Chapter 4 calculations with complex numbers, Definitions, Setting the calculator to complex mode – HP 49g+ User Manual

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Chapter 4
Calculations with complex numbers

This chapter shows examples of calculations and application of functions to
complex numbers.

Definitions

A complex number z is a number written as z = x + iy, where x and y are
real numbers, and i is the imaginary unit defined by i

2

= -1. The complex

number x+iy has a real part, x = Re(z), and an imaginary part, y = Im(z).
We can think of a complex number as a point P(x,y) in the x-y plane, with the
x-axis referred to as the real axis, and the y-axis referred to as the imaginary
axis. Thus, a complex number represented in the form x+iy is said to be in its
Cartesian representation. An alternative Cartesian representation is the
ordered pair z = (x,y). A complex number can also be represented in polar
coordinates (polar representation) as z = re

i

θ

= r

⋅cosθ + i r⋅sinθ, where r =

|z| =

2

2

y

x +

is the magnitude of the complex number z, and

θ = Arg(z) =

arctan(y/x) is the argument of the complex number z. The relationship
between the Cartesian and polar representation of complex numbers is given
by the Euler formula: e

i

θ

= cos

θ + i sin θ. The complex conjugate of a

complex number z = x + iy = re

i

θ

, is

z = x – iy = re

-i

θ

. The complex

conjugate of i can be thought of as the reflection of z about the real (x) axis.
Similarly, the negative of z, –z = -x-iy = - re

i

θ

, can be thought of as the

reflection of z about the origin.

Setting the calculator to COMPLEX mode

When working with complex numbers it is a good idea to set the calculator to
complex mode, use the following keystrokes:

H)@@CAS@ 2˜˜™@ @CHK@

The COMPLEX mode will be selected if the CAS MODES screen shows the
option _Complex checked off, i.e.,