Skip to main content
Ch. 8 - Integration Techniques
Briggs - Calculus: Early Transcendentals 3rd Edition
Briggs3rd EditionCalculus: Early TranscendentalsISBN: 9780136847243Not the one you use?Change textbook
All textbooksBriggs 3rd EditionCh. 8 - Integration TechniquesProblem 8.R.12
Chapter 8, Problem 8.R.12

2–74. Integration techniques Use the methods introduced in Sections 8.1 through 8.5 to evaluate the following integrals.
12. ∫ (8x + 5)/(2x² + 3x + 1) dx

Verified step by step guidance
1
Identify the integral to solve: \(\int \frac{8x + 5}{2x^{2} + 3x + 1} \, dx\).
Factor the denominator if possible. The quadratic \$2x^{2} + 3x + 1\( factors as \)(2x + 1)(x + 1)$.
Express the integrand as a sum of partial fractions: \(\frac{8x + 5}{(2x + 1)(x + 1)} = \frac{A}{2x + 1} + \frac{B}{x + 1}\), where \(A\) and \(B\) are constants to be determined.
Multiply both sides by the denominator \((2x + 1)(x + 1)\) to get: \$8x + 5 = A(x + 1) + B(2x + 1)\(. Then, expand and collect like terms to form an equation in \)x$.
Solve the system of equations for \(A\) and \(B\) by equating coefficients of \(x\) and the constant terms. Once \(A\) and \(B\) are found, rewrite the integral as the sum of two simpler integrals and integrate each using the natural logarithm rule: \(\int \frac{1}{ax + b} \, dx = \frac{1}{a} \ln|ax + b| + C\).

Verified video answer for a similar problem:

This video solution was recommended by our tutors as helpful for the problem above.
Video duration:
4m
Was this helpful?

Key Concepts

Here are the essential concepts you must grasp in order to answer the question correctly.

Partial Fraction Decomposition

Partial fraction decomposition is a technique used to break down a rational function into simpler fractions that are easier to integrate. It is especially useful when the denominator can be factored into linear or quadratic terms. This method transforms the integral into a sum of simpler integrals.
Recommended video:
10:07
Partial Fraction Decomposition: Distinct Linear Factors

Integration of Rational Functions

Integrating rational functions involves expressing the integrand as a ratio of polynomials and applying algebraic techniques like substitution or partial fractions. Recognizing the form of the integrand helps determine the appropriate method to simplify and integrate the expression.
Recommended video:
6:04
Intro to Rational Functions

Substitution Method

The substitution method simplifies integration by changing variables to transform the integral into a more manageable form. It is often used when the integrand contains a function and its derivative, allowing the integral to be rewritten in terms of a single variable.
Recommended video:
07:33
Euler's Method
Related Practice
Textbook Question

"Electric field due to a line of charge A total charge of Q is distributed uniformly on a line segment of length 2L along the y-axis (see figure). The x-component of the electric field at a point (a, 0) is given by

Eₓ(a) = (kQa/2L) ∫-L L dy/(a² + y²)^(3/2),

where k is a physical constant and a > 0.

a. Confirm that Eₓ(a)=kQ / a √(a²+L²)

b. Letting ρ=Q / 2 L be the charge density on the line segment, show that if L → ∞, then Eₓ(a) = 2kρ / a.

42
views
Textbook Question

114. {Use of Tech} Arc length of the natural logarithm Consider the curve y = ln(x).

c. As a increases, L(a) increases as what power of a?

43
views
Textbook Question

2–74. Integration techniques Use the methods introduced in Sections 8.1 through 8.5 to evaluate the following integrals.

10. ∫ (x³ + 3x² + 1)/(x³ + 1) dx

56
views
Textbook Question

2–74. Integration techniques Use the methods introduced in Sections 8.1 through 8.5 to evaluate the following integrals.

43. ∫ eˣ sin(x) dx

69
views
Textbook Question

92. Integral with a parameter For what values of p does the integral

∫ (from 1 to ∞) dx/xlnᵖ(x) converge, and what is its value (in terms of p)?

85
views
Textbook Question

108. Arc length Find the length of the curve y = ln(x) on the interval [1, e^2].

121
views