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

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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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