126 CHAPTER 4 THREE IMPORTANT CROSSOVER TACTICS
In other words, if you start with z and then reciprocate, negate, translate by
1 and then reciprocate again, you will get J (z ).
Next, use this "decomposition" of J(z) plus the geometry lemma that you
proved above to show that every point z on the imaginary axis is mapped to
a circle with diameter 1 with center at 1/2. Draw a good diagram!
(c) The "converse" of (b) is true: not only does J(z) transform the Cartesian grid to
circles, it transforms certain circles to Cartesian grid lines! Verify this explicitlyfor the unit circle (circle with radius 1 centered at the origin). Show that J(z)
turns the unit circle into the vertical line consisting of all points with real partequal to 1/2. In fact, show that
( i8 )
1 1. (J
J e = 2" -2"1 cot "2'
As in (b), do this in two different ways-algebraically and geometrically. Make
sure that you show exactly how the unit circle gets mapped into this line. Forexample, it is obvious that - 1 is mapped to 1/2. What happens as you move
counterclockwise, starting from -1 along the unit circle?
Roots of Unity
The zeros of the equation y;!l = 1 are called the nth roots of unity. These numbers have
many beautiful properties that interconnect algebra, geometry and number theory. One
reason for the ubiquity of roots of unity in mathematics is symmetry: roots of unity, in
some sense, epitomize symmetry, as you will see below. (We will be assuming some
knowledge about polynomials and summation. If you are unsure about this material,
consult Chapter 5.),� •.• , .•.. --------___ ,=cos600+ isin 600