\displaystyle-\frac{{6}}{{{y}^{{5}}{\left({y}+{9}\right)}}} Explanation: \displaystyle\frac{{{6}{y}}}{{{y}^{{2}}+{y}-{72}}}\div\frac{{y}^{{6}}}{{{8}-{y}}} \displaystyle\frac{{{6}{y}}}{{{\left({y}+{9}\right)}{\left({y}-{8}\right)}}}\frac{{{8}-{y}}}{{y}^{{6}}} ...

\displaystyle{3}{y}-{6} Explanation: \displaystyle\frac{{{y}^{{2}}-{4}}}{{{y}-{2}}}\div\frac{{{y}+{2}}}{{{3}{y}-{6}}} When performing division involving fractions, get the reciprocal of ...

We have \[ \frac y{y-1} = \frac{y-1+1}{y-1} = \frac{y-1}{y-1} + \frac 1{y-1} = 1 + \frac 1{y-1}. \]

-1 Explanation: => \displaystyle\frac{{{3}{y}-{y}^{{2}}}}{{{y}^{{3}}-{27}}}\cdot\frac{{{y}^{{2}}+{3}{y}+{9}}}{{y}} => \displaystyle\frac{{{y}{\left({3}-{y}\right)}}}{{{y}^{{3}}-{3}^{{3}}}}\cdot\frac{{{y}^{{2}}+{3}{y}+{9}}}{{y}} ...

\displaystyle\frac{{5}}{{3}}{y}^{{7}} Explanation: \displaystyle{\frac{{{3}{y}^{{9}}}}{{{2}{y}^{{4}}}}}\div{\frac{{{9}{y}}}{{{10}{y}^{{3}}}}} To divide fractions, multiply by the ...

The value \frac{-1-\sqrt{1+4y^2}}{2y} is not in (-1,1). That's because \sqrt{1+4y^2}>2|y|. So you get two solutions, but only one of them is in (-1,1). Now you just need to realize that: \frac{2y}{1+\sqrt{1+4y^2}}=\frac{-1+\sqrt{1+4y^2}}{2y} ...