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Question
In the figure given below, PQR is an equilateral triangle of side 20 cm. ΔQSR is inscribed in it, ∠QSR = 90°, QS = 16 cm. Find (i) SR, (ii) the area of the shaded portion. [Take `sqrt3 = 1.732`].
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Solution
Given:
- PQR is an equilateral triangle with each side = 20 cm
- ΔQSR is inscribed such that ∠QSR = 90°
- QS = 16 cm
- Need to find (i) SR and (ii) area of shaded portion
- Take `sqrt3 = 1.732`
Step 1: Calculate SR in ΔQSR
Since ∠QSR = 90°, triangle QSR is right angled at S.
Using Pythagoras theorem:
PR = 20 cm ...(Side of equilateral triangle)
QR = 20 cm ...(Equilateral triangle side)
Triangle PQR is equilateral, side = 20 cm.
In triangle QSR ...(Right angled at S)
QS = 16 cm ...(Given)
SR = ?
QR = 20 cm ...(Base of equilateral triangle)
Using the Pythagoras theorem in ΔQSR:
(QS)2 + (SR)2 = (QR)2
⇒ (16)2 + (SR)2 = (20)2
⇒ 256 + (SR)2 = 400
⇒ (SR)2 = 400 – 256 = 144
⇒ SR = `sqrt(144)` = 12 cm
Step 2: Calculate area of the shaded portion
The shaded portion is the area of triangle PQR minus the area of triangle QSR.
Area of equilateral triangle PQR:
`"Area" = sqrt(3)/4 xx "side"^2`
= `1.732/4 xx 20^2`
= `1.732/4 xx 400`
= 1.732 × 100
= 173.2 cm2
Area of triangle QSR right angled triangle:
`"Area" = 1/2 xx QS xx SR`
= `1/2 xx 16 xx 12`
= 96 cm2
i. SR = 12 cm
ii. Area of shaded portion
= Area of triangle PQR − Area of triangle QSR
= 173.2 − 96
= 77.2 cm2
