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Question
Use the given figure to prove that, AB = AC.
Solution
In ΔAPQ,
AP = AQ .........[Given]
∴ ∠APQ = ∠AQP .........(i) [angles opposite to equal sides are equal]
In ΔABP,
∠APQ = ∠BAP + ∠ABP .......(ii) [Ext. the angle is equal to the sum of opp. int. angles]
In ΔAQC,
∠AQP = ∠CAQ + ∠ACQ ...(iii) [Ext. angle is equal to sum of opp. int. angles]
From (i), (ii) and (iii)
∠BAP + ∠ABP = ∠CAQ + ∠ACQ
But, ∠BAP = ∠CAQ .......[Given]
⇒ ∠CAQ + ∠ABP = ∠CAQ + ∠ACQ
⇒ ∠ABP = ∠CAQ + ∠ACQ − ∠CAQ
⇒ ∠ABP = ∠ACQ
⇒ ∠B = ∠C ...........(iv)
In ΔABC,
∠B = ∠C
⇒ AB = AC ......[Sides opposite to equal angles are equal]
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