Trirectangular tetrahedron

In geometry, a trirectangular tetrahedron is a tetrahedron where all three face angles at one vertex are right angles.

That vertex is called the right angle or apex of the trirectangular tetrahedron and the face opposite it is called the base.

The three edges that meet at the right angle are called the legs and the perpendicular from the right angle to the base is called the altitude of the tetrahedron (analogous to the altitude of a triangle).

An example of a trirectangular tetrahedron is a truncated solid figure near the corner of a cube or an octant at the origin of Euclidean space.

Kepler discovered the relationship between the cube, regular tetrahedron and trirectangular tetrahedron.

[1] Only the bifurcating graph of the

affine Coxeter group has a Trirectangular tetrahedron fundamental domain.

If the legs have lengths a, b, c, then the trirectangular tetrahedron has the volume[2] The altitude h satisfies[3] The area

of the base is given by[4] The solid angle at the right-angled vertex, from which the opposite face (the base) subtends an octant, has measure π/2  steradians, one eighth of the surface area of a unit sphere.

If the area of the base is

and the areas of the three other (right-angled) faces are

, then This is a generalization of the Pythagorean theorem to a tetrahedron.

Trirectangular tetrahedrons with integer legs

of the base triangle exist, e.g.

Here are a few more examples with integer legs and sides.

Notice that some of these are multiples of smaller ones.

Trirectangular tetrahedrons with integer faces

and altitude h exist, e.g.