Graph the function. Plot all necessary asymptotes. For vertical asymptotes, make sure there are at least two points on each side.

To graph the function G(x) = (x-3)/(x-1), we first need to identify any asymptotes.

Horizontal asymptote:
As x approaches positive or negative infinity, the numerator and denominator will have the same degree, so we will have a horizontal asymptote at y=1.

Vertical asymptote:
The denominator cannot equal zero in order to avoid division by zero, so x=1 is a vertical asymptote for the function.

To plot the graph, we can select a few points on either side of the vertical asymptote x=1:

x=0, y=-3
x=0.5, y=-5
x=1.5, y=2
x=2, y=1

Plotting these points and connecting them with a smooth curve, we have:

Asymptotes:
Horizontal asymptote y=1
Vertical asymptote x=1

Graph:
|
| **
| **
---------
|*
|
|
----------
-5 | *
| *
| *
| *
-|----------*-----
| *
| *
| *
| *
-|**
|
|_________________
0 1 2 3

Please note that the graph is a rough sketch and should be confirmed using a graphing tool.