(2+3i)(7+5i) 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) • ( 7 +  5i) = ...

\displaystyle{9}+{4}{i} Explanation: distribute the brackets and collect like terms. \displaystyle\Rightarrow{\left({2}+{3}{i}\right)}+{\left({7}+{i}\right)}={2}+{3}{i}+{7}+{i} collecting ...

(2+3i)-(5-4i) Complex Subtraction : The difference of the two complex numbers,  (a+bi)  and  (c+di) , is  ((a-c) + (b-d)i)   ( 2 +  3i) - ( 5 -  4i) =   ( -  3 +  7i)  Processing ends ...

\displaystyle-{5}-{3}{i} Explanation: Taking \displaystyle{\left({2}+{3}{i}\right)}-{\left({7}+{6}{i}\right)} we can first distribute the subtraction/negative sign: \displaystyle{2}+{3}{i}-{7}-{6}{i} ...

(2+4i)(-1+4i) 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 +  4i) • ( -  1 +  4i) = ...

(-2+3i)(8-i) 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) • ( 8 - i) = ...