Chapter 5 | Integration
529
5.2 | The Definite Integral
Learning Objectives
5.2.1 State the definition of the definite integral. 5.2.2 Explain the terms integrand, limits of integration, and variable of integration. 5.2.3 Explain when a function is integrable. 5.2.4 Describe the relationship between the definite integral and net area. 5.2.5 Use geometry and the properties of definite integrals to evaluate them. 5.2.6 Calculate the average value of a function.
In the preceding section we defined the area under a curve in terms of Riemann sums:
→∞ ∑ i =1 n
f ⎛
⎞ ⎠ Δ x .
A = lim n
⎝ x i *
However, this definition came with restrictions. We required f ( x ) to be continuous and nonnegative. Unfortunately, real- world problems don’t always meet these restrictions. In this section, we look at how to apply the concept of the area under the curve to a broader set of functions through the use of the definite integral. Definition and Notation The definite integral generalizes the concept of the area under a curve. We lift the requirements that f ( x ) be continuous and nonnegative, and define the definite integral as follows.
Definition If f ( x ) is a function defined on an interval ⎡ ⎣ a , b ⎤
⎦ , the definite integral of f from a to b is given by
→∞ ∑ i =1 n
(5.8)
b f ( x ) dx = lim n
f ⎛
⎞ ⎠ Δ x ,
∫
⎝ x i *
a
provided the limit exists. If this limit exists, the function f ( x ) is said to be integrable on ⎡ ⎣ a , b ⎤
⎦ , or is an integrable
function .
The integral symbol in the previous definition should look familiar. We have seen similar notation in the chapter on Applications of Derivatives , where we used the indefinite integral symbol (without the a and b above and below) to represent an antiderivative. Although the notation for indefinite integrals may look similar to the notation for a definite integral, they are not the same. A definite integral is a number. An indefinite integral is a family of functions. Later in this chapter we examine how these concepts are related. However, close attention should always be paid to notation so we know whether we’re working with a definite integral or an indefinite integral. Integral notation goes back to the late seventeenth century and is one of the contributions of Gottfried Wilhelm Leibniz, who is often considered to be the codiscoverer of calculus, along with Isaac Newton. The integration symbol ∫ is an elongated S, suggesting sigma or summation. On a definite integral, above and below the summation symbol are the boundaries of the interval, ⎡ ⎣ a , b ⎤ ⎦ . The numbers a and b are x -values and are called the limits of integration ; specifically, a is the lower limit and b is the upper limit. To clarify, we are using the word limit in two different ways in the context of the definite integral. First, we talk about the limit of a sum as n →∞. Second, the boundaries of the region are called the limits of integration . We call the function f ( x ) the integrand , and the dx indicates that f ( x ) is a function with respect to x , called the variable of integration . Note that, like the index in a sum, the variable of integration is a dummy variable, and has no impact on the computation of the integral. We could use any variable we like as the variable of integration: ∫ a b f ( x ) dx = ∫ a b f ( t ) dt = ∫ a b f ( u ) du
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