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Bisectors of interior ∠B and exterior ∠ACD of a ΔABC intersect at the point T. Prove that ∠BTC=12∠BAC
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Bisectors of interior ∠B and exterior ∠ACD of a ΔABC intersect at the point T. Prove that ∠BTC=12∠BAC
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Solution
In ΔABC, produce BC to D and the bisectors of ∠ABC and ∠ACD meet at point T.
To prove: ∠BTC=12∠BAC
Proof:
In ΔABC, ∠C is an exterior angle.
∴ ∠ACD=∠ABC+∠CAB
[exterior angle of a triangle is equal to the sum of two opposite interior angles]
⇒ 12 ∠ACD=12 ∠CAB+12 ∠ABC
⇒ ∠TCD=12∠CAB+12∠ABC
[∵ CT is a bisector of ∠ACD⇒12 ∠ACD=∠TCD]
In ΔBTC, ∠TCD=∠BTC+∠CBT
[exterior angle of a triangle is equal to the sum of two opposite interior angles]
⇒ ∠TCD=∠BTC+12∠ABC
[∵ BT bisects of ∠ABC⇒∠CBT=12∠ABC]
From equations (i) and (ii),
12 ∠CAB+12 ∠ABC=∠BTC+12 ∠ABC
⇒ ∠BTC=12 ∠CAB
or ∠BTC=12∠BAC
To prove: ∠BTC=12∠BAC
Proof:
In ΔABC, ∠C is an exterior angle.
∴ ∠ACD=∠ABC+∠CAB
[exterior angle of a triangle is equal to the sum of two opposite interior angles]
⇒ 12 ∠ACD=12 ∠CAB+12 ∠ABC
⇒ ∠TCD=12∠CAB+12∠ABC
[∵ CT is a bisector of ∠ACD⇒12 ∠ACD=∠TCD]
In ΔBTC, ∠TCD=∠BTC+∠CBT
[exterior angle of a triangle is equal to the sum of two opposite interior angles]
⇒ ∠TCD=∠BTC+12∠ABC
[∵ BT bisects of ∠ABC⇒∠CBT=12∠ABC]
From equations (i) and (ii),
12 ∠CAB+12 ∠ABC=∠BTC+12 ∠ABC
⇒ ∠BTC=12 ∠CAB
or ∠BTC=12∠BAC
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