4.2 COMPLEX NUMBERS 125Let AB be a diameter oj a circle with diameter k. Consider a right
triangle ABC with right angle at B. Let D be the point oj intersection
(D of. A) oj line AC with the circle. Then
AD.AC = k^2.
(b) Consider the transformation J(z) = _
z
_. This is a function with complex do-z - 1
main and range. Here is computer output (using Mathematica) of what J(z) does
to the domain (O:S Re (z) :s 2, - 2:S 1m (z) :s 2). The plot shows how J(z) trans
forms the rectangular grid lines. Notice that J appears to transform the rectan
gular Cartesian grid of the Gaussian plane into circles, all tangent at 1 [although
the point 1 is not in the range, nor is a neighborhood about 1, since z has to be
very large in order for J(z) to be close to 1].
Verify this phenomenon explicitly, without calculation, for the imaginary axis.Prove that the function J(z) = _
z
_ transforms the imaginary axis into a circlez-1
with center at (�, 0) and radius �. Do this two ways.
1. Algebraically. Let a point on the imaginary axis be it, where t is any real
number. Find the real and imaginary parts of JUt); i.e, put J(it) into the
form x+ yi. Then show that (x-1/2)^2 + y^2 = 1/4.
2. Geometrically. First, show that J(z) is the composition of four mappings,
in the following order:Z f---> - Z f--->-Z, zf--->z+ l, Z f---> -.
Z' Z