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Example Questions
Example Question #1 : Conic Sections
Find the focal points of the conic below:
The first thing we want to do is put the conic (an ellipse because the x2 and the y2 terms have the same sign) into a better form i.e.Â
where (h,k) is the center of our ellipse.
We will continue by completing the square for both the x and y binomials.
First we seperate them into two trinomials:
 Â
then we pull a 27 out of the first one and a 16 out of the second
then we add the correct constant to each trinomial (being sure to add the same amount to the other side of our equation.
then we factor our trinomials and divide by 16 and 27 to get
so the center of our ellipse is (-6,3) and we calculate the distance from the focal points to the center by the equation:
Â
and we know that our ellipse is stretched in the y direction because b>a so our focal points will be c displaced from our center.Â
withÂ
our focal points areÂ
Example Question #1 : Ellipses
Find the center of this ellipse: Â
To find the center of this ellipse we need to put it into a better form. We do this by rearranging our terms and completing the square for both our y and x terms.
Â
completing the square for both gives us this.
we could divide by 429 but we have the information we need. The center of our ellipse isÂ
Example Question #2 : Conic Sections
What is the equation of the elipse centered at the origin and passing through the point (5, 0)Â with major radius 5 and minor radius 3?Â
The equation of an ellipse is
,
where a is the horizontal radius, b is the vertical radius, and (h, k) is the center of the ellipse. In this case we are told that the center is at the origin, or (0,0), so both h and k equal 0. That brings us to:
We are told about the major and minor radiuses, but the problem does not specify which one is horizontal and which one vertical. However it does tell us that the ellipse passes through the point (5, 0), which is in a horizontal line with the center, (0, 0). Therefore the horizontal radius is 5.
The vertical radius must then be 3. We can now plug these in:
Example Question #2 : Ellipses
An ellipse is centered at (-3, 2) and passes through the points (-3, 6) and (4, 2). Determine the equation of this eclipse.
The usual form for an ellipse is
,
where (h, k) is the center of the ellipse, a is the horizontal radius, and b is the vertical radius.Â
Plug in the coordinate pair:
Now we have to find the horizontal radius and the vertical radius. Let's compare points; we are told the ellipse passes through the point (-3, 6), which is vertically aligned with the center. Therefore the vertical radius is 4.
Similarly, the ellipse passes through the point (4, 2), which is horizontally aligned with the center. This means the horizontal radius must be 7.
Substitute:
Example Question #3 : Ellipses
Find the eccentricity of an ellipse with the following equation:
Start by putting this equation in the standard form of the equation of an ellipse:
, where  is the center of the ellipse.
Group the  terms together and the  terms together.
Factor out  from the  terms and  from the  terms.
Now, complete the squares. Remember to add the same amount to both sides!
Subtract  from both sides.
Divide both sides by .
Factor both terms to get the standard form of the equation of an ellipse.
Â
Recall that the eccentricity is a measure of the roundness of an ellipse. Use the following formula to find the eccentricity, .
Next, find the distance from the center to the focus of the ellipse, . Recall that when , the major axis will lie along the -axis and be horizontal and that when , the major axis will lie along the -axis and be vertical.
 is calculated using the following formula:
 for , or
 forÂ
For the ellipse in question,
Now that we have found the distance from the center to the foci, we need to find the distance from the center to the vertex.
Because , the major axis for this ellipse is vertical.  will be the distance from the center to the vertices.
For this ellipse, .
Now, plug in the distance from the center to the focus and the distance from the center to the vertex to find the eccentricity of this ellipse.
Â
Example Question #2 : Hyperbolas And Ellipses
Write the equation for an ellipse with center , foci and a major axis with length 14.
The general equation for an ellipse is , although if we consider a to be half the length of the major axis, a and b might switch depending on if the longer major axis is horizontal or vertical. This general equation has as the center, a as the length of half the major axis, and b as the length of half the minor axis.
Because the center of this ellipse is at and the foci are at , we can see that the foci are away from the center, and they are on the horizontal axis. This means that the horizontal axis is the major axis, the one with length 14. Having a length of 14 means that half is 7, so . Since the foci are away from the center, we know that . We can solve for b using the equation :
that's really as far as we need to solve.
Putting all this information into the equation gives:
Â
Example Question #1 : Ellipses
What is the equation of the ellipse given the following:
Vertices: (10,0), (-10,0)
Co-vertices: (0,7), (0,-7)
Standard equation of an ellipse:Â
Â
From the given information, the ellipse is centered around the origin (0,0), so h and k are both 0.
The coordinates of the vertices are on the x-axis, which is the major axis. The vertices are a units away from the center. Here, a = 10.
The coordinates of the co-vertices are on the y-axis, which is the minor axis. The co-vertices are b units away from the center. Here, b = 7.
Example Question #1 : Ellipses
The graph of the equationÂ
is an example of which conic section?
A vertical hyperbolaÂ
A horizontal ellipse
The equation has no graph.
A vertical ellipse
A horizontal hyperbolaÂ
A vertical ellipse
The quadratic coefficients in this general form of a conic equation are 16 and 12. They are of the same sign, making its graph, if it exists, an ellipse.Â
To determine whether this ellipse is horizontal or vertical, rewrite this equation in standard form
as follows:
Separate the  and  terms:
Distribute out the quadratic coefficients:
Complete the square within each quadratic expression by dividing each linear coefficient by 2 and squaring the quotient.
Since  and , we get
Balance this equation, adjusting for the distributed coefficients:
The perfect square trinomials are squares of binomials, by design; rewrite them as such:
Divide by 192:
The ellipse is now in standard form. , so the graph of the equation is a vertical ellipseÂ
Example Question #4 : Ellipses
Give the foci of the ellipse of the equation
Round your coordinates to the nearest tenth, if applicable.
 andÂ
None of the other choices gives the correct response.
 andÂ
 andÂ
 andÂ
 andÂ
The equation of the ellipse is given in the standard form
This ellipse has its center at the origin . Also, since , it follows that the ellipse is horizontal. The foci are therefore along the horizontal axis of the ellipse; their coordinates are , where
Substituting 46 and 19 for  and , respectively,
.
The foci are at the points  and . Â
Example Question #5 : Ellipses
Give the eccentricity of the ellipse of the equationÂ
This ellipse is in standard form
where . This is a vertical ellipse, whose foci areÂ
units from its center in a vertical direction.
The eccentricity of this  ellipse can be calculated by taking the ratio , or, equivalently, . Set  - making  - and . The eccentricity is calculated to be
.
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