Follow the normal multiplication rules, and remember that \displaystyle{i}^{{2}}=-{1} Explanation: \displaystyle={2}\cdot{2}+{2}\cdot{3}{i}+{i}\cdot{2}+{i}\cdot{3}{i} \displaystyle={4}+{6}{i}+{2}{i}+{3}{i}^{{2}} ...

\displaystyle{7}-{4}{i} Explanation: First, we have to know that \displaystyle{i}^{{1}}={i} \displaystyle{i}^{{2}}=-{1} \displaystyle{i}^{{3}}=-{i} \displaystyle{i}^{{4}}={1} ...

\displaystyle{5}+{10}{i} Explanation: \displaystyle•{\left({x}\right)}{i}^{{2}}={\left(\sqrt{{-{1}}}\right)}^{{2}}=-{1} \displaystyle\text{expand using FOIL and simplify} \displaystyle={8}+{6}{i}+{4}{i}+{3}{i}^{{2}} ...

\displaystyle{6}{t}^{{2}}-{t}-{15} Explanation: \displaystyle\text{each term in the second bracket is multiplied by each} \displaystyle\text{term in the first bracket} \displaystyle\Rightarrow{\left({\left({2}{t}+{3}\right)}\right)}{\left({3}{t}-{5}\right)} ...

\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={\left({0}\right.} Explanation: \displaystyle{29}{c}+{\left(-{29}{c}\right)} \displaystyle={29}{c}-{29}{c} \displaystyle={\left({0}\right.}