I need an equation to find point F. Point A, B, and D are known. Point F is unknown. Point F is on line AB. Line AB is perpendicular to line DF. What is the equation for F?
I'm assuming you want something computationally fast, since you mention 'collision', and this is Stack Overflow. First, a diagram: We want to calculate the components of AF, which we'll label f = qi + pj. AFD forms a triangle, so we can get the length of f from AD, which we'll label d. Let's mark lengths in italics versus vectors in bold: f = d cos(θ). But trig is computationally expensive. So let's use the fact that the vector dot product between b (AB) and d is: b · d = b d cos(θ) The angle is the same because AF and AB are on the same line. Substituting in for dcos(θ): b · d = b f f = (b · d) / b Now we have f, but we want its components p and q. Calling the angle to the horizontal φ: q = f cos(φ) p = f sin(φ) But again we're avoiding trig. We know that f is along b, so f = kb, and in fact using the unit vector in the direction of b: f = f (b/b) Substituting our expression for f: f = [(b · d) / b ] (b/b) = [(b/ b) · d ] (b/b) = [b · d] b / (b^{2}) Defining a factor k which is common to both components: k = (b_{x} d_{x} + b_{y} d_{y}) /b^{2} By keeping the b^{2} separate, we can avoid a square root operation to get the unit vector along b Our components, then: q = k b_{x} p = k b_{y} Finally, add back in the offset of point A. Fx = Ax + q Fy = Ay + p So, the pseudo code:
No square root calls, no trig, 8 additions/subtractions, 6 multiplications, 1 division. The only instabilities I can see are: divide by zero when A and B are at the same position, possible overflow calculating 


You haven't specified exactly where point F is along line DF, so there's no single answer. If you're just trying to find SOME point along a line perpendicular to line AB, from point D, then
will work. 


First, find the slope of line AB with the pointslope formula using A and B's coordinates: Point Slope Formula You can then find b to finished the equation for line AB:
The slope of line DF would be the negative reciprocal of the slope of line AB. Plug this into the equation: y = mx + b where m is the negative reciprocal of the slope of line AB and b comes later. Now, solve for b using the x and y values of point D, and plug that into the equation. You should now have an equation for line DF and another equation for line AB. Now solve for the intercept of the two equations by setting them equal to one another and solving for x first and then plugging in x and finding y. Here's an example. A = (1, 2). B = (4, 8). D = (2, 5). Line AB:
Line DF:
Intersection of AB and DF (i.e. coordinates of point F)


