Draw
a 36o-72o-72o triangle, with two long sides =
1, and the short side = x .
Now, bisect
one of the 72° angles forming two triangles:
a 36o-36o-108o
isosceles triangle whose short sides are both x , and a smaller 36o-72o-72o
isosceles triangle whose long sides are x , and short side is 1−x
Since
the two 36o-72o-72o triangles are
proportional: <o:p></o:p>
x/1=(1-x)/x
solving x2+x-1=0
and
ignoring the negative answer
we
get x=(-1+sqrt(5))/2
a.k.a.
phi, the golden ratio<o:p></o:p>
Now
bisect the obtuse angle in the 36o-36o-108o
triangle to get a right
(36o-54o-90o) triangle, with a hypotenuse=(-1+sqrt(5))/2 and the long leg =1/2 .
so:
cos 36°
=1/(-1+sqrt(5))=(1+phi)/2 =.809
approximately.
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