Complex Numbers 45are said to be square roots, for n = 3 the roots are said to be cubic roots,
for n = 4 fourth roots, and so on.Example The cubic roots of 8 are 2, -1 + v'3i, and -1 - v'3i.
When the number w is expressed in binomial form, the exact or ap-
proximate computation of its nth roots is rather difficult, except in the
case n = 2.Example To find the square roots of -4, we must determine the complex
numbers x + iy satisfying the condition
or(x+iy)^2 =-4
(x^2 -y^2 ) + 2xyi = -4 + Oi
From the definition of equality it follows that
x2 -y2 = -4 and 2xy = 0The second equation implies that x = 0 or y = 0. However, y = 0 substi-
tuted into the first equation gives x^2 = -4, which is impossible since thesquare of any real number is nonnegative. Hence x = 0, and from the first
equation we get y^2 = 4, so that y = 2 or y = -2. Thus -4 has two square
roots in the complex field: 2i and -2i.
Next consider the general problem of finding the square roots of a+ bi.
We must have
(x + iy)^2 = (x^2 - y^2 ) + 2xyi =a+ bi
Hence we obtain the systemx2 -y2 =a
2xy = bSquaring both equations and adding, we get
x4 + 2 x2y2 + y4 = a2 + b2which gives
x2 + y2 = J a2 + b2(1.12-2)
(1.12-3)(1.12-4)where the radical on the right-hand side has the usual interpretation, i.e.,
the principal (nonnegative) square root of a^2 + b2, since x^2 + y^2 2'.: 0.
Letting r = v a^2 + b^2 , we have
x2 + y2 = r (1.12-5)