I guess it's easier to go for a reduction formula. I proceed along the generalization mentioned in comment : Call the determinant M = M_n(x_1,x_2,\cdots, x_n) \displaystyle \begin{align}M &= \left|\begin{matrix}\dfrac{1}{x_1+x_1} & \cdots & \dfrac{1}{x_1+x_n}\\ \dfrac{1}{x_2+x_1} & \cdots & \dfrac{1}{x_2+x_n}\\ \cdot & \cdot &\cdot \\ \dfrac{1}{x_n+x_1} & \cdots & \dfrac{1}{x_n+x_n}\end{matrix}\right| \\& \text{subtract R1 from each row} \\&= \left|\begin{matrix}\dfrac{1}{x_1+x_1} & \cdots & \dfrac{1}{x_1+x_n}\\ \dfrac{x_1 - x_2}{(x_2+x_1)(x_1+x_1)} & \cdots & \dfrac{x_1 - x_2}{(x_2+x_n)(x_1+x_n)}\\ \cdot & \cdot &\cdot \\ \dfrac{x_1 - x_n}{(x_n+x_1)(x_1+x_1)} & \cdots & \dfrac{x_1 - x_n}{(x_n+x_n)(x_1+x_n)}\end{matrix}\right| \\&= \prod\limits_{j=2}^{n} (x_1 - x_j)\times \prod\limits_{j=1}^{n}\frac{1}{(x_1+x_j)} \times \left|\begin{matrix}1 & \cdots & 1\\ \dfrac{1}{(x_2+x_1)} & \cdots & \dfrac{1}{(x_2+x_n)}\\ \cdot & \cdot &\cdot \\ \dfrac{1}{(x_n+x_1)} & \cdots & \dfrac{1}{(x_n+x_n)}\end{matrix}\right|\end{align} ...

\begin{align} \frac{d}{dx} \frac{x}{(1+2x)} &= \lim_{h \rightarrow 0} \frac{\frac{x+h}{1+2x+2h}-\frac{x}{1+2x}}{h} &\text{apply limit definition}\\ &=\lim_{h \rightarrow 0} ...

Of course the given proof is wrong because g_n is not continuous. But I was hugely amused to realize that we don't need that category argument; the given proof can be easily fixed, and the fix has a ...

Hint: Add and subtract 3 to get E=\left(\sum x_i\right)^2\left(\frac {\sum (x_ix_j)^2}{(\prod x_i )^2}\right) -3 E=\left(\sum x_i\right)^2\left(\frac {\left(\sum x_ix_j\right)^2-2\prod x_i\left(\sum x_i\right) }{(\prod x_i )^2}\right) -3 ...

For the second one, you do the same thing: \dfrac{\frac{1}{(x+h)+1}-\frac{1}{x+1}}{h}=\dfrac{1}{h}\left(\frac{1}{(x+h)+1}-\frac{1}{x+1}\right)=\dfrac{1}{h}\dfrac{(x+1)-(x+h+1)}{(x+1)(x+h+1)}=\dfrac{1}{h}\dfrac{-h}{(x+1)(x+h+1)}=\ldots ...

\frac{\log(2x+1)-\log4}{1-\log(3x+2)}=1 becomes \log(2x+1)-\log4=1-\log(3x+2) that is \log\frac{2x+1}{4}=\log\frac{10}{3x+2} Can you go on from here? (I assume decimal logarithms.) You ...