derivoiva

Derivoiva is a term used in Finnish mathematics to describe a function that is differentiable. The word derives from the verb derivoida, to differentiate. In calculus, a function f defined on an interval I is derivoiva on I if the derivative f'(x) exists for every x in I.

The derivative, when it exists, measures the instantaneous rate of change of f and is defined as

Every derivoiva function is continuous on I; however continuity does not imply derivoiva. For example f(x) =

Common derivoiva functions include polynomials, exponential, logarithmic and trigonometric functions on appropriate domains. Basic differentiation rules

In mathematical analysis, differentiability implies local linear approximation; the derivative function f' may be continuous or

The concept has wide use in physics, engineering and economics, where derivatives describe rates of change,

In Finnish mathematical education, derivoiva is the standard term for differentiable and derivative-related ideas, and it