Example: contours of a complex modulus surface – Texas Instruments PLUS TI-89 User Manual
Page 187
170 Chapter 10: 3D Graphing
10_3D.DOC TI-89/TI-92 Plus: 3D Graphing (English) Susan Gullord Revised: 02/23/01 11:00 AM Printed: 02/23/01 4:22 PM Page 170 of 22
10_3D.DOC TI-89/TI-92 Plus: 3D Graphing (English) Susan Gullord Revised: 02/23/01 11:00 AM Printed: 02/23/01 4:22 PM Page 170 of 22
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+yù
i
)
3
+1).
1. Use 3 to set
Graph
=
3D
.
2. Press ¥ #, and define the
equation:
z1(x,y)=abs((x+y
ù i
)^3+1)
3. Press ¥ $, and set
the Window variables as
shown.
4. Display the Graph Formats
dialog box:
TI
-
89:
¥ Í
TI
-
92 Plus
:
¥
F
Turn on the axes, set
Style = CONTOUR LEVELS
,
and return to the Window
editor.
5. Press ¥ % to graph the equation.
It will take awhile to evaluate the graph; so be patient. When the
graph is displayed, the complex modulus surface touches the
xy plane at exactly the complex zeros of the polynomial:
ë 1,
1
2
+
3
2
i
, and
1
2
ì
3
2
i
6. Press …, and move the
trace cursor to the zero in
the fourth quadrant.
The coordinates let you
estimate .428ì.857
i
as
the zero.
7. Press N. Then use the
cursor keys to animate the
graph and view it from
different
eye
angles.
Example: Contours of a Complex Modulus Surface
The complex modulus surface given by z(a,b) = abs(f(a+b
i
))
shows all the complex zeros of any polynomial y=f(x).
Example
Note: For more accurate
estimates, increase the
xgrid
and ygrid Window
variables. However, this
increases the graph
evaluation time.
Tip: When you animate the
graph, the screen changes
to normal view. Use
p
to
toggle between normal and
expanded views.
The zero is precise when z=0.
This example shows eye
q
=70,
eye
f
=70, and eye
ψ
=0.