Hexagon | Definition, Shape, Area, Angles, & Sides (2024)

regular and irregular hexagons

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Hexagons in nature

Honeycombs, snowflakes, the compound eyes of various insects, benzene and other cyclic compounds, and certain types of minerals are among the most well-known examples of hexagonal structures in nature.

Honeycombs

Honeybees build their honeycombs with wax they produce, so they need a form that makes the most efficient use of this precious wax resource. The regular hexagon fits this requirement, allowing bees to fit the most cells into a honeycomb. Their hexagonal cells are nearly the exact same size with the same precise wall thickness across hives.

In the past, this remarkable engineering feat was attributed mainly to the way bees evolved. Yet researchers have pointed out that simple laws of physics may also be at work, citing the example of floating rafts of bubbles. When the bubbles reach a certain number, they naturally change from spherical to hexagonal-faced structures as a more efficient way to fill the space. In a similar manner, the cells that bees make have a somewhat circular shape at first while the wax is still soft. It is possible that as the number of cells increases, the surface tension around them rises, and the circles gradually form into hexagons, hardening into the familiar hexagonal honeycomb pattern.

Snowflakes

The laws of physics are also at work when six-sided snowflakes form. Depending on the weather conditions, snowflakes often begin as small regular hexagonal plates, formed by water molecules as they freeze. Because each of the hexagon’s internal angles is 120 degrees, such a plate has an unusually stable structure. As this plate tumbles through the clouds, exposed to different temperatures and levels of moisture, crystal arms grow from each of the six outside corners. When all corners are exposed to the same conditions, the arms grow into the symmetrical crystals seen in some snowflakes.

Basalt columns and other minerals

One of the most striking examples of hexagonal structures in minerals are basalt columns, as seen in the Devils Postpile National Monument in California and the Giant’s Causeway in Northern Ireland. Basalt columns are formed by lava outflows that cool and begin to shrink. The shrinking creates surface tension that produces cracks in the basalt. It turns out that cracks at 120 degrees release the most tension. Gradually the cracks create the hexagonal columns of basalt, although most of them are irregular. If all parts of the lava had cooled at the same rate, the basalt columns would all be regular hexagons.

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There are only a few minerals whose internal structure is classified under the hexagonal system. They include calcite, dolomite, quartz, apatite, emerald, and ruby. Their structures allow light to travel through the crystals at difference speeds and at different angles.

Hexagons in human designs

Hexagons have a long history in human designs, particularly in tile patterns and in some architectural structures. More recently, hexagons have also been used to represent geographic data on computer-generated maps.

Tiling

Hexagon tiles can be tessellated, or arranged in a repeating pattern without gaps or overlaps, to fill a floor or wall space efficiently. Both regular and irregular hexagons can be used to create a variety of highly original, artistic designs. Hexagonal tiles often represent a more efficient, less costly use of materials than other tile shapes.

Architecture

Hexagons are also used as architectural elements. Several well-known buildings, such as the New York Supreme Court Building, the Museum of Jewish History in Manhattan, and the Berlin-Tegel Airport were built using a six-sided design. In addition, the pulpits in many historical churches were built in a hexagonal shape not only for strength and durability but to represent the sacred number six, referring to the six days of creation. In material design engineering, synthetic, composite materials comprised of hexagonal forms can have minimal density and relatively high out-of-plane compression and shear properties, and may prove useful in the construction of tall buildings. The Sino Steel International Plaza T2 in Tianjin, China, is set to be the first super tall building to implement a hexagonal grid structure system for the exterior tube structure.

Map-making

The regular hexagon is also used to represent 3D geographic features and other geospatial data, such as population density, on 2D computer-generated maps. Hexagons not only can be tessellated in an evenly spaced grid, but they also allow curvatures in the 3D patterns of geographic and other data to be seen more accurately. For example, on maps depicting a large area of Earth’s curved surface, a hexagonal grid will show less distortion than will a typical square grid.

L. Sue Baugh

FAQs

Hexagon | Definition, Shape, Area, Angles, & Sides? ›

A hexagon shape is a closed two-dimensional polygon made up of six straight sides. Hexagons have six vertices (corners), six interior angles and six exterior angles. The name hexagon is divided into 'hex' meaning six, and 'gonia' meaning apex or corners.

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What are the angles and sides of a hexagon? ›

Regular Hexagon Properties

It has 6 equal sides and 6 equal angles. It has 6 vertices. Sum of interior angles equals 720°. Interior angle is 120° and exterior angle is 60°.

What is the area of the angles of a hexagon? ›

After multiplying this area by six (because we have 6 triangles), we get the hexagon area formula: A = 6 × A₀ = 6 × √3/4 × a² A = 3 × √3/2 × a² = (√3/2 × a) × (6 × a) /2.

Do angles in a hexagon add up to 360? ›

A hexagon can be divided into four triangles, therefore the sum of the interior angles of a hexagon is 180 × 4 = 720. The interior angles in a hexagon sum to 720°.

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What is the angle of a hexagon pattern? ›

In a regular hexagon, all sides are the same length, and each internal angle is 120 degrees.

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What is the formula for the each angle of a hexagon? ›

A hexagon has six sides, and we can use the formula degrees = (# of sides – 2) * 180. Then degrees = (6 – 2) * 180 = 720 degrees. Each angle is 720/6 = 120 degrees.

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How to get the area of a regular hexagon? ›

The formula for the area of a regular hexagon is Area = (3√3 s²)/2; where 's' is the side length. This means if we know the side length of a regular hexagon, we can easily find the area using this formula.

What is the formula for the area and perimeter of a hexagon? ›

The hexagon formulas apply directly to regular hexagons. The hexagon formulas are given as, Area of hexagon = (3√3s2)2 ( 3 3 s 2 ) 2 and Perimeter of hexagon = 6s, where s = side length.

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Do all hexagons have 6 angles? ›

In geometry, a hexagon can be defined as a closed two-dimensional polygon with six sides. Hexagon has 6 vertices and 6 angles also. Hexa means six and gonia means angles.

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What is the sum of all the angles of a hexagon? ›

Therefore, sum of interior angles of the hexagon = 4 x 180° = 720°.

What is the angle for a perfect hexagon? ›

All the internal angles are equal to 120° each in a regular hexagon. The sum of the internal angles is always equal to 720°. All the external angles are equal to 60° each in a regular hexagon.

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What is the angle between each side of a hexagon? ›

Interior angles of Regular Polygons

Regular Polygon Name	Each interior angle
Hexagon	120°
Septagon	128.57°
Octagon	135°
Nonagon	140°

4 more rows

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What are three angles of a hexagon each? ›

The other three angles are also congruent, each with a measure twice that of the first three.

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What are the angles of a 5 sided hexagon? ›

In the pentagon, the sum of the interior angles is equal to 540°. If all the sides are equal and all the angles are of equal measure, then it is a regular pentagon. Otherwise, it is irregular. In the regular pentagon, each interior angle measures 108°, and each exterior angle measures 72°.

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Can you find the sum of the 6 angles of a hexagon? ›

In a hexagon, the sum of all 6 interior angles is always 720º. The sum of interior angles of a polygon is calculated using the formula, (n-2) × 180°, where 'n' is the number of sides of the polygon. Since a hexagon has 6 sides, taking 'n' as 6 we get (6-2) × 180°, which gives 720°.

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What is the rule for hexagon sides? ›

If all the sides of a hexagon are equal and angles are the same then the hexagon is called a regular hexagon. A hexagon has a total number of 9 diagonals. The sum of all interior angles of a regular hexagon is 720 degrees. Also, each interior angle is 120 degrees.