\displaystyle={\frac{{{b}-{2}}}{{{\left({b}+{5}\right)}{\left({2}{b}+{3}\right)}}}} Explanation: \displaystyle{\frac{{{6}{b}-{12}}}{{{b}+{5}}}}\div{\left({12}{b}+{18}\right)} \displaystyle{\frac{{{\left({6}{b}-{12}\right)}}}{{{\left({b}+{5}\right)}}}}\cdot{\frac{{{1}}}{{{\left({12}{b}+{18}\right)}}}} ...

\displaystyle{7}\frac{{1}}{{2}}-{\left(\frac{{1}}{{9}}+\frac{{2}}{{3}}\right)}\div\frac{{3}}{{2}}=\frac{{377}}{{54}} Explanation: Simplify: \displaystyle{7}\frac{{1}}{{2}}-{\left(\frac{{1}}{{9}}+\frac{{2}}{{3}}\right)}\div\frac{{3}}{{2}} ...

Expression \displaystyle=-{2} Explanation: Expression \displaystyle=\frac{{-{75}\div{3}+{15}}}{{{\left({11}-{6}\right)}}} Remember that the hierarchy of arithmetic operators (from first to ...

\displaystyle\frac{{{15}{a}+{5}{b}}}{{{5}{a}{b}}}\div{\left({3}{a}+{b}\right)}=\frac{{1}}{{{a}{b}}} \displaystyle{\left(\text{XXXX}\right)} Warning: this is not exactly what was asked, but I ...

\displaystyle\frac{{\frac{{5}}{{9}}-{3}}}{{\frac{{5}}{{6}}}}\div\frac{{3}}{{2}}\div\frac{{3}}{{4}}=-\frac{{352}}{{135}} Explanation: Dividing a fraction by a fraction, whether as in \displaystyle\frac{{\frac{{a}}{{b}}}}{{\frac{{c}}{{d}}}} ...

\displaystyle{\left(-\frac{{7}}{{10}}+{0.15}\right)}\div{\left(-{0.125}\right)}={4.4} Explanation: \displaystyle{\left(-\frac{{7}}{{10}}+{0.15}\right)}\div{\left(-{0.125}\right)} = \displaystyle{\left(-\frac{{70}}{{100}}+\frac{{15}}{{100}}\right)}\div{\left(-\frac{{125}}{{1000}}\right)} ...