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Translation and Rotation of Axes

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b will be the coefficient of the y term. ... Divide both sides of the equation by the constant if you have a hyperbola or ellipse. ... – PowerPoint PPT presentation

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Title: Translation and Rotation of Axes


1
Translation and Rotation of Axes
  • 8.4

2
Solving Second Degree Equations in Two Variables
  • Use the quadratic formula to solve for y.
  • a will be the coefficient of the y2 term.
  • b will be the coefficient of the y term.
  • c will be the constant term and the terms with
    xs in them.
  • The coefficients may contain xs.
  • Just solve for y.

3
Translation of Axes Formulas
  • The coordinates (x,y) and (x, y) based on
    parallel sets of axes are related by either of
    the following translation formulas
  • x x h y y h
  • or
  • x x h y y - k

4
Completing the Square to Find a Conic Equation
  • Put the terms with variables in decreasing order
    on the left side and the constants on the right
    side of the equation.
  • Factor out the coefficient of the y2 term from
    the y2 and the y terms. Call this m.
  • In the parenthesis, add (b/2)2.
  • Now add m(b/2)2 to each side of the equation.

5
Completing the Square to Find a Conic Equation
  • Repeat for the x terms.
  • Divide both sides of the equation by the constant
    if you have a hyperbola or ellipse.
  • For a parabola, you will only need to complete
    the square once.

6
Rotation of Axes Formula
  • The coordinates (x,y) and (x, y) based on
    rotated sets of axes are related by either of the
    following rotation formulas
  • x x cos a y sin a
  • y -x sin a y cos a
  • or
  • x x cos a y sin a
  • y x sin a y cos a
  • Where a, 0ltalt pi/2, is the angle of rotation.
    Example 10 from 7.2 proves the first set of
    equations.

7
Coefficients for a Conic in a Rotated System
  • See page 670

8
Angle of Rotation to Eliminate the Cross Product
Term
  • If B ltgt 0, an angle of rotation a such that
  • Cot 2a (A C)/B and 0ltaltpi/2
  • Will eliminate the term Bxy from the second
    degree equation in the rotated xy coordinate
    system.

9
Angle of Rotation to Eliminate the Cross Product
Term
  • If B ltgt 0, an angle of rotation a such that
  • Cot 2a (A C)/B and 0ltaltpi/2
  • Will eliminate the term Bxy from the second
    degree equation in the rotated xy coordinate
    system.

10
Discriminant Test
  • The second degree equation Ax2 Bxy Cy2 Dx
    Ey F 0 graphs as
  • A hyperbola if B2 4AC gt 0
  • A parabola is B2 4AC 0
  • An ellipse if B2 4AC lt 0
  • Except for degenerate cases. Pg. 631 figure 8.2 b
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