This is how we do it; Explanation: \displaystyle\frac{{{2}\frac{{3}}{{4}}-\frac{{3}}{{8}}}}{{\frac{{2}}{{5}}}} \displaystyle=\frac{{\frac{{11}}{{4}}-\frac{{3}}{{8}}}}{{\frac{{2}}{{5}}}} \displaystyle={\left(\frac{{{22}-{3}}}{{8}}\right)}\cdot\frac{{5}}{{2}} ...

\displaystyle\frac{{3}}{{8}}\div\frac{{5}}{{6}}={\left(\frac{{4}}{{9}}\right)} Explanation: Division is identical to multiplication by the (multiplicative) inverse. The (multiplicative) inverse ...

\displaystyle\frac{{7}}{{8}}\div\frac{{2}}{{3}}={1}\frac{{5}}{{16}} Explanation: Dividing a fraction with another fraction is equivalent to multiplying the first fraction with the reciprocal of ...

\displaystyle{12.38} Explanation: You don't want to work with different formats - there are decimals and fractions. The first term will be easier in fractions. \displaystyle{6.8}\div\frac{{2}}{{5}}-{4.62}\ \text{ }\ \leftarrow{\left({6.8}={6}\frac{{8}}{{10}}={6}\frac{{4}}{{5}}\right)} ...

See a solution process below: Explanation: Use this rule for dividing fractions: \displaystyle\frac{{\frac{{{a}}}{{{b}}}}}{{\frac{{{c}}}{{{d}}}}}=\frac{{{\left({a}\right)}\times{\left({d}\right)}}}{{{\left({b}\right)}\times{\left({c}\right)}}} ...

-1 Explanation: It is easier to transform a division into a multiplication: \displaystyle-\frac{{3}}{{8}}\div\frac{{9}}{{24}}=-\frac{{3}}{{8}}\times\frac{{24}}{{9}}=-\frac{{72}}{{72}}=-{1} ...