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In the given figure, AB=AC. Then, can we say that AD bisects angle A
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Given, AB=AC
∠ABC=∠ACB (Isosceles triangle property)
Now, in △DPB and △DQC,
BD=DC (Given)
∠DBP=∠DCQ (Proved above)
∠DPB=∠DQC (Each 90∘)
thus, △DPB≅△DQC (ASA rule)
Hence, PB=QC (By cpct)
We know, AB=AC
Hence, AB−PB=AC−QC
AP=AQ (I)
Now, In △APD and △AQD,
∠APD=∠AQD (each 90∘)
AP=AQ (From I)
AD=AD (Common)
Thus, △APD≅△AQD (SAS postulate)
Hence, ∠DAP=∠DAQ (By cpct)AD bisects ∠A
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