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Учебные пособия > College Algebra CoRequisite Course

Divide Complex Numbers

Learning Outcomes

  • Identify and write the complex conjugate of a complex number.
  • Divide complex numbers.
  • Simplify powers of [latex]i[/latex].

recall a technique: rationalizing the denominator

In mathematics, a technique that works well in one situation often works equally as well in a different, but stylistically similar situation. Dividing complex numbers uses a technique you used when rewriting a fraction that contains a radical in the denominator. We called it rationalizing a denominator. To accomplish it, you multiplied the fraction in the numerator and denominator by a number that would clear the radical in the denominator. We use the same general idea when dividing complex numbers. This time, instead of multiplying a radical by a specially chosen radical though, we'll multiply a complex number by a specially chosen complex number. When rationalizing the denominator, we took advantage of the fact that [latex]\left(\sqrt{a}\right)^2=a[/latex]. When dividing complex numbers, we'll take advantage of the fact that [latex]i^2 = -1[/latex].

Dividing Complex Numbers

Division of two complex numbers is more complicated than addition, subtraction, and multiplication because we cannot divide by an imaginary number, meaning that any fraction must have a real-number denominator. We need to find a term by which we can multiply the numerator and the denominator that will eliminate the imaginary portion of the denominator so that we end up with a real number as the denominator. This term is called the complex conjugate of the denominator, which is found by changing the sign of the imaginary part of the complex number. In other words, the complex conjugate of [latex]a+bi[/latex] is [latex]a-bi[/latex]. Note that complex conjugates have a reciprocal relationship: The complex conjugate of [latex]a+bi[/latex] is [latex]a-bi[/latex], and the complex conjugate of [latex]a-bi[/latex] is [latex]a+bi[/latex]. Importantly, complex conjugate pairs have a special property. Their product is always real.

[latex]\begin{align}(a+bi)(a-bi)&=a^2-abi+abi-b^2i^2\\[2mm]&=a^2-b^2(-1)\\[2mm]&=a^2+b^2\end{align}[/latex]

Suppose we want to divide [latex]c+di[/latex] by [latex]a+bi[/latex], where neither [latex]a[/latex] nor [latex]b[/latex] equals zero. We first write the division as a fraction, then find the complex conjugate of the denominator, and multiply.

[latex]\dfrac{c+di}{a+bi}[/latex] where [latex]a\ne 0[/latex] and [latex]b\ne 0[/latex].

Multiply the numerator and denominator by the complex conjugate of the denominator.

[latex]\dfrac{\left(c+di\right)}{\left(a+bi\right)}\cdot \dfrac{\left(a-bi\right)}{\left(a-bi\right)}=\dfrac{\left(c+di\right)\left(a-bi\right)}{\left(a+bi\right)\left(a-bi\right)}[/latex]

Apply the distributive property.

[latex]=\dfrac{ca-cbi+adi-bd{i}^{2}}{{a}^{2}-abi+abi-{b}^{2}{i}^{2}}[/latex]

Simplify, remembering that [latex]{i}^{2}=-1[/latex].

[latex]\begin{align}&=\dfrac{ca-cbi+adi-bd\left(-1\right)}{{a}^{2}-abi+abi-{b}^{2}\left(-1\right)} \\[2mm] &=\dfrac{\left(ca+bd\right)+\left(ad-cb\right)i}{{a}^{2}+{b}^{2}}\end{align}[/latex]

A General Note: The Complex Conjugate

The complex conjugate of a complex number [latex]a+bi[/latex] is [latex]a-bi[/latex]. It is found by changing the sign of the imaginary part of the complex number. The real part of the number is left unchanged.
  • When a complex number is multiplied by its complex conjugate, the result is a real number.
  • When a complex number is added to its complex conjugate, the result is a real number.

Example: Finding Complex Conjugates

Find the complex conjugate of each number.
  1. [latex]2+i\sqrt{5}[/latex]
  2. [latex]-\frac{1}{2}i[/latex]

Answer:

  1. The number is already in the form [latex]a+bi[/latex]. The complex conjugate is [latex]a-bi[/latex], or [latex]2-i\sqrt{5}[/latex].
  2. We can rewrite this number in the form [latex]a+bi[/latex] as [latex]0-\frac{1}{2}i[/latex]. The complex conjugate is [latex]a-bi[/latex], or [latex]0+\frac{1}{2}i[/latex]. This can be written simply as [latex]\frac{1}{2}i[/latex].

