"Question 6 In the given figure, the side QR of ΔPQR is produced to a point S. If the bisectors of ∠PQR and ∠PRS meet at point T, then prove that ∠QTR=∠QPR.
Class 9 - Math - Lines and Angles Page 108"
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Exterior Angle of a triangle:
If a side of a triangle is produced then the exterior angle so formed is equal to the sum of the two interior opposite angles.
______________________
Solution:
Given,
Bisectors of ∠PQR & ∠PRS meet at point T.
To prove,
∠QTR = 1/2∠QPR.
Proof,
∠TRS = ∠TQR +∠QTR
(Exterior angle of a triangle equals to the sum of the two interior angles.)
⇒∠QTR=∠TRS–∠TQR — (i)
∠SRP = ∠QPR + ∠PQR
⇒ 2∠TRS = ∠QPR + 2∠TQR
[ TR is a bisector of ∠SRP & QT is a bisector of ∠PQR]
⇒∠QPR= 2∠TRS – 2∠TQR
⇒∠QPR= 2(∠TRS – ∠TQR)
⇒ 1/2∠QPR = ∠TRS – ∠TQR — (ii)
Equating (i) and (ii)
∠QTR= 1/2∠QPR
Hence proved.
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If a side of a triangle is produced then the exterior angle so formed is equal to the sum of the two interior opposite angles.
______________________
Solution:
Given,
Bisectors of ∠PQR & ∠PRS meet at point T.
To prove,
∠QTR = 1/2∠QPR.
Proof,
∠TRS = ∠TQR +∠QTR
(Exterior angle of a triangle equals to the sum of the two interior angles.)
⇒∠QTR=∠TRS–∠TQR — (i)
∠SRP = ∠QPR + ∠PQR
⇒ 2∠TRS = ∠QPR + 2∠TQR
[ TR is a bisector of ∠SRP & QT is a bisector of ∠PQR]
⇒∠QPR= 2∠TRS – 2∠TQR
⇒∠QPR= 2(∠TRS – ∠TQR)
⇒ 1/2∠QPR = ∠TRS – ∠TQR — (ii)
Equating (i) and (ii)
∠QTR= 1/2∠QPR
Hence proved.
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