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This module describes how to graph basic functions.

Graphing, like algebraic generalizations, is a difficult topic because many students know how to do it but are not sure what it means .

For instance, consider the following graph:

A parabola showing the graph of y=x-squared

If I asked you “Draw the graph of y = x 2 size 12{y=x rSup { size 8{2} } } {} ” you would probably remember how to plot points and draw the shape.

But suppose I asked you this instead: “Here’s a function, y = x 2 size 12{y=x rSup { size 8{2} } } {} . And here’s a shape, that sort of looks like a U. What do they actually have to do with each other?” This is a harder question! What does it mean to graph a function?

The answer is simple, but it has important implications for a proper understanding of functions. Recall that every point on the plane is designated by a unique ( x , y ) size 12{ \( x,y \) } {} pair of coordinates: for instance, one point is ( 5,3 ) size 12{ \( 5,3 \) } {} . We say that its x size 12{x} {} -value is 5 and its y size 12{y} {} -value is 3.

A few of these points have the particular property that their y size 12{y} {} -values are the square of their x size 12{x} {} -values. For instance, the points ( 0,0 ) size 12{ \( 0,0 \) } {} , ( 3,9 ) size 12{ \( 3,9 \) } {} , and ( 5, 25 ) size 12{ \( - 5, 25 \) } {} all have that property. ( 5,3 ) size 12{ \( 5,3 \) } {} and ( 2, 4 ) size 12{ \( - 2, - 4 \) } {} do not.

The graph shown—the pseudo-U shape—is all the points in the plane that have this property . Any point whose y size 12{x} {} -value is the square of its x size 12{x} {} -value is on this shape; any point whose y size 12{y} {} -value is not the square of its x size 12{x} {} -value is not on this shape. Hence, glancing at this shape gives us a complete visual picture of the function y = x 2 size 12{y=x rSup { size 8{2} } } {} if we know how to interpret it correctly .

Graphing functions

Remember that every function specifies a relationship between two variables. When we graph a function, we put the independent variable on the x size 12{x} {} -axis, and the dependent variable on the y size 12{y} {} -axis.

For instance, recall the function that describes Alice’s money as a function of her hours worked. Since Alice makes $12/hour, her financial function is m ( t ) = 12 t size 12{m \( t \) ="12"t} {} . We can graph it like this.

a graph depicting the function of Alice's pay.

This simple graph has a great deal to tell us about Alice’s job, if we read it correctly.

  • The graph contains the point ( 3, 300 ) size 12{ \( 3,"300" \) } {} .What does that tell us? That after Alice has worked for three hours, she has made $300.
  • The graph goes through the origin (the point ( 0,0 ) size 12{ \( 0,0 \) } {} ). What does that tell us? That when she works 0 hours, Alice makes no money.
  • The graph exists only in the first quadrant. What does that tell us? On the mathematical level, it indicates the domain of the function ( t 0 size 12{t>= 0} {} ) and the range of the function ( m 0 size 12{m>= 0} {} ). In terms of the situation, it tells us that Alice cannot work negative hours or make negative money.
  • The graph is a straight line. What does that tell us? That Alice makes the same amount of money every day: every day, her money goes up by $100. ($100/day is the slope of the line—more on this in the section on linear functions.)

Consider now the following, more complicated graph, which represents Alice’s hair length as a function of time (where time is now measured in weeks instead of hours).

A right slanted saw-tooth graph oscillating between 12 and 18 inches.

What does this graph h ( t ) size 12{h \( t \) } {} tell us? We can start with the same sort of simple analysis.

  • The graph goes through the point ( 0, 12 ) size 12{ \( 0,"12" \) } {} .This tells us that at time ( t = 0 ) size 12{ \( t=0 \) } {} , Alice’s hair is 12" long.
  • The range of this graph appears to be 12 h 18 size 12{"12"<= h<= "18"} {} . Alice never allows her hair to be shorter than 12" or longer than 18".

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Source:  OpenStax, Advanced algebra ii: conceptual explanations. OpenStax CNX. May 04, 2010 Download for free at http://cnx.org/content/col10624/1.15
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