Math, asked by Anonymous, 1 month ago

1. Find the area of a triangle whose sides are 12 cm, 6 cm and 15 cm.

Answers

Answered by adityapatel57208
0

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Answered by Anonymous
2

Given : Sides of triangle are 12 cm, 6 cm and 15 cm

To find : The area of triangle

Solution :

To solve this problem, we will use the concept of " Heron's formala ", according to which,

\sf:\rightarrow Area\:of\:triangle = \sqrt{S(S-A)(S-B)(S-C)}

Here,

  • S = Semi Perimeter
  • A = Side 1
  • B = Side 2
  • C = Side 3

From this, it's clear that firstly we have to find the semi perimeter of triangle inorder to further find the area.

Let's assume that,

  • A = 12 cm
  • B = 6 cm
  • C = 15 cm

Semi perimeter of triangle is given by,

{ \leadsto  \sf \: Semi \:  perimeter =  \dfrac{A + B + C}{2}}

{ \leadsto  \sf \: Semi \:  perimeter =  \dfrac{12 \: cm + 15 \: cm + 6 \: cm}{2}}

{ \leadsto  \sf \: Semi \:  perimeter =  \dfrac{33\: cm}{2}}

 \boxed{ \purple{ \leadsto  \sf \: Semi \:  perimeter = 16.5 \: cm}}

Now apply " Heron's formala " :-

\sf:\implies Area\:of\:\triangle = \sqrt{S(S-A)(S-B)(S-C)}

\sf:\implies Area\:of\:\triangle = \sqrt{16.5\:cm(16.5\:cm-12\:cm)(16.5\;cm-6\:cm)(16.5\:cm-15\:cm)}

 \sf:\implies Area\:of \: \triangle = \sqrt{16.5\:cm(4.5\:cm)(10.5\;cm)(1.5\:cm)}

 \sf:\implies Area\:of \: \triangle = \sqrt{1169.43 \: cm^{4}  }

 \boxed{ \red{ \sf:\implies Area\:of \: \triangle = 34.14\: cm^{2}}}

So the required area of triangle is 34.14 cm².

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