In ∆PQR, ∠P = 90° and PQ = PR. The angle bisector of ∠QPR intersects QR at S, then prove that sin∠RPS/ sec∠PRS = sin2∠PQS.
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Answer:
Step-by-step explanation:
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Given : In ∆PQR, ∠P = 90° and PQ = PR. The angle bisector of ∠QPR intersects QR at S,
To find : Prove that sin∠RPS sec∠PRS = sin²∠PQS
Solution:
in Δ PQR
PQ = PR
=> ∠Q = ∠R
∠P = 90°
∠P + ∠Q + ∠R = 180°
=> ∠Q + ∠R = 90°
=> ∠Q = ∠R = 45°
PS is angle bisector of 90°
=> ∠RPS = ∠QPS = 45°
sin∠RPS = Sin45° = 1/√2
Sec ∠PRS = Sec∠R = Sec45° = √2
(sin∠RPS ) /(Sec ∠PRS) = (1/√2)/√2 = 1/2
sin²∠PQS. = Sin ²(∠Q) = Sin²(45°) = ( 1/√2)² = 1/2
1/2 = 1/2
(sin∠RPS ) /(Sec ∠PRS) = sin²∠PQS.
QED
Hence Proved
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