3.2 Trigonometric integrals (Page 3/6)

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Integrating $\int {tan}^{k} x {sec}^{j} x d x$ When $j$ Is even

Evaluate $\int {tan}^{6} x {sec}^{4} x d x .$

Since the power on $sec x$ is even, rewrite ${sec}^{4} x = {sec}^{2} x {sec}^{2} x$ and use ${sec}^{2} x = {tan}^{2} x + 1$ to rewrite the first ${sec}^{2} x$ in terms of $tan x .$ Thus,

\begin{matrix} \int {tan}^{6} x {sec}^{4} x d x & = \int {tan}^{6} x ({tan}^{2} x + 1) {sec}^{2} x d x & Let u = tan x and d u = {sec}^{2} x . \\ = \int u^{6} (u^{2} + 1) d u & Expand . \\ = \int (u^{8} + u^{6}) d u & Evaluate the integral . \\ = \frac{1}{9} u^{9} + \frac{1}{7} u^{7} + C & Substitute tan x = u . \\ = \frac{1}{9} {tan}^{9} x + \frac{1}{7} {tan}^{7} x + C . \end{matrix}

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Integrating $\int {tan}^{k} x {sec}^{j} x d x$ When $k$ Is odd

Evaluate $\int {tan}^{5} x {sec}^{3} x d x .$

Since the power on $tan x$ is odd, begin by rewriting ${tan}^{5} x {sec}^{3} x = {tan}^{4} x {sec}^{2} x sec x tan x .$ Thus,

\begin{matrix} {tan}^{5} x {sec}^{3} x & = & {tan}^{4} x {sec}^{2} x sec x tan x . & Write {tan}^{4} x = {({tan}^{2} x)}^{2} . \\ \int {tan}^{5} x {sec}^{3} x d x & = & \int {({tan}^{2} x)}^{2} {sec}^{2} x sec x tan x d x & Use {tan}^{2} x = {sec}^{2} x - 1. \\ = & \int {({sec}^{2} x - 1)}^{2} {sec}^{2} x sec x tan x d x & Let u = sec x and d u = sec x tan x d x . \\ = & \int {(u^{2} - 1)}^{2} u^{2} d u & Expand . \\ = & \int (u^{6} - 2 u^{4} + u^{2}) d u & Integrate . \\ = & \frac{1}{7} u^{7} - \frac{2}{5} u^{5} + \frac{1}{3} u^{3} + C & Substitute sec x = u . \\ = & \frac{1}{7} {sec}^{7} x - \frac{2}{5} {sec}^{5} x + \frac{1}{3} {sec}^{3} x + C . \end{matrix}

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Integrating $\int {tan}^{k} x d x$ Where $k$ Is odd and $k \geq 3$

Evaluate $\int {tan}^{3} x d x .$

Begin by rewriting ${tan}^{3} x = tan x {tan}^{2} x = tan x ({sec}^{2} x - 1) = tan x {sec}^{2} x - tan x .$ Thus,

\begin{matrix} \int {tan}^{3} x d x & = \int (tan x {sec}^{2} x - tan x) d x \\ = \int tan x {sec}^{2} x d x - \int tan x d x \\ = \frac{1}{2} {tan}^{2} x - ln | sec x | + C . \end{matrix}

For the first integral, use the substitution $u = tan x .$ For the second integral, use the formula.

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Integrating $\int {sec}^{3} x d x$

Integrate $\int {sec}^{3} x d x .$

This integral requires integration by parts. To begin, let $u = sec x$ and $d v = {sec}^{2} x .$ These choices make $d u = sec x tan x$ and $v = tan x .$ Thus,

\begin{matrix} \int {sec}^{3} x d x & = sec x tan x - \int tan x sec x tan x d x \\ = sec x tan x - \int {tan}^{2} x sec x d x & Simplify . \\ = sec x tan x - \int ({sec}^{2} x - 1) sec x d x & Substitute {tan}^{2} x = {sec}^{2} x - 1. \\ = sec x tan x + \int sec x d x - \int {sec}^{3} x d x & Rewrite . \\ = sec x tan x + ln | sec x + tan x | - \int {sec}^{3} x d x . & Evaluate \int sec x d x . \end{matrix}

We now have

\int {sec}^{3} x d x = sec x tan x + ln | sec x + tan x | - \int {sec}^{3} x d x .

Since the integral $\int {sec}^{3} x d x$ has reappeared on the right-hand side, we can solve for $\int {sec}^{3} x d x$ by adding it to both sides. In doing so, we obtain

2 \int {sec}^{3} x d x = sec x tan x + ln | sec x + tan x | .

