Which expression is the sum of the interior angles of a polygon with n sides?

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Study for the 8th Grade Mathematics Test. Prepare with multiple choice questions, each with hints and explanations. Get ready for your exam!

Multiple Choice

Which expression is the sum of the interior angles of a polygon with n sides?

Explanation:
Think about how polygons can be broken into triangles. If you draw diagonals from one vertex, you can divide an n-sided polygon into exactly n−2 triangles. Each triangle has interior angles that sum to 180 degrees, so the whole polygon’s interior angles add up to (n−2) × 180 degrees. That’s why the expression (n−2)180 matches the sum. For example, a triangle (n=3) gives (3−2)×180 = 180; a quadrilateral (n=4) gives 360; a pentagon (n=5) gives 540. The other expressions don’t fit these facts: one would give 180n, which doesn’t match the actual sums; another is a formula for area, and the last isn’t a correct way to express an angle sum.

Think about how polygons can be broken into triangles. If you draw diagonals from one vertex, you can divide an n-sided polygon into exactly n−2 triangles. Each triangle has interior angles that sum to 180 degrees, so the whole polygon’s interior angles add up to (n−2) × 180 degrees. That’s why the expression (n−2)180 matches the sum.

For example, a triangle (n=3) gives (3−2)×180 = 180; a quadrilateral (n=4) gives 360; a pentagon (n=5) gives 540. The other expressions don’t fit these facts: one would give 180n, which doesn’t match the actual sums; another is a formula for area, and the last isn’t a correct way to express an angle sum.

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