\displaystyle\frac{{9}}{{20}} as a fraction, \displaystyle{0.45} as a decimal, \displaystyle{45}\% as a percent Explanation: Let's represent this as a fraction: \displaystyle\frac{{90}}{{200}} ...

\displaystyle{22}\div{2.42}={9.0909}\ldots Explanation: \displaystyle{22}\div{2.42}={22}\div\frac{{242}}{{100}} As dividing by a fraction is equivalent to multiplying by its reciprocal \displaystyle{22}\div\frac{{242}}{{100}}={22}\times\frac{{100}}{{242}}={11}\cancel{{{22}}}\times\frac{{100}}{{{121}\cancel{{{242}}}}} ...

Do the division first. Since 2 ÷ 2 = 1, you get left with 2+1, which is 3. The Order of Operations is very useful in solving math functions. If you don’t know what that is, the Order of Operations is ...

See the simplification process below: Explanation: We can rewrite this expression as: \displaystyle\frac{{2}}{{-{{0.4}}}}=-\frac{{2}}{{0.4}}=-\frac{{2}}{{{2}\times{0.2}}}=-\frac{{\cancel{{{\left({2}\right)}}}}}{{{\left(\cancel{{{\left({2}\right)}}}\right)}\times{0.2}}}= ...

\displaystyle{67} with remainder \displaystyle{31} or as a decimal expansion: \displaystyle{67.9393}\ldots={67}.\overline{{{93}}} Explanation: You can use long division to find: \displaystyle\frac{{2242}}{{33}}={67} ...

\displaystyle{8} Explanation: Count the number of terms first. There are two terms: Simplify each to a single answer which can be added or subtracted in the last step. Do the division fisrt \displaystyle{\left({12}\ \text{ }\ \right)}{\left(-\ \text{ }\ {8}\div{2}\right)} ...