tiderivater

Tiderivater, or time derivatives, are derivatives of quantities with respect to time. In mathematics and physics, the time derivative of a quantity q(t) measures how q changes as time progresses. The most common notation is the derivative with respect to t, written as dq/dt. In physics, time derivatives are often shown using a dot notation: ẋ for dx/dt, ẍ for d^2x/dt^2, and higher derivatives as x^(n)(t) or with successive dots.

A fundamental example is kinematics: for a particle with position x(t), the velocity is v = dx/dt =

Time differentiation is a linear operator, obeying rules such as the product rule d/dt(fg) = f' g +

Applications of tiderivater span many fields. In physics and engineering, they describe motion and dynamic systems