142
Chapter 10: Differential Equation Graphing
10DIFFEQ.DOC TI-86, Chap 10, US English Bob Fedorisko Revised: 02/13/01 2:28 PM Printed: 02/13/01 3:02 PM Page 142 of 20
10DIFFEQ.DOC TI-86, Chap 10, US English Bob Fedorisko Revised: 02/13/01 2:28 PM Printed: 02/13/01 3:02 PM Page 142 of 20
10DIFFEQ.DOC TI-86, Chap 10, US English Bob Fedorisko Revised: 02/13/01 2:28 PM Printed: 02/13/01 3:02 PM Page 142 of 20
Graphing a System of Equations in FldOff Format
For this example, you must transform the fourth-order differential equation
y
(4)
N
y=e
L
x
into an
equivalent system of first-order differential equations, as shown in the chart below.
Differentiate...
Define the variables as...
And then substitute:
t
=x
Q'1
=y'
Q1
=y
Q'1
=
Q2
(since
Q'1
=y'=
Q2
)
Q'2
=y''
Q2
=y'
Q'2
=
Q3
Q'3
=y'''
Q3
=y''
Q'3
=
Q4
Q'4
=y
(4)
Q4
=y'''
Q'4
=e
L
t
+
Q1
(since
Q'4
=y
(4)
=e
L
x
+y=e
L
t
+
Q1
)
���
Display the mode screen and set
DifEq
graphing mode.
-
m
#
#
#
#
"
"
"
b
���
Display the format screen and set
FldOff
field format.
6
/
&
#
#
#
#
#
"
"
b
���
Display the equation editor and store the
transformed system of differential
equations for y
(4)
=e
L
x
+y, substituting as
shown in the chart.
���
Deselect
Q'3
,
Q'2
, and
Q'1
to plot
Q'4=e^(
L
t)+Q1
only.
&
'
2
#
'
3
#
'
4
#
-
‚
D
a
&
E
\
'
1
$
*
$
*
$
*
In
DifEq
graphing mode,
t
is
the independent variable and
Q'
n
is the equation variable,
where
n
‚
1 and
9.