Hello. In this mathematics post, I cover graphing complex numbers. For those who know some trigonometry, graphing complex numbers is not that much different.
Real & Imaginary Parts of Complex Numbers
A complex number
z is of the form:
a is the real number part of
b is the imaginary number part of
A complex number can be represented graphically with the use of a Argand diagram. This diagram is for plotting complex numbers as points. The x-axis is the real axis and the y-axis is the imaginary axis. (Screenshot)
Modulus & Radius
Similar to trigonometry with Cartesian co-ordinates and
(x, y) points, we can find the radius of the point
(a, b) that represents a complex number. This radius in the complex numbers setting is called the modulus. This modulus is a distance measure that is related to the Pythagorean Theorem. Wolfram uses
z = x + iy while I use
z = a + bi in this post.
After drawing the point for
(a, b), we can draw two lines. The first line is the radius from the origin to the point. Line two is a horizontal line from the origin to
(a, 0). The angle theta is the angle between these two lines.
Determine The Angle Theta
When the angle theta is unknown, trigonometry is used to find the angle. The tangent of the unknown angle is the opposite side length
b divided by the adjacent side length of
Obtaining the angle involves the use of the inverse tangent function (arctan).
A Few Examples
The complex number that we are working with in this example is . Five is the real part of the complex number and 2 is the imaginary part. The co-ordinate would be (5, 2) on the Argand diagram. (Screenshot with MathisFun drawing website.)
The angle associated with the right angled triangle is as follows.
Consider a different complex number of
z = -2 -4i. The co-ordinate here is (-2, -4) on the Argand diagram.
Using the formula for finding the angle we have:
The angle theta is for the angle in the triangle. If we want the angle associated with the complex number
z, we need
arg(z) which is the angle from the terminal arm to the hypotenuse of the triangle.
In this case, the argument for
z is 180 degrees + 63.43 degrees which is 243.43 degrees.
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