Learn on PengiBig Ideas Math, Course 3Chapter 3: Angles and Triangles

Lesson 3: Angles of Polygons

In this Grade 8 lesson from Big Ideas Math, Course 3 (Chapter 3: Angles and Triangles), students learn how to find the sum of interior angle measures of polygons using the formula S = (n − 2) · 180°, and discover that the sum of exterior angle measures of any convex polygon is always 360°. Students also practice distinguishing between convex and concave polygons and apply these concepts to find missing angle measures in figures such as pentagons, hexagons, and heptagons.

Section 1

Identifying Convex and Concave Polygons

Property

A polygon is convex if for every pair of vertices, the line segment connecting them is entirely inside or on the polygon. All interior angles of a convex polygon measure less than 180180^\circ.

A polygon is concave if there is at least one pair of vertices for which the line segment connecting them goes outside the polygon. A concave polygon has at least one interior angle greater than 180180^\circ.

Section 2

Polygon Interior Angle Sum Formula

Property

The sum of interior angles of any polygon with nn sides is given by:

S=(n2)×180°S = (n-2) \times 180°

This formula is derived by dividing any polygon into (n2)(n-2) triangles from one vertex.

Section 3

Polygon Exterior Angle Sum Property

Property

An exterior angle of a polygon is formed by extending one side of the polygon at a vertex. The sum of all exterior angles of any convex polygon is always 360°360°.

Sum of exterior angles=360°\text{Sum of exterior angles} = 360°

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Chapter 3: Angles and Triangles

  1. Lesson 1

    Lesson 1: Parallel Lines and Transversals

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  2. Lesson 2

    Lesson 2: Angles of Triangles

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  3. Lesson 3Current

    Lesson 3: Angles of Polygons

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  4. Lesson 4

    Lesson 4: Using Similar Triangles

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Section 1

Identifying Convex and Concave Polygons

Property

A polygon is convex if for every pair of vertices, the line segment connecting them is entirely inside or on the polygon. All interior angles of a convex polygon measure less than 180180^\circ.

A polygon is concave if there is at least one pair of vertices for which the line segment connecting them goes outside the polygon. A concave polygon has at least one interior angle greater than 180180^\circ.

Section 2

Polygon Interior Angle Sum Formula

Property

The sum of interior angles of any polygon with nn sides is given by:

S=(n2)×180°S = (n-2) \times 180°

This formula is derived by dividing any polygon into (n2)(n-2) triangles from one vertex.

Section 3

Polygon Exterior Angle Sum Property

Property

An exterior angle of a polygon is formed by extending one side of the polygon at a vertex. The sum of all exterior angles of any convex polygon is always 360°360°.

Sum of exterior angles=360°\text{Sum of exterior angles} = 360°

Book overview

Jump across lessons in the current chapter without opening the full course modal.

Continue this chapter

Chapter 3: Angles and Triangles

  1. Lesson 1

    Lesson 1: Parallel Lines and Transversals

    LearnPractice
  2. Lesson 2

    Lesson 2: Angles of Triangles

    LearnPractice
  3. Lesson 3Current

    Lesson 3: Angles of Polygons

    LearnPractice
  4. Lesson 4

    Lesson 4: Using Similar Triangles

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