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प्रश्न
In adjoining figure, seg PS ⊥ seg RQ, seg QT ⊥ seg PR. If RQ = 6, PS = 6 and PR = 12, then Find QT.
योग
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उत्तर
`{:("seg PS ⊥ seg RQ"), ("seg QT ⊥ seg PR"), ("RQ = 6, PS = 6 and PR = 12"):} }"Given"`
With base PR and height QT,
A(Δ PQR) = `1/2` × PR × QT ...(1)
With base QR and height PS,
A(Δ PQR) = `1/2` × QR × PS ...(2)
The ratio of areas of two triangles is equal to the ratio of the product of their base and corresponding heights.
From (1) and (2),
`"A(Δ PQR)"/"A(Δ PQR)" = (1/2 × "PR × QT")/(1/2 × "QR ×PS")`
`1/1 = ("PR"×"QT")/("QR"×"PS")`
PR × QT = QR × PS
QT = `("QR × PS")/"PR"`
QT = `(6 × 6)/12`
QT = `3/1`
Hence, the measure of side QT is 3 units.
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