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Ok so lets say I have a point in an enclosed 3d space and I know its coordinates, yaw , and pitch. I'm trying continue from where my point is and continue on until I hit the border of the 3 space. Can anyone give me a little insight into developing this algorithm?

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what kind of border do you have? –  Karoly Horvath Jul 10 '11 at 22:54
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closed as off topic by marc_s, Jeff Atwood Jul 11 '11 at 11:16

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1 Answer

You'll find it much easier to work with heading (expressed as a vector) than with Euler angles.

Then your problem becomes one of finding the intersection between a ray (a line starting at your point and travelling in the direction of your heading) and the boundary of the enclosing volume.

For example, if the enclosing volume is a convex polyhedron like a cuboid, you can easily intersect the ray with each of the bounding plane (see Wikipedia, for example), and pick the one it hits first.

You probably need to give a few more details of your problem to get a more detailed answer than this.

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cool thanks! :) yea sorry my question is very confusing im not exectly great at explaining things –  darkdoughnut Jul 10 '11 at 23:19
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