# Explain - Formula to curve through a control point

I have a question regarding formula curving through a control point. As you know, HTML Canvas has `quadraticCurveTo(x1, y1, x2, y2)` with `x1 and x2` being the control point.

However when you try to draw a stroke using it, the stroke will never touch the control point.

So we have this formula:

``````x1 = xt * 2 - (x0 + x2) / 2;
y1 = yt * 2 - (y0 + y2) / 2;
``````

`(xt, yt)` = the point you want to curve through. `t` for tangent as it is 90 degrees perpendicular at that point.

This recalculates the control point position.

I got this formula from a book, however the book doesn't explain how it is been derived. I tried google around but in vain.

Anyone knows how this formula is derived?

Thanks, Venn.

Quadratic Bezier curve is described by equations:

`x(t) = x0 * (1-t)^2 + 2 * x1 * t * (1 - t) + x2 * t^2` (and similar for y(t)).

If we apply parameter value t = 1/2 (in some way - middle of the curve), we will get your formula:

`x(t=1/2) = xt = x0 * 1/4 + 2 * x1 * 1/4 + x2 * 1/4`

then

`x1/2 = xt - (x0 + x2)/4`

`x1 = 2 * xt - (x0 + x2)/2`

• Thanks for the help! This is great. – Vennsoh Mar 16 '12 at 1:45

This is called a Spline. More to the point, it appears that they are using a Bezier Curve.

• Thanks but I still don't get it how x1 = xt * 2 - (x0 + x2) / 2; y1 = yt * 2 - (y0 + y2) / 2; is being derived. – Vennsoh Mar 14 '12 at 22:03
• @Vennsoh: Edited my answer, I believe that they are using a quadratic Bezier Curve. See the derivation in the linked wiki article. – mindvirus Mar 14 '12 at 22:17