Calculate The Surface Area Of An Octahedron

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Tetrahedron

Hexahedron

Octahedron

Dodecahedron

Icosahedron

The surface area of an octahedron is the total area covered by all of its faces. An octahedron is a polyhedron with eight faces, each of which is an equilateral triangle. This shape can be found in various real-life objects such as diamond crystals, carbon molecules, and molecular models.

The surface area of an octahedron can be used in many applications, such as in the study of crystal structures and molecular geometry. It can also be applied in architecture and design, as the octahedral shape is often used in construction and as a decorative element.

One example of an octahedral structure in architecture is the Geisel Library at the University of California, San Diego, which features an octahedral tower. The octahedral shape is also commonly used in jewelry design, such as in the creation of diamond earrings and pendants.

Overall, understanding the surface area of an octahedron can have practical applications in various fields and industries, making it an important concept to learn and apply.

The formula for determining the surface area of an octahedron is defined as:

\(SA\) \(=\) \(2\) \(\cdot\) \(\sqrt{3}\) \(\cdot\) \(a^2\)

\(SA\): the surface area of the octahedron

\(a\): the length of any side

The SI unit of surface area is: \(square \text{ } meter\text{ }(m^2)\)

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