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Hello, then I need to calculate the center of a circle O knowing 2 points A and B. I made a drawing because I am not able to explain in english.


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where are the two points? on opposite sides? at some known distance from each other along the edge? at unknown distances? – Brian Feb 3 '12 at 17:40
up vote 2 down vote accepted

It is impossible, You need at least 3 points to unambiguously define a circle.

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Even if the AOB angle is known to be right, you can have two circles, another one with the center in O mirrored by the AB line. – Alexander Pavlov Feb 3 '12 at 17:41
No, there's only one circle (2 in fact) that can passes by the two points because the center O is also at the same distance of A and B and the lines AO and BO are perpendicular. – Entretoize Feb 4 '12 at 7:59
That's what I said in the comment. Now, how do you need to "calculate" the center O? Are the A and B points given in cartesian coordinates? – Alexander Pavlov Feb 4 '12 at 10:16
sorry I didn't saw your comment... yes each point have an x and y coordinates.... – Entretoize Feb 4 '12 at 16:46
OK, things are more clear now. Let A=(x1,y1), B=(x2,y2), P=((x1+x2)/2,(y1+y2)/2) - the middle of AB. Obviously, O (actually, O1 and O2) belongs to a line orthogonal to AB, passing through P. Since AOB is isosceles and right, PO=PA=PB. PA=(x1-(x1+x2)/2;y1-(y1+y2)/2)=((x1-x2)/2;(y1-y2)/2). To get PO, you need a vector orthogonal to PA. To do that, you swap PA's coordinates and negate one of them (you have a choice of two negations, hence PO1 and PO2): PO1=((y1-y2)/2; (x2-x1)/2); PO2=((y2-y1)/2; (x1-x2)/2), thus O1=((x1+x2+y1-y2)/2; (y1+y2+x2-x1)/2), O2=((x1+x2+y2-y1)/2; (y1+y2+x1-x2)/2). Done. – Alexander Pavlov Feb 4 '12 at 20:08

Since you have 2 points. Randomly choose a third. Then calculate the circle center point. This solution meets the criteria of the circle going through the original 2 points.

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