Table of contents

0. Functions7h 52m
1. Limits and Continuity2h 2m
2. Intro to Derivatives1h 33m
3. Techniques of Differentiation3h 18m
4. Applications of Derivatives2h 38m
5. Graphical Applications of Derivatives6h 2m
6. Derivatives of Inverse, Exponential, & Logarithmic Functions2h 37m
7. Antiderivatives & Indefinite Integrals1h 26m
8. Definite Integrals4h 44m
9. Graphical Applications of Integrals2h 27m
- Area Between Curves
  1h 18m
- Introduction to Volume & Disk Method
  1h 8m
10. Physics Applications of Integrals 3h 16m
- Kinematics
  1h 13m
- Work
  2h 3m
11. Integrals of Inverse, Exponential, & Logarithmic Functions2h 34m
12. Techniques of Integration7h 39m
13. Intro to Differential Equations2h 55m
14. Sequences & Series5h 36m
15. Power Series2h 19m
- Introduction to Power Series
  1h 9m
- Taylor Series & Taylor Polynomials
  1h 10m
16. Parametric Equations & Polar Coordinates7h 58m

12. Techniques of Integration

Partial Fractions

Calculus

12. Techniques of Integration

Partial Fractions

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2:24 minutes

Problem 8.6.2

Textbook Question

Choosing an integration strategy Identify a technique of integration for evaluating the following integrals. If necessary, explain how to first simplify the integrand before applying the suggested technique of integration. You do not need to evaluate the integrals.
∫ (1 + tan x) sec²x dx

Verified step by step guidance

Step 1: Observe the integrand ∫ (1 + tan x) sec²x dx. Notice that it contains a combination of trigonometric functions: tan(x) and sec²(x). Recall that the derivative of tan(x) is sec²(x), which suggests a potential substitution method.

Step 2: Let u = tan(x). Then, the derivative of u with respect to x is du/dx = sec²(x), or equivalently, du = sec²(x) dx. This substitution simplifies the integral by replacing sec²(x) dx with du.

Step 3: Rewrite the integrand in terms of u using the substitution u = tan(x). The integral becomes ∫ (1 + u) du.

Step 4: Simplify the new integral ∫ (1 + u) du into two separate terms: ∫ 1 du + ∫ u du. This makes the integration process straightforward.

Step 5: Identify the integration technique as basic integration of polynomial terms. The integral ∫ 1 du evaluates to u, and ∫ u du evaluates to u²/2. Combine these results after integration to express the solution in terms of u, and then back-substitute u = tan(x) to return to the original variable.

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Key Concepts

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

Integration Techniques

Integration techniques are methods used to find the integral of a function. Common techniques include substitution, integration by parts, and partial fractions. Understanding these methods allows one to choose the most effective approach based on the form of the integrand.

Trigonometric Identities

Trigonometric identities are equations involving trigonometric functions that are true for all values of the variables. For example, the identity sec²x = 1 + tan²x can simplify integrals involving secant and tangent functions. Recognizing and applying these identities can make integration more straightforward.

Simplifying the Integrand

Simplifying the integrand involves rewriting it in a form that is easier to integrate. This may include factoring, combining like terms, or using trigonometric identities. A simpler integrand can often lead to a more direct application of integration techniques, making the evaluation process more efficient.

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Choosing an integration strategy Identify a technique of integration for evaluating the following integrals. If necessary, explain how to first simplify the integrand before applying the suggested technique of integration. You do not need to evaluate the integrals.∫ (1 + tan x) sec²x dx

Key Concepts

Integration Techniques

Trigonometric Identities

Simplifying the Integrand

Watch next

Choosing an integration strategy Identify a technique of integration for evaluating the following integrals. If necessary, explain how to first simplify the integrand before applying the suggested technique of integration. You do not need to evaluate the integrals.
∫ (1 + tan x) sec²x dx