Try another version of this question Graph `r(x) = x^2` on the Cartesian plane. Choose the name of the toolkit function you graphed.
The domain of `r(x)` is: The range of `r(x)` is: If any of the above do not exist, enter "DNE".
Clear All Draw:
Identify the toolkit function by verifying the exponent of `x`. Then decide if there are any domain restrictions- if there is any value of `x` that cannot be squared. For the range, determine the outputs of `x^2`. Are there any values that will not be output from `r(x) = x^2`? Finally, graph the function using the appropriate graph tool. (Do not use the point tool to graph a function!)
Quadratic
`(-oo,oo)`
`[0,oo)`