I need to determine points of inflection (points where the curvature changes) on a 2d Bezier curve, parameterized by **t**, 0 <= **t** <= 1, if they exist. My original method was to sample along the curve, evaluating second derivatives and finding the point where the derivative's sign changes.

```
2DVector curvature1, curvature2;
for (double t = 0, t <= 1.0; t += STEP) {
curvature1 = bezier.CurvatureAt(t);
curvature2 = bezier.CurvatureAt(t + (STEP/2.0 >= 1.0 ? 0 : t + STEP/2.0));
if (isNegative(curvature1) ? isPositive(curvature2) : isNegative(curvature2)) {
inflection_point = t;
}
}
```

where CurvatureAt() is a method that evaluates the second derivative of the bezier at **t**, but as the bezier curve is a vector valued function the derivative is returned as a 2D vector (not std::vector, a 2D vector class). I dont know how to interpret "where the sign changes" for vectors. Basically i dont know how to write isNegative or isPositive in the above snippet.

are there any other ways to find points of inflection on a 2d Bezier curve?

I dont think its possible to determine a closed form solution to this problem because the Bezier can be of arbitrary degree, however please correct me if I'm wrong here.