# Draw a quadratic bezier curve through three given points

I have three points in 2D and I want to draw a quadratic bezier curve passing through them. How do I calculate the middle control point (x1 and y1 as in quadTo)? I know linear algebra from college but need some simple help on this. I don't want links to some math page or tips about some catmull rom spline library. I just need help to calculate the middle control point so that the curve passes through it as well.

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Let P0, P1, P2 be the control points, and Pc be your fixed point you want the curve to pass through.

Then the Bezier curve is defined by

``````P(t) = P0*t^2 + P1*2*t*(1-t) + P2*(1-t)^2
``````

...where t goes from zero to 1.

There are an infinite number of answers to your question, since it might pass through your point for any value of t... So just pick one, like t=0.5, and solve for P1:

``````Pc = P0*.25 + P1*2*.25 + P2*.25

P1 = (Pc - P0*.25 - P2*.25)/.5

= 2*Pc - P0/2 - P2/2
``````

There the "P" values are (x,y) pairs, so just apply the equation once for x and once for y:

``````x1 = 2*xc - x0/2 - x2/2
y1 = 2*yc - y0/2 - y2/2
``````

...where (xc,yc) is the point you want it to pass through, (x0,y0) is the start point, and (x2,y2) is the end point. This will give you a Bezier that passes through (xc,yc) at t=0.5.

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This seems to be the perfect answer with the right amount of math and text. Using 0.5 for t makes sence and I get the math now. 0.5 for t means that the middle control point will be passed "halfway", right? That is a perfect value for me. Thanks, will accept answer in a while if it solves my problem. t = 0.5 was what was missing. –  Alex Jul 15 '11 at 19:42
Yes it works and is a very simple solution. t = 0.5 was the qlue I needed. Thanks. –  Alex Jul 15 '11 at 20:04
Using t=0.5 is indeed a nice choice. It has the property that P1 is the point furthest away from the line through P0 and P2 (respectively that the tangent on the curve through P1 is parallel to the line P0 P2) –  Accipitridae Jul 16 '11 at 17:40
I don't understand how this formula, x1 = 2*xc - x0/2 - x2/2 y1 = 2*yc - y0/2 - y2/2 is derived. I asked this question on another thread, stackoverflow.com/questions/9710616/… –  Vennsoh Mar 14 '12 at 22:01
P0 and P2 are swapped. It is not a problem, it just means that P(0) equals to P2, and not to P0. –  karatedog Jan 6 at 21:04