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प्रश्न
In ΔPQR, ∠Q = 90° and PQ = QR = 6 cm. Calculate the
- area of triangle
- length of perpendicular from Q to PR [Take `sqrt2 = 1.414`]
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उत्तर
Given:
- In ΔPQR, ∠Q = 90°
- PQ = QR = 6 cm
- Take `sqrt2` = 1.414
Stepwise calculation:
Step 1: Identify triangle type and sides
Since ∠Q = 90° and PQ = QR = 6 cm, triangle PQR is an isosceles right triangle with legs PQ and QR equal.
Step 2: Calculate the area of ΔPQR
Area of a right triangle = `1/2 xx "leg"_1 xx "leg"_2`
`"Area" = 1/2 xx PQ xx QR`
= `1/2 xx 6 xx 6`
= 18 cm2
Step 3: Calculate length of hypotenuse PR
Using Pythagoras theorem:
`PR = sqrt(PQ^2 + QR^2)`
= `sqrt(6^2 + 6^2)`
= `sqrt(72)`
= `6sqrt(2)`
= 6 × 1.414
= 8.484 cm
Step 4: Calculate the length of perpendicular from Q to PR
Since ∠Q = 90°, Q lies on the right angle vertex, the perpendicular from Q to PR is actually the height in the triangle relative to hypotenuse PR.
The length of the perpendicular height from Q to PR in a right triangle is given by:
`"Height" = ("Area" xx 2)/("Base")`
= `(2 xx 18)/8.484`
= `36/8.484 ≈ 4.24 cm`
Area of triangle ΔPQR = 18 cm2.
Length of perpendicular from Q to PR = 4.24 cm.
