\displaystyle\sqrt{{{377}}}{\left\lbrace{\cos{{\left({{\tan}^{{-{{1}}}}{\left(\frac{{11}}{{16}}\right)}}\right)}}}+{i}{\sin{{\left({{\tan}^{{-{{1}}}}{\left(\frac{{11}}{{16}}\right)}}\right)}}}\right\rbrace} ...

\displaystyle{4}{c}+{5} Explanation: Step 1) Remove the parenthesis: \displaystyle{c}-{4}+{3}{c}+{9} Step 2) Rearrange to combine like terms: \displaystyle{c}+{3}{c}-{4}+{9} Step 3) ...

use f.o.i.l 2 \displaystyle{r}^{{2}} +15r-50 Explanation: multiply the first two terms(first) multiply the two outside terms(outside) multiply the two inside terms(inside) multiply the two last ...

The answer is \displaystyle=\frac{{3}}{\sqrt{{41}}}{i}-\frac{{4}}{\sqrt{{41}}}{j}+\frac{{4}}{\sqrt{{41}}}{k} Explanation: Let \displaystyle\vec{{v}}={<}{3},-{4},{4}{>} The magnitude of \displaystyle\vec{{v}} ...

\displaystyle{15}\sqrt{{{10}}}\ \text{ cis}{\left(\text{Arc}\text{tan}{\left(-{3}\right)}\right)} Explanation: \displaystyle{\left({5}+{10}{i}\right)}{\left({3}+{3}{i}\right)}={15}{\left({1}+{2}{i}\right)}{\left({1}+{i}\right)}={15}{\left(-{1}+{3}{i}\right)} ...

That answer seems right to me, if you are submitting it through internet, try rearrange it, from small to big.