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Chapter 3: Problem 21

Sketch the graph of the function by first making a table of values. $$ g(x)=\frac{2}{x^{2}} $$

Short Answer

Expert verified
The graph of \( g(x) = \frac{2}{x^2} \) is an even function with a vertical asymptote at \( x = 0 \) and approaches zero as \( x \) increases in magnitude.

Step by step solution

01

Identify the Function

The given function is a rational function defined as \( g(x) = \frac{2}{x^2} \). It is important to note this function is undefined at \( x = 0 \) since division by zero is undefined.
02

Choose Values for x

Select a set of \( x \) values to create a table of values. It is often helpful to choose both positive and negative values as well as points near where the function is undefined. For this example, choose \( x = -3, -2, -1, -0.5, 0.5, 1, 2, 3 \).
03

Calculate g(x) for Each x

Compute the value of \( g(x) \) for each chosen \( x \). Fill in the table of values:\[\begin{array}{|c|c|}\hlinex & g(x) \\hline-3 & \frac{2}{9} \-2 & \frac{2}{4} = 0.5 \-1 & 2 \-0.5 & 8 \0.5 & 8 \1 & 2 \2 & 0.5 \3 & \frac{2}{9} \\hline\end{array}\]
04

Plot the Points

Using the table of values, plot each point \((x, g(x))\) on a coordinate grid. Remember, the function is not defined at \( x = 0 \), so no value exists for this point.
05

Draw the Graph

Connect the plotted points to form a smooth curve. Observe the trend that the graph is symmetric with respect to the y-axis (even function) and that as \( x \) approaches 0 from both sides, \( g(x) \) tends toward \(+\infty\). As \( x \) increases or decreases in magnitude, \( g(x) \) approaches zero.

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Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Graph Sketching
Graph sketching is the process of drawing a rough outline of a graph based on certain key characteristics. For rational functions like \( g(x) = \frac{2}{x^2} \), this involves understanding behavior such as asymptotes, intercepts, and overall shape. Remember that this function is not defined at \( x = 0 \), resulting in a vertical asymptote at that point. The graph will approach infinity as \( x \) nears zero from both sides.
  • Vertical asymptotes occur where the denominator is zero, creating a break in the graph.
  • Horizontal asymptotes can be found by looking at limits as \( x \rightarrow \pm \infty \), which for this function is the x-axis since \( g(x) \) approaches zero.
For sketching, plot points from a table of values to determine the shape. Note that since \( g(x) \) involves \( x^2 \), the graph is symmetrical about the y-axis.
Table of Values
Creating a table of values is crucial for understanding how a function behaves across different points. In the example of \( g(x) = \frac{2}{x^2} \), choosing both negative and positive \( x \) values highlights how the function changes symmetrically. To generate this table, select values of \( x \) such as -3, -2, -1, -0.5, 0.5, 1, 2, and 3. Calculating \( g(x) \) for each of these values provides a set of coordinates to plot:

  • For \( x = -3 \), \( g(x) = \frac{2}{9} \).
  • For \( x = -2 \), \( g(x) = 0.5 \).
  • Continue calculating similarly for other chosen values.
Tracking these points on a graph helps visualize the function. The careful selection of points also shows trends as \( x \) gets very small or very large.
Symmetry in Functions
Symmetry is a vital concept in understanding certain types of functions. The function \( g(x) = \frac{2}{x^2} \) is an even function due to the presence of \( x^2 \) in the denominator. This means it is symmetric about the y-axis. To test for symmetry, substitute \( -x \) into the function and observe that \( g(-x) = g(x) \).
  • This symmetry results in the left and right sides of the graph being mirror images.
  • Even functions always have their graphs exhibiting this property about the vertical axis.
Understanding symmetry helps simplify graph sketching by confirming that calculated points from one side of the y-axis will reflect identically on the other.

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Most popular questions from this chapter

\(7-10\) Find the domain of the function. $$ f(x)=\sqrt{x}+\sqrt{1-x} $$

Determine whether the equation defines y as a function of x. (See Example 10.) $$ x^{2}+2 y=4 $$

Multiple Discounts You have a \(\$ 50\) coupon from the manufacturer good for the purchase of a cell phone. The store where you are purchasing your cell phone is offering a 20\(\%\) discount on all cell phones. Let \(x\) represent the regular price of the cell phone. (a) Suppose only the 20\(\%\) discount applies. Find a function \(f\) that models the purchase price of the cell phone as a function of the regular price \(x .\) (b) Suppose only the \(\$ 50\) coupon applies. Find a function \(g\) that models the purchase price of the cell phone as a function of the sticker price \(x .\) (c) If you can use the coupon and the discount, then the purchase price is either \(f \circ g(x)\) or \(g\) o \(f(x),\) depending on the order in which they are applied to the price. Find both \(f \circ g(x)\) and \(g \circ f(x) .\) Which composition gives the lower price?

\(41-44\) Find \(f \circ g \circ h\) $$ f(x)=x-1, \quad g(x)=\sqrt{x}, \quad h(x)=x-1 $$

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