A pentagon has actually 5 sides, and can it is in made native **three triangles**, therefore you recognize what ...

You are watching: What is the measure of each interior angle of a regular pentagon?

... Its interior angles include up come 3 × 180° =** 540° **

And as soon as it is **regular** (all angle the same), then each edge is 540**°** / 5 = 108**°**

(Exercise: make sure each triangle right here adds up to 180°, and check the the pentagon"s inner angles add up come 540°)

The internal Angles of a Pentagon include up come 540°

## The general Rule

Each time we add a next (triangle come quadrilateral, quadrilateral to pentagon, etc), we **add another 180°** come the total:

ShapeSidesSum of

**Interior AnglesShapeEach Angle**

If it is a Regular Polygon (all sides room equal, all angles space equal) | ||||

Triangle | 3 | 180° | 60° | |

Quadrilateral | 4 | 360° | 90° | |

Pentagon | 5 | 540° | 108° | |

Hexagon | 6 | 720° | 120° | |

Heptagon (or Septagon) | 7 | 900° | 128.57...° | |

Octagon | 8 | 1080° | 135° | |

Nonagon | 9 | 1260° | 140° | |

... | ... | .. | ... See more: What Does The Name Traci Mean ? What Does Traci Mean | ... |

Any Polygon | n | (n−2) × 180° | (n−2) × 180° / n |

So the general ascendancy is:

Sum of interior Angles = (**n**−2) × 180**°**

Each edge (of a constant Polygon) = (**n**−2) × 180**°** / **n**

Perhaps an example will help:

### Example: What about a continuous Decagon (10 sides) ?

Sum of internal Angles = (

**n**−2) × 180

**°**

= (

**10**−2) × 180

**°**

= 8 × 180°

=

**1440°**

And for a consistent Decagon:

Each internal angle = 1440**°**/10 = **144°**

Note: inner Angles room sometimes called "Internal Angles"

interior Angles Exterior Angles degrees (Angle) 2D shapes Triangles square Geometry Index