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Question
In the right-angled triangle QPR, PM is an altitude.
Given that QR = 8 cm and MQ = 3.5 cm, calculate the value of PR.
Solution
In ΔPQM and ΔQPR,
∠PMQ = ∠QPR ...(Each = 90°)
∠Q = ∠Q ...(Common)
∴ ΔPQM ∼ ΔQPR ...(AA postulate)
∴ `(PQ)/(QR) = (QM)/(PQ) = (PM)/(PR)` ...(i)
`\implies` PQ2 = QR × QM
= 8 × 3.5
= 28
∴ `PQ = sqrt(28)` ...(ii)
In ΔPQR, ∠P = 90° and PM ⊥ QR
∴ PM2 = QM × MR = 3.5 × 4.5 ...(∴ MR = QR – QM)
∴ `PM = sqrt(3.5 xx 4.5)` ...(iii)
From (i) `(PQ)/(QR) = (PM)/(PR)`
`sqrt(28)/8 = sqrt(3.5 xx 4.5)/(PR)`
Squaring on both sides,
`28/64 = (3.5 xx 4.5)/(PR)`
`PR^2 = (3.5 xx 4.5 xx 64)/28`
= `(35 xx 45 xx 64)/(10 xx 10 xx 28)`
= `10080/2800`
`=>` PR2 = 36 = (6)2
∴ PR = 6 cm.
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