10.2 Parabolas

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Title: 10.2 Parabolas

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10.2 Parabolas
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Objective

To determine the relationship between the
equation of a parabola and its focus, directrix,
vertex, and axis of symmetry.
To graph a parabola

3
Definition

A set of points equidistant from a fixed point
(focus) and a fixed line (directrix).

The midpoint between the focus and the directrix
is called the vertex.
The line passing through the focus and the vertex
is called the axis of the parabola.
A parabola is symmetric with respect to its axis.

p is the distance from the vertex to the focus
and from the vertex to the directrix.

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Vertical
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If p gt 0 opens up, if p lt 0 opens down
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Horizontal parabola
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General Form
If p gt 0 opens right, if p lt 0 opens left
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Example 1

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Example2Finding the Focus of a Parabola

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Example 3Finding the Standard Equation of a
Parabola

Find the standard form of the equation of the
parabola with vertex (1, 3) and focus (1, 5)

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Example 4

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Application

A line segment that passes through the focus of a
parabola and has endpoints on the parabola is
called a focal chord. The focal chord
perpendicular to the axis of the parabola is
called the latus retum.

A line is tangent to a parabola at a point on the
parabola if the line intersects, but does not
cross, the parabola at the point.
Tangent lines to parabolas have special
properties related to the use of parabolas in
constructing reflective surfaces.

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Reflective Property of a Parabola

The Tangent line to a parabola at a point P makes
equal angles with the following two line
The line passing through P and the focus
The axis of the parabola.

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Example 5Finding the Tangent Line at a point on
a Parabola