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Chapter 5: Q 36. (page 452)

Solve the following integral.
$鈭� \sin x \cos^{4} x d x$

Short Answer

Expert verified

Answer is $\frac{- \cos^{5} x}{5} + C$

Step by step solution

Step 1. Given information

An integral is $鈭� \sin x \cos^{4} x d x$

Step 2. Explanation

Let $c o s x = u$

$\begin{array}{rcl} 鈭� \sin x \cos^{4} x d x & = & 鈭� - u^{4} d u \\ = & \frac{- u^{5}}{5} + C \\ = & \frac{- \cos^{5} x}{5} + C \end{array}$

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Most popular questions from this chapter

Solve the integral: $鈭� x \ln (x) d x$

Complete the square for each quadratic in Exercises 28鈥�33. Then describe the trigonometric substitution that would be appropriate if you were solving an integral that involved that quadratic.

$x^{2} + 6 x 鈭� 2$

Solve each of the integrals in Exercises 39鈥�74. Some integrals require trigonometric substitution, and some do not. Write your answers as algebraic functions whenever possible.

$鈭� x^{3} \sqrt{x^{2} + 1} d x$

Solve each of the integrals in Exercises 39鈥�74. Some integrals require trigonometric substitution, and some do not. Write your answers as algebraic functions whenever possible.

$鈭� \frac{\sqrt{9 - x^{2}}}{x} d x$

Show by differentiating (and then using algebra) that $鈭� \cot 鈦� (\sin^{鈭� 1} 鈦� x)$ and $鈭� \frac{\sqrt{1 鈭� x^{2}}}{x}$ are both antiderivatives of $\frac{1}{x^{2} \sqrt{1 鈭� x^{2}}}$ . How can these two very different-looking functions be an antiderivative of the same function?

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Solve the following integral.鈭�sinxcos4xdx

Short Answer

Step by step solution

Step 1. Given information

Step 2. Explanation

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Solve the following integral.
$鈭� \sin x \cos^{4} x d x$