A triangular prism has six vertices, nine edges, and five faces. Every prism has two congruent faces known as its bases, and the bases of a triangular prism are
triangles. The triangle has three vertices, each of which pairs with another triangle's vertex, forming three edges. These edges form three
parallelograms as other faces. It is also considered a special case of a
wedge, a polyhedron with two triangular and three trapezoidal faces. A triangular prism can have the form of a right prism, meaning that its edges are perpendicular to the base, forming
rectangular-shaped lateral faces. Like any-sided prism, it has all vertices lying on the parallel bases, a
prismatoid. A triangular prism and a
triangular frustum are topologically equivalent, although such a frustum has different sizes of triangular bases and slanted trapezoidal-shaped sides. The vertices and edges of a triangular prism can give rise to a
graph. This is due to
Steinitz's theorem, stating that any convex polyhedron can be drawn into a
planar graph that is
3-connected, meaning the edges of a graph do not cross each other, and the vertices are impossible to disconnect whenever picking any two vertices to be removed. Classifying into a family, the graph of a triangular prism is the
prism graph , where the symbol represents the graph of an sided prism. The graph of a triangular prism is a type of planar graph formed from a tree with no degree-two vertices by adding a cycle connecting its leaves, an example of
Halin graph.
As a uniform prism When all edges are equal in length, its bases and its lateral faces are all
equilaterals and
squares, respectively. Hence, the triangular prism is
semiregular. A semiregular prism means that the number of its polygonal base's edges equals the number of its square faces. More generally, the triangular prism is
uniform. This means that a triangular prism has
regular faces and has a symmetry of mapping any two vertices known as
isogonal. The dihedral angle between two adjacent square faces is the
internal angle of an equilateral triangle , and that between a square and a triangle is . The volume of any prism is the product of the area of the base and the distance between the two bases. In the case of a triangular prism, its base is a triangle. The area of a triangle is the half product of its base and its height , formulated as . Since the triangular prism has a distance between two triangular bases, the general formula for its volume is: V = \frac{1}{2}bh \cdot l. In the case of a right triangular prism, where all its edges are equal in length , its volume can be calculated as the product of the equilateral triangle's area and the distance between bases: V_\text{uniform} = \frac{1}{2} \cdot \frac{\sqrt{3}}{2}l^2 \cdot l = \frac{\sqrt{3}}{4}l^3 \approx 0.433\,l^3 The
three-dimensional symmetry group of a triangular prism is
dihedral group of order 12: the appearance is unchanged if the triangular prism is rotated one- and two- thirds of a full angle around its
axis of symmetry passing through the center's base, and reflecting across a horizontal plane. The
dual polyhedron of any prism is a
bipyramid, a polyhedron formed by fusing two pyramids base-to-base. In the case of a triangular prism, its dual is a
triangular bipyramid, both of which have a common three-dimensional symmetry group. == Applications ==