Calculating interior angles of a star shaped polygon
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Since all the angles of a regular star polygon are equal, we can calculate each pointy interior angle of a regular star polygon using the following formulas :
For (n, 2) family star polygons :
θ = (1−4/n)180°
For (n, 3) family star polygons :
θ = (1 − 6/n)/180°
For (n, 4) family star polygons :
θ = (1 − 8/n)/180°
and so on.
Where θ is the interior angle of an n-sided regular star polygon.
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For (n, 2) family star polygons :
θ = (1−4/n)180°
For (n, 3) family star polygons :
θ = (1 − 6/n)/180°
For (n, 4) family star polygons :
θ = (1 − 8/n)/180°
and so on.
Where θ is the interior angle of an n-sided regular star polygon.
Hope this helped if you still have doubts or more questions to ask then get them solved by Expert Online Math Tutors
https://tutstu.com/tutors/Math/sub/18/
get solutions for free in a Free Trial Class. All you need to do is Register https://user.tutstu.com/student-login-register.
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