Sharp EL-9900 Handbook Vol. 1 Operation Manual page 4

Using this Handbook
This handbook was produced for practical application of the SHARP EL-9900 Graphing
Calculator based on exercise examples received from teachers actively engaged in
teaching. It can be used with minimal preparation in a variety of situations such as
classroom presentations, and also as a self-study reference book.
Introduction
Explanation of the section
Example
Example of a problem to be
solved in the section
Before Starting
Important notes to read
before operating the calculator
Step & Key Operation
A clear step-by-step guide
to solving the problems
Display
Illustrations of the calculator
screen for each step
Merits of Using the EL-9900
Highlights the main functions of the calculator relevant
to the section
We would like to express our deepest gratitude to all the teachers whose cooperation we received in editing this
book. We aim to produce a handbook which is more replete and useful to everyone, so any comments or ideas
on exercises will be welcomed.
(Use the attached blank sheet to create and contribute your own mathematical problems.)
EL-9900 Graphing Calculator
Slope and Intercept of Quadratic Equations
A quadratic equation of y in terms of x can be expressed by the standard form y = a (x -h)
k, where a is the coefficient of the second degree term ( y = ax 2 + bx + c) and ( h, k) is the
vertex of the parabola formed by the quadratic equation. An equation where the largest
exponent on the independent variable x is 2 is considered a quadratic equation. In graphing
quadratic equations on the calculator, let the x- variable be represented by the horizontal
axis and let y be represented by the vertical axis. The graph can be adjusted by varying the
coefficients a, h, and k.
Example
Graph various quadratic equations and check the relation between the graphs and
the values of coefficients of the equations.
Step & Key Operation
1.
Graph y = x 2 and y = (x-2) 2 .
*Use either pen touch or cursor to operate.
2.
Graph y = x 2 and y = x 2 +2.
2
1
-
Change the equation in Y2 to y = x
3.
Graph y = x 2 and y = 2x 2
.
4.
2 2
Graph y = x and y = -2x . Y= 2nd F
*
2
ENTER ENTER
Before There may be differences in the results of calculations and graph plotting depending on the setting.
2
Starting 2
- View both graphs.
Return all settings to the default value and delete all data.
GRAPH
Step & Key Operation Display
1
1
- Enter the equation y = x 2 for Y1.
Y= X/ /T/ n x 2
3
1
- Change the equation in Y2 to y = 2x
1
2
- Enter the equation y = (x-2) 2 for
Y= 2nd F
*
Y2 using Sub feature.
0 ENTER
A ( n
ALPHA X/ /T/ —
3
2
-
View both graphs.
ALPHA H ) x 2 + ALPHA K
GRAPH
2nd F SUB 1 ENTER 2 ENTER
( )
0 ENTER
1 Notice that the addition of -2
3 View both graphs.
-
within the quadratic operation
moves the basic y =x
GRAPH 4
1
- right two units (adding 2 moves
Change the equation in Y2 to
it left two units) on the x-axis.
y = -2x 2 .
This shows that placing an h (>0) within the standard
form y = a (x - h) 2 + k will move the basic graph right
Y=
2nd F
*
h units and placing an h (<0) will move it left h units
on the x-axis.
ENTER
4
2
-
View both graphs.
GRAPH
The EL-9900 allows various quadratic equations to be graphed easily.
Also the characteristics of quadratic equations can be visually shown through
the relationship between the changes of coefficient values and their graphs,
using the Substitution feature.
4-1
Notes
Explains the process of each
step in the key operations
2
+
EL-9900 Graphing Calculator
Display Notes
2
+2.
SUB 0
Notice that the addition of 2 moves
the basic y =x 2 graph up two units
and the addition of -2 moves the
basic graph down two units on
Notes
the y-axis. This demonstrates the
fact that adding k (>0) within the standard form y = a (x -
h) 2 + k will move the basic graph up k units and placing k
k (<0) will move the basic graph down k units on the y-axis.
axis.
2 .
2 ENTER
SUB
Notice that the multiplication of
2 pinches or closes the basic
y=x 2 graph. This demonstrates
the fact that multiplying an a
(> 1) in the standard form y = a
(x - h) 2 + k will pinch or close
the basic graph.
2 graph
-
( ) 2
SUB
Notice that the multiplication of
-2 pinches or closes the basic
4-1
y =x 2 graph and flips it (reflects
it) across the x-axis. This dem-
onstrates the fact that multiply-
2
ing an a (<-1) in the standard form y = a (x - h) + k
will pinch or close the basic graph and flip it (reflect
it) across the x-axis.