Chapter 9
Calculus
In this chapter, we take it for granted that you are familiar with the basic calculus ideas
like limits, continuity, differentiation, integration, and power series. On the other hand,
we assume that you may have have heard of, but not mastered:- Formal" 0 - e" proofs
- Taylor series with "remainder"
- The mean value theorem
In contrast to, say, Chapter 7, this chapter is not a systematic, self-contained treatment.
Instead, we concentrate on just a few important ideas that enhance your understanding
of how calculus works. Our goal is twofold: to uncover the practical meaning of some
of the things that you have already studied, by developing useful reformulations of old
ideas; and to enhance your intuitive understanding of calculus, by showing you some
useful albeit non-rigorous "moving curtains." The meaning of this last phrase is best
understood with an example.
9.1 The Fundamental Theorem of Calculus
To understand what a moving curtain is, we shall explore, in some detail, the most
important idea of elementary calculus. This example also introduces a number of
ideas that we will keep returning to throughout the chapter.
Example 9.1.1 What is the fundamental theorem of calculus (FTC), what does it
mean, and why is it true?
Partial Solution: You have undoubtedly learned about the FTC. One formulation
of it says that if f is a continuous function,l thenlb f(x)dx = F(b) -F(a), (1)
where F is any anti derivative of f; i.e., F'(x) = f(x). This is a remarkable state
ment. The left -hand side of (1) can be interpreted as the area bounded by the graphI In this chapter we will assume that the domain and range of all functions are subsets of the real numbers.315