The last part of Q2 asks us to show that $y=3e^{2x}+14\ln\left(\frac{4}{3}-x\right)$ has a minimum between $x=\frac{1}{2}$ and $x=1$. Normally I would do this by differentiating and subbing in the two $x$ values and looking for a change of sign (from negative to positive). But it seems from the way the question is set out that we're supposed to do it by using the Maclaurin series expansion of $e^x$. Do we also need to use the Maclaurin expansion of $\ln (1+x)$? And then maybe differentiate the series expansions, or use some inequality arguments like in the earlier parts?