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Chapter 5: Problem 104

Without drawing a graph, describe the behavior of the graph of \(y=\cos ^{-1} x .\) Mention the function's domain and range in your description.

Short Answer

Expert verified
The domain of the inverse cosine function \(y = \cos^{-1}x\) is \([-1, 1]\), and the range is \([0, \pi]\). The function is decreasing over its domain and symmetric with respect to the y-axis.

Step by step solution

01

Describe the Domain

The domain of the function \(y = \cos^{-1}x\) (also written as \(y = arccos(x)\)) consists of all the real numbers that can be input to the function, for which a real number output exists. The inverse cosine function is defined for all real numbers between -1 and 1, inclusive. So, the domain of \(y = \cos^{-1}x\) is \([-1, 1]\).
02

Describe the Range

The range of the function consists of all the possible output values. The range of the inverse cosine function is \([0, \pi]\), because cosine values are between 0 and \(\pi\) in their natural domain.
03

Describe the Behaviour

The inverse cosine function decreases as the input value increases over its domain. It starts at the upper y-bound of its range and ends at the lower y-bound. It also has the property of being an even function, meaning that it is symmetric with respect to the y-axis, i.e., \(\cos^{-1}(-x) = \cos^{-1}(x)\).

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Most popular questions from this chapter

We will prove the following identities: $$\begin{array}{l} {\sin ^{2} x=\frac{1}{2}-\frac{1}{2} \cos 2 x} \\ {\cos ^{2} x=\frac{1}{2}+\frac{1}{2} \cos 2 x} \end{array}$$ Use the identity for \(\sin ^{2} x\) to graph one period of \(y=\sin ^{2} x\)

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