isogonism Sentence Examples
- In geometry, isogonism is a term used to describe the property of having congruent angles in a polygon.
- Isogonism can be applied to both regular and irregular polygons, but it is most commonly associated with regular polygons.
- Isogonism is a defining characteristic of regular polygons, as it implies that all of the angles in the polygon are equal in measure.
- In a regular polygon, the degree measure of each angle is calculated by dividing the sum of the interior angles of the polygon by the number of sides.
- For example, in a regular hexagon, each angle measures 120 degrees, as the sum of the interior angles is 720 degrees and there are 6 sides.
- The concept of isogonism is also applicable to three-dimensional polyhedra, where it refers to the property of having congruent faces.
- In a regular polyhedron, all of the faces are congruent polygons, meaning they have the same shape and size.
- The Platonic solids, which are the five regular polyhedra, are all isogonal, as each of their faces is an equilateral triangle.
- The concept of isogonism is often used in architecture, where it can be applied to create aesthetically pleasing and symmetrical structures.
- The Parthenon in Athens, Greece, is a famous example of a building that exhibits isogonism, as its external columns are arranged in a regular pattern with congruent angles.
isogonism Meaning
isogonism (n.)
The quality of having similar sexual zooids or gonophores and dissimilar hydrants; -- said of certain hydroids.
Synonyms & Antonyms of isogonism
No Synonyms and anytonyms found
FAQs About the word isogonism
The quality of having similar sexual zooids or gonophores and dissimilar hydrants; -- said of certain hydroids.
No synonyms found.
No antonyms found.
In geometry, isogonism is a term used to describe the property of having congruent angles in a polygon.
Isogonism can be applied to both regular and irregular polygons, but it is most commonly associated with regular polygons.
Isogonism is a defining characteristic of regular polygons, as it implies that all of the angles in the polygon are equal in measure.
In a regular polygon, the degree measure of each angle is calculated by dividing the sum of the interior angles of the polygon by the number of sides.