The aim of this study is to investigate the bouncing dynamics of a small elastic ball on a
rectangular stairway and to determine if its dynamics is chaotic. We derive a simple nonlinear
recursion for the coordinates of the collisions from which the type of dynamics cannot be predicted.
Numerical simulations indicate that stationary bouncing always sets in asymptotically, and is
typically quasi-periodic. The dependence on the coefficient of restitution can be very complicated,
yet the dynamics is found to be nonchaotic. Only elementary mathematics is required for the
calculations, and we offer a piece of user-friendly demo software on our website,
http://crnl.hu/stairway [http://crnl.hu/stairway] , to facilitate further understanding of this
complex phenomenon.