A
parabola is the set of points in a plane that are the same distance from a given point and a given line in that plane. The given point is called the
focus, and the line is called the
directrix. The midpoint of the perpendicular segment from the focus to the directrix is called the
vertex of the parabola. The line that passes through the vertex and focus is called the
axis of symmetry (see Figure
1 .)
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Figure 1
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Two possible parabolas.
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The equation of a parabola can be written in two basic forms
-
Form 1:
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Form 2:
In Form 1, the parabola opens vertically. (It opens in the “
y” direction.) If
a > 0, it opens upward. Refer to Figure
1 (a). If
a < 0, it opens downward. The distance from the vertex to the focus and from the vertex to the directrix line are the same. This distance is
A parabola with its vertex at (
h,
k), opening vertically, will have the following properties.
In Form 2, the parabola opens horizontally. (It opens in the “
x” direction.) If
a > 0, it opens to the right. Refer to Figure
1 (b). If
a < 0, it opens to the left.
A parabola with its vertex at (
h,
k), opening horizontally, will have the following properties.
Example 1: Draw the graph of
. State which direction the parabola opens and determine its vertex, focus, directrix, and axis of symmetry.
The equation
can be written as
so
a = 1,
h = 0, and
k = 0. Since
a > 0 and the parabola opens vertically, its direction is up (see Figure
2 ).
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Figure 2
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Properties of parabolas.
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Vertex:
Focus:
Directrix:
Axis of symmetry:
x = h
x = 0
Example 2: Graph
State which direction the parabola opens and determine its vertex, focus, directrix, and axis of symmetry.
The equation
is the same as
Since
a < 0 and the parabola opens horizontally, this parabola opens to the left (see Figure
3 ).
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Figure 3
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The graph of Example 7.
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Vertex:
Focus:
Directrix:
Axis of symmetry
y = k
Example 3: Put the equation
into the form
Determine the direction of opening, vertex, focus, directrix, and axis of symmetry.
Factor out the coefficient of
y2 from the terms involving
y so that you can complete the square.
Completing the square within the parentheses adds 5(9) = 45 to the right side. Add this amount to the left side to keep the equation balanced.
Subtract 45 from both sides.
Direction: opens to the right (
a > 0, opens horizontally)
Vertex:
Focus:
Directrix:
Axis of symmetry:
y = k
y = 3
Linear Sentences in One Variable
Conic Sections
.
