See below. Explanation: Vertical asymptotes occur at the values of \displaystyle{x} for which the function is undefined. In this case if \displaystyle{x}={2} \displaystyle\frac{\sqrt{{{x}^{{2}}+{2}}}}{{{3}{x}-{6}}}=\frac{\sqrt{{{x}^{{2}}+{2}}}}{{{3}{\left({2}\right)}-{6}}}=\frac{\sqrt{{{x}^{{2}}+{2}}}}{{0}} ...

See a solution process below: Explanation: First, we can use this rule of radicals to rewrite this expression: \displaystyle\frac{\sqrt{{{\left({a}\right)}}}}{\sqrt{{{\left({b}\right)}}}}=\sqrt{{\frac{{{a}}}{{{b}}}}} ...

A simpler way to proceed: If a,b\ge 0, then \sqrt {a+b}-\sqrt a \le \sqrt b. Proof: Move \sqrt a to the other side and square. It follows that \sqrt {x^2+1/n^2} -\sqrt {x^2} \le \sqrt {1/n^2} = 1/n.

Alan P. Apr 7, 2015 \displaystyle{g{{\left({x}\right)}}}=\frac{\sqrt{{{x}}}}{{{x}^{{2}}+{x}-{90}}} \displaystyle=\frac{\sqrt{{{x}}}}{{{\left({x}+{10}\right)}{\left({x}-{9}\right)}}} ...

Frederico Guizini S. Sep 15, 2017 See the answer below:

See below. Explanation: \displaystyle{15}{T}={5}\sqrt{{{x}^{{2}}+{1}}}+{3}{x}-{6} or \displaystyle{15}{T}+{6}={P}={5}\sqrt{{{x}^{{2}}+{1}}}+{3}{x} This problem is equivalent to Minimize \displaystyle{P}={5}{y}+{3}{x} ...