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Chapter 5: Q. 23 (page 464)

In Exercises 20鈥�27, use reference triangles and the unit circle to write the given trigonometric compositions as algebraic functions.
$\sin (\tan^{鈭� 1} (\frac{x}{2}))$

Short Answer

Expert verified

Ans: $\sin (\tan^{鈭� 1} (\frac{x}{2})) = x$

Step by step solution

01

Step 1. Given information:

$\sin (\tan^{鈭� 1} (\frac{x}{2}))$

02

Step 2. Finding the integrals using trigonometric substitution:

The reference triangle is as follows:

$S o, \sin (\tan^{- 1} (\frac{x}{2})) = \sin u = \frac{a d j}{h y p} = x$

S o, \sin (\tan^{- 1} (\frac{x}{2})) = \sin u = \frac{a d j}{h y p} = x

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Most popular questions from this chapter

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?

Problem Zero: Read the section and make your own summary of the material.

For each function u(x) in Exercises 9鈥�12, write the differential du in terms of the differential dx.

$u (x) = \sin x$

Domains and ranges of inverse trigonometric functions: For each function that follows, (a) list the domain and range, (b) sketch a labeled graph, and (c) discuss the domains and ranges in the context of the unit circle.

$f (x) = \sec^{鈭� 1} 鈦� x$

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

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