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I have a given line R defined by an angle α. R goes through the origin of my plane. I also do have an rectangle, with known width and height. The rectangle has its bottom left corner on the origin.

A new line, parallel to R, is defined by a distance L from R (take A, B, and C as examples). I would like to find out the points where the new line intersects the rectangle (like P1 and P2 for the line A, P3 and P4 for B, and P5 and P6 for C).

What is the best way to find it?

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The best way is probably math.stackexchange.com :) –  sth Aug 26 '10 at 14:28
    
How is L defined for each side of R? Can R have a negative slope or is alpha always 0-90 degrees? –  phkahler Aug 26 '10 at 17:25
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2 Answers

Use this page http://local.wasp.uwa.edu.au/~pbourke/geometry/lineline2d/

it gives formula for intersection of two lines. Intersect with every one of the 4 lines that make up rectangle separately, and then check that u_a (the place of intersection parametrized by a rectangle line) is between the correct bounds, to make sure that your line doesnt intersect it outside of the rectangle.

Note you'll need actual points not angles for this, but it is very easy to compute them. Line going through origin is simply (0,0)->(cos(a), sin(a))

Line x distance away from it, parallel is (0,0) + x*(sin(a),-cos(a)) -> (cos(a),sin(a)) + x*(sin(a),-cos(a))

because as you can notice, (sin(a), -cos(a)) is just a unit length vector that is perpendicular to your line, so you just add it on top of both points that form your original line.

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  1. knowing R(x) and distance L you can easily get function for B(x)
  2. rectangle can be represented as 4 lines, i.e. 4 simple functions R1(x), R2(x), R3(x), R4(x)
  3. you have to solve 4 combined equitations: {A(x);R1(x)}, {A(x);R2(x)}, etc
  4. check found intersections with lines whether they are in bounds of rectangle using rectangle's base point, width and height (and angle of inclination in general case)
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