\displaystyle{\left({8}-{7}{i}\right)}{\left({6}-{4}{i}\right)}={20}-{74}{i} Explanation: Whilst we could convert each complex number into trigonometric forms, it would be cumbersome to do so, ...

\displaystyle-{14}+{20}{i} Explanation: \displaystyle\text{distribute the bracket and collect like terms} \displaystyle{\left({13}{i}\right)}-{14}{\left(+{7}{i}\right)} \displaystyle=-{14}+{20}{i}\leftarrow\ \text{ in standard form}

See a solution process below: Explanation: First, multiply the two terms on the left. To multiply these two terms you multiply each individual term in the left parenthesis by each individual term in ...

(2-3i)(6-2i) Complex Multiplication The formula is :  (a+bi) • (x+yi)  = ax+by•i^2+(ay+bx)i  and since  i^2 = -1  it can be written as :  ax - by + (ay + bx) i   ( 2 -  3i) • ( 6 -  2i) =   ( ...

(4-5i)(6-2i) Complex Multiplication The formula is :  (a+bi) • (x+yi)  = ax+by•i^2+(ay+bx)i  and since  i^2 = -1  it can be written as :  ax - by + (ay + bx) i   ( 4 -  5i) • ( 6 -  2i) =   ( ...

\displaystyle{18}-{46}{i} Explanation: \displaystyle\ \text{ note that }\ {i}^{{2}}={\left(\sqrt{{-{1}}}\right)}^{{2}}=-{1} \displaystyle\text{Expanding factors gives} \displaystyle{30}-{10}{i}-{36}{i}+{12}{i}^{{2}} ...