(c)Multiply.
Add. NOW TRYOBJECTIVE 4 Divide complex numbers.The quotient of two complex num-
bers, such asis expressed in standard form by changing the denominator into a real number.
As seen in Example 3(c),the product is 5, a real number. This
suggests multiplying the numerator and denominator of the given quotient by
as follows.Multiply.Combine like terms.Factor out 5.= 2 - 3 i Divide out the common factor.=
512 - 3 i 2
5=
10 - 15 i
5=
8 - 16 i+i- 21 - 12
1 - 41 - 12=
8 - 16 i+i- 2 i^2
1 - 4 i^21 - 2 i
= 1 - 2 i= 18 +i
1 + 2 i#^1 -^2 i
1 - 2 i8 +i
1 + 2 i1 - 2 i11 + 2 i 211 - 2 i 28 +i
1 + 2 i,
= 5
= 1 + 4
= 1 - 41 - 12 i^2 =- 1= 1 - 4 i^21 xy 22 =x^2 y^2= 12 - 12 i 22 1 x+y 21 x-y 2 =x^2 - y^211 + 2 i 211 - 2 i 2SECTION 9.4 Complex Numbers 577NOW TRY
EXERCISE 3
Find each product.
(a)
(b)
(c) 15 - 7 i 215 + 7 i 2
12 - 4 i 213 + 2 i 28 i 11 - 3 i 2NOW TRY ANSWERS
- (a) (b)
(c) 74
24 + 8 i 14 - 8 iUse parentheses
around to avoid
errors.- 1
Factor first.
Then divide out
the common
factor.The complex numbers and are conjugates.That is, the conjugateof
the complex number is Multiplying the complex number by
its conjugate a-bigives the real number a^2 +b^2.abi abi. a+bi1 + 2 i 1 - 2 iProduct of ConjugatesThat is, the product of a complex number and its conjugate is the sum of the
squares of the real and imaginary parts.1 abi 21 abi 2 a^2 b^2To divide complex numbers, multiply both the numerator and denominator by the
conjugate of the denominator. We used a similar method to rationalize some radical
expressions in Chapter 8.