(i) Using the formula for the absolute value of a complex number we have
x + iy = |x + iy|
⇒ x + iy = \(\sqrt{x^2 + y^2}\)
⇒ x = \(\sqrt{x^2 + y^2}\) and y = 0.
Since y = 0 the equation x = \(\sqrt{x^2 + y^2}\) implies x = \(\sqrt{x^2}\) which implies x ≥ 0. Therefore, this equation is satisfied by
x ≥ 0, y = 0.
(ii) We compute
\(\frac {x + iy}{x - iy} = x - iy\)
⇒ x + iy = (x - iy)2
⇒ x + iy = x2 - y2 - 2(xy)i.
This gives us two equations (since the real parts and imaginary parts must be equal),
x = x2 - y2,
y = -2xy
If y ≠ 0 then from the second equation we have
\(x = - \frac 12\)
⇒ \(- \frac 12 = (- \frac 12)^2 - y^2\)
⇒ \(y = \frac {\sqrt 3}2\)
If y = 0 then we have x = x2 so x = 0 or x = 1. But, x = 0 is not impossible since then \(\frac {x + iy}{x - iy} \) is undefined. Therefore we have two possibilities
x = 1, y = 0 or
x = \(- \frac 12\), y = \(\frac{\sqrt 3}2\)
(iii) Here we note that
Therefore, we have
Therefore, from the given equation we have
x + iy = 1
⇒ x = 1, y = 0.
