1.1 Review of functions (Page 6/28)

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Note that for this function and the function $f (x) = −4 x + 2$ graphed in [link] , the values of $f (x)$ are getting smaller as $x$ is getting larger. A function with this property is said to be decreasing. On the other hand, for the function $f (x) = \sqrt{x + 3} + 1$ graphed in [link] , the values of $f (x)$ are getting larger as the values of $x$ are getting larger. A function with this property is said to be increasing. It is important to note, however, that a function can be increasing on some interval or intervals and decreasing over a different interval or intervals. For example, using our temperature function in [link] , we can see that the function is decreasing on the interval $(0, 4),$ increasing on the interval $(4, 14),$ and then decreasing on the interval $(14, 23) .$ We make the idea of a function increasing or decreasing over a particular interval more precise in the next definition.

Definition

We say that a function $f$ is increasing on the interval $I$ if for all $x_{1}, x_{2} \in I,$

f (x_{1}) \leq f (x_{2}) when x_{1} < x_{2} .

We say $f$ is strictly increasing on the interval $I$ if for all $x_{1}, x_{2} \in I,$

f (x_{1}) < f (x_{2}) when x_{1} < x_{2} .

We say that a function $f$ is decreasing on the interval $I$ if for all $x_{1}, x_{2} \in I,$

f (x_{1}) \geq f (x_{2}) if x_{1} < x_{2} .

We say that a function $f$ is strictly decreasing on the interval $I$ if for all $x_{1}, x_{2} \in I,$

f (x_{1}) > f (x_{2}) if x_{1} < x_{2} .

For example, the function $f (x) = 3 x$ is increasing on the interval $(− \infty, \infty)$ because $3 x_{1} < 3 x_{2}$ whenever $x_{1} < x_{2} .$ On the other hand, the function $f (x) = − x^{3}$ is decreasing on the interval $(− \infty, \infty)$ because $− x_{1}^{3} > - x_{2}^{3}$ whenever $x_{1} < x_{2}$ ( [link] ).

An image of two graphs. The first graph is labeled “a” and is of the function “f(x) = 3x”, which is an increasing straight line that passes through the origin. The second graph is labeled “b” and is of the function “f(x) = -x cubed”, which is curved function that decreases until the function hits the origin where it becomes level, then decreases again after the origin. — (a) The function $f (x) = 3 x$ is increasing on the interval $(− \infty, \infty) .$ (b) The function $f (x) = − x^{3}$ is decreasing on the interval $(− \infty, \infty) .$

Combining functions

Now that we have reviewed the basic characteristics of functions, we can see what happens to these properties when we combine functions in different ways, using basic mathematical operations to create new functions. For example, if the cost for a company to manufacture $x$ items is described by the function $C (x)$ and the revenue created by the sale of $x$ items is described by the function $R (x),$ then the profit on the manufacture and sale of $x$ items is defined as $P (x) = R (x) - C (x) .$ Using the difference between two functions, we created a new function.

Alternatively, we can create a new function by composing two functions. For example, given the functions $f (x) = x^{2}$ and $g (x) = 3 x + 1,$ the composite function $f \circ g$ is defined such that

(f \circ g) (x) = f (g (x)) = {(g (x))}^{2} = {(3 x + 1)}^{2} .

The composite function $g \circ f$ is defined such that

(g \circ f) (x) = g (f (x)) = 3 f (x) + 1 = 3 x^{2} + 1 .

Note that these two new functions are different from each other.

Combining functions with mathematical operators

To combine functions using mathematical operators, we simply write the functions with the operator and simplify. Given two functions $f$ and $g,$ we can define four new functions:

\begin{matrix} (f + g) (x) = f (x) + g (x) & S u m \\ (f - g) (x) = f (x) - g (x) & Difference \\ (f \cdot g) (x) = f (x) g (x) & P r o d u c t \\ (\frac{f}{g}) (x) = \frac{f (x)}{g (x)} for g (x) \neq 0 & Q u o t i e n t \end{matrix}

Combining functions using mathematical operations

Given the functions $f (x) = 2 x - 3$ and $g (x) = x^{2} - 1,$ find each of the following functions and state its domain.

$(f + g) (x)$
$(f - g) (x)$
$(f \cdot g) (x)$
$(\frac{f}{g}) (x)$

$(f + g) (x) = (2 x - 3) + (x^{2} - 1) = x^{2} + 2 x - 4 .$ The domain of this function is the interval $(− \infty, \infty) .$
$(f - g) (x) = (2 x - 3) - (x^{2} - 1) = − x^{2} + 2 x - 2 .$ The domain of this function is the interval $(− \infty, \infty) .$
$(f \cdot g) (x) = (2 x - 3) (x^{2} - 1) = 2 x^{3} - 3 x^{2} - 2 x + 3 .$ The domain of this function is the interval $(− \infty, \infty) .$
$(\frac{f}{g}) (x) = \frac{2 x - 3}{x^{2} - 1} .$ The domain of this function is ${x | x \neq ± 1} .$

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Source: OpenStax, Calculus volume 1. OpenStax CNX. Feb 05, 2016 Download for free at http://cnx.org/content/col11964/1.2

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