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Question
In ΔPQR, ∠P : ∠Q : ∠R = 1 : 2 : 3 and altitude from P to QR is 4 cm. Find the perimeter of ΔPQR.
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Solution
Given:
Angles are in ratio ∠P : ∠Q : ∠R = 1 : 2 : 3
Altitude from P to base QR = 4 cm
Find the perimeter of △PQR
Step 1:
Let ∠P = x, ∠Q = 2x, ∠R = 3x
x + 2x + 3x = 6x = 180°
x = 30°
∠P = 30°
∠Q = 60°
∠R = 90°
Step 2:
Since ∠R = 90°, the triangle is right-angled at R.
Let, Height from P to base QR = 4 cm
Use triangle △PQR with ∠P = 30°
sin(30°) = `"opposite"/"hypotenuse"`
= `4/(PQ) = 4/sin(30°)`
= `4/(1/2)` = 8 cm
cos(30°) = `"adjacent (QR)"/"hypotenuse (PQ)"`
cos(30°) = `(QR)/8`
= QR = 8 ⋅ cos(30°)
= 8 ⋅ `sqrt3/2 = 4sqrt3`
= PR2 = PQ2 − QR2 ...[use Pythagoras for PR]
= `PR^2 = 8^2 − (4sqrt3)^2`
= PR2 = 64 − 48
= PR2 = 16
= PR = 4 cm
Step 3:
Perimeter = PQ + QR + PR
= `8 + 4sqrt3 + 4 = 4 + 4sqrt3` cm
= `(4 + 4sqrt3)` cm
