What is the area of a hexagon whose perimeter is 24 feet?

2 Answers
Mar 17, 2018

See a solution process below:

Explanation:

Assuming this is a regular hexagon (all 6 sides have the same length) then the formula for the perimeter of a hexagon is:

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Substituting 24 feet for #P# and solving for #a# gives:

#24"ft" = 6a#

#(24"ft")/color(red)(6) = (6a)/color(red)(6)#

#4"ft" = (color(red)(cancel(color(black)(6)))a)/cancel(color(red)(6))#

#4"ft" = a#

#a = 4"ft"#

Now we can use the value for #a# to find the area of the hexagon. The formula for the area of a hexagon is:

enter image source here

Substituting #4"ft"# for #a# and calculating #A# gives:

#A = (3sqrt(3))/2(4"ft")^2#

#A = (3sqrt(3))/2 16"ft"^2#

#A = 3sqrt(3) * 8"ft"^2#

#A = 24sqrt(3)"ft"^2#

or

#A ~= 41.569"ft"^2#

Mar 17, 2018

#24 sqrt3 = 41.57# square feet

Explanation:

We need to assume that it is a regular hexagon - meaning that all the six sides and angles are equal,

If the perimeter is #24# feet, then each side is #24/6 = 4# feet

A hexagon is the only polygon which is made up of equilateral triangles.

In this hexagon, the sides of the hexagon and therefore the sides of the triangles are all #4# feet and the angles are each #60°#

Using the trig Area formula, #A = 1/2ab sin C#, we can calculate the area of the hexagon as:

#A = 6 xx 1/2 xx4xx4xxsin60°#

#= 48 sin 60°#

#= 48 xx sqrt3/2#

#=24 sqrt3#

If you calculate it you will get # 41.57 " feet"^2#