Open brackets and multiply. Explanation: This is how you'll proceed ,treat 'i'(iota) as a variable: \displaystyle{2}{\left(-{3}-{2}{i}\right)}+{3}{i}{\left(-{3}-{2}{i}\right)} \displaystyle=-{6}-{4}{i}-{9}{i}-{6}{i}^{{2}} ...

See the explanation below. Explanation: First, expand the expression. \displaystyle{\left({2}-{4}{i}\right)}\cdot{\left({3}-{2}{i}\right)} = \displaystyle{6}-{4}{i}-{12}{i}+{8}{i}^{{2}} = ...

\displaystyle{\left({2}-{i}\right)}\cdot{\left({1}-{2}{i}\right)}=-{5}{i} Explanation: Let us first write \displaystyle{\left({2}-{i}\right)} and \displaystyle{\left({1}-{2}{i}\right)} ...

\displaystyle{\left({1}+{i}\right)}\cdot{\left({6}-{2}{i}\right)}={8} Explanation: First evaluate \displaystyle{\left({\left({1}+{i}\right)}\right)}\cdot{\left({\left({6}-{2}{i}\right)}\right)} ...

They’re counting 3-card sets, not sequences of 3 cards. There are \binom42=6 pairs of cards that could be combined with the 1, so Quantity A is 6. There are \binom43=4 ways to choose 3 ...

Hint \left( f(a) \right)^n=f(a^n)=f(e)=e \,. You don 't need to calculate the order of f, you need to calculate the order of f(a) which is an element in H.