Examples of eccentricity in the following topics:
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- One of the most useful definitions, in that it involves only the plane, is that a conic consists of those points whose distances to some point—called a focus—and some line—called a directrix—are in a fixed ratio, called the eccentricity.
- The type of a conic corresponds to its eccentricity, those with eccentricity less than 1 being ellipses, those with eccentricity equal to 1 being parabolas, and those with eccentricity greater than 1 being hyperbolas.
- In the focus-directrix definition of a conic, the circle is a limiting case with eccentricity 0.
- where e is the eccentricity and l is half the latus rectum.
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- There are a number of other geometric definitions possible, one of the most useful being that a conic consists of those points whose distances to some other point (called a focus) and some other line (called a directrix) are in a fixed ratio, called the eccentricity.
- The type of a conic corresponds to its eccentricity—those with eccentricity less than 1 being ellipses, those with eccentricity equal to 1 being parabolas, and those with eccentricity greater than 1 being hyperbolas.
- In the focus-directrix definition of a conic, the circle is a limiting case with eccentricity 0.
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- The eccentricity of an ellipse tells you how stretched out the ellipse is.
- The eccentricity can be from 0 to 1.
- If the eccentricity is equal to zero, that means it is a circle.
- The eccentricity is what makes an ellipse different from a circle.
- These values are important because the equation for eccentricity is: