# Finding control points for bezier curve

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Hi stackoverflow's users !

First i want to say its my first post and i've been diging straight up gold from this site and i love it and everyone out there smart enough to give out solutions.

So basically am writing a game and i have bezier curve that controls where an actor moves. Am using only 3 points (start, control1, end) and everything is fine.

Now i want to create a bezier curve that passes through a certain point (r1) at t = 0.5 . The problem being that i have my start point, my end point and my point (r1) at t=0.5, and i need to find the control point.

Sorry if i explained it badly i hope everyone can understand.

Thank you for any replies : )

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 is r1 is the mid-point (or the crest) between the start and end points of the curve? – TheDarkIn1978 May 9 '11 at 20:10 A bezier curve needs two control points. Have you merge your points together? Or do you have some other simplification? – ja72 May 9 '11 at 20:12 @ja72: ActionScript3's drawing API currently only supports bezier curves with one control point. "real" bezier curves with 2 control points is coming in Flash Player 11. – TheDarkIn1978 May 9 '11 at 20:14 @ja72: of course, that's only if you're using the drawing API and not rolling your own curves. – TheDarkIn1978 May 9 '11 at 20:30 yes, r1 is the midpoint, you can use from 2 to n points for bezier curves if am correct – user745739 May 9 '11 at 20:40

Look into the documentation of `Asymptote` (here) which has a geometrical interpretation of the a spline. For the mid point (t=-.5) the point lies in the point m_5 below. If you are using one control point them c_0 and c_1 are coincident simplifying the math. If at (t=0.5) your y values is `y_c` and the beginning and ending values are respectively `z_0` and `z_1` then the control point is at
``````c = (8*y_c-z_0-z_1)/6
Do the same for the `x` values.
 i understand what you are saying but i cannot figure out the 8 and 6 in that equation, where did you get those ?! :/ – user745739 May 9 '11 at 20:55 from `y = z_0 (1-t)^3 + c_0 * 3*(1-t)^2*t + c_1 * 3*(1-t)*t^2 + z_1*t^3` with `c = c_0 = c_1` and `y(t=0.5)=y_c`. – ja72 May 9 '11 at 21:05