NAME: Jeremy Lovejoy ADDRESS: 218 McAllister Bldg Penn State University University Park, PA 16802 EMAIL ADDRESS: lovejoy@math.psu.edu TITLE OF TALK: Divisibility and Distribution of Partitions into Distinct Parts ABSTRACT OF TALK: Let $Q(n)$ denote the number of partitions of $n$ into distinct parts. For any prime $p$ larger than 3 and any residue class $r$ modulo $p$ I will address the following question: How often is $Q(n)$ congruent to $r$ modulo $p$? Applying the theory of modular forms leads to some interesting and rather unexpected answers. ===========================================================