Casio CLASSPAD 330 3.04 User Manual

20060301

14-7-7

Differential Equation Graph Window Operations

(3) From the eActivity application menu, tap [Insert], [Strip], and then [DiffEqGraph].

• This inserts a Differential Equation Graph data strip,
and displays the Differential Equation Graph window
in the lower half of the screen.

S To graph the slope field and solution curves by dropping a 1st-order

differential equation and matrix into the Differential Equation Graph
window

Example: To drag the 1st-order differential equation y’ = exp(x) + x

2

and then the initial

condition matrix [0,1] from the eActivity application window to the Differential

Equation Graph window, and graph the applicable slope field and solution curve

(1) On the application menu, tap

.

• This starts up the eActivity application.

(2) On the eActivity application window, input the following expression and matrix.

y’ = exp(x) + x

2

[0,1]

To draw this type of graph:

Drop this type of expression or value into the
Differential Equation Graph window:

Slope field

1st-order differential equation in the form of y' = f (x, y)

Solution curve(s) of a 1st-order
differential equation

Matrix of initial conditions in the following form:
[[x

1

, y(x

1

)][x

2

, y(x

2

)], .... [x

n

, y(x

n

)]]

• Slope field must already have been graphed. If not,

only points will be plotted and initial conditions are
registered in the initial condition editor ([IC] tab).

Solution curve(s) of an Nth-order
differential equation

1) Nth-order differential equation such as y’’+ y’+ y =

sin(x), followed by

2) Matrix of initial conditions in the following form:

[[x

1

, y1(x

1

)],[x

2

, y1(x

2

)], .... [x

n

, y1(x

n

)]] or [[x

1

, y1(x

1

),

y2(x

1

)],[x

2

, y1(x

2

), y2(x

2

)], .... [x

n

, y1(x

n

), y2(x

n

)]]

f (x) type function graph

Function in the form y = f (x)