Casio ClassPad 300 PLUS User Manual

20050501

u To determine the definite integral for a particular domain

Example: To graph the function

y

=

x

(

x

+ 2)(

x

– 2) and obtain its definite integral in the

domain of 1 <

x

< 2

(1) Display the View Window dialog box, and then configure it with the following

parameters.

xmin = –7.7,

xmax = 7.7,

xscale = 1

ymin = –4,

ymax = 4,

yscale = 1

(2) On the Graph Editor window, input and store

y

=

x

(

x

+ 2)(

x

– 2) into line

y

1, and then

tap $ to graph it.

• Make sure that only

y

1 is checked.

(3) Tap [Analysis], [G-Solve], and then [

∫

dx

].

• This displays “Lower” on the Graph window.

(4) Press

1.

• This displays a dialog box for inputting an interval for

the

x

-values, with 1 specified for the lower limit of the

x

-axis (Lower).

3-8-6

Analyzing a Function Used to Draw a Graph

(5) Tap the [Upper] input box and then input 2 for the upper limit of the

x

-axis.

(6) Tap [OK].

Tip

• Instead of inputting [Lower] and [Upper] values in steps (4) through (6), you can use the cursor

key or the graph controller arrows to move the pointer along the graph to specify the lower limit
and upper limit. If you do, perform the following two steps after step (3).

(4) Use the cursor key or the graph controller to move the pointer to the location of the lower limit

and then press

E.

• This registers the lower limit and changes the word in the lower right corner of the Graph

window to “Upper”.

(5) Move the pointer to the location of the upper limit, and then press

E.

Result Screenshot