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Earn +20 ptsQ: What is the greatest number of sides a regular polygon can have?
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How do you work out the number of sides in a regular polygon that has an exterior angle?
With a regular polygon: 360/exterior angle = number of sides
What is the formula to find the sides of a regular polygon?
360/exterior angle = number of sides of a regular polygon
How do you work out the exterior and interior angles of a regular polygon with W sides?
Exterior angle regular polygon = 360° ÷ number of sides = 360° ÷ W Interior angle regular polygon = 180° - exterior angle regular polygon = 180° - (360° ÷ number of sides ) = 180° - (360° ÷ W)
What regular polygons have parallel sides?
Any regular polygon with an even number of sides must have parallel sides.
What is the name of the polygon with the smallest number of sides a regular polygon with obtuse angles can have?
triangel
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