Definition:Real Function/Two Variables

Definition
Let $S, T \subseteq \R$ be subsets of the set of real numbers $\R$.

Let $f: S \times T \to \R$ be a mapping.

Then $f$ is defined as a (real) function of two (independent) variables.

The expression:


 * $z = \map f {x, y}$

means:
 * (The dependent variable) $z$ is a function of (the independent variables) $x$ and $y$.