Predator-prey model – Texas Instruments TI-86 User Manual

258

Chapter 19: Applications

19APPS.DOC TI-86, Chap 19, US English Bob Fedorisko Revised: 02/13/01 2:41 PM Printed: 02/13/01 3:05 PM Page 258 of 18

19APPS.DOC TI-86, Chap 19, US English Bob Fedorisko Revised: 02/13/01 2:41 PM Printed: 02/13/01 3:05 PM Page 258 of 18

Predator-Prey Model

The growth rates of predator and prey populations, such as foxes and rabbits, depend upon the
populations of both species. This initial-value problem is a form of the predator-prey model.

F'=

L

F+0.1F¹R

R'=3R

N

F¹R

Q1

= population of foxes (F)

Q2

= population of rabbits (R)

Q

[

1

= initial population of foxes (2)

Q

[

2

= initial population of rabbits (5)

Find the population of foxes and rabbits after 3 months (

t=3

).

ᕡ In

DifEq

graphing mode, select

Q't=

from the

GRAPH

menu and enter the functions and set graph

styles in the equation editor as shown.
¼

Q'1=

L

Q1+0.1Q1

¹

Q2

»

Q'2=3Q2

N

Q1

¹

Q2

ᕢ Select

FORMT

from the

GRAPH

menu and set

FldOff

field format.

ᕣ Select

WIND

from the

GRAPH

menu and set the window variable values as shown.

tMin=0

xMin=

L

1

yMin=

L

10

tMax=10

xMax=10

yMax=40

tStep=

pà

24

xScl=5

yScl=5

tPlot=0

difTol=.001

ᕤ Select

INITC

from the

GRAPH

menu and set the initial conditions as shown.

tMin=0

Q

[

1=2

Q

[

2=5