of a vector field $x(t)$ along a curve
The curve representing the ends of the variable vector $x(t)$ ($t$ is a real variable, such as time) whose origin for all $t$ is a given fixed point $O$.
Figure: h047500a
The hodograph is a visual geometrical representation of the variation (with $t$) of the magnitude represented by the variable vector and of the rate of this change. Its direction is that of the tangent to the hodograph. For example, if the velocity of a moving point is represented by a variable vector $\mathbf{v}$, then by drawing the values of $\mathbf{v}$ at different moments of time from the origin $O$, one obtains the velocity hodograph. The magnitude describing the rate of the variation of the velocity at some point $M$, i.e. the acceleration $\mathbf{w}$ at that point, has at any point of time the direction of the tangent to the velocity hodograph at the respective point.