# How do you find the domain, identify any horizontal, vertical, and slant (if possible) asymptotes and identify holes, x-intercepts, and y-intercepts for f(x)=(x^2)/(x-1)?

The domain of f(x) is $R - \left\{1\right\}$ is the set of all reals except 1.
As $x \to 1$ , $f \left(x\right) \to \infty$ hence x=1 vertical asymptote.
The oblique asymptote for f(x) is $y = x + 1$