Analysis of the Solution

Although we have seen that we can find the complex conjugate of an imaginary number, in practice we generally find the complex conjugates of only complex numbers with both a real and an imaginary component. To obtain a real number from an imaginary number, we can simply multiply by [latex]i[/latex].

How To: Given two complex numbers, divide one by the other.

  1. Write the division problem as a fraction.
  2. Determine the complex conjugate of the denominator.
  3. Multiply the numerator and denominator of the fraction by the complex conjugate of the denominator.
  4. Simplify.

Example: Dividing Complex Numbers

Divide [latex]\left(2+5i\right)[/latex] by [latex]\left(4-i\right)[/latex].

Answer: We begin by writing the problem as a fraction.

[latex]\dfrac{\left(2+5i\right)}{\left(4-i\right)}[/latex]

Then we multiply the numerator and denominator by the complex conjugate of the denominator.

[latex]\dfrac{\left(2+5i\right)}{\left(4-i\right)}\cdot \dfrac{\left(4+i\right)}{\left(4+i\right)}[/latex]

To multiply two complex numbers, we expand the product as we would with polynomials (the process commonly called FOIL).

[latex]\begin{align}\dfrac{\left(2+5i\right)}{\left(4-i\right)}\cdot \dfrac{\left(4+i\right)}{\left(4+i\right)}&=\dfrac{8+2i+20i+5{i}^{2}}{16+4i - 4i-{i}^{2}}\\[2mm] &=\dfrac{8+2i+20i+5\left(-1\right)}{16+4i - 4i-\left(-1\right)} && \text{Because } {i}^{2}=-1 \\[2mm] &=\frac{3+22i}{17} \\[2mm] &=\dfrac{3}{17}+\frac{22}{17}i && \text{Separate real and imaginary parts}.\end{align}[/latex]

Note that this expresses the quotient in standard form.

Try It

[ohm_question]61715[/ohm_question]

tip for success

We have seen that we can evaluate functions for any real number or algebraic expression we choose. For example, given the function [latex]f(x)=2x-7[/latex], [latex-display]f(-1) = 2(-1) -7 = -9[/latex-display] [latex]f(5+h)=2(5+h)-7 = 10 +2h - 7 = 3 +2h[/latex]. We may also evaluate a function for a complex number if we wish, as shown in the Example and Try It boxes below.

Example: Substituting a Complex Number into a Polynomial Function

Let [latex]f\left(x\right)={x}^{2}-5x+2[/latex]. Evaluate [latex]f\left(3+i\right)[/latex].

Answer: Substitute [latex]x=3+i[/latex] into the function [latex]f\left(x\right)={x}^{2}-5x+2[/latex] and simplify.

[latex]\begin{align}f(3+i)&=(3+i)^2-5(3+i)+2&&\text{Substitute } 3+i \text{ for }x\\[2mm]&=(3+6i+i^2)-(15+5i)+2&&\text{Multiply}\\[2mm]&=9+6i+(-1)-15-5i+2&&\text{Substitute }-1\text{ for }i^2 \\[2mm]&=-5+i&&\text{Combine like terms}\end{align}[/latex]

Analysis of the Solution

We write [latex]f\left(3+i\right)=-5+i[/latex]. Notice that the input is [latex]3+i[/latex] and the output is [latex]-5+i[/latex].

Try It

Let [latex]f\left(x\right)=2{x}^{2}-3x[/latex]. Evaluate [latex]f\left(8-i\right)[/latex].

Answer: [latex-display]102 - 29i[/latex-display]

[ohm_question]120193[/ohm_question]

Example: Substituting an Imaginary Number in a Rational Function

Let [latex]f\left(x\right)=\dfrac{2+x}{x+3}[/latex]. Evaluate [latex]f\left(10i\right)[/latex].

Answer: Substitute [latex]x=10i[/latex] and simplify.

[latex]\begin{align}&\dfrac{2+10i}{10i+3} && \text{Substitute }10i\text{ for }x\\[2mm] &\dfrac{2+10i}{3+10i} && \text{Rewrite the denominator in standard form}\\[2mm] &\dfrac{2+10i}{3+10i}\cdot \dfrac{3 - 10i}{3 - 10i} && \text{Multiply the numerator and denominator by the complex conjugate of the denominator}\\[2mm] &\dfrac{6 - 20i+30i - 100{i}^{2}}{9 - 30i+30i - 100{i}^{2}} && \text{Multiply using the distributive property or the FOIL method} \\[2mm] &\dfrac{6 - 20i+30i - 100\left(-1\right)}{9 - 30i+30i - 100\left(-1\right)} && \text{Substitute }-1\text{ for } {i}^{2} \\[2mm] &\dfrac{106+10i}{109} && \text{Simplify} \\[2mm] &\dfrac{106}{109}+\dfrac{10}{109}i && \text{Separate the real and imaginary parts} \end{align}[/latex]

Try It

Let [latex]f\left(x\right)=\dfrac{x+1}{x - 4}[/latex]. Evaluate [latex]f\left(-i\right)[/latex].

