]> Chapter 21: The Fundamental Theorem of Calculus in One Dimension

Chapter 21: The Fundamental Theorem of Calculus in One Dimension

 

Introduction

The act of integrating a function and that of differentiating one are inverse operations; thus the area under a curve is an antiderivative of its integrand as a function of the upper end of the area. We explore proof of this claim and its implications for one dimensional integrals.

Topics

21.1   The Fundamental Theorem for Ordinary Integrals

21.2   The Fundamental Theorem for Integration in on a Path in the Complex Plane

21.3   The Fundamental Theorem in Integration on a Path in Euclidean Space