The given function is always decreasing and therefore has neither maximum nor minimum Explanation: The derivative of the function is \displaystyle{y}'=\frac{{{2}{x}{\left({x}^{{2}}-{3}{x}\right)}-{x}^{{2}}{\left({2}{x}-{3}\right)}}}{{\left({x}^{{2}}-{3}{x}\right)}^{{2}}}= ...

\displaystyle{M}{A}{X}{\left({0};{0}\right)} and \displaystyle{M}{I}{N}{\left(-\frac{{10}}{{3}},\frac{{20}}{{29}}\right)} Explanation: We compute \displaystyle{f}'{\left({x}\right)}=-{x}\frac{{{3}{x}+{10}}}{{\left({x}^{{2}}-{3}{x}-{5}\right)}^{{2}}} ...

\displaystyle{x}^{{2}}+{9}{x}+{66}+\frac{{{437}{x}-{165}}}{{{x}^{{2}}-{10}{x}+{25}}} Explanation: We'll first want to rewrite the polynomials as single expressions. \displaystyle{\left({x}^{{3}}+{x}+{3}\right)}{\left({x}-{1}\right)}={x}^{{4}}-{x}^{{3}}+{x}^{{2}}-{x}+{3}{x}-{3} ...

\displaystyle{x}={2} is a removeable discontinuity and \displaystyle{x}={1} is a non-removeable discontinuity. Explanation: factorizing the denominator we get \displaystyle{f{{\left({x}\right)}}}=\frac{{{x}-{2}}}{{{\left({x}-{2}\right)}{\left({x}-{1}\right)}}}=\frac{{{x}-{2}}}{{{x}-{1}}} ...

\displaystyle\text{horizontal asymptote at }\ {y}=\frac{{1}}{{2}} Explanation: The denominator of f(x) cannot be zero as this would make f(x) undefined. Equating the denominator to zero and ...

\displaystyle{x}={5} is a non removable discontinuity, while \displaystyle{x}=-{2} can be removed by simplifying the function Explanation: As \displaystyle{f{{\left({x}\right)}}} is a ...