1549312215-Complex_Analysis_for_Mathematics_and_Engineering_5th_edition__Mathews

(jair2018) #1

  1. 2 • THE ALGEBRA OF COMPLEX NUMBERS 9


We get the same answer by using the notation z 1 = 3 + 7i and z2 = 5 - 6i:

Z1Z2 = (3, 7)(5, -6)


= (3 + 7i)(5 - 6i)

= 15 - 18i + 35i - 42i^2

= 15 - 42( -1) + (-18 + 35)i

=57+17i
= (57, 17).

Of course, it makes sense that the answer came out as we expected because
we used the notation x + iy as motivation for our definition in the first place.


To motivate our definition for division, we proceed along the same lines as
we did for multiplication, assuming that z2 tf 0:


z1 (xi. Y1)

z2 = (xz, 112)

_ (x1 + iy1)



  • (xz + iy2) ·


We need to figure out a way to write the preceding quantity in the form
x + iy. To do so, we use a standard trick and multiply the numerator and
denominator by x2 - iyz, which gives


Thus, we finally arrive at a rather odd definition.


Definition 1.4: Division

for z2 -:f 0. (1-^11 )
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