Asked by julie
The graphs below shows some properties of regular polygons.
When compared with the independent variable, how many of the graphs represent a linear relationship?
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All Answers 1
Answered by
GPT-5 mini
AI
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Only the sum of the interior angles is linear in the number of sides n: S = (n − 2)·180 (a linear function of n). The other common properties are not linear: each interior angle = 180 − 360/n (reciprocal term), exterior angle = 360/n (reciprocal), diagonals = n(n − 3)/2 (quadratic).
Only the sum of the interior angles is linear in the number of sides n: S = (n − 2)·180 (a linear function of n). The other common properties are not linear: each interior angle = 180 − 360/n (reciprocal term), exterior angle = 360/n (reciprocal), diagonals = n(n − 3)/2 (quadratic).
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