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Precalculus Enhanced with Graphing Utilities

Sullivan

$Math Studyset 91影视 Explanations$ Math

6th Edition 路 1200 pages

ISBN: 9780321795465

Chapter 2: Q 93. (page 92)

Can a function be both even and odd? Explain.

Short Answer

Expert verified

The function can be both even and odd if $f (x) = 0$ for all $x$ .

Step by step solution

01

Step 1. Define even and odd function

A function is odd if $f (- x) = - f (x) 鈥� (1)$ and a function is even if $f (- x) = f (x) 鈥� (2)$

02

Step 2. Explain when the function be both even and odd.

From the eqution $(2)$ , the value of $f (x)$ is as follows:

$f (x) = - f (- x) 鈥� (3)$

Add equation $(1)$ and $(3)$ .

$\begin{array}{rcl} f (x) + f (x) & = & f (- x) + (- f (- x)) \\ 2 f (x) & = & f (- x) - f (- x) \\ 2 f (x) & = & 0 \\ 鈬� & f (x) = 0 \end{array}$

Hence, the function can be both even and odd if $f (x) = 0$ for all $x$ .

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Most popular questions from this chapter

match each graph to its function.

A. Constant function

B. Identity function

C. Square function

D. Cube function

E. Square root function

F. Reciprocal function

G. Absolute value function

H. Cube root function

Graph the function using the techniques of shifting, compressing, stretching, and/or reflecting. Start with the graph of the basic function and show all stages. Be sure to show at least three key points. Find the domain and the range of each function. Verify your results using a graphing utility.

$f (x) = x^{2} - 1$

If $(3, 6)$ is a point on the graph of $y = f (x)$ , which of the following points must be on the graph of $y = f (- x)$ ?

True or False The cube function is odd and is increasing on the interval $(- 鈭�, 鈭�)$ .

A right triangle has one vertex on the graph of $y = x^{3}, x > 0,$ at $(x, y)$ , another at the origin, and the third on the positive y-axis at $(0, y)$ , as shown in the figure. Express the area Aof the triangle as a function of x.

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