# How to check if point is in line shadow

I can't really figure out how exactly to phrase this question, so I made a crude graphic explaining what I'm trying to ask:

Given a line comprised of two points, how would I go about checking if a given point was within the area relative to the line as displayed in the image? Sorry if there is a term for this that I didn't know.

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As a side note-- this question is probably off-topic for stackoverflow :). –  DuckMaestro May 25 '13 at 4:47
I thought it may be, but due to the fact that I need this explained to me in terms of programming concepts I thought it was fair game here. –  lfnunley May 25 '13 at 4:49

Assuming your line segment points are `p1` and `p2`, and your query point is `q`:

1. Compute the line segment length `b := |p2 - p1|` and line direction (normalized) `z := (p2 - p1) / b` and

2. Compute the vector from `p1` to `q`, defined as `w := (q - p1)`.

3. Project the query point onto the infinite line by computing `q' := w dot z`. This gives you the position of the point as if it moved to the line via an orthogonal path from its original position.

4. Inspect `q`: If `q > b` then your query point is outside of the line segment shadow, past `p2`. If `q < 0` then your query point is outside of the line segment shadow, past `p1`. Otherwise, `q` is "inside".

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Thank you, this was very easy to follow. Is this code a correct implementation of this? Excuse the added complications of the graphical lib I use. EDIT: Save for the fact that I need to use the vector distance formula for line 5, which I am adding to my code now –  lfnunley May 25 '13 at 5:03
It worked! Here is the revised, working code –  lfnunley May 25 '13 at 5:15