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Ellipses

Collection of points whose sum of distances from two foci is constant.

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Ellipses

An ellipse is commonly known as an oval.  Ellipses are just as common as parabolas in the real world with their own uses.  Rooms that have elliptical shaped ceilings are called whisper rooms because if you stand at one focus point and whisper, someone standing at the other focus point will be able to hear you. 

Ellipses look similar to circles, but there are a few key differences between these shapes.  Ellipses have both an x -radius and a y -radius while circles have only one radius.  Another difference between circles and ellipses is that an ellipse is defined as the collection of points that are a set distance from two focus points while circles are defined as the collection of points that are a set distance from one center point.  A third difference between ellipses and circles is that not all ellipses are similar to each other while all circles are similar to each other.  Some ellipses are narrow and some are almost circular.  How do you measure how strangely shaped an ellipse is?

Watch This

http://www.youtube.com/watch?v=LVumLCx3fQo James Sousa: Conic Sections: The Ellipse part 1

http://www.youtube.com/watch?v=oZB69DY0q9A James Sousa: Conic Sections: The Ellipse part 2

Guidance

An ellipse has two foci.  For every point on the ellipse, the sum of the distances to each foci is constant.  This is what defines an ellipse.  Another way of thinking about the definition of an ellipse is to allocate a set amount of string and fix the two ends of the string so that there is some slack between them.  Then use a pencil to pull the string taught and trace the curve all the way around both fixed points.  You will trace an ellipse and the fixed end points of the string will be the foci.  Foci is the plural form of focus. In the picture below,   (h,k) is the center of the ellipse and the other two marked points are the foci.

The general equation for an ellipse is:

\frac{(x-h)^2}{a^2}+\frac{(y-k)^2}{b^2}=1

In this case the major axis is horizontal because a , the x -radius, is larger.  If the y -radius were larger, then a  and  b would reverse.  In other words, the coefficient  a always comes from the length of the semi major axis (the longer axis) and the coefficient  b always comes from the length of the semi minor axis (the shorter axis).

In order to find the locations of the two foci, you will need to find the focal radius represented as c  using the following relationship:

a^2-b^2=c^2

Once you have the focal radius, measure from the center along the major axis to locate the foci.   The general shape of an ellipse is measured using eccentricity.  Eccentricity is a measure of how oval or how circular the shape is. Ellipses can have an eccentricity between 0 and 1 where a number close to 0 is extremely circular and a number close to 1 is less circular.  Eccentricity is calculated by:

e=\frac{c}{a}

Ellipses also have two directrix lines that correspond to each focus but on the outside of the ellipse.  The distance from the center of the ellipse to each directrix line is \frac{a^2}{c} .

Example A

Find the vertices (endpoints of the major axis), foci and eccentricity of the following ellipse.

\frac{x^2}{25}+\frac{y^2}{16}=1

Solution: The center of this ellipse is at (0, 0).  The semi major axis is a=5  and travels horizontally.  This means that the vertices are at (5, 0) and (-5, 0).  The semi-minor axis is b=4  and travels vertically.

25-16&=c^2\\3&=c

The focal radius is 3.  This means that the foci are at (3, 0) and (-3, 0).

The eccentricity is e=\frac{3}{5}

Example B

Sketch the following ellipse.

\frac{(y-1)^2}{16}+\frac{(x-2)^2}{9}=1

Solution: Plotting the foci are usually important, but in this case the question simply asks you to sketch the ellipse.  All you need is the center, x -radius and y -radius.

Example C

Put the following conic into graphing form.

25x^2-150x+36y^2+72y-639=0

Solution:

25x^2-150x+36y^2+72y-639&=0\\25(x^2-6x)+36(y^2+2y)&=639\\25(x^2-6x+9)+36(y^2+2y+1)&=639+225+36\\25(x-3)^2+36(y+1)^2&=900\\\frac{25(x-3)^2}{900}+\frac{36(y+1)^2}{900}&=\frac{900}{900}\\\frac{(x-3)^2}{36}+\frac{(y+1)^2}{25}=1

Concept Problem Revisited

Ellipses are measured using their eccentricity.  Here are three ellipses with estimated eccentricity for you to compare.

Eccentricity is the ratio of the focal radius to the semi major axis:  e=\frac{c}{a} .

Vocabulary

The semi-major axis is the distance from the center of the ellipse to the furthest point on the ellipse.  The letter  a represents the length of the semi-major axis.

The major axis is the longest distance from end to end of an ellipse.  This distance is twice that of the semi-major axis.

The semi-minor axis is the distance from the center to the edge of the ellipse on the axis that is perpendicular to the semi-major axis.  The letter  b represents the length of the semi-minor axis.

An ellipse is the collection of points whose sum of distances from two foci is constant.

The foci in an ellipse are the two points that the ellipse curves around.

Eccentricity is a measure of how oval or how circular the shape is.  It is the ratio of the focal radius to the semi major axis:  e=\frac{c}{a} .

