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Title: Today in Precalculus


1
Today in Precalculus
  • Notes Conic Sections - Ellipses
  • Homework
  • Go over quiz

2
Ellipses
  • Definition An ellipse is the set of all points
    in a plane whose distances from two fixed points
    have a constant sum. The fixed points are the
    foci (F). The line through the foci is the focal
    axis. The point on the focal axis midway between
    the two foci is the center (C). The points on
    the ellipse that intersect with the focal axis
    are the vertices (V).

F2
V
F1
C
V
focal axis
3
Ellipses
  • Standard form for the equation of an ellipse
    centered at the origin with the x-axis as its
    focal axis is
  • There is a pythagorean relationship between a,b,
    and c
  • c2 a2 b2 (Note the change in the sign
    between a and b)

(0,b)
F1(-c,0)
F2(c,0)
(-a,0)
(a,0)
C(0,0)
(0,-b)
4
  • A line segment with endpoints on an ellipse is a
    chord of the ellipse.
  • The chord lying on the focal axis is the major
    axis of the ellipse and has a length of 2a.
  • The value for a is the semimajor axis.
  • The chord through the center perpendicular to the
    focal axis is the minor axis of the ellipse and
    has a length of 2b.
  • The value of b is the semiminor axis

5
  • An ellipse centered at the origin with the y-axis
    as its focal axis has the form
  • So when looking at the equation of an ellipse the
    variable with the larger denominator will be the
    focal axis.

6
Ellipses with center (0,0)
Standard Equation
Focal axis x-axis y-axis
Foci (c, 0) (0, c)
Vertices (a, 0) (0, a)
Semimajor axis a a
Semiminor axis b b
Pythagorean relation c2 a2 b2 c2 a2 b2
7
Example 1
  • Find the vertices and foci of the ellipse 4x2
    8y2 64
  • Vertices (-4, 0), (4, 0)
  • c2 16 8 8
  • c 2.8
  • Foci (-2.8, 0), (2.8,0)

8
Example 2
  • Find an equation of the ellipse with foci (0, -3)
    and (0,3) whose minor axis has length 4.
  • From the foci c 3 and focal axis is y-axis
  • 2b 4
  • b 2
  • 32 a2 22
  • 9 a2 4
  • 13 a2

9
Sketching an ellipse
  • Vertices (0, -3.6), (0, 3.6) Points on minor
    axis (-2, 0), (2,0)

10
Graphing an ellipse
  • Just as with the parabolas, must solve the
    equation for y

11
Homework
  • Page 653 1, 2, 5, 6, 12, 14, 18, 22-30even
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