Concept: The derivative relates how much $f$ changes as $x$ changes

Prerequisite concepts

Understanding both difference (how far apart two values are at one time) and change (how far apart the value of a single parameter is at two different times) is necessary for understanding derivatives.

The derivative relates how much $f$ changes as $x$ changes The derivative is a ratio of small changes The derivative can be approximated by the slope of a secant line The derivative is a limit The derivative is a function The derivative of a constant is zero The derivative is a linear operator Power law The derivative at a cusp is undefined Variables can be held constant Product rule Single variable chain rule You can flip a derivative "With respect to what" matters The magnitude of the derivative at a point is the slope of a tangent line at that point

lower anchor MTH 251

The derivative relates how much $f$ changes as $x$ changes

Conceptually, a derivative can be thought of as how much one value changes as another value changes. FIXME: Representations