In 4-dimensional geometry, there are 15 uniform 4-polytopes with B<sub>4</sub> symmetry. There are two regular forms, the tesseract and 16-cell, with 16 and 8 vertices respectively.
They can be visualized as symmetric orthographic projections in Coxeter planes of the B<sub>5</sub> Coxeter group, and other subgroups.
Symmetric orthographic projections of these 32 polytopes can be made in the B<sub>5</sub>, B<sub>4</sub>, B<sub>3</sub>, B<sub>2</sub>, A<sub>3</sub>, Coxeter planes. A<sub>k</sub> has [k+1] symmetry, and B<sub>k</sub> has [2k] symmetry.
These 32 polytopes are each shown in these 5 symmetry planes, with vertices and edges drawn, and vertices colored by the number of overlapping vertices in each projective position.
The pictures are drawn as Schlegel diagram perspective projections, centered on the cell at pos. 3, with a consistent orientation, and the 16 cells at position 0 are shown solid, alternately colored.
The tesseractic family of 4-polytopes are given by the convex hulls of the base points listed in the following table, with all permutations of coordinates and sign taken. Each base point generates a distinct uniform 4-polytopes. All coordinates correspond with uniform 4-polytopes of edge length 2.