la4
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Conic Sections The Problem We all know how to sketch the graph of an ellipse or hyperbola given an equation such as x 2 + 2y 2 + 4x + 12y + 6 = 0 by completing the square, finding the center of the ellipse, plotting the vertices and sketching the graph. If you forgot this process click here. The goal of this discussion is to be able to sketch a conic section given by ax 2 + 2bxy + cy 2 + dx + ey + f = 0 The fact that there is an xy term here poses the challenge. We will look at the example Our goal is to graph this conic. At this point, we do not even know if it is a hyperbola, ellipse, or circle. The type will come out soon enough. The Solution The key to solving this is to realize this as a matrix equation: x T Ax + Bx + f = 0 Where A is a 2 x 2 matrix, B is a 1 x 2 matrix and x T = (x,y). For our example we have Next we diagonalize the matrix A. Since the matrix is symmetric, it can be orthogonally diagonalized. The eigenvalues are 7 and 2. We can check that the diagonalization is given by A = PDP T or Conic Sections http://ltcconline.net/greenl/courses/203/MatrixOnVectors... 1 of 4 Saturday 23 August 2014 07:08 PM
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Conic SectionsThe ProblemWe all know how to sketch the graph of an ellipse or hyperbola given an equationsuch as
x2 + 2y2 + 4x + 12y + 6 = 0by completing the square, nding the center of the ellipse, plotting the vertices andsketching the graph. If you forgot this process click here. The goal of this discussionis to be able to sketch a conic section given by ax2 + 2bxy + cy2 + dx + ey + f = 0The fact that there is an xy term here poses the challenge. We will look at theexample
Our goal is to graph this conic. At this point, we do not even know if it is a hyperbola,ellipse, or circle. The type will come out soon enough.
The SolutionThe key to solving this is to realize this as a matrix equation: xTAx + Bx + f = 0Where A is a 2 x 2 matrix, B is a 1 x 2 matrix and xT = (x,y). For our example wehave
Next we diagonalize the matrix A. Since the matrix is symmetric, it can be orthogonally diagonalized. Theeigenvalues are 7 and 2. We can check that the diagonalization is given by
A = PDPTor
Conic Sections http://ltcconline.net/greenl/courses/203/MatrixOnVectors...
1 of 4 Saturday 23 August 2014 07:08 PM
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We can write
xTAx = xTPDPTx = (PTx)TD(PTx)and let
y = PTx or x = PyThat is
and
So that
We can put this all together to get
7x'2 + 2y'2 + 6x' +8y' - 2/7 = 0Completing the square gives
7(x' + 3/7)2 + 2(y' + 2)2 = 9This is the ellipse centered at (-3/7, -2) in the (x', y') coordinate system. with
a = 3 / b = 3 /
Conic Sections http://ltcconline.net/greenl/courses/203/MatrixOnVectors...
2 of 4 Saturday 23 August 2014 07:08 PM
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The effect of the change of coordinates is a rotation of the graph by an angle of arctan(-2) = -1.1
The value of -2 was obtained by finding P21/P11. The graph is shown below.
Eigenvalues and Types of ConicsIn algebra, we learn how to identify conics. If the signs are opposite then we get ahyperbola and if the signs are alike, but the coecients are dierent, we get anellipse. If the signs are the same, we get a circle. If there is an absence of a squaredterm, then we have a parabola. We have a similar classication system for ourrotated conics.TheoremLet xTAx + Bx + f = 0be a conic and let s = l1 l2then
Conic Sections http://ltcconline.net/greenl/courses/203/MatrixOnVectors...
3 of 4 Saturday 23 August 2014 07:08 PM
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If A is the zero matrix, we have a line. OtherwiseIf s < 0 the conic is a hyperbolaIf s > 0 then we get an ellipse (possibly degenerate) that is a circle ifthe eigenvalues are equal.If s = 0 then we get a parabola
Back to the Vectors Home PageBack to the Linear Algebra Home PageBack to the Math Department Home Pagee-mail Questions and Suggestions
Conic Sections http://ltcconline.net/greenl/courses/203/MatrixOnVectors...
4 of 4 Saturday 23 August 2014 07:08 PM
