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# Ellipses Centered at the Origin

## Analyze ellipses with (0, 0) as center

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Ellipses Centered at the Origin

Your homework assignment is to draw the ellipse $16x^2 + 4y^2 = 144$ . Where will the foci of your graph be located?

### Guidance

The third conic section is an ellipse. Recall that a circle is when a plane sliced through a cone and that plane is parallel to the base of the cone. An ellipse is formed when that plane is not parallel to the base. Therefore, a circle is actually a more specific version of an ellipse.

By definition, an ellipse is the set of all points such that the sum of the distances from two fixed points, called foci (the plural of focus ), is constant.

#### Investigation: Drawing an Ellipse

In this investigation we will use the definition to draw an ellipse.

1. On a piece of graph paper, draw a set of axes and plot $(-2, 0)$ and $(2, 0)$ . These will be the foci.

2. From the definition, we can conclude a point $(x, y)$ is on an ellipse if the sum of the distances is always constant. In the picture, $d_1+d_2=r$ and $g_1+g_2=r$ .

3. Determine how far apart the foci are. Then, find $d_1$ and $d_2$ .

4. Determine if the point $(-2, 3)$ is on the ellipse.

Extension : Check out the website, http://schools.spsd.sk.ca/mountroyal/hoffman/MathC30/Ellipse/Ellipse.MOV to see an animation of $(x, y)$ moving around the ellipse, showing that $d_1+d_2$ remains constant.

In this concept, the center of an ellipse will be $(0, 0)$ . An ellipse can have either a vertical or horizontal orientation (see below). There are always two foci and they are on the major axis . The major axis is the longer of the two axes that pass through the center of an ellipse. Also on the major axis are the vertices , which its endpoints and are the furthest two points away from each other on an ellipse. The shorter axis that passes through the center is called the minor axis , with endpoints called co-vertices . The midpoint of both axes is the center.

Equation of an Ellipse, Centered at the Origin
$\frac{x^2}{a^2}+ \frac{y^2}{b^2}=1$

HORIZONTAL

major axis is the $x$ -axis with length $2a$ .

minor axis is the $y$ -axis with length $2b$ .

$\frac{x^2}{b^2}+ \frac{y^2}{a^2}=1$

VERTICAL

major axis is the $y$ -axis with length $2a$ .

minor axis is the $x$ -axis with length $2b$ .

Other Important Facts

• $a$ is ALWAYS greater than $b$ . If they are equal, we have a circle.
• The foci, vertices, and co-vertices relate through a version of the Pythagorean Theorem: $c^2=a^2-b^2$

#### Example A

Find the vertices, co-vertices, and foci of $\frac{x^2}{64}+ \frac{y^2}{25}=1$ . Then, graph the ellipse.

Solution: First, we need to determine if this is a horizontal or vertical ellipse. Because $64 > 25$ , we know that the ellipse will be horizontal. Therefore, $a^2=64$ making $a=\sqrt{64}=8$ and $b^2=25$ , making $b=\sqrt{25}=5$ . Using the pictures above, the vertices will be $(8, 0)$ and $(-8, 0)$ and the co-vertices will be $(0, 5)$ and $(0, -5)$ .

To find the foci, we need to use the equation $c^2=a^2-b^2$ and solve for $c$ .

$c^2&=64-25=39 \\c&=\sqrt{39}$

The foci are $\left(\sqrt{39},0\right)$ and $\left(- \sqrt{39},0\right)$ .

To graph the ellipse, plot the vertices and co-vertices and connect the four points to make the closed curve.

#### Example B

Graph $49x^2+9y^2=441$ . Identify the foci.

Solution: This equation is not in standard form. To rewrite it in standard form, the right side of the equation must be 1. Divide everything by 441.

$\frac{49x^2}{441}+ \frac{9y^2}{441}&= \frac{441}{441} \\\frac{x^2}{9}+ \frac{y^2}{49}&=1$

Now, we can see that this is a vertical ellipse, where $b=3$ and $a=7$ .

To find the foci, use $c^2=a^2-b^2$ .

$c^2&=49-9=40 \\c&=\sqrt{40}=2\sqrt{10}$

The foci are $\left(0,2\sqrt{10}\right)$ and $\left(0,-2\sqrt{10}\right)$ .

#### Example C

Write an equation for the ellipse with the given characteristics below and centered at the origin.

a) vertex: $(-6, 0)$ , co-vertex: $(0, 4)$

b) vertex: $(0, 9)$ , focus: $(0, -5)$

Solution: In either part, you may wish to draw the ellipse to help with orientation.

For part a, we can conclude that $a=6$ and $b=4$ . The ellipse is horizontal, because the larger value, $a$ , is the $x$ -value of the vertex. The equation is $\frac{x^2}{36}+ \frac{y^2}{16}=1$ .

