Given a list of N points in the plane in general position (no three are collinear), find a new point p that is not collinear with any pair of the N original points.

We obviously cannot search for every point in the plane, I started with finding the coincidence point of all the lines that can be formed with the given points, or making a circle with them something.. I dont have any clue how to check all the points.

Question found in http://introcs.cs.princeton.edu/java/42sort/

I found this question in a renowned algorithm book that means it is answerable, but I cannot think of an optimal solution, thats why I am posting it here so that if some one knows it he/she can answer it

sayshe did work, without showing any of it. – mikołak Apr 8 '12 at 22:37