There is a series of mistakes in your solution. I'll mark them one by one: You correctly arrive to \frac A {2\pi}=r^2+rh But "dividing by h" produces \frac 1 h \frac A {2\pi}=\frac 1 h\left(r^2+rh\right) ...

14m2+1=6m2+7m Two solutions were found :  m =(7-√17)/16= 0.180  m =(7+√17)/16= 0.695 Rearrange: Rearrange the equation by subtracting what is to the right of the equal sign from both sides of ...

See the entire solution process below: Explanation: First, subtract \displaystyle{\left({2}\pi{r}^{{2}}\right)} from each side of the equation to isolate the \displaystyle{h} term: \displaystyle{S}-{\left({2}\pi{r}^{{2}}\right)}={2}\pi{r}{h}+{2}\pi{r}^{{2}}-{\left({2}\pi{r}^{{2}}\right)} ...

You can see even before you’ve evaluated the integral that something’s not right by doing some dimensional analysis: it’s got a dimension of length^3, which isn’t going to give you an area. The ...

If the volume is supposed to be fixed (as you indicated in the comments), you can use this to write one variable in terms of the other. If V is the volume (which is supposed to be just some ...

We start by getting rid of one variable: h=2\sqrt{R^2-r^2} S(r)=2 \pi r (r+2\sqrt{R^2-r^2}) Now we use the derivative as usual: S'=2\pi \left(r+2\sqrt{R^2-r^2}+r-2 \frac{r^2}{\sqrt{R^2-r^2}} \right) ...