\displaystyle-{4}{i}{\left({3}-{5}{i}\right)}=-{20}-{12}{i} Explanation: \displaystyle-{4}{i}{\left({3}-{5}{i}\right)}={\left(-{4}{i}\right)}\times{3}-{\left(-{4}{i}\right)}\times{\left({5}{i}\right)}=-{12}{i}+{20}{i}^{{2}} ...

(-5-i)-(1-4i) Complex Subtraction : The difference of the two complex numbers,  (a+bi)  and  (c+di) , is  ((a-c) + (b-d)i)   ( -  5 - i) - ( 1 -  4i) =   ( -  6 +  3i)  Processing ends ...

\displaystyle{16}{r}^{{2}}+{56}{r}{s}+{49}{s}^{{2}} Explanation: \displaystyle{\left({4}{r}+{7}{s}\right)}{\left({4}{r}+{7}{s}\right)} Multiply out brackets using FOIL method \displaystyle{16}{r}^{{2}}+{28}{r}{s}+{28}{r}{s}+{49}{s}^{{2}} ...

\displaystyle-\frac{{4}}{\sqrt{{{42}}}}\hat{{i}}+\frac{{5}}{\sqrt{{{42}}}}\hat{{j}}-\frac{{1}}{\sqrt{{{42}}}}\hat{{k}} Explanation: A normalised vector is just the vector divided by its metric ...

\displaystyle{5}-{7}{i} Explanation: Keep in mind that \displaystyle{i}^{{2}}=-{1} , and proceed, multiplying this with a method resembling FOIL: \displaystyle{\left({1}-{4}{i}\right)}{\left({2}+{i}\right)}={1}+{i}-{\left({4}\right)}{\left({2}\right)}{i}-{4}{i}^{{2}} ...

See below. Explanation: We use the distributive property. \displaystyle{\left({4}-{5}{i}\right)}-{\left(-{4}+{i}\right)} becomes \displaystyle{4}-{5}{i}+{4}-{i} Combining like-terms, \displaystyle{4}-{5}{i}+{4}-{i}={8}-{6}{i}