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Get Started Now- Intro Lesson7:00
- Lesson: 1a2:07
- Lesson: 1b1:47
- Lesson: 1c7:34
- Lesson: 1d2:57
- Lesson: 1e13:09
- Lesson: 1f6:16
- Lesson: 1g20:21
- Lesson: 1h2:42

hyperbola: the **difference** of the distances from any point on a hyperbola to each focus is constant and equal to the transverse axis $2a$.

ellipse: the** sum** of the distances from any point on an ellipse to each focus is constant and equal to the major axis $2a$.

$c= \sqrt{a^2 - b^2}$ $c$: distance from the center to a focus

$e= \frac{c}{a}$ $e$: eccentricity; the larger the value of $e$, the straighter the hyperbola

ellipse: the

$c= \sqrt{a^2 - b^2}$ $c$: distance from the center to a focus

$e= \frac{c}{a}$ $e$: eccentricity; the larger the value of $e$, the straighter the hyperbola

- Introduction
- 1.
**properties of a hyperbola**

$-(\frac{x-6}{4})^2 + (\frac{y+5}{3})^2=1$a)Identify the type of conic section.b)State the “center”.c)Set up the guidelines for the conic graph.d)Find the “vertices”.e)Locate the “foci”.f)Find the “eccentricity”.g)Find the equations of the “asymptotes”.h)Find the lengths of transverse axis and conjugate axis.

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