I would say \displaystyle\infty : Explanation: Consider: \displaystyle\lim_{{{x}\to\infty}}{\left(\frac{{{x}^{{2}}-{7}{x}}}{{{x}+{1}}}\right)}= collecting \displaystyle{x}^{{2}} and \displaystyle{x} ...

We have a vertical asymptote at \displaystyle{x}=-{1} and an oblique asymptote \displaystyle{y}={x}+{1} Explanation: As in \displaystyle{f{{\left({x}\right)}}}=\frac{{{x}^{{2}}+{2}{x}}}{{{x}+{1}}} ...

Reqd. Limit \displaystyle=-{2} . Explanation: Reqd. Limit \displaystyle=\lim_{{{x}\rightarrow-{2}}}\frac{{{x}^{{2}}+{2}{x}}}{{{x}+{2}}} \displaystyle=\lim_{{{x}\rightarrow-{2}}}{\left\lbrace{x}\frac{\cancel{{{\left({x}+{2}\right)}}}}{\cancel{{{\left({x}+{2}\right)}}}}\right\rbrace} ...

You seem to know well enough how it is with this function: It equals x whenever x is not -1, and the expression is not defined for x=-1. Whether it makes sense to care about the missing point ...

vertical asymptote at x = -2 oblique asymptote at y = -x + 6 Explanation: The denominator of the rational function cannot be zero as this would make the function undefined. Equating the denominator ...

Check below Explanation: \displaystyle{f} is not continuous at \displaystyle{0} because \displaystyle{0} \displaystyle\cancel{{\in}} \displaystyle{D}_{{f}} The domain of \displaystyle\frac{{{x}^{{2}}+{x}}}{{x}} ...