differenciálatlan

Differenciálatlan is a term used in mathematics, specifically in calculus, to describe a function that does not possess a derivative at a particular point or over an interval. A function is differentiable if its graph is smooth and continuous at that point, meaning it can be approximated by a straight line (the tangent line) with no sharp corners, cusps, or breaks.

Several conditions can lead to a function being differenciálatlan. One common reason is discontinuity. If a

Examples of differenciálatlan functions include the absolute value function at x=0, which has a sharp corner,