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I know. This question was already answered but I not a mathematician and really I didn't understand the answers. I need a Cubic bezier and need to fix the 2 control points so that the total length of the curve will never change. So I need to limit the control points to certain ranges I suppose. How can I range the control points in a way that starting point is always fixed and ending point variable ?

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Cubic Bezier spline is defined by four points: P0, P1, P2, P3. Where P0 is a starting point, P1 and P2 are control points and P3 is an ending point of the curve. In general, length of linear spline P0``P1``P2``P3 is a upper bound for Bezier curve length and length of P0``P3 is a lower bound. In other words, all Bezier curves for which length P0``P1``P2``P3 is the equal, also have the same length of the Bezier curve.

Considering quadratic Bezier spline with fixed starting point P0 and ending point P2, then geometrical place for all possible P1 for fixed length Bezier curves will be an ellipse with focal points in P0 and P2.

Considering cubic Bezier spline with fixed starting point P0 and ending point P2, geometrical place for P1 and P2 for fixed length Bezier curves is not a curve any more, but a subspace. But applying additional restrictions, for example, fixing P2, will simplify it to a planar curve. This will be again an ellipse with focal points in P0 and P2.

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