derivativet

Derivativet is a term occasionally used in mathematical literature to denote the derivative with respect to a variable t. It is not a standard or widely adopted term in mainstream calculus; more common terminology uses d/dt or D_t for the time or parameter derivative. When f is a function of t, the derivativet of f at t is the ordinary derivative df/dt = lim_{h→0} (f(t+h)-f(t))/h.

In vector-valued or multivariable contexts, the derivativet with respect to t is the derivative of f with

Properties of the derivativet carry over from standard calculus: linearity, product rule, quotient rule, and chain

Distinctions: the total derivative with respect to t accounts for all ways t influences f, while the

Applications include physics, engineering, and dynamical systems, where the rate of change with respect to a

Notes: Given its inconsistent usage, one should verify definitions in any source that uses the term derivativet.