See explanation. Explanation: First you have to find a common denominator for both fractions in brackets: \displaystyle\frac{{5}}{{9}}\div{\left(\frac{{8}}{{18}}-\frac{{3}}{{18}}\right)} Now ...

\displaystyle{1} Explanation: \displaystyle\frac{\cancel{{14}}^{\cancel{{7}}}}{\cancel{{21}}^{{3}}}\cdot\frac{{7}}{\cancel{{2}}^{{1}}}\div\frac{\cancel{{14}}^{{7}}}{\cancel{{6}}^{{3}}} \displaystyle\therefore=\frac{{1}}{{3}}\cdot\frac{{7}}{{1}}\div\frac{{7}}{{3}} ...

\displaystyle\frac{{1}}{{3}} Explanation: \displaystyle{\left[\frac{{2}}{{9}}\cdot\frac{{3}}{{10}}-{\left(-\frac{{2}}{{9}}\div\frac{{1}}{{3}}\right)}\right]}-\frac{{2}}{{5}} = \displaystyle{\left[\frac{{6}}{{90}}-{\left(-\frac{{2}}{{9}}\cdot\frac{{3}}{{1}}\right)}\right]}-\frac{{2}}{{5}} ...

\displaystyle-\frac{{3}}{{4}} Explanation: Solve in order of PEMDAS. Start inside the parentheses: \displaystyle{4}+{2}={6} \displaystyle{2}-{4}-{6}=-{8} (You go left to right on this ...

Tiago Hands Apr 17, 2015 \displaystyle\frac{{2}}{{5}}\cdot\frac{{2}}{{3}}+\frac{{1}}{{5}}\div\frac{{2}}{{3}} \displaystyle=\frac{{4}}{{15}}+\frac{{1}}{{5}}\cdot\frac{{3}}{{2}} \displaystyle=\frac{{4}}{{15}}+\frac{{3}}{{10}} ...

You know that e^{-x}=1-\frac{x}{1!}+\frac{x^2}{2!}-\frac{x^3}{3!}+-\dots\;, so \begin{align*} e^{-1}&=1-\frac1{1!}+\frac1{2!}-\frac1{3!}+-\dots\\ &=\frac1{2!}-\frac1{3!}+\frac1{4!}-\frac1{5!}+-\dots\;. \end{align*} ...