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Question
In the given figure, AD = BC, AC = BD. Prove that ∠ADB = ∠ACB.
Theorem
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Solution
Given: AD = BC and AC = BD
To Prove: ∠ADB = ∠ACB
Proof:
1. Consider triangles ΔADB and ΔBCA.
2. In ΔADB and ΔBCA, we have:
AD = BC ...(Given)
AC = BD ...(Given)
AB = AB ...(Common side)
3. By the SSS (Side-Side-Side) congruence criterion, ΔADB ≅ ΔBCA.
4. Therefore, by CPCT (Corresponding Parts of Congruent Triangles), the corresponding angles are equal:
∠ADB = ∠ACB.
Hence proved that ∠ADB = ∠ACB.
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