A regular hexagon has side 2 meters. What is its area?

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A regular hexagon has side 2 meters. What is its area?

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Answer 1 · 2015-11-17T23:26:41

$6sqrt(3)"m"^2$

Explanation:

The hexagon can be divided into $6$ equilateral triangles with base $2"m"$ and height $sqrt(3)"m"$ . Why $sqrt(3)"m"$ ? Each equilateral triangle can be split into two right angled triangles with hypotenuse $2"m"$ , one leg $1"m"$ and the other $sqrt(2^2-1^2)"m" = sqrt(3)"m"$ .

The area of each of the equilateral triangles is:

$1/2 xx "base" xx "height" = 1/2 xx 2"m" xx sqrt(3)"m" = sqrt(3)"m"^2$

So the area of the hexagon is $6sqrt(3)"m"^2$

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A regular hexagon has side 2 meters. What is its area?

1 Answer

Explanation:

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