Interior Angles of a Regular Dodecagon

Medium Geometry Polygons

Consider a regular dodecagon, which is a twelve-sided polygon with all sides and angles equal. To find the measure of each interior angle of the dodecagon, we can use the formula for the interior angle of a regular polygon:

$$ ext{Interior Angle} =\frac{(n-2) imes 180}{n} $$

where $$n$$ is the number of sides of the polygon. Using this formula, what is the measure of each interior angle in the regular dodecagon?

$150^{\circ}$

$120^{\circ}$

$135^{\circ}$

$168^{\circ}$

Hint

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