\displaystyle\frac{{{12}{x}+{1}}}{{{\left({x}+{3}\right)}{\left({x}+{4}\right)}}} Explanation: \displaystyle\text{before we can add the fractions we require them to have} \displaystyle\text{a }\ \text{common denominator} ...

Yes, you are right, but after writing \frac{4x-21}{(x-4)(x+1)}>0 we get the answer immediately by the intervals method: (-1,4)\cup\left(\frac{21}{4},+\infty\right). The intervals method ...

\displaystyle{\left(\Rightarrow\frac{{{8}{x}-{29}}}{{{x}^{{2}}-{5}{x}-{14}}}\right.} Explanation: \displaystyle\frac{{3}}{{{x}-{7}}}+\frac{{5}}{{{\left({x}+{2}\right)}}} \displaystyle{L}{C}{M}={\left({x}-{7}\right)}\cdot{\left({x}+{2}\right)} ...

((8)/(x+3))/((5)/(x+6)) Final result : 8 • (x + 6) ——————————— 5 • (x + 3) Step by step solution : Step  1  : 5 Simplify ————— x + 6 Equation at the end of step  1  : 8 5 ——————— ÷ ————— (x + 3) x + ...

\displaystyle{x}=\frac{{{5}\pm\sqrt{{-{47}}}}}{{2}} Explanation: First put everything on the LHS on a common denominator \displaystyle\frac{{6}}{{x}}-\frac{{4}}{{{x}-{3}}}={1} \displaystyle\frac{{{6}{\left({x}-{3}\right)}-{4}{x}}}{{{x}{\left({x}-{3}\right)}}}={1} ...

I found: \displaystyle\frac{{{2}{x}+{7}}}{{{\left({x}+{3}\right)}{\left({x}+{4}\right)}}}{E}{x}{p}{l}{a}{n}{a}{t}{i}{o}{n}:{Y}{o}{u}\ne{e}{d}\bot{h}{\frac{{t}}{{i}}}{o}{n}{s}{w}{i}{t}{h}{t}{h}{e}{s}{a}{m}{e}{d}{e}{n}{o}\min{a}\to{r}{\left({t}{h}{e}{p}{a}{r}{t}{b}{e}{l}{o}{w}\right)}\to{b}{e}{a}{b}\le\to{a}{d}{d};\to{d}{o}{t}\hat{{w}}{e}{c}{a}{n}\text{choose}{a}{c}{o}{m}{m}{o}{n}{d}{e}{n}{o}\min{a}\to{r}!{W}{e}{c}{a}{n}{c}{h}\infty{s}{e} ...