As we had discussed in the previous chapter, we wish to differentiate functions living on vector spaces (such as C[a, b]) whose elements are functions, and taking values in . In order to talk about the derivative, we need a notion of closeness between points of a vector space so that the derivative can be defined. It turns out that vector spaces such as C[a, b] can be equipped with a “norm,” and this provides a “distance” between two vectors. Having done this, we have the familiar setting of calculus, and we can talk about the derivative of a function living on a normed space. We then also have analogues of the two facts from ordinary calculus relevant to optimization that were mentioned in the previous chapter, namely the vanishing of the derivative for minimizers, and the sufficiency of this condition for minimization when the function has an increasing derivative. Thus the outline of this chapter is as follows: