How do you use Heron's formula to determine the area of a triangle with sides of that are 8, 5, and 10 units in length?

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How do you use Heron's formula to determine the area of a triangle with sides of that are 8, 5, and 10 units in length?

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Answer 1 · 2016-02-04T11:29:39

here is how,

Explanation:

we know,

$s = \frac{a + b + c}{2}$ $s=(a+b+c)/2$

$= \frac{8 + 10 + 5}{2}$ $=(8+10+5)/2$

$= \frac{23}{2}$ $=23/2$

$= 11.5$ $=11.5$

from heron's formula, we know,

$A = \sqrt{s (s - a) (s - b) (s - c)}$ $A=sqrt(s(s-a)(s-b)(s-c))$

$= \sqrt{11.5 (11.5 - 8) (11.5 - 5) (11.5 - 10)}$ $=sqrt(11.5(11.5-8)(11.5-5)(11.5-10))$

$= \sqrt{392.4375}$ $=sqrt(392.4375)$

$= 19.8100353357 u n i t^{2}$ $=19.8100353357unit^2$

Answer 2 · 2016-02-04T11:53:34

Area ≈ 19.8

Explanation:

This is a 2 step process :

Calculate half of the triangle's perimeter (s)

Calculate the area

let a = 8 , b = 5 and c = 10

step 1 : $s = \frac{a + b + c}{2} = \frac{8 + 5 + 10}{2} = \frac{23}{2} = 11.5$ $s = (a+b+c)/2 = (8+5+10)/2 = 23/2 = 11.5$

step 2 : Area $= \sqrt{s (s - a) (s - b) (s - c)}$ $= sqrt(s(s-a)(s-b)(s-c) )$

$= \sqrt{11.5 (11.5 - 8) (11, 5 - 5 (11.5 - 10)}$ $= sqrt(11.5(11.5-8)(11,5-5(11.5-10)$

$= \sqrt{11.5 \times 3.5 \times 6.5 \times 1.5} \approx 19.8$ $= sqrt(11.5 xx 3.5 xx 6.5 xx 1.5) ≈ 19.8$

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How do you use Heron's formula to determine the area of a triangle with sides of that are 8, 5, and 10 units in length?

2 Answers

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