A hexagon has 6 sides. For all regular polygons, the number of lines of symmetry is equal to the number of sides.
Thus, for a regular hexagon, there are six lines of symmetry. We can determine the area of a hexagon by i dentifying the length of the side of the hexagon. Always write the final answer of area in square units. The formula to calculate the regular hexagon perimeter is 6a units, where 'a' is the side length of the hexagon. In the case of an irregular hexagon, we add the side lengths. Learn Practice Download. Hexagon A hexagon is a closed 2D shape that is made up of straight lines.
Hexagon Definition 2. Types of Hexagon 3. Properties of a Hexagon 4. Hexagon Formulas 5. Hexagon Examples Example 1: What is the area of a regular hexagon with sides equal to 3 units? Have questions on basic mathematical concepts? Become a problem-solving champ using logic, not rules.
Practice Questions on Hexagon. Explore math program. Explore coding program. Regular octagons have sides of equal length and interior angles of degrees. A nonagon is a 9 sided polygon with interior angles that add to degrees. Regular nonagons have sides of equal length and interior angles of degrees. A decagon is a 10 sided polygon with interior angles that add to degrees.
Regular decagons have sides of equal length and interior angles of degrees. An pentadecagon is a 15 sided polygon with interior angles that add to degrees. An icosagon is a 20 sided polygon with interior angles that add to degrees. Check out our pictures of shapes. Now that you're an expert on 2D polygon shapes, try learning about cubes and other 3D polyhedron shapes.
A regular hexagon is defined as a 6-sided polygon that is both equilateral and equiangular—meaning that all of the sides have the same length and all of the angles have the same measure. An irregular hexagon is defined as a 6-sided polygon that is not regular—meaning that all of the sides and angles do not have the same measure.
In Geometry, you will most often be dealing with regular hexagons. It is important to know their three main properties:. All sides of a regular hexagon have equal lengths. In the case of 3D hexagons, the hexagonal base is usually a regular hexagon.
For example, a truncated octahedron can be considered a 3D Hexagon because it has a hexagonal base. In Geometry, a polygon is can be convex or concave. But why? Furthermore, you can use the polygon interior sum formula to find the sum of the interior angles for any regular polygon. By applying the polygon interior sum formula to a hexagon, you replace n with 6 since a hexagon has 6 sides as follows:. The hexagon is a simple yet remarkable shape that can be found everywhere and anywhere—ranging from art to architecture to nature.
Here a few remarkable examples of hexagons in real life:. Did you know that all snowflakes are hexagons? When ice crystals form, the molecules join together in a hexagonal structure. Mother Nature has determined that this type of formation is the most efficient way for snowflakes to form.
Regular hexagons are one of only three polygons that will tesselate a plane—meaning that they can be duplicated infinitely to fill a space without any gaps.
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