Meave60 May 10, 2015 Solve \displaystyle\frac{{{2}{x}-{1}}}{{{3}{x}-{2}}}\le{1} Multiply both sides by \displaystyle{3}{x}-{2} \displaystyle\frac{{\cancel{{{3}{x}-{2}}}\times{2}{x}-{1}}}{\cancel{{{3}{x}-{2}}}}\le{1}\times{\left({3}{x}-{2}\right)} ...

\displaystyle{x}\in{\left(-\infty,{2}\right)}\cup{\left[{3},\infty\right)} Explanation: As per the question, we have \displaystyle\frac{{{x}+{3}}}{{{3}{x}-{6}}}\le{2} \displaystyle\therefore\frac{{{x}+{3}}}{{{3}{x}-{6}}}-{2}\le{0} ...

Nghi N. May 13, 2015 (1) \displaystyle-{2}\le{5}-\frac{{x}}{{3}} -> \displaystyle\frac{{x}}{{3}}\le{5}+{2}\to\frac{{x}}{{3}}{<}{7}\to{x}\le{21} (2) \displaystyle{5}-\frac{{x}}{{3}}\le{2}\to\frac{{x}}{{3}}\ge{5}-{2}\to\frac{{x}}{{3}}\ge{3}\to{x}\ge{9} ...

Solution is \displaystyle{x}\le-\frac{{5}}{{3}} or \displaystyle{x}\ge{1} Explanation: For considering \displaystyle\frac{{{2}-{2}{x}}}{{{3}{x}+{5}}}\le{0} , let us first consider \displaystyle\frac{{{2}-{2}{x}}}{{{3}{x}+{5}}}{<}{0} ...

The answer is \displaystyle={x}\in{]}-\frac{{4}}{{3}},{2}{]} Explanation: Let \displaystyle{f{{\left({x}\right)}}}=\frac{{{4}-{2}{x}}}{{{3}{x}+{4}}} The domain of \displaystyle{f{{\left({x}\right)}}} ...

\displaystyle{x}\in{\left[-\frac{{1}}{{5}},{2}\right)} Explanation: Given \displaystyle{\left(\text{XXX}\right)}\frac{{{5}{x}+{1}}}{{{x}-{2}}}\le{0} Consider the two cases (note this ...