függfelületek

Függfelületek, meaning "function surfaces" in Hungarian, refers to a type of mathematical surface that can be represented by a function of two variables, typically in the form z = f(x, y). This means that for every point (x, y) in a domain of the xy-plane, there is a unique corresponding z-value, which defines the height of the surface above or below that point. These surfaces are fundamental in multivariable calculus and are used to visualize and analyze the behavior of functions of two variables.

The graph of any function z = f(x, y) is a surface in three-dimensional Cartesian space. Common examples

Függfelületek have wide-ranging applications in various scientific and engineering disciplines. In physics, they can model potential