Theorem of Equal Chords Subtending Equal Angles at the Center
Question 4AB ...
Question
Question 4 AB and AC are two equal chords of a circle. Prove that the bisector of the angle BAC passes through the centre of the circle.
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Solution
Given AB and AC are two equal chords whose centre is O.
To prove that the centre O lies on the bisector of ∠BAC.
Construction : Join BC, draw bisector AD of ∠BAC
Proof
In ΔBAOandΔCAO
AB = AC ∠BAO=∠CAO
AO = AO [common side] ∴ΔBAO≅ΔCAO [by SAS congruence rule] ⇒ BO = CO [by CPCT]
and ∠BOA=∠COA [by CPCT]
So, BO = CO, and ∠BOA=∠COA=90∘
So AD is the perpendicular bisector of the chord BC.
Hence the bisector of ∠BAC i.e., AD passes through the centre O.