In triangle PQR,PR is greater than PQ and PS bisects angle QPR,prove that the angles PSR is greater than angle PSQ
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Hello mate =_=
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Solution:
PR>PQ (Given)
⇒∠PQR>∠PRQ ....... (1)
(In any triangle, the angle opposite to the longer side is larger.)
We also have ∠PQR+∠QPS+∠PSQ=180° (Angle sum property of triangle)
⇒∠PQR=180°−∠QPS−∠PSQ ......(2)
And, ∠PRQ+∠RPS+∠PSR=180° (Angle sum property of triangle)
⇒∠PRQ=180°−∠PSR−∠RPS ....... (3)
Putting (2) and (3) in (1), we get
180°−∠QPS−∠PSQ>180°−∠PSR−∠RPS
We also have ∠QPS=∠RPS, using this in the above equation, we get
−∠PSQ>−∠PSR
⇒∠PSQ<∠PSR
Hence Proved
hope, this will help you.
Thank you______❤
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