\displaystyle\frac{{{3}{x}+{6}}}{{{4}{x}-{8}}} \displaystyle{x}\ne{\left\lbrace{0},{6}\right\rbrace} Explanation: Expression \displaystyle=\frac{{{x}+{2}}}{{{4}{x}{\left({x}-{6}\right)}}}\div\frac{{{x}-{2}}}{{{3}{x}{\left({x}-{6}\right)}}} ...

\displaystyle\frac{{1}}{{{2}{x}}} Explanation: Start off with a question involving algebraic fractions by factoring wherever possible. \displaystyle\frac{{{x}²-{7}{x}+{6}}}{{{x}²-{1}}}\div\frac{{{2}{x}²-{12}{x}}}{{{x}+{1}}}\ \text{ change }\ \div\ \text{ to }\ \times\ \text{ by reciprocal} ...

It is almost right. You have forgotten the negative sign. \lim_{h\to 0}-\frac{1}{(h+x-1)(x-1)}=\lim_{h\to 0}-\frac{1}{h(x-1)+x(x-1)-(x-1)}=-\frac{1}{x(x-1)-(x-1)} =-\frac1{x^2-x-x+1}=-\frac{1}{(x-1)^2} ...

It's \frac{\frac{x}{1-x}}{1-\frac{x}{1-x}}=\frac{\frac{x}{1-x}\cdot(1-x)}{\left(1-\frac{x}{1-x}\right)(1-x)}=\frac{x}{1\cdot(1-x)-\frac{x}{1-x}\cdot(1-x)}=\frac{x}{1-x-x}=\frac{x}{1-2x}

\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 ...

\begin{align*} \frac32\cdot\frac{x+1}{3-x}&=\frac12\cdot\frac{x+1}{1-\frac{x}3}\\ &=\frac12\left(x\sum_{n\ge 0}\left(\frac13\right)^nx^n+\sum_{n\ge 0}\left(\frac13\right)^nx^n\right)\\ &=\frac12\left(\sum_{n\ge 0}\left(\frac13\right)^nx^{n+1}+\sum_{n\ge 0}\left(\frac13\right)^nx^n\right)\\ &=\frac12\left(\sum_{n\ge 1}\left(\frac13\right)^{n-1}x^n+\sum_{n\ge 1}\left(\frac13\right)^nx^n+1\right)\\ &=\frac12\left(\sum_{n\ge 1}\left(\left(\frac13\right)^{n-1}+\left(\frac13\right)^n\right)x^n+1\right)\\ &=\frac12+\frac12\sum_{n\ge 1}\left(\frac43\right)\left(\frac13\right)^{n-1}x^n\\ &=\frac12+2\sum_{n\ge 1}\left(\frac13\right)^nx^n\;, \end{align*} ...