\displaystyle\frac{{7}}{{\sqrt{{{6}}}-{5}}}=-{7}\cdot\frac{{\sqrt{{{6}}}+{5}}}{{19}} Explanation: [0] \displaystyle\frac{{7}}{{\sqrt{{{6}}}-{5}}}={\left({7}\cdot\frac{{\sqrt{{{6}}}+{5}}}{{{\left(\sqrt{{{6}}}-{5}\right)}{\left(\sqrt{{{6}}}+{5}\right)}}}\right)} ...

\displaystyle\frac{{2}}{{15}} Explanation: \displaystyle\text{note that }\ \sqrt{{4}}={2}\ \text{ and }\ \sqrt{{25}}={5} \displaystyle\Rightarrow\frac{{\sqrt{{4}}}}{{{3}\sqrt{{25}}}}=\frac{{2}}{{{3}\times{5}}}=\frac{{2}}{{15}}

\displaystyle{2}-\sqrt{{2}} Explanation: \displaystyle\text{to simplify a fraction with a radical on the denominator} \displaystyle\text{multiply the numerator/denominator by the }\ \text{conjugate} ...

\displaystyle\frac{{{2}\sqrt{{3}}}}{{3}} Explanation: We have the following: \displaystyle\frac{\sqrt{{20}}}{\sqrt{{15}}} \displaystyle{20}={4}\cdot{5} and \displaystyle{15}={3}\cdot{5} ...

\displaystyle m\log a=\log a^m when both the logarithms remain defined \displaystyle\implies3^{(2\log_35)}=3^{\log_3(5^2)} Now \displaystyle a^{\log_ab}=b when the logarithm remains defined

Your approach is correct, and the textbook misses the point. There is no direct relation between the number of zeros of f'(x) and the number of zeros of f(x), since derivatives ignore constant ...