle ABQ. Since P lies inside triangle ABC, point Q lies beyond P on AC, so triangle ABQ exists.
In triangle ABQ, angle PQC is an exterior angle.
So, ∠PQC > ∠A ... (2) (Exterior Angle Theorem again)
4. From (1) and (2), we combine:
∠BPC > ∠PQC > ∠A ⇒ ∠BPC > ∠A
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