# Drawing a Smooth Line from Tablet Input

As the user drags their stylus across the tablet, you receive a series of coordinates. You want to approximate the pen's path with a smooth line, trailing only a few sample points behind it. How would you do this?

In other words, how would you render a nice smooth responsive line as a user draws it with their tablet? Simply connecting the dots with straight lines is not good enough. Real drawing programs do a much better job of curving the line, no matter how close or far the sample points are. Some even let you give them a number to indicate the amount of smoothing to be done, accounting for jittery pens and hands. Where can I learn to do this stuff?

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–  kervin Jan 18 '11 at 21:40

I know this is an old question but I had the same problem and I came with 2 different solutions:

• The first approach is use two resolutions: One , when the user is inserting the path points connecting them with straight lines. Two , when the user finish the stroke delete the lines and draw and spline over it. That should be smoother than the straight lines.

• The second approach it is to smooth the new points with an weighted mean of the previous sampled point. So each time you get a new sampled point [x1,y1] instead of painting it directly you take the previous sampled point [x2,y2] and create a new intermediate point ith the weighted mean of the two points. The pseudocode could be something like:

newPoint = [x1,y1]; oldPoint = [x2,y2];

point2Paint = [(x1*0.3) + (x2*0.7), (y1*0.3) + (y2*0.7)]; oldPoint= newPoint;

Being 0.7 and 0.3 the coefficients for the weighted mean ( You can change them to get your desired smoothing :)

I hope this would help

UPDATE Dec 13: Here it is an article explaining different drawing methods, there are good concepts that can be applied (edge smoothing, bezier curves, smooth joints)

http://perfectionkills.com/exploring-canvas-drawing-techniques/

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I never had to implement these (only for academic purposes), but you may want to take a look at wikipedia's interpolation article.

Extracted from the article:

interpolation is a method of constructing new data points within the range of a discrete set of known data points.

In engineering and science one often has a number of data points, as obtained by sampling or experimentation, and tries to construct a function which closely fits those data points. This is called curve fitting or regression analysis. Interpolation is a specific case of curve fitting, in which the function must go exactly through the data points.

Hope it helps.

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