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The sum of the interior angles of a regular polygon?
The sum of the interior angles of a n-sided polygon is (n-2)*180 degrees. This is true whether or not the polygon is regular.
What is the angle measure for a regular polygon?
The sum of the internal angles of an n-sided polygon is (n-2)*180 degrees. So, for a regular polygon, each internal angle is (n-2)*180/n degrees.
What do the interior angles of a regular polygon add up to?
The interior angles of a polygon (regular or not) with n sides sum to (n - 2)*180 degrees.
How many diagonals does a regular polygon have?
For a polygon with n sides, there would be n*(n-3)/2
What is the measure of 1 angle assuming the polygon is regular?
The sum of the internal angles of an n-sided polygon is (n-2)*180 degrees. So, for a regular polygon, each internal angle is (n-2)*180/n degrees.
The sum of the interior angles of a regular polygon?
The sum of the interior angles of a n-sided polygon is (n-2)*180 degrees. This is true whether or not the polygon is regular.
What are the 2 classifications of polygon?
Quadrilaterals and Triangles, if you're asking for polygon categories.
If the polygon is regular what is the size of its interior angles?
equation for any regular polygon when n = number of sides: 180(n-2)/n
Which polygon has the largest interior angle?
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 formula for calculating the interior angle of a regular polygon is (n-2) * 180 / n, where n is the number of sides. As the number of sides increases, the interior angle also increases. Therefore, a regular polygon with a very large number of sides will have the largest interior angle.
What is the angle measure for a regular polygon?
The sum of the internal angles of an n-sided polygon is (n-2)*180 degrees. So, for a regular polygon, each internal angle is (n-2)*180/n degrees.
What do the interior angles of a regular polygon add up to?
The interior angles of a polygon (regular or not) with n sides sum to (n - 2)*180 degrees.
Is a isosceles acute triangle a regular polygon?
A regular polygon is one which has all equal sides. But in an isosceles triangle, only 2 sides are equal. The third side has a different measure.Thus an isosceles acute triangle is not a regular polygon.
What is a 2 equal sided tri called?
a regular polygon
How many diagonals does a regular polygon have?
For a polygon with n sides, there would be n*(n-3)/2
How many triangles can you fit in a regular polygon?
The number of triangles that can be formed within a regular polygon depends on the number of sides the polygon has. For an n-sided polygon, where n is greater than or equal to 3, you can form n-2 triangles within the polygon. This is because each triangle is formed by connecting one vertex to any other two non-adjacent vertices. So, for example, in a regular pentagon (5-sided polygon), you can form 5-2 = 3 triangles.
What is the measure of 1 angle assuming the polygon is regular?
The sum of the internal angles of an n-sided polygon is (n-2)*180 degrees. So, for a regular polygon, each internal angle is (n-2)*180/n degrees.
What is the Perimeter of a regular polygon?
The formula used to find the area of any regular polygon is A = 1/2 a P where the lower case a stands for the length of the apothem and the uppercase P stands for the perimeter of the polygon.
