deriválhatók

Deriválhatók is a Hungarian term used in mathematics to describe objects, usually functions, that possess a derivative at a given point or on a domain. In short, a function is deriválható at a point if its derivative exists there; if this holds for every point of an interval or set, the function is deriválható on that interval or set.

For a real-valued function f defined on an interval I, f is deriválható at a point x0

Key properties include that deriválhatók are continuous at the points of differentiability, and differentiability implies a

Common examples: polynomials, exponentials, logarithms, and trigonometric functions are deriválhatók on their domains; the function f(x)

In usage, a function or a class of functions may be described as deriválhatók to indicate the