Learning Outcomes
- Add and subtract complex numbers
- Multiply complex numbers
Just as with real numbers, we can perform arithmetic operations on complex numbers. To add or subtract complex numbers, we combine the real parts and combine the imaginary parts.
A General Note: Addition and Subtraction of Complex Numbers
Adding complex numbers:
[latex]\left(a+bi\right)+\left(c+di\right)=\left(a+c\right)+\left(b+d\right)i[/latex]
Subtracting complex numbers:
[latex]\left(a+bi\right)-\left(c+di\right)=\left(a-c\right)+\left(b-d\right)i[/latex]
How To: Given two complex numbers, find the sum or difference.
- Identify the real and imaginary parts of each number.
- Add or subtract the real parts.
- Add or subtract the imaginary parts.
Example: Adding Complex Numbers
Add [latex]3 - 4i[/latex] and [latex]2+5i[/latex].
Try It
Subtract [latex]2+5i[/latex] from [latex]3 - 4i[/latex].
Multiplying Complex Numbers
Multiplying complex numbers is much like multiplying binomials. The major difference is that we work with the real and imaginary parts separately.
Multiplying a Complex Number by a Real Number
Let’s begin by multiplying a complex number by a real number. We distribute the real number just as we would with a binomial. So, for example,
[latex]\begin{align}3(6+2i)&=(3\cdot6)+(3\cdot2i)&&\text{Distribute.}\\&=18+6i&&\text{Simplify.}\end{align}[/latex]
How To: Given a complex number and a real number, multiply to find the product.
- Use the distributive property.
- Simplify.
Example: Multiplying a Complex Number by a Real Number
Find the product [latex]4\left(2+5i\right)[/latex].
Try It
Find the product [latex]-4\left(2+6i\right)[/latex].
Multiplying Complex Numbers Together
Now, let’s multiply two complex numbers. We can use either the distributive property or the FOIL method. Recall that FOIL is an acronym for multiplying First, Outer, Inner, and Last terms together. Using either the distributive property or the FOIL method, we get
[latex]\left(a+bi\right)\left(c+di\right)=ac+adi+bci+bd{i}^{2}[/latex]
Because [latex]{i}^{2}=-1[/latex], we have
[latex]\left(a+bi\right)\left(c+di\right)=ac+adi+bci-bd[/latex]
To simplify, we combine the real parts, and we combine the imaginary parts.
[latex]\left(a+bi\right)\left(c+di\right)=\left(ac-bd\right)+\left(ad+bc\right)i[/latex]
How To: Given two complex numbers, multiply to find the product.
- Use the distributive property or the FOIL method.
- Simplify.
Example: Multiplying a Complex Number by a Complex Number
Multiply [latex]\left(4+3i\right)\left(2 - 5i\right)[/latex].
Try It
Multiply [latex]\left(3 - 4i\right)\left(2+3i\right)[/latex].
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Candela Citations
- Question ID 120193. Provided by: LumenLearning. License: CC BY: Attribution. License Terms: IMathAS Community License CC-BY + GPL
- Revision and Adaptation. Provided by: Lumen Learning. License: CC BY: Attribution
- Ex 1: Adding and Subtracting Complex Numbers. Authored by: James Sousa (Mathispower4u.com) . Located at: https://youtu.be/SGhTjioGqqA. License: CC BY: Attribution
- Question ID 61710. Authored by: Day, Alyson. License: CC BY: Attribution. License Terms: IMathAS Community License CC-BY + GPL
- Question ID 40462. Authored by: Jenck,Michael. License: CC BY: Attribution. License Terms: IMathAS Community License CC-BY + GPL
- Question ID 3903. Authored by: Lippman,David. License: CC BY: Attribution. License Terms: IMathAS Community License CC-BY + GPL
- Question ID 61715. Authored by: Day, Alyson. License: CC BY: Attribution. License Terms: IMathAS Community License CC-BY + GPL
- Ex 2: Multiply Complex Numbers. Authored by: Sousa, James (Mathispower4u). Located at: https://youtu.be/O9xQaIi0NX0. License: CC BY: Attribution
- College Algebra. Authored by: Abramson, Jay et al.. Provided by: OpenStax. Located at: http://cnx.org/contents/9b08c294-057f-4201-9f48-5d6ad992740d@5.2. License: CC BY: Attribution. License Terms: Download for free at http://cnx.org/contents/9b08c294-057f-4201-9f48-5d6ad992740d@5.2
- Ex: Dividing Complex Numbers . Authored by: James Sousa (Mathispower4u.com) . Located at: https://youtu.be/XBJjbJAwM1c. License: CC BY: Attribution