Mathematics
In the adjoining figure, AB = AC, D is a point in the interior of △ABC such that ∠DBC = ∠DCB. Prove that AD bisects ∠BAC of △ABC.
Triangles
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Answer
Given, AB = AC.
∴ ∠ABC = ∠ACB (As angles opposite to equal sides of isosceles triangle are equal.)
Given, ∠DBC = ∠DCB
∴ DB = DC. (Sides opposite to equal angles are equal.)
In △ABD and △ACD,
AB = AC (Given)
DB = DC (Proved)
AD = AD (Common)
Thus, △ABD ≅ △ACD by SSS axiom.
We know that corresponding parts of congruent triangle are equal.
∴ ∠BAD = ∠CAD.
Hence, proved that AD bisects ∠BAC.
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