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- Problem 497 Find the greatest number of side. . . [FREE SOLUTION] | Vaia
Find the greatest number of sides that a regular polygon can have and yet still have an Integral number of degrees in each Interior angle The maximum number of sides that a regular polygon can have so that each interior angle measures an integral number of degrees is 180
- What is the maximum numbers of sides that a polygon can have?
How many sides possible in a polygon? The number of sides possible in a polygon is a minimum of 3, with an unlimited maximum For a regular polygon, as the number of sides approaches infinity,
- Answers to: Is it possible to determine the largest number of side that . . .
In Euclidean geometry, a polygon is traditionally defined as a closed two-dimensional shape with a f
- How Many Sides on a Polygon Can we Find: Explained Simply
A polygon can have any number of sides that is three or greater The number of sides determines the type of polygon; for example, a triangle has three sides, a quadrilateral has four sides, and so on There is no upper limit to the number of sides a polygon can have
- How To Find The Number Of Sides Of A Polygon - Sciencing
The number of sides of a regular polygon can be calculated by using the interior and exterior angles, which are, respectively, the inside and outside angles created by the connecting sides of the polygon
- combinatorics - Largest number of sides and diagonals - Mathematics . . .
I have asked to solve the following: For given an integer number $n\ge3$, find the largest positive number $k_n$ for which: for every convex $n-$polygon (with $n$ sides), we can find $k_n$ segments
- How to find the number of sides in a polygon? - Cuemath
Answer: We can find the number of sides in a polygon using the value of interior angle Interior angle = 180 (n-2) n, where n is the number of sides of the polygon Let us find the number of sides a regular polygon with an interior angle of 108° ⇒ 180 (n−2) n = 108° ⇒ 180n − 360 = 108n ⇒ 72n = 360 ⇒ n = 5
- What is the largest number of sides a regular polygon can have?
The polygon with the largest interior angle is a regular polygon, specifically a regular polygon with the greatest number of sides In a regular polygon, all interior angles are equal, and the
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