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Conic Sections. How to identify and graph them. Identifying Conic Sections. A quadratic relationship is a relation specified by an equation or inequality of the form: Ax 2 +Bxy + Cy 2 + Dx + Ey + F = 0 Where A, B, C, D, E, & F are constants.
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Conic Sections How to identify and graph them.
Identifying Conic Sections • A quadratic relationship is a relation specified by an equation or inequality of the form: Ax2 +Bxy + Cy2 + Dx + Ey + F = 0 Where A, B, C, D, E, & F are constants. • The following information assumes that B=0. Therefore there is no xy-term. • To IDENTIFY what conic section you have: Look at the coefficients of x2 and y2.
There are five types of conic sections you need to worry about.
Circles • The coefficients of x2 and y2 have the same sign and same value. • An example of a circle is x2 + y2 = 16. • In this example x2 and y2 have coefficients equal to positive 1.
Ellipses • The coefficients of x2 and y2 have the same sign but different values. • An example of an ellipses is 9x2 + 25y2 = 225 • In this example the coefficient of x2 is positive 9. The coefficient of y2 is positive 25.
Hyperbolas • The coefficients of x2 and y2 have different signs and different values. • An example of a hyperbola is 16x2 - 9y2 = 144 • In this example the coefficient of x2 is positive 16. The coefficient of y2 is negative 9.
Parabolas Parabolas are “special” conic sections. There are two types parabolas that you will need to graph.
Y-Direction Parabolas • Y-Direction Parabolas open in the y-direction. • Y-Direction Parabolas are defined by the general formula y = ax2 + bx + c • An example of a Y-Direction Parabola is: y = 2x2+4x-3
X-Direction Parabolas • X-Direction Parabolas open in the x-direction. • X-Direction Parabolas are defined by the general formula x = ay2 + by + c • An example of a X-Direction Parabola is: x = 4y2+yx-2