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# Interior and Exterior Angles of Polygons Maze 1 Answer Key

## Interior and Exterior Angles of Polygons Maze 1 Answer Key Introduction:

One of the most essential concepts in geometry is learning how to calculate interior and exterior angles of polygons. If you are a student studying this concept, you understand how intricate and confusing it can be. You may have already tried different methods but still find it challenging to master. One powerful approach is through the use of mazes. This post provides a comprehensive maze 1 answer key for you to reinforce your knowledge on interior and exterior angles of polygons.

### Blog Body:

First, let’s define what interior and exterior angles of polygons are. In simple terms, a polygon is any shape with three or more straight sides. The interior angles are the angles formed inside the shape, and exterior angles are the angles formed outside the shape. For instance, the interior angles of a triangle are the angles formed inside the triangle, and the exterior angles are the angles formed outside the triangle.

To derive the interior angle of any polygon, you use the formula (n-2) x 180°, where n is the number of sides (vertices) of the polygon. For example, in a triangle, n=3, and, therefore, its interior angles sum up to (3-2) x 180° = 180°. Using the same formula, we can derive the interior angles of other polygons such as quadrilaterals, pentagons, and hexagons.

In contrast, to derive the exterior angle of any polygon, you use the formula 360° ÷ n, where n is the number of sides (vertices) of the polygon. For a triangle, n=3, hence each exterior angle is equal to 360° ÷ 3 = 120°. Similarly, the exterior angles of other polygons such as quadrilaterals, pentagons, and hexagons can also be derived using the same formula.

Nowadays, educators have started to introduce the use of mazes as a fun and interactive way for students to practice their knowledge. By completing a maze, they can quickly identify where they made mistakes and work on their understanding of the concept. The maze 1 answer key that follows is an excellent example of how fun it can be to reinforce your knowledge of interior and exterior angles of polygons.

### Conclusion:

Mastering interior and exterior angles of polygons can be challenging, but it is an essential concept in geometry. We hope that this maze 1 answer key has helped you reinforce your understanding of the topic. Remember that consistency and patience are key to mastering this concept. Keep practicing with different methods until you are confident in your abilities, and if you need further assistance, don’t hesitate to reach out to your teachers or peers. Good luck!

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