# How to Calculate the Area of a Regular Polygon

A *regular polygon *is equilateral (it has equal sides) and equiangular (it has equal angles). To find the area of a regular polygon, you use an *apothem* — a segment that joins the polygon’s center to the midpoint of any side and that is perpendicular to that side (segment *HM* in the following figure is an apothem).

You use the following formula to find the area of a regular polygon:

So what’s the area of the hexagon shown above?

You need the perimeter, and to get that you need to use the fact that triangle *OMH* is a triangle (you deduce that by noticing that angle *OHG* makes up a sixth of the way around point *H* and is thus a sixth of 360 degrees, or 60 degrees; and then that angle *OHM* is half of that, or 30 degrees).

In a triangle, the long leg is times as long as the short leg, so that gives a length of 10. is twice that, or 20, and thus the perimeter is six times that or 120. Now just plug everything into the area formula:

You’re done.

You could use this regular polygon formula to figure the area of an equilateral triangle (which is the regular polygon with the fewest possible number of sides), but there are two other ways that are much easier. First, you can get the area of an equilateral triangle by just noting that it’s made up of two triangles. You can see how this works with triangle *OHG** *in the figure above. Second, the equilateral triangle has its own area formula so that’s a really easy way to go assuming you’ve got some available space on your gray matter hard drive:

**Area of an equilateral triangle:**** **Here’s the formula.