Second derivate is -\dfrac{e^x}{(1+e^x)^2}<0. So the correct answer is in your book: f is not convex. Indeet, it is concave.

Use chain rule 3 times. It's: \displaystyle\frac{{2}}{{x}}\cdot{e}^{{{\left({\ln{{2}}}{x}\right)}^{{2}}}} Explanation: \displaystyle{\left({e}^{{{\left({\ln{{2}}}{x}\right)}^{{2}}}}\right)}'={e}^{{{\left({\ln{{2}}}{x}\right)}^{{2}}}}\cdot{\left({\left({\ln{{2}}}{x}\right)}^{{2}}\right)}'={e}^{{{\left({\ln{{2}}}{x}\right)}^{{2}}}}\cdot{2}{\left({\ln{{2}}}{x}\right)}'= ...

Tom Apr 4, 2015 \displaystyle{u}={\left({\ln{{\left({x}\right)}}}\right)}^{{2}} Derivate will be \displaystyle{u}'\cdot{e}^{{u}} So : \displaystyle{\left({\left({\ln{{\left({x}\right)}}}\right)}^{{2}}\right)}'={\left({u}^{{n}}\right)}'={n}\cdot{u}'{u}^{{{n}-{1}}} ...

\displaystyle{x}={12} Explanation: \displaystyle{\left({\ln{{\left({x}\right)}}}\right)} means \displaystyle{\left(\ \text{ the value }\ {k}\ \text{ you need as an exponent of e for }\ {e}^{{k}}\ \text{ to be equal to x}\right)} ...

x=21, e \displaystyle{e}^{{{\ln{{x}}}}}={x} Explanation: x=21, e \displaystyle{e}^{{{\ln{{x}}}}}={x} by the rules of logarithms and exponential funcs

\displaystyle\frac{{{3}{e}^{{{3}{x}}}}}{{{e}^{{{3}{x}}}+{2}}} Explanation: \displaystyle\text{differentiate using the }\ \text{chain rule} \displaystyle\text{given }\ {y}={f{{\left({g{{\left({x}\right)}}}\right)}}}\ \text{ then} ...