Sharp EL9900 manual Graphing Hyperbolas

Page 52

EL-9900 Graphing Calculator

Graphing Hyperbolas

The standard equation for a hyperbola can take one of two forms:

( x - h )2

-

( y - k )2

= 1

with vertices at ( h ± a, k ) or

a2

b 2

 

 

 

( x - k )2

-

( y - h)2

 

= 1

with vertices at ( h, k ± b ).

a2

b 2

 

 

 

There is a problem entering this equation in the calculator graphing list for two reasons:

a)it is not a function, and only functions can be entered in the Y= list locations.

b)the functions entered in the Y= list locations must be in terms of x, not y.

To draw a graph of a hyperbola, consider the “top” and “bottom” halves of the hyperbola as two different parts of the graph because each individual is a function. Solve the equation of the hyperbola for y and enter the two parts in two locations of the Y= list.

Example

Graph a hyperbola in rectangular mode. Solve the equation for y to put it in the standard form.

Graph the hyperbola x 2 + 2x - y 2 - 6y + 3 = 0

Before There may be differences in the results of calculations and graph plotting depending on the setting. Starting Return all settings to the default value and delete all data.

Set the zoom to the decimal window:

ZOOM A

(

ENTER ALPHA

)

7

Step & Key Operation

Display

Notes

1Solve the equation for y completing the square.

Enter

Y1 = x 2 + 2x + 12 Y2 = Y1 -3

Y3 = -Y1 -3

Y=

 

2nd F

 

 

 

X/ /T/n

x2

+

2

 

 

 

 

 

 

 

 

X/ /T/n

 

+

 

 

1 2

ENTER

 

2nd F VARS A ENTER 1 3 ENTER

(-) 2nd F VARS A ENTER 1 3

x 2 + 2x - y 2 -6y= -3

x 2 + 2x - (y 2 + 6y + 9) = -3 -9 x 2 + 2x - (y +3)2 = -12

(y + 3)2 = x 2 + 2x + 12

y+ 3 = +x 2 + 2x + 12 y = +x 2 + 2x + 12 - 3

2Turn off Y1 so that it will not graph.

ENTER

12-4

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Contents EL-9900 Contents Read this first Always read Before StartingUsing this Handbook IntroductionFractions and Decimals ExamplePie Charts and Proportions BeforeSlope and Intercept of Linear Equations 1Enter the equation y = x for Y2 Parallel and Perpendicular Lines 2View the graphs Slope and Intercept of Quadratic Equations 1Change the equation in Y2 to y = x 2+2 1Access the Solver feature This screen will appear a few 4Enter the values L=15,000, I=0.09, N=48 Access the Solver feature 10π 200 15 π1Access the Solver feature 5Solve for the height and enter a starting point Graphing Polynomials and Tracing to Find the Roots 1Move the tracer near the left-hand root Graphing Polynomials and Jumping to Find the Roots = x 4 + x 3 5x 2 3x +Find the next root Solving a System of Equations by Graphing or Tool Feature 1Access the Tool menu. Select the number of variables Entering and Multiplying Matrices 1Multiply the matrices a and B together at the home screen Solving a System of Linear Equations Using Matrices 2Calculate B-1C Solving Inequalities EL-9900 Graphing Calculator 2x 5 ≥ Solving Double Inequalities= 2x 5 = 2x 5 and y = 7 intersect at 6,7 2x + y ≥ + y ≤+ y ≤ + 2y ≤ 1 x 2 + y ≥ + 2y ≤ 1 y ≤ +y ≥ 4 y ≥ 4 xContinuing key operations omitted Slope and Intercept of Absolute Value Functions If x ≥3View the graph Solving Absolute Value Equations Solve an absolute value equation 5 4x =Solving Absolute Value Inequalities = 10, y =2nd F Calc 2 x = = 9.999999999 Note Evaluating Absolute Value Functions +3 1+3Math Graphing Rational Functions + 1x Solving Rational Function Inequalities Graphing Parabolas = y 2 + 2 = y = +√ x +Change to parametric mode Graphing Circles Graph x 2 2x + y 2 + 4y =2x + y 2 + 4y = 2x + y+22 =For Y1 = Y1 2 for Y2, and y = -Y1 -2 for Graphing Ellipses View the graph Graphing Hyperbolas Zoom out the screen Key pad for the Sharp EL-9900 Calculator Key pad for the Sharp EL-9900 Calculator Sharp Graphing Calculator Step Sharp Corporation OSAKA, Japan