Conic Sections and a New Look at Parabolas

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Conic Sections and a New Look at Parabolas Demana, Waits, Foley, Kennedy 8.1 Conic Sections and a New Look at Parabolas

What you’ll learn about Conic Sections Geometry of a Parabola Translations of Parabolas Reflective Property of a Parabola … and why Conic sections are the paths of nature: Any free-moving object in a gravitational field follows the path of a conic section.

A Right Circular Cone (of two nappes)

Conic Sections and Degenerate Conic Sections

Conic Sections and Degenerate Conic Sections (cont’d)

Second-Degree (Quadratic) Equations in Two Variables

Parabola A parabola is the set of all points in a plane equidistant from a particular line (the directrix) and a particular point (the focus) in the plane.

Graphs of x2 = 4py

Parabolas with Vertex (0,0) Standard equation x2 = 4py y2 = 4px Opens Upward or To the right or to the downward left Focus (0, p) (p, 0) Directrix y = –p x = –p Axis y-axis x-axis Focal length p p Focal width |4p| |4p|

Graphs of y2 = 4px

Example: Finding an Equation of a Parabola

Solution

Parabolas with Vertex (h,k) Standard equation (x– h)2 = 4p(y – k) (y – k)2 = 4p(x – h) Opens Upward or To the right or to the left downward Focus (h, k + p) (h + p, k) Directrix y = k-p x = h-p Axis x = h y = k Focal length p p Focal width |4p| |4p|

Example: Finding an Equation of a Parabola

Solution