There are a medley of functions that are NOT defined for all $x$-values. For instance, the function $f(x)=\frac{1}{x(x-1)}$ is not defined at $x=0$ nor at $x=1$. For such functions, it is important that we know for which values the function IS defined.

Definition

The Domain of a function is the set of all inputs/$x$-values for which the function is defined.

In other words, the domain of a function is the set of all $x$-values that can be “plugged into” the function to get an output $y$-value.

The set of all $x$-values that are NOT in a function’s domain ought to be considered carefully, especially in Calculus-like settings.

Not only is it important to consider all possible inputs for a function, it is fruitful to know all of it’s possible outputs as well.

Definition

The Range of a function is the set of all outputs that the function can return.

Think of range as the set of all possible $y$-values that a function can give you.

In the following topics, we concern ourselves with finding the domain and range of functions in each of the representations discussed so far.

Lesson Content

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Finding Domains and Ranges Using Potato Diagrams and Sets of Ordered Pairs or Tables

Finding Domains and Ranges Using Graphs of Functions

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