Answer:
Domain: [tex]{ x \in R }[/tex]
Range: [tex]y \in R[/tex]
Explanation: Domain and range are all about restrictions within the x and y-ordinates.
Let's first talk about domain:
Essentially, the big question is "what can't x be?"
If x can be any number, then the domain will be under the set: [tex]{ x \in R }[/tex]
If x can't be a specific number, then the domain will still be under [tex]{ x \in R; x \neq value }[/tex]
So, since we have a straight line, x can be any number, hence: [tex]{ x \in R }[/tex]
Range:
The range is a little bit harder for more complex graphs, such as the graph of [tex]e^{x} \cdot sinx[/tex], but if it's a straight line, then we know that y can be any value. Any input will produce an output, and an output can produce an input.
Hence, the range will become: [tex]{ y \in R }[/tex]
