dFdx

dfdx is a shorthand used in calculus to denote the derivative of a function f with respect to the variable x. In standard notation this appears as df/dx or d f/dx, and it conveys the instantaneous rate at which f changes as x changes. If f is a function of a single variable x alone, df/dx is the total derivative of f with respect to x.

When f depends on several variables, the corresponding concept is the partial derivative, written ∂f/∂x, which

Common examples: if f(x) = x^2, then d f/dx = 2x. If f(x) = sin(x^2), then df/dx = cos(x^2) · 2x.

Applications span physics, engineering, economics, and beyond, where df/dx describes rates of change, slopes of graphs,

Notes and caveats: df/dx assumes f is differentiable with respect to x. It is distinct from ∂f/∂x