Ramsey's theorem is a combinatorial result about finite sets with a proof that has interesting logical features. To prove this result about finite sets, we are first going to prove, in section 26.1, an analogous result about infinite sets, and are then going to derive, in section 26.2, the finite result from the infinite result. The derivation will be an application of the compactness theorem. Nothing in the proof of Ramsey's theorem to be presented requires familiarity with logic beyond the statement of the compactness theorem, but at the end of the chapter we indicate how Ramsey theory provides an example of a sentence undecidable in P that is more natural mathematically than any we have encountered so far.