Complex number

Revision as of 21:14, 7 July 2006 by Joml88 (talk | contribs)

We come about the idea of complex numbers when we trying to solve equations such as $x^2 = -1$. We know that it's absurd for the square of a real number to be negative so this equation has no solutions in real numbers. However, if we define a number, $i$, such that $i = \sqrt{-1}$. Then we will have solutions to $x^2 = -1$. It turns out that not only are we able to find the solutions of $x^2 = -1$ but we can now find all solutions to any polynomial using $i$. (See the Fundamental Theorem of Algebra for more details.)

We are now ready for a more formal definition. A complex number is a number of the form $a + bi$ where $a,b\in \mathbb{R}$ and $i = \sqrt{-1}$. The set of complex numbers is denoted by $\mathbb{C}$. The set of complex numbers contains the set $\mathbb{R}$ of the real numbers, but is much larger. Every complex number has a real part, denoted by $\Re$, or simply $\mathrm{Re}$, and an imaginary part, denoted by $\Im$, or simply $\mathrm{Im}$. So, if $z\in \mathbb C$, we can write $z=\mathrm{Re}(z)+i\mathrm{Im}(z)$, where $i$ is the imaginary unit.

As you can see, complex numbers enable us to remove the restriction of $x\ge 0$ for the domain of $f(x)=\sqrt{x}$.

The letters $z$ and $\omega$ are usually used to denote complex numbers.

Operations

  • Addition
  • Subtraction
  • Multiplication
  • Division
  • Absolute value/Modulus/Magnitude (denoted by $|z|$). This is the distance from the origin to the complex number in the complex plane.

Simple Example

If $z=a+bi$ and w = c+di,

  • $\mathrm{Re}(z)=a$,$\mathrm{Im}(z)=b$
  • $|z|=\sqrt{a^2+b^2}$
  • $\mathrm{Re}(w)=c$,$\mathrm{Im}(w)=d$
  • $|w|=\sqrt{c^2+d^2}$
  • $z+w=(a+c)+(b+d)i$
  • $z-w=(a-c)+(b-d)i$

Topics

Problems


See also