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Complex Numbers and Transformations of the Plane

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Title: Complex Numbers and Transformations of the Plane


1
Complex Numbers and Transformations of the Plane
  • Lesson
  • 9.4

2
Definitions
  • Distance between complex numbers
  • The distance between two complex numbers z and w
    is z w
  • A transormation T of the plane is an isometry iff
    z w T(z) T(w)

3
Definitions
  • Complex Number Transformation Theorem
  • 1. The translation Ta,b a units horizontally and
    b units vertically can be expressed as
    Tabi z ? z a bi
  • 2. The reflection over the real axis is
  • rR z ? z
  • 3. The rotation R? of mag. ? about the origin can
    be expressed as R? z ? (cos ? i sin ?) z
  • 4. The size change of Sk of mag k and centered at
    the origin can be expressed as Sk z ? k z

4
Isometry Theorem
  • The transformation T is an isometry iff there
    exist complex numbers c and d with c 1 st
  • T(z) cz d (direct isometry)
  • T(z) cz d (opposite isometry)

5
Plain and Simple
  • It is an isometry if it is only a translation,
    rotation, and/or reflection.
  • It cannot be an isometry if there is a scale
    change.
  • Isometry
  • Direct Indirect
  • Translation rotation reflection glide
    reflection

6
Example 1
  • Find a formula for the congruence transformation
    T that maps black onto blue
  • rotation across imaginary axis
  • real 0, im down 5
  • - z - 5i

7
Example 2
  • Find a formula that maps PQR (with P 1, Q
    2 i, R 4 i) onto PQR (with P -1, Q
    -2 i , R -4 i).
  • rotation 180
  • z(cos 180 i sin 180)
  • - z

8
Example 3
  • Describe the transformation with the given rule
    as a composite of rotations, reflections, or
    translations.
  • iz 3 5i
  • T3-5i ? Rp/2 ? rR

9
Homework
  • Page 545
  • 1 - 9
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