Difference between revisions of "Pentagon"

Revision as of 20:39, 20 July 2016

In geometry, a pentagon is a polygon with 5 sides. Each angle of a regular pentagon is $108^{\circ}$ . The sum of the internal angles of any pentagon is $540^{\circ}$ .

Construction

It is possible to construct a regular pentagon with compass and straightedge:

Draw circle $O$ (red).
Draw diameter $AB$ and construct a perpendicular radius through $O$ .
Construct the midpoint of $CO$ , and label it $E$ .
Draw $AE$ (green).
Construct the angle bisector of $\angle AEO$ , and label its intersection with $AB$ as $F$ (pink).
Construct a perpendicular to $AB$ at $F$ .
Adjust your compass to length $AG$ , and mark off points $H$ , $I$ and $J$ on circle $O$ .
$AGHIJ$ is a regular pentagon.

The Golden Ratio and the Pentagram

The pentagon is closely associated with the Golden Ratio. More specifically, the ratio of a diagonal to an edge is $\frac{1+\sqrt{5}}{2}$ . By drawing each of the diagonals, one can form a pentagram, or five-pointed star, in which each of the internal angles is $36^{\circ}$ .\

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 ==The Golden Ratio and the Pentagram==
-The pentagon is closely associated with the *[[Golden Ratio]]. More specifically, the ratio of a diagonal to an edge is <math>\frac{1+\sqrt{5}}{2}</math>.\
+The pentagon is closely associated with the [[Golden Ratio]]. More specifically, the ratio of a diagonal to an edge is <math>\frac{1+\sqrt{5}}{2}</math>. By drawing each of the diagonals, one can form a pentagram, or five-pointed star, in which each of the internal angles is <math>36^{\circ}</math>.\
-By drawing each of the diagonals, one can form a pentagram, or five-pointed star, in which each of the internal angles is <math>36^{\circ}</math>.\
 == See Also ==

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Difference between revisions of "Pentagon"

Revision as of 20:39, 20 July 2016

Construction

The Golden Ratio and the Pentagram

See Also