I am working on implementing the Jarvis algorithm (a.k.a gift wrapping). For determining if a point p1 is clockwise or counter-clockwise relative to point p2, I am using this formula: (y1-qY)(x2-qX) - (x1-qX)(y2-qY) = n where q is the vertex of the angle formed by the two points. If n < 0, point1 is clockwise of point2. If n > 0, point1 is counter-clockwise of point2.
A) If p1 = (1.5, 34.5)[yellow dot], p2 = (1, 2.4)[red dot], and q = (2.5, 2)[orange dot], then n = (34.5 - 2)(1 - 2.5) - (1.5 - 2.5)(2.4 - 2) = -48.35
B) If p1 = (6, 2.4)[blue dot] and everything else remains unchanged, then n6 = (2.4 - 2)(1 - 2.5) - (6 - 2.5)(2.4 - 2) = approximately -2.
Looking at a plot of the points, the blue dot is much more clockwise than the yellow dot (relative to red), but the formula is indicating that the yellow dot is the most clockwise point.
What am I misunderstanding?