Example: contours of a complex modulus surface – Texas Instruments TITANIUM TI-89 User Manual
Page 402
3D Graphing
402
•
Because of possible long evaluation times, you first may want to experiment with
your 3D equation by using Style=WIRE FRAME. The evaluation time is much
shorter. Then, after you’re sure you have the correct Window variable values,
display the Graph Formats dialog box and set Style=CONTOUR LEVELS or WIRE
AND CONTOUR.
8 Í
Example: Contours of a Complex Modulus Surface
Example: Contours of a Complex Modulus Surface
Example: Contours of a Complex Modulus Surface
Example: Contours of a Complex Modulus Surface
The complex modulus surface given by
z(a,b) = abs(f(a+bi))
shows all the complex zeros
of any polynomial
y=f(x)
.
Example
Example
Example
Example
In this example, let f(x)=x
3
+1. By substituting the general complex form x+y
i
for x, you
can express the complex surface equation as z(x,y)=abs((x+y
i)
3
+1).
1. Use
3 to set
Graph=3D
.
2. Press
8 #, and define the equation:
z1(x,y)=abs((x+y
ù
i
)^3+1)
3. Press
8 $, and set the Window
variables as shown.