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20.) Find the area
of a triangle,
two sides of which are 8cm
and 11am and perimeter is 32cm
Answers
Given:-
- Two sides of the triangle are 8cm and 11cm.
- Perimeter of the triangle is 32cm.
To Find:-
- Find the area of the triangle.
Concept:-
- Let's go through the concept first. Concepts used here is Area of a traingle(Heron's Formula).Heron's Formula gives the area of a triangle when the length of all three sides are known.Unlike other triangle area formulae,there is no need to calculate angles or other distances in the triangle first.
- Substitute the given values in the equation and find the area of it.Let's do it.
Formulae Applied:-
- Area of a triangle = √[S(s - a)(s - b)(s - c)]
Solution:-
Length of the first side (a) is 8cm.
Length of the second side (b) is 11cm.
Length of third side (c) be x.
Perimeter of the triangle is 32cm.
Firstly, we should find the Semiperimeter
Semiperimeter(S) = perimeter/2
⟹ perimeter/2
⟹ 32/2
⟹ 16
Hence,
Semiperimeter of the triangle is 16cm.
Now,we should find the unknown side x(c).
Perimeter of a Triangle = a + b + c(Sum of all sides)
⟹ a + b + c = 32
⟹ 8 + 11 + x = 32
⟹ 19 + x = 32.
⟹ x = 32 - 19
⟹ x = 13
⟹ x = 13cm
Hence,
The length of third side (c) is 13cm.
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According to the question we have!
Area of a triangle = √[S(s - a)(s - b)(s - c)]
⟹ √[S(s - a)(s - b)(s - c)]
⟹ √[16(16 - 8) × (16 - 11) × (16 - 13)]
⟹ √[16 × (8) × (5) × (3)]
⟹ √[(8 × 2) × 8 × 5 × )]
⟹ √[(8 × 8) × (2 × 5 × 3)]
⟹ √8^2 × √30
⟹ 8 × √30
⟹ 8√30
⟹ 8√30cm^2
Hence,
The area of the triangle is 8√30cm^2.
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Answer:
8√30 is the answer.hope this may hlp u
Step-by-step explanation:
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