Answer: [latex-display]-\dfrac{3}{17}+\dfrac{5}{17}i[/latex-display]

https://youtu.be/XBJjbJAwM1c

Simplifying Powers of [latex]i[/latex]

The powers of [latex]i[/latex] are cyclic. Let’s look at what happens when we raise [latex]i[/latex] to increasing powers. [latex-display]{i}^{1}=i[/latex-display] [latex-display]{i}^{2}=-1[/latex-display] [latex-display]{i}^{3}={i}^{2}\cdot i=-1\cdot i=-i[/latex-display] [latex-display]{i}^{4}={i}^{3}\cdot i=-i\cdot i=-{i}^{2}=-\left(-1\right)=1[/latex-display] [latex-display]{i}^{5}={i}^{4}\cdot i=1\cdot i=i[/latex-display] We can see that when we get to the fifth power of [latex]i[/latex], it is equal to the first power. As we continue to multiply [latex]i[/latex] by itself for increasing powers, we will see a cycle of 4. Let’s examine the next 4 powers of [latex]i[/latex]. [latex-display]{i}^{6}={i}^{5}\cdot i=i\cdot i={i}^{2}=-1[/latex-display] [latex-display]{i}^{7}={i}^{6}\cdot i={i}^{2}\cdot i={i}^{3}=-i[/latex-display] [latex-display]{i}^{8}={i}^{7}\cdot i={i}^{3}\cdot i={i}^{4}=1[/latex-display] [latex-display]{i}^{9}={i}^{8}\cdot i={i}^{4}\cdot i={i}^{5}=i[/latex-display]

recall properties of exponents

Recall that [latex]\left(a^m\right)^n=a^{mn}[/latex].

Example: Simplifying Powers of [latex]i[/latex]

Evaluate [latex]{i}^{35}[/latex].

Answer: Since [latex]{i}^{4}=1[/latex], we can simplify the problem by factoring out as many factors of [latex]{i}^{4}[/latex] as possible. To do so, first determine how many times [latex]4[/latex] goes into [latex]35[/latex]: [latex]35=4\cdot 8+3[/latex]. [latex-display]{i}^{35}={i}^{4\cdot 8+3}={i}^{4\cdot 8}\cdot {i}^{3}={\left({i}^{4}\right)}^{8}\cdot {i}^{3}={1}^{8}\cdot {i}^{3}={i}^{3}=-i[/latex-display]

Q & A

Can we write [latex]{i}^{35}[/latex] in other helpful ways? As we saw in Example: Simplifying Powers of [latex]i[/latex], we reduced [latex]{i}^{35}[/latex] to [latex]{i}^{3}[/latex] by dividing the exponent by 4 and using the remainder to find the simplified form. But perhaps another factorization of [latex]{i}^{35}[/latex] may be more useful. The table below shows some other possible factorizations.
Factorization of [latex]{i}^{35}[/latex] [latex]{i}^{34}\cdot i[/latex] [latex]{i}^{33}\cdot {i}^{2}[/latex] [latex]{i}^{31}\cdot {i}^{4}[/latex] [latex]{i}^{19}\cdot {i}^{16}[/latex]
Reduced form [latex]{\left({i}^{2}\right)}^{17}\cdot i[/latex] [latex]{i}^{33}\cdot \left(-1\right)[/latex] [latex]{i}^{31}\cdot 1[/latex] [latex]{i}^{19}\cdot {\left({i}^{4}\right)}^{4}[/latex]
Simplified form [latex]{\left(-1\right)}^{17}\cdot i[/latex] [latex]-{i}^{33}[/latex] [latex]{i}^{31}[/latex] [latex]{i}^{19}[/latex]
Each of these will eventually result in the answer we obtained above but may require several more steps than our earlier method.

Licenses & Attributions

CC licensed content, Shared previously

  • Ex: Dividing Complex Numbers. Authored by: James Sousa (Mathispower4u.com) . License: CC BY: Attribution.