Question
Download Solution PDFThe perimeter and one of two equal sides of an isosceles triangle are 72 cm and 20 cm respectively. Area of the triangle is:
Answer (Detailed Solution Below)
Detailed Solution
Download Solution PDFGiven,
One of two equal sides of an isosceles triangle, a = 20 cm
Perimeter of the triangle = 72 cm
Formula:
Perimeter of an isosceles triangle = 2a + b
Area of an isosceles triangle = (b/4) × √(4a2 – b2)
Calculation:
Let a = 20 cm
2a + b = 72
⇒ 2 × 20 + b = 72
⇒ 40 + b = 72
⇒ b = 72 – 40
⇒ b = 32
Area of isosceles triangle = (32/4) × √(4 × 202 – 322)
⇒ 8 × √(4 × 400 – 1024)
⇒ 8 × √(1600 – 1024)
⇒ 8 × √576
⇒ 8 × 24
⇒ 192 cm2
∴ Area of the triangle is 192 cm2.
Alternate solution
Third side = 72 – 2 × 20 = 72 – 40 = 32
Semi perimeter, s = 72/2 = 36
Now,
Area = √[s (s – a) (s – b) (s – c)] = √[36(36 – 32)(36 - 20)(36 - 20)] = √(36 × 4 × 16 × 16) = 16 × 4 × 3 = 192 cm2
Last updated on Jul 22, 2025
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