Find the area of a 6-gon with side length 12? Round to a whole number.

2 Answers
Apr 10, 2018

374

Explanation:

Area of regular hexagon=#(3sqrt3)/2a^2# where #a# is side length

Apr 10, 2018

This is approximately #374.12 " units"^2# to 2 decimal places

Rounded this gives #374" units"^2#

Explanation:

Objective is to find the area of #1/2# the triangle then multiply that by 12 to obtain the total area.

Area of a triangle is #1/2xx"base"xx"hight"#
Tony B

The angle marked in blue is #(360^o)/6 = 60^o#
Consider just #1/2# of the triangle:

Tony B

The sum of angles in a triangle is #180^o#

Angle ABC is #90^o# so angle BCA is #180^o-90^o-30 = 60^o#

Length AB can be determined from #tan(60^0)=(AB)/(BC)#

#tan(60^o)=(AB)/6#

The height #AB=6tan(60)#

But #tan(60) = sqrt(3)" "# as an exact value.

So height #AB=6tan(60)=6sqrt(3)#

Thus area of #DeltaABC = a= 1/2xx"base"xx"height"#

# color(white)("dddddddddddddddddd")a= 1/2xx color(white)("d")6 color(white)("d")xx color(white)("d")6sqrt(3) color(white)("ddd")=18sqrt(3) #

We have 12 of these in the 6-gon so the total area is:

Area of the whole #A=12xx18sqrt(3) = 216sqrt(3)#

This is approximately #374.12 " units"^2# to 2 decimal places
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Note that #216sqrt(3) = 3/2sqrt(3)xx12^2#

Matching the #3/2sqrt(3)color(white)(.)a^2# given by Briana M

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