If the bisectors of angle Q and angle R of a triangle PQR meet at point S, then prove that angle QSR = 90 + 1/2 angle P.
Answers
Answer:
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Given : bisectors of angles ∠Q and ∠R of triangle PQR meet at a point S
To find : prove that ∠QSR = 90°+(1/2)∠P
Solution:
in Δ PQR
∠Q + ∠R + ∠P = 180° ( sum of angles of triangle)
=>∠Q + ∠R = 180° - ∠P Eq1
in Δ SQR
∠SQR + ∠SRQ + ∠QSR = 180° ( sum of angles of triangle)
∠SQR = ∠Q/2
∠SRQ = ∠R/2
=> ∠Q/2 + ∠R/2 + ∠QSR = 180°
=> (∠Q + ∠R )/2 + ∠QSR = 180°
Substitute ∠Q + ∠R value from Eq1
=> (180° - ∠P)/2 + ∠QSR = 180°
=> 90° - ∠P/2 + ∠QSR = 180°
=> ∠QSR = 90° + ∠P/2
QED
Hence proved
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