Complex plane

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In mathematics, the complex plane is a geometric space of the complex numbers as set up by the real axis and the orthogonal imaginary axis. It can be thought of as a modified cartesian plane, with the real part typically represented in the x-axis and the imaginary part in the y-axis.

The complex plane is sometimes called the Argand plane for its use in Argand diagrams. Its creation is generally credited to Jean-Robert Argand, although it was first described by Norwegian-Danish land surveyor and mathematician Caspar Wessel.

The concept of the complex plane allows a geometric interpretation of complex numbers. Under addition, they add like vectors, and the multiplication of complex numbers can be expressed simply using polar coordinates, where the magnitude of the product is the product of those of the terms, and the angle from the real axis of the product is the sum of those of the terms. In particular, multiplication by a complex number of magnitude 1 acts as a rotation.

Argand diagrams are frequently used to plot the positions of poles and zeros of a function in the complex plane.

Complex analysis, the theory of complex functions, is one of the richest areas of mathematics, and finds deep applications in many other areas of mathematics as well as in physics, electronics and in many other subjects.

[edit] Use of the complex plane in control theory

In control theory, one use of a complex plane is that known as the 's-plane'. It is used to visualise the roots of the equation describing a system's behaviour (the characteristic equation) graphically. The equation is normally expressed as a polynomial in the parameter 's' of the Laplace transform, hence the name 's' plane.

In addition, a related use of the complex plane is with the Nyquist stability criterion. This is a geometric principle which allows the stability of a control system to be determined from inspection of a Nyquist plot of its frequency-phase response (Transfer function) in the complex plane.

The 'z-plane' is a discrete-time version of the s-plane, where z-transforms are used instead of the Laplace transformation.