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What is the formula for finding the measure of an exterior angle in a regular polygon?
360/number of sides = each exterior angle
What is the largest exterior angle that any regular polygon can have?
The largest exterior angle measure is 120o. It is the exterior measure of an equilateral triangle (which is a regular polygon).
How do you work out the 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.
What is the formula in finding the measure of a exterior angle?
Providing that it's a regular polygon: 360/number of sides = each exterior angle
What is the interior and exterior angle of a regular 9 sided 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=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
What are the interior and exterior angles of a regular 18 sided 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=18, then the answer is that the interior angle = 160The measure of an exterior angle in degrees of a regular polygon of n sides is given by the formula: 360/nSubstituting with n= 18, then the answer is that the exterior angle = 20
What is the interior and exterior angle of a regular 15 sided 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=15, then the answer is thatthe interior angle = 12x13 =156The measure of an exterior angle in degrees of a regular polygon of n sides is given by the formula: 360/nSubstituting with n= 15, then the answer is that the exterior angle = 24
How many sides does a regular polygon have with an exterior angle measure of 1?
A regular polygon will have 360 sides with exterior angles of 181 degrees.
What is the formula to find the sides of a regular polygon?
360/exterior angle = number of sides of a regular polygon
If a polygon has exterior angles that measure 36 how many sides does the polygon have?
A regular 10 polygon
What is the formula for the exterior angle of a regular polygon?
360/number of sides = exterior angle
Is it possible to have a regular polygon with measure of each exterior angle of 22?
No, it is not possible to have a regular polygon with each exterior angle measuring 22 degrees. The sum of all exterior angles of any polygon is always 360 degrees, and the measure of each exterior angle of a regular polygon can be calculated using the formula ( \frac{360}{n} ), where ( n ) is the number of sides. Setting ( \frac{360}{n} = 22 ) gives ( n = \frac{360}{22} \approx 16.36 ), which is not a whole number. Therefore, a regular polygon with each exterior angle of 22 degrees cannot exist.
