These books are all on 3 day reserve in Math-Physics-Astronomy library. You can also borrow copies of most of them from me, Modeling Differential Equations in Biology; Clifford Henry Taubes; QH 323.5 T38 This is a very elementary mathematics text on systems of ordinary differential equations. Its main feature is a lot of Nature and Science papers using fairly elemenary mathematics. I recommend that you look at it! Its kind of fun at every level. Mathematical Models in Biology; Elizabeth S. Allman and John A. Rhodes; QH 323.5 A44 I put another text for a course like ours. This one has a different flavor.`This has a chapter on phylogenetic Trees.This was used as a text Mathematical models in Cell biology and cancer theorapy. Martin M. Eisen; QH581.2 E483 This book I don't know...it sounds really interesting. Let me know. Mathematical Physiology; James Keener and James Sneyd; QP33.6 M36K4 I recommend the first chapter of this text for anybody seriously interested in biochemistry. The book is rather advanced...so it is for the ambitious! Mathematical models in molecular and cellular biology; Lee A. Segel; QH506 M38 This is less advanced than Keener and Sneyd and goes into topics in our text, chapter 7 in more detail. Modeling dynamic phenomena in molectular and cellular biology; Lee A. Segel; QH506 S44 This has a lot about enzyme kinetics...I think it is probably easier to read than our text (but it only treats the biochemistry). Differential Equation Models; (Modules in Applied Mathematics) Martin Braun, Courtney Coleman and Donald Drew QA37.2 M6 This is a classic set of models which is accessible to calculus students. For a project which has simple math, this is ideal. Mathematical Biology; J.D. Murray; QH323.5 M88 The standard text in mathematical biology. I think the biology is less interesting than the biology in our text. Mathematics in Medicine and the Life Sciences; F.C. Hoppenstadt and C.S. Peskin; QH323.5 H67 Another book which is accessible to calculus students and ideal if you are looking for interesting problems using simple mathematics. A first course in chaotic dynamical systems; Robert L. Devaney; QA 6148.8 D49 For the mathematically inclined who would like to study the logistics equation in more detail. Nonlinear dynhamics and chaos:with applications in physics, biology, chemistry and engineering; Steven H. Strogatz; Q172.5 C45 S767 This is my favorite ordinary differential equations text. It has lots of great examples, but isn't so heavy on the biology. I recommend it to the physics students in the course.