Calculus Examples

$\int 5 (\tan^{2} (x) + \tan^{4} (x)) d x$

Step 1

Since $5$ is constant with respect to $x$ , move $5$ out of the integral.

$5 \int \tan^{2} (x) + \tan^{4} (x) d x$

Step 2

Split the single integral into multiple integrals.

$5 (\int \tan^{2} (x) d x + \int \tan^{4} (x) d x)$

Step 3

Using the Pythagorean Identity, rewrite $\tan^{2} (x)$ as $- 1 + \sec^{2} (x)$ .

$5 (\int - 1 + \sec^{2} (x) d x + \int \tan^{4} (x) d x)$

Step 4

Split the single integral into multiple integrals.

$5 (\int - 1 d x + \int \sec^{2} (x) d x + \int \tan^{4} (x) d x)$

Step 5

Apply the constant rule.

$5 (- x + C + \int \sec^{2} (x) d x + \int \tan^{4} (x) d x)$

Step 6

Since the derivative of $\tan (x)$ is $\sec^{2} (x)$ , the integral of $\sec^{2} (x)$ is $\tan (x)$ .

$5 (- x + C + \tan (x) + C + \int \tan^{4} (x) d x)$

Step 7

Simplify with factoring out.

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Step 7.1

Factor $2$ out of $4$ .

$5 (- x + C + \tan (x) + C + \int {\tan (x)}^{2 (2)} d x)$

Step 7.2

Rewrite ${\tan (x)}^{2 (2)}$ as exponentiation.

$5 (- x + C + \tan (x) + C + \int {(\tan^{2} (x))}^{2} d x)$

Step 8

Using the Pythagorean Identity, rewrite $\tan^{2} (x)$ as $- 1 + \sec^{2} (x)$ .

$5 (- x + C + \tan (x) + C + \int {(- 1 + \sec^{2} (x))}^{2} d x)$

Step 9

Simplify.

$5 (- x + C + \tan (x) + C + \int 1 - 2 \sec^{2} (x) + \sec^{4} (x) d x)$

Step 10

Split the single integral into multiple integrals.

$5 (- x + C + \tan (x) + C + \int d x + \int - 2 \sec^{2} (x) d x + \int \sec^{4} (x) d x)$

Step 11

Apply the constant rule.

$5 (- x + C + \tan (x) + C + x + C + \int - 2 \sec^{2} (x) d x + \int \sec^{4} (x) d x)$

Step 12

Simplify.

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Step 12.1

Add $- x$ and $x$ .

$5 (C + \tan (x) + C + 0 + C + \int - 2 \sec^{2} (x) d x + \int \sec^{4} (x) d x)$

Step 12.2

Add $C + \tan (x) + C$ and $0$ .

$5 (C + \tan (x) + C + C + \int - 2 \sec^{2} (x) d x + \int \sec^{4} (x) d x)$

Step 13

Since $- 2$ is constant with respect to $x$ , move $- 2$ out of the integral.

$5 (C + \tan (x) + C + C - 2 \int \sec^{2} (x) d x + \int \sec^{4} (x) d x)$

Step 14

Since the derivative of $\tan (x)$ is $\sec^{2} (x)$ , the integral of $\sec^{2} (x)$ is $\tan (x)$ .

$5 (C + \tan (x) + C + C - 2 (\tan (x) + C) + \int \sec^{4} (x) d x)$

Step 15

Simplify the expression.

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Step 15.1

Rewrite $4$ as $2$ plus $2$

$5 (C + \tan (x) + C + C - 2 (\tan (x) + C) + \int {\sec (x)}^{2 + 2} d x)$

Step 15.2

Rewrite ${\sec (x)}^{2 + 2}$ as $\sec^{2} (x) \sec^{2} (x)$ .

$5 (C + \tan (x) + C + C - 2 (\tan (x) + C) + \int \sec^{2} (x) \sec^{2} (x) d x)$

Step 16

Using the Pythagorean Identity, rewrite $\sec^{2} (x)$ as $1 + \tan^{2} (x)$ .

$5 (C + \tan (x) + C + C - 2 (\tan (x) + C) + \int (1 + \tan^{2} (x)) \sec^{2} (x) d x)$

Step 17

Let $u = \tan (x)$ . Then $d u = \sec^{2} (x) d x$ , so $\frac{1}{\sec^{2} (x)} d u = d x$ . Rewrite using $u$ and $d$ $u$ .

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Step 17.1

Let $u = \tan (x)$ . Find $\frac{d u}{d x}$ .

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Step 17.1.1

Differentiate $\tan (x)$ .

$\frac{d}{d x} [\tan (x)]$

Step 17.1.2

The derivative of $\tan (x)$ with respect to $x$ is $\sec^{2} (x)$ .

$\sec^{2} (x)$

Step 17.2

Rewrite the problem using $u$ and $d u$ .

$5 (C + \tan (x) + C + C - 2 (\tan (x) + C) + \int 1 + u^{2} d u)$

Step 18

Split the single integral into multiple integrals.

$5 (C + \tan (x) + C + C - 2 (\tan (x) + C) + \int d u + \int u^{2} d u)$

Step 19

Apply the constant rule.

$5 (C + \tan (x) + C + C - 2 (\tan (x) + C) + u + C + \int u^{2} d u)$

Step 20

By the Power Rule, the integral of $u^{2}$ with respect to $u$ is $\frac{1}{3} u^{3}$ .

$5 (C + \tan (x) + C + C - 2 (\tan (x) + C) + u + C + \frac{1}{3} u^{3} + C)$

Step 21

Simplify.

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Step 21.1

Combine $\frac{1}{3}$ and $u^{3}$ .

$5 (C + \tan (x) + C + C - 2 (\tan (x) + C) + u + C + \frac{u^{3}}{3} + C)$

Step 21.2

Simplify.

$5 (- \tan (x) + u + \frac{u^{3}}{3}) + C$

Step 22

Replace all occurrences of $u$ with $\tan (x)$ .

$5 (- \tan (x) + \tan (x) + \frac{\tan^{3} (x)}{3}) + C$

Step 23

Add $- \tan (x)$ and $\tan (x)$ .

$5 (0 + \frac{\tan^{3} (x)}{3}) + C$

Step 24

Reorder terms.

$5 (0 + \frac{1}{3} \tan^{3} (x)) + C$