Casio ALGEBRA FX2.0 series User Manual
Page 17
○ ○ ○ ○ ○
Example
Express the differential equation below as a set of first order
differential equations.
y
(3)
= sin
x
–
y
n –
y
Ș,
x
0
= 0,
y
0
= 0,
y
n
0
= 1,
y
Ș
0
= 0.
Procedure
1
m DIFF EQ
2
3(N-th)
3
3(
n
)dw
4
sv-3(
y
(n)
) b-3(
y
(n)
)cw
5 a
w
a
w
b
w
a
w
6
2(
→SYS)
7
w(Yes)
The differential equation is converted to a set of first order differential equations as shown
below.
(
y
1
)
n =
dy
/
dx
= (
y
2
)
(
y
2
)
n =
d
2
y
/
dx
2
= (
y
3
)
(
y
3
)
n = sin
x
– (
y
2
) – (
y
3
).
Initial values are also converted to (
x
0
= 0), ((
y
1
)
0
= 0), ((
y
2
)
0
= 1), and ((
y
3
)
0
= 0)).
# On the system of first order differential
equations screen, dependent valuables are
expressed as follows.
(
y
1
)
→ Y1
(
y
2
)
→ Y2
(
y
3
)
→ Y3
Result Screen
4-4
Differential Equations of the Nth Order