CS241 Lecture Notes - Lecture 17: Planar Graph, Graph Theory, Product Rule

This section of the course focuses on counting problems and the methodology behind solving them. For the most part, a set of con gurations s must rst be de ned with a corresponding weight function. The answer will then be the number of con gurations with a speci c weight k. Here are several theorems that are often used in the computation of generating series coe cients. It will be useful to memorize the following formulae. Theorem 1. 1. 1 for non-negative integers n and k, the number of k-element subsets of an n-element set is(cid:18)n (cid:19) k n(n 1) . (n k + 1) k! Theorem 1. 1. 2 (binomial theorem) for non-negative integers n, (cid:18)n (cid:19) n(cid:88) k k=0 (1 + x)n = xk. Theorem 1. 1. 3 (binomial theorem for negative numbers) for any positive integer n, A function f : s > t is a bijection if and only if it is one-to-one and onto.