We know how to find the square root of any positive real number. In a similar way, we can find the square root of a negative number. The difference is that the root is not real. If the value in the radicand is negative, the root is said to be an imaginary number. The imaginary number [latex]i[/latex] is defined as the square root of negative 1.
So, using properties of radicals,
We can write the square root of any negative number as a multiple of i. Consider the square root of –25.
We use 5i and not [latex]-\text{5}i[/latex] because the principal root of 25 is the positive root.
A complex number is the sum of a real number and an imaginary number. A complex number is expressed in standard form when written a + bi where a is the real part and bi is the imaginary part. For example, [latex]5+2i[/latex] is a complex number. So, too, is [latex]3+4\sqrt{3}i[/latex].
Imaginary numbers are distinguished from real numbers because a squared imaginary number produces a negative real number. Recall, when a positive real number is squared, the result is a positive real number and when a negative real number is squared, again, the result is a positive real number. Complex numbers are a combination of real and imaginary numbers.
A General Note: Imaginary and Complex Numbers
A complex number is a number of the form [latex]a+bi[/latex] where
- a is the real part of the complex number.
- bi is the imaginary part of the complex number.
If [latex]b=0[/latex], then [latex]a+bi[/latex] is a real number. If [latex]a=0[/latex] and b is not equal to 0, the complex number is called an imaginary number. An imaginary number is an even root of a negative number.
How To: Given an imaginary number, express it in standard form.
- Write [latex]\sqrt{-a}[/latex] as [latex]\sqrt{a}\sqrt{-1}[/latex].
- Express [latex]\sqrt{-1}[/latex] as i.
- Write [latex]\sqrt{a}\cdot i[/latex] in simplest form.
Example 1: Expressing an Imaginary Number in Standard Form
Express [latex]\sqrt{-9}[/latex] in standard form.
Solution
[latex]\sqrt{-9}=\sqrt{9}\sqrt{-1}=3i[/latex]
In standard form, this is [latex]0+3i[/latex].
Candela Citations
- College Algebra. Authored by: OpenStax College Algebra. Provided by: OpenStax. Located at: http://cnx.org/contents/9b08c294-057f-4201-9f48-5d6ad992740d@3.278:1/Preface. License: CC BY: Attribution
- Introduction to Complex Numbers. Authored by: Mathispower4u. Located at: https://youtu.be/NeTRNpBI17I. License: All Rights Reserved. License Terms: Standard YouTube License