Incircle of a Polygon

The incircle of a regular polygon is the largest circle that will fit inside the polygon and touch each side in just one place (see figure above) and so each of the sides is a tangent to the incircle. If the number of sides is 3, this is an equilateral triangle and its incircle is exactly the same as the one described in Incircle of a Triangle.

The inradius of a regular polygon is exactly the same as its apothem. The formulas below are the same as for the apothem. Use the formula that uses the facts you are given to start.

Inradius given the length of a side

By definition, all sides of a regular polygon are equal in length. If you know the length of one of the sides, the inradius is given by the formula:

where
s is the length of any side
n is the number of sides
tan is the tangent function calculated in degrees (see Trigonometry Overview)

Inradius given the radius (circumradius)

If you know the radius (distance from the center to a vertex):

where
r is the radius (circumradius)
n is the number of sides
cos is the cosine function calculated in degrees (see Trigonometry Overview)

Irregular Polygons

Irregular polygons are not thought of as having an incircle or even a center. If you were to draw a polygon at random, it is unlikely that there is a circle that has every side as a tangent. An exception is a 3-sided polygon (triangle). All triangles always have an incircle. (See Incircle of a Triangle)

It can happen in reverse however. You can start with a circle and draw an irregular polygon around it as in the figure on the right. This would be called a circumscribed polygon.

Some mathematicians consider the incircle to be the largest circle that will fit inside a polygon, without the requirement that it touches all the sides. Clearly, under this definition, it is always possible to draw such a circle.

Other polygon topics

General

• Polygon general definition
• Quadrilateral
• Regular polygon
• Irregular polygon
• Convex polygons
• Concave polygons
• Polygon diagonals
• Polygon triangles
• Apothem of a regular polygon
• Polygon center
• Radius of a regular polygon
• Incircle of a regular polygon
• Incenter of a regular polygon
• Circumcircle of a polygon
• Parallelogram inscribed in a quadrilateral

Types of polygon

• Square
• Diagonals of a square
• Rectangle
• Diagonals of a rectangle
• Golden rectangle
• Parallelogram
• Rhombus
• Trapezoid
• Trapezoid median
• Kite
• Inscribed (cyclic) quadrilateral
• Inscribed quadrilateral interior angles
• Inscribed quadrilateral area
• Inscribed quadrilateral diagonals

Area of various polygon types

• Regular polygon area
• Irregular polygon area
• Rhombus area
• Kite area
• Rectangle area
• Area of a square
• Trapezoid area
• Parallelogram area

Perimeter of various polygon types

• Perimeter of a polygon (regular and irregular)
• Perimeter of a triangle
• Perimeter of a rectangle
• Perimeter of a square
• Perimeter of a parallelogram
• Perimeter of a rhombus
• Perimeter of a trapezoid
• Perimeter of a kite

Angles associated with polygons

• Exterior angles of a polygon
• Interior angles of a polygon
• Relationship of interior/exterior angles
• Polygon central angle

Named polygons

• Tetragon, 4 sides
• Pentagon, 5 sides
• Hexagon, 6 sides
• Heptagon, 7 sides
• Octagon, 8 sides
• Nonagon Enneagon, 9 sides
• Decagon, 10 sides
• Undecagon, 11 sides
• Dodecagon, 12 sides