Imaginary Numbers

A radical expression represents the root of a given quantity. What does it mean, then, if the value under the radical is negative, such as in $\displaystyle \sqrt{-1}$? There is no real value such that when multiplied by itself it results in a negative value. This means that there is no real value of $x$ that would make $x^2 =-1$ a true statement.

That is where imaginary numbers come in. When the radicand (the value under the radical sign) is negative, the root of that value is said to be an imaginary number. Specifically, the imaginary number, $i$, is defined as the square root of -1: thus, $i=\sqrt{-1}$.

We can write the square root of any negative number in terms of $i$. Here are some examples:

• $\sqrt{-25}=\sqrt{25\cdot-1}=\sqrt{25}\cdot\sqrt{-1}=5i$
• $\sqrt{-18} = \sqrt{2\cdot9\cdot-1} = \sqrt{2} \cdot \sqrt{9} \cdot \sqrt{-1} = 3i\sqrt{2}$