What are the interior angles of a regular octagon?

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Study for the Geometry Regents Exam. Engage with flashcards and multiple-choice questions with hints and explanations to enhance learning. Be confident and prepared for your exam!

Multiple Choice

What are the interior angles of a regular octagon?

To find the measure of the interior angles of a regular octagon, you can use the formula for the measure of each interior angle of a regular polygon, which is given by:

[

\text{Interior Angle} = \frac{(n - 2) \times 180}{n}

]

where ( n ) is the number of sides in the polygon. For an octagon, ( n = 8 ):

[

\text{Interior Angle} = \frac{(8 - 2) \times 180}{8} = \frac{6 \times 180}{8} = \frac{1080}{8} = 135 \text{ degrees}

]

This calculation shows that each interior angle of a regular octagon measures 135 degrees. Thus, option B is the correct choice because it accurately reflects this calculation. Each angle in a regular octagon is equal, which is a key characteristic of regular polygons, further supporting the correctness of this answer.

What are the interior angles of a regular octagon?

Study for the Geometry Regents Exam. Engage with flashcards and multiple-choice questions with hints and explanations to enhance learning. Be confident and prepared for your exam!

What are the interior angles of a regular octagon?

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