\displaystyle\frac{{16}}{{15}} Explanation: First, let's turn them into improper fractions \displaystyle\frac{{76}}{{9}}\div\frac{{95}}{{12}} When dividing fractions, we can simply ...

\displaystyle\frac{{21}}{{16}} Explanation: Start with the brackets first. \displaystyle{\left(-\frac{{1}}{{4}}-\frac{{1}}{{2}}\right)} = \displaystyle\frac{{-{1}-{2}}}{{4}} = \displaystyle-\frac{{3}}{{4}} ...

\displaystyle\frac{{26}}{{55}} Explanation: For a division sign, you can flip the other side of the equation and multiply instead. You will get \displaystyle{\left(-\frac{{8}}{{33}}\right)}\times{\left(-\frac{{39}}{{20}}\right)} ...

\displaystyle\frac{{1000}}{{129}} Explanation: I always do these kind of stuff the way I learned it back where I was younger. So, \displaystyle{55}\frac{{5}}{{9}}=\frac{{{\left({9}\times{55}\right)}+{5}}}{{9}}=\frac{{{495}+{5}}}{{9}}=\frac{{500}}{{9}} ...

\displaystyle{4.4} Explanation: \displaystyle{\left(-\frac{{7}}{{10}}+{0.15}\right)}\div-{0.125} = \displaystyle{\left(-\frac{{70}}{{100}}+\frac{{15}}{{100}}\right)}\div-{0.125} = \displaystyle-\frac{{55}}{{100}}\div-\frac{{125}}{{1000}} ...

\displaystyle{14}\frac{{2}}{{3}} Explanation: \displaystyle{\left(\frac{{11}}{{6}}-\frac{{1}}{{2}}\right)}\div\frac{{1}}{{11}} \displaystyle\therefore=\frac{{{11}-{3}}}{{6}}\times\frac{{11}}{{1}} ...