Conic Sections and Parabolas

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Title: Conic Sections and Parabolas

1
Conic Sections and Parabolas

2
Conic Sections

Place two right circular cones together at their
vertex. Now connect the centers of the bases
with a line. Call this line the axis.

3
Conic Sections

Slice a cone perpendicular to the axis and you
will get a circle.
Slightly tilt the above plane and you will get an
ellipse. The plane will not intersect the base
of a cone.

4
Conic Sections

Tilt the plane further so that it intersects the
base of the cone and a parabola will result.
A plane that intersects the base of both cones
will result in a hyperbola.

5
Parabola

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

6
Axis of Symmetry

A line that passes through the focus and the
vertex of the parabola. It is the line of
symmetry for the parabola.

7
Vertex

The point where the parabola intersects its axis.
This point is midway between the focus and the
directrix.

8
Parabola Facts

9
Graphing on the Calculatory2

10
Graphing on the Calculatorx2

11
Find the Equation of the Parabola Described

12
Find the vertex, focus and directrix of each
parabola. Then graph by hand and by calc.

Use the chart to help find the three items.
When graphing, graph the three items and then
graph two points on one side of the axis of
symmetry and the two symmetric points on the
other side.

13
Write an Equation for a Parabola Given the vertex
and a point on the parabola.

Find the correct standard form for the parabola
based on how it points.
Plug the vertex in for h and k.
Plug the coordinate in for x and y.
Solve for a.
Write the equation with the a, h, and k plugged
in, and leave the x and y as x and y.

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