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Q: What is the formula for the exterior angle of a regular polygon?

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360/number of sides = exterior angle

360/exterior angle = number of sides of a regular polygon

Each exterior angle of a regular polygon with n sides is 360/n degrees. Each interior angle of a regular polygon is 180 - Exterior angle. A direct formula for the interior angle is 180*(n-2)/n degrees.

360/number of sides = each exterior angle

360/number of sides = each exterior angle

Measure it. There is no formula for an exterior angle unless you have a regular (or equiangular) polygon. And there is no evidence to suggest that that is the case.

Providing that it's a regular polygon: 360/number of sides = each exterior angle

With a regular polygon: 360/exterior angle = number of sides

The largest exterior angle measure is 120o. It is the exterior measure of an equilateral triangle (which is a regular polygon).

The measure of an interior angle in degrees of a regular polygon of n sides is given by the formula: 180 x (n-2) / nSubstituting with n=10, then the answer is that the interior angle = 144The measure of an exterior angle in degrees of a regular polygon of n sides is given by the formula: 360/nSubstituting with n= 10, then the answer is that the exterior angle = 36

The measure of an interior angle in degrees of a regular polygon of n sides is given by the formula: 180 x (n-2) / nSubstituting with n=9, then the answer is that the interior angle = 140The measure of an exterior angle in degrees of a regular polygon of n sides is given by the formula: 360/nSubstituting with n= 9, then the answer is that the exterior angle = 40

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