I have the X,Y of 2 end points and 1 bezier point, of a Quadratic Bezier curve.
Using this data, how can I derive the polynomial representation of the curve?
I have the X,Y of 2 end points and 1 bezier point, of a Quadratic Bezier curve. Using this data, how can I derive the polynomial representation of the curve? 


B(t) = (1t) * (1t) * B0 + 2 * (1t) * t * B1 + t * t * B2 


Oog. That would be tricky. Beziers are parametrized curves, namely:
where t=0 yields one endpoint and t=1 yields the other. You could technically figure out how to eliminate "t" and get an equation in x and y, but it would not be a polynomial like y = a + bx + cx^{2} ...; it would be an equation h(x,y) = 0 where h is probably somewhat ugly. 


Wikipedia has a section about this. Perhaps this helps. 

