\displaystyle\frac{{19}}{{{3}-{4}{i}}} Explanation: \displaystyle\frac{{{\left({4}-{3}{i}\right)}{\left({4}+{3}{i}\right)}}}{{{3}-{4}{i}}}=\frac{{{16}-{3}{i}^{{2}}}}{{{3}-{4}{i}}} \displaystyle\frac{{{16}+{3}}}{{{3}-{4}{i}}} ...

\displaystyle{5} Explanation: First, write the polar coordinates in cartesian form. You will need the parametric form to help you with that: \displaystyle{x}={r}{\cos{\theta}} \displaystyle{y}={r}{\sin{\theta}} ...

\displaystyle{9.556} units. Explanation: The distance formula for polar coordinates is \displaystyle{d}=\sqrt{{{{r}_{{1}}^{{2}}}+{{r}_{{2}}^{{2}}}-{2}{r}_{{1}}{r}_{{2}}{\cos{{\left(\theta_{{1}}-\theta_{{2}}\right)}}}}} ...

\displaystyle{13}\frac{{8}}{{15}} Explanation: The brackets are not necessary because there is only addition. \displaystyle{4}\frac{{3}}{{5}}+{6}\frac{{1}}{{3}}+{2}\frac{{3}}{{5}}\ \text{ }\ \leftarrow ...

straight math, but sadly the statement isn't true Explanation: apply your bedmas, eliminate the fractions and solve \displaystyle-{\left({3}-\frac{{21}}{{6}}\right)}-\frac{{1}}{{3}}{<}{0} \displaystyle-{3}+\frac{{21}}{{6}}-\frac{{1}}{{3}}{<}{0} ...

The origin (0, 0) and these two points form a 3,4,5 triangle. Therefore, the distance between the two points is 5. Explanation: Let's use the Law of Cosines to solve this problem: \displaystyle{c}²={a}²+{b}²-{2}{\left({a}\right)}{\left({b}\right)}{\cos{{\left({C}\right)}}} ...