MATH 1330 Section 8.2b.

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Presentation transcript:

MATH 1330 Section 8.2b

Ellipses An ellipse is the set of all points, the sum of whose distances from two fixed points is constant. Each fixed point is called a focus (plural = foci).

Basic “Vertical” Ellipse (centers at origin):

Eccentricity The eccentricity provides a numerical measure of how much the ellipse deviates from being a circle. The eccentricity e is a number between 0 and 1.

Basic “Horizontal” Ellipse:

“Diameters” in an Ellipse For ellipses, the line segment joining the vertices is called the Major Axis (length 2a) and the line segment through the center and perpendicular to the major axis with endpoints on the ellipse is called the Minor Axis (length 2b). Major Axis Minor Axis

Graphing Ellipses To graph an ellipse with center at the origin:

To graph an ellipse with center not at the origin

Popper 5: Determine which graph corresponds to the equation below: