isogonism Sentence Examples

  1. In geometry, isogonism is a term used to describe the property of having congruent angles in a polygon.
  2. Isogonism can be applied to both regular and irregular polygons, but it is most commonly associated with regular polygons.
  3. Isogonism is a defining characteristic of regular polygons, as it implies that all of the angles in the polygon are equal in measure.
  4. 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.
  5. 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.
  6. The concept of isogonism is also applicable to three-dimensional polyhedra, where it refers to the property of having congruent faces.
  7. In a regular polyhedron, all of the faces are congruent polygons, meaning they have the same shape and size.
  8. The Platonic solids, which are the five regular polyhedra, are all isogonal, as each of their faces is an equilateral triangle.
  9. The concept of isogonism is often used in architecture, where it can be applied to create aesthetically pleasing and symmetrical structures.
  10. 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

Webster

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.