For part b, we know that $a=9$ and $c=5$ and that the ellipse is vertical. Solve for $b$ using $c^2=a^2-b^2$

$5^2&=9^2-b^2 \\25&=81-b^2 \\b^2&=56 \rightarrow b=2\sqrt{14}$

The equation is $\frac{x^2}{56}+ \frac{y^2}{81}=1$

Intro Problem Revisit This equation is not in standard form. To rewrite it in standard form, the right side of the equation must be 1. Divide everything by 144.

$\frac{16x^2}{144}+ \frac{4y^2}{144}&= \frac{144}{144} \\\frac{x^2}{9}+ \frac{y^2}{36}&=1$

Now, we can see that this is a vertical ellipse, where $b=3$ and $a=6$ .

To find the foci, use $c^2=a^2-b^2$ .

$c^2&=36-9=27 \\c&=\sqrt{27}=3\sqrt{3}$

The foci are therefore $\left(0,3\sqrt{3}\right)$ and $\left(0,-3\sqrt{3}\right)$ .

### Guided Practice

1. Find the vertices, co-vertices, and foci of $\frac{x^2}{4}+ \frac{y^2}{36}=1$ . Then, graph the equation.

2. Graph $49x^2+64y^2=3136$ and find the foci.

3. Find the equation of the ellipse with co-vertex $(0, -7)$ , focus $(15, 0)$ and centered at the origin.

1. Because the larger number is under $y^2$ , the ellipse is vertical. Therefore, $a=6$ and $b^2$ . Use $c^2=a^2-b^2$ to find $c$ .

$c^2&=6^2-2^2=36-4=32 \\c&=\sqrt{32}=4\sqrt{2}$

vertices: $(0, 6)$ and $(0, -6)$

co-vertices: $(2, 0)$ and $(-2, 0)$

foci: $\left(0,4\sqrt{2}\right)$ and $\left(0,-4\sqrt{2}\right)$

2. Rewrite $49x^2+64y^2=3136$ in standard form.

$\frac{49x^2}{3136}+ \frac{64y^2}{3136}&=\frac{3136}{3136} \\\frac{x^2}{64}+ \frac{y^2}{49}&=1$

This ellipse is horizontal with $a=8$ and $b=7$ . Find $c$ .

$c^2&=64-49=15 \\c&=\sqrt{15}$

The foci are $\left(- \sqrt{15},0\right)$ and $\left(\sqrt{15},0\right)$ .

3. Because the co-vertex is $(0, -7), b = 7$ and the ellipse is horizontal. From the foci, we know that $c = 15$ . Find $a$ .

$15^2&=a^2-7^2 \\a^2&=225+49=274 && \text{The equation is} \ \frac{x^2}{274}+ \frac{y^2}{49}=1. \\a&=\sqrt{274}$

### Vocabulary

Ellipse
The set of all points such that the sum of the distances from two fixed points, called foci , is constant.
Major Axis
The longer of the two axes that pass through the center of an ellipse.
Minor Axis
The shorter of the two axes that pass through the center of an ellipse.
Vertices
The endpoints of the major axis.
Co-vertices
The endpoints of the minor axis.
Equation of an Ellipse
If the center of an ellipse is (0, 0), the equation is $\frac{x^2}{a^2}+\frac{y^2}{b^2}=1$ or $\frac{y^2}{a^2}+\frac{x^2}{b^2}=1$ .

### Practice

Find the vertices, co-vertices, and foci of each ellipse below. Then, graph.

1. $\frac{x^2}{9}+ \frac{y^2}{16}=1$
2. $4x^2+25y^2=100$
3. $\frac{x^2}{64}+y^2=1$
4. $81x^2+100y^2=8100$
5. $\frac{x^2}{49}+ \frac{y^2}{16}=1$
6. $121x^2+9y^2=1089$

Find the equation of the ellipse, centered at the origin, with the given information.

1. vertex: $(-3, 0)$ co-vertex: $(0, 1)$
2. co-vertex: $(7, 0)$ major axis: 18 units
3. vertex: $(0, 5)$ minor axis: 4 units
4. vertex: $(0, 6)$ co-vertex: $(-2, 0)$
5. co-vertex: $(17, 0)$ focus: $(0, 17)$
6. vertex: $(4, 0)$ focus: $(-3, 0)$
7. co-vertex: $(-6, 0)$ focus: $(0, 5)$
8. focus: $(0, -9)$ minor axis: 16 units
9. Real Life Application A portion of the backyard of the White House is called The Ellipse. The major axis is 1058 feet and the minor axis is 903 feet. Find the equation of the horizontal ellipse, assuming it is centered at the origin.

### Vocabulary Language: English

Equation of an Ellipse

Equation of an Ellipse

If the center of an ellipse is (0, 0), the equation of the ellipse is of the form $\frac{x^2}{a^2}+\frac{y^2}{b^2}=1$ or $\frac{y^2}{a^2}+\frac{x^2}{b^2}=1$.
Major Axis

Major Axis

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