Title: Trigonometry of partially truncated triangles and tetrahedra

Abstract: The first main results of this note establish forms of the hyperbolic laws of cosines and sines for certain classes of quadrilaterals and pentagons in the hyperbolic plane, having at least one ideal vertex and right angles at non-ideal vertices, in which the length of a horocyclic cross-section at an ideal vertex plays the role filled by the dihedral angle in the usual versions of these laws. The final main result bounds the transversal length of a truncated tetrahedron in three-dimensional hyperbolic space, meaning the distance from a designated internal edge to its opposite, in terms of the tetrahedron's entire collection of internal edge lengths. All main results are established using the unifying perspective of the hyperboloid model and Lorentzian geometry. A thorough introduction to this perspective is provided, with references as appropriate.