Dividing by 2, we arrive at

\int {sec}^{3} x d x = \frac{1}{2} sec x tan x + \frac{1}{2} ln | sec x + tan x | + C .

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Evaluate $\int {tan}^{3} x {sec}^{7} x d x .$

$\frac{1}{9} {sec}^{9} x - \frac{1}{7} {sec}^{7} x + C$

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Reduction formulas

Evaluating $\int {sec}^{n} x d x$ for values of $n$ where $n$ is odd requires integration by parts. In addition, we must also know the value of $\int {sec}^{n - 2} x d x$ to evaluate $\int {sec}^{n} x d x .$ The evaluation of $\int {tan}^{n} x d x$ also requires being able to integrate $\int {tan}^{n - 2} x d x .$ To make the process easier, we can derive and apply the following power reduction formulas . These rules allow us to replace the integral of a power of $sec x$ or $tan x$ with the integral of a lower power of $sec x$ or $tan x .$

Rule: reduction formulas for $\int {sec}^{n} x d x$ And $\int {tan}^{n} x d x$

\int {sec}^{n} x d x = \frac{1}{n - 1} {sec}^{n - 2} x tan x + \frac{n - 2}{n - 1} \int {sec}^{n - 2} x d x

\int {tan}^{n} x d x = \frac{1}{n - 1} {tan}^{n - 1} x - \int {tan}^{n - 2} x d x

The first power reduction rule may be verified by applying integration by parts. The second may be verified by following the strategy outlined for integrating odd powers of $tan x .$

Revisiting $\int {sec}^{3} x d x$

Apply a reduction formula to evaluate $\int {sec}^{3} x d x .$

By applying the first reduction formula, we obtain

\begin{matrix} \int {sec}^{3} x d x & = \frac{1}{2} sec x tan x + \frac{1}{2} \int sec x d x \\ = \frac{1}{2} sec x tan x + \frac{1}{2} ln | sec x + tan x | + C . \end{matrix}

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Using a reduction formula

Evaluate $\int {tan}^{4} x d x .$

Applying the reduction formula for $\int {tan}^{4} x d x$ we have

\begin{matrix} \int {tan}^{4} x d x & = \frac{1}{3} {tan}^{3} x - \int {tan}^{2} x d x \\ = \frac{1}{3} {tan}^{3} x - (tan x - \int {tan}^{0} x d x) & Apply the reduction formula to \int {tan}^{2} x d x . \\ = \frac{1}{3} {tan}^{3} x - tan x + \int 1 d x & Simplify . \\ = \frac{1}{3} {tan}^{3} x - tan x + x + C . & Evaluate \int 1 d x . \end{matrix}

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Apply the reduction formula to $\int {sec}^{5} x d x .$

$\int {sec}^{5} x d x = \frac{1}{4} {sec}^{3} x tan x - \frac{3}{4} \int {sec}^{3} x$

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Key concepts

Integrals of trigonometric functions can be evaluated by the use of various strategies. These strategies include
1. Applying trigonometric identities to rewrite the integral so that it may be evaluated by u -substitution
2. Using integration by parts
3. Applying trigonometric identities to rewrite products of sines and cosines with different arguments as the sum of individual sine and cosine functions
4. Applying reduction formulas

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Practice Key Terms 2

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Source: OpenStax, Calculus volume 2. OpenStax CNX. Feb 05, 2016 Download for free at http://cnx.org/content/col11965/1.2

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3.2 Trigonometric integrals (Page 3/6)

Integrating ∫ tan k x sec j x d x When j Is even

Integrating ∫ tan k x sec j x d x When k Is odd

Integrating ∫ tan k x d x Where k Is odd and k ≥ 3

Integrating ∫ sec 3 x d x

Reduction formulas

Rule: reduction formulas for ∫ sec n x d x And ∫ tan n x d x

Revisiting ∫ sec 3 x d x

Using a reduction formula

Key concepts

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Integrating $\int {tan}^{k} x {sec}^{j} x d x$ When $j$ Is even

Integrating $\int {tan}^{k} x {sec}^{j} x d x$ When $k$ Is odd

Integrating $\int {tan}^{k} x d x$ Where $k$ Is odd and $k \geq 3$

Integrating $\int {sec}^{3} x d x$

Rule: reduction formulas for $\int {sec}^{n} x d x$ And $\int {tan}^{n} x d x$

Revisiting $\int {sec}^{3} x d x$