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In Fig 7.51, PR > PQ and PS bisect QPR. Prove that PSR > PSQ. Q.5

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Find the easiest solution of ncert class 9th solution of chapter triangles . Please help me to find out the best solution of exercise 7.4 question number 5 . Give me the easiest and best solution of this question. In Fig 7.51, PR > PQ and PS bisect QPR. Prove that PSR > PSQ.

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  1. Solution:

    It is given that PR > PQ and PS bisects QPR

    Now we will have to prove that angle PSR is smaller than PSQ i.e. PSR > PSQ

    Proof:

    QPS = RPS — (ii) (As PS bisects ∠QPR)

    PQR > PRQ — (i) (Since PR > PQ as angle opposite to the larger side is always larger)

    PSR = PQR + QPS — (iii) (Since the exterior angle of a triangle equals to the sum of opposite interior angles)

    PSQ = PRQ + RPS — (iv) (As the exterior angle of a triangle equals to the sum of opposite interior angles)

    By adding (i) and (ii)

    PQR +QPS > PRQ +RPS

    Thus, from (i), (ii), (iii) and (iv), we get

    PSR > PSQ

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