Guided Practice

1. Find the vertices (endpoints of the major axis), foci and eccentricity of the following ellipse.

\frac{(x-2)^2}{4}+\frac{(y+1)^2}{16}=1

2. Sketch the following ellipse.

(x-3)^2+\frac{(y-1)^2}{9}=1

3. Put the following conic into graphing form.

9x^2-9x+4y^2+12y+\frac{9}{4}=-8

Answers:

1. The center of the ellipse is at (2, -1).  The major axis is vertical which means the semi major axis is a=4 .  The vertices are (2, 3) and (2, -5).

16^2-4^2&=c^2\\4 \sqrt{15}=\sqrt{240}&=c

Thus the foci are (2, -1+4 \sqrt{15})  and (2, -1-4 \sqrt{15})

2.

3.

9x^2-9x+4y^2+12y+\frac{9}{4}&=-8\\9x^2-9x+\frac{9}{4}+4y^2+12y&=-8\\9 \left(x^2-x-\frac{1}{4}\right)+4(y^2+3y)&=-8\\9 \left(x-\frac{1}{2}\right)^2+4\left(y^2+3y+\frac{9}{4}\right)&=-8+4 \cdot \frac{9}{4}\\9 \left(x-\frac{1}{2}\right)^2+4\left(y+\frac{3}{2}\right)^2&=1\\\frac{\left(x-\frac{1}{2}\right)^2}{\frac{1}{9}}+\frac{\left(y+\frac{3}{2}\right)^2}{\frac{1}{4}}=1

Practice

Find the vertices, foci, and eccentricity for each of the following ellipses.

1. \frac{(x-1)^2}{4}+\frac{(y+5)^2}{16}=1

2. \frac{(x+1)^2}{9}+\frac{(y+2)^2}{4}=1

3. (x-2)^2+\frac{(y-1)^2}{4}=1

Now sketch each of the following ellipses (note that they are the same as the ellipses in #1 - #3).

4. \frac{(x-1)^2}{4}+\frac{(y+5)^2}{16}=1

5. \frac{(x+1)^2}{9}+\frac{(y+2)^2}{4}=1

6. (x-2)^2+\frac{(y-1)^2}{4}=1

Put each of the following equations into graphing form.

7. x^2+2x+4y^2+56y+197=16

8. x^2-8x+9y^2+18y+25=9

9. 9x^2-36x+4y^2+16y+52=36

Find the equation for each ellipse based on the description.

10. An ellipse with vertices (4, -2) and (4, 8) and minor axis of length 6.

11. An ellipse with minor axis from (4, -1) to (4, 3) and major axis of length 12.

12. An ellipse with minor axis from (-2, 1) to (-2, 7) and one focus at (2, 4).

13. An ellipse with one vertex at (6, -15), and foci at (6, 10) and (6, -14).

A bridge over a roadway is to be built with its bottom the shape of a semi-ellipse 100 feet wide and 25 feet high at the center. The roadway is to be 70 feet wide.

14. Find one possible equation of the ellipse that models the bottom of the bridge.

15. What is the clearance between the roadway and the overpass at the edge of the roadway?

Vocabulary

Conic

Conic

Conic sections are those curves that can be created by the intersection of a double cone and a plane. They include circles, ellipses, parabolas, and hyperbolas.
Eccentricity

Eccentricity

The eccentricity of a conic section is a measure of how much the conic section deviates from being circular. The eccentricity of circles is 0, the eccentricity of ellipses is between 0 and 1, the eccentricity of parabolas is 1, and the eccentricity of hyperbolas is greater than 1. For ellipses and hyperbolas, e=\frac{c}{a}.
Ellipse

Ellipse

Ellipses are conic sections that look like elongated circles. An ellipse represents all locations in two dimensions that are the same distance from two specified points called foci.
Ellipses

Ellipses

Ellipses are conic sections that look like elongated circles. An ellipse represents all locations in two dimensions that are the same distance from two specified points called foci.
Foci

Foci

The foci of an ellipse are the two points that define the ellipse. The sum of the distances from any point on the ellipse to the foci is constant.
Major Axis

Major Axis

The major axis of an ellipse is the longest diameter of the ellipse.
minor axis

minor axis

The minor axis of an ellipse is the shortest diameter of the ellipse.
semi-major axis

semi-major axis

The semi-major axis is the distance from the center of the ellipse to the furthest point on the ellipse. In the general equation of an ellipse, \frac{(x-h)^2}{a^2}+\frac{(y-k)^2}{b^2}=1, a represents the length of the semi-major axis.
semi-minor axis

semi-minor axis

The semi-minor axis is the distance from the center to the edge of the ellipse on the axis that is perpendicular to the semi-major axis. In the general equation of an ellipse, \frac{(x-h)^2}{a^2}+\frac{(y-k)^2}{b^2}=1, b represents the length of the semi-minor axis.

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