A relation can be represented in various ways, of which a few are shown here.
When a relation is given as a set of coordinates, such as the -coordinates represent the inputs, and the -coordinates represent the corresponding outputs. In this example, the input is paired — or mapped — to the output the input is mapped to the output and the input is mapped to the output
A table where one row gives the input and another row gives the output, is a representation of a relation.
The relation given by the above table is the same as
Instead of listing the set of coordinates, they can be plotted in a coordinate plane. The -coordinates are the inputs, and the -coordinates are the corresponding outputs.
The graph visualizes
A mapping diagram is a diagram that lists the inputs in one column, and the outputs in another column. Arrows are used to indicate which outputs correspond to which inputs.
This mapping diagram shows
The relation between inputs and outputs can also be defined using a rule. One such rule isReplacing with any input gives the value of the corresponding output, For instance, the input yields the output Thus, this relation maps the input to the output
Represent the following relation with a mapping diagram and determine whether it is a function.
To create the mapping diagram we'll start by listing the inputs in a column to the left, and the outputs in a column to the right. The inputs of the relation are and and the outputs are and
We can now add the arrows mapping the inputs to their corresponding outputs. There should be an arrow from input to output from input to output etc.
For a relation to be a function, every input must correspond with exactly one output. Here, we can see that the input value has two possible outputs, and Thus, this relation is not a function.
Relations that are not functions have the same specific characteristic when graphed. When a relation is not a function, it is because there are multiple -values produced by the same -value. Therefore, the graph would show at least two points directly above the other. Consider the following graphs.
This fact gives way to a test that can be done to determine if a relation is a function by looking at its graph. This test is called the Vertical Line Test, and is performed by moving an imaginary vertical line across the graph. If this line intersects the graph more than once at any given time, the relation is not a function. If this is not the case, the relation is a function.
Is the graphed relation a function?
Since the relation is given as a graph, we can use the Vertical Line Test to figure out if it's a function. Moving an imaginary vertical line across the graph, we can see that it never intersects the graph more than once at any given time.
Thus, under the necessary assumption that the graph behaves in a similar fashion outside of the visible region, the relation is a function.