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Given two collinear line segments AB and CD, how do I find if they overlap? How do I locate the start and end points of the overlap?

Below is the approach I am using. I am first ensuring that A < B and C < D.

if(pa < pc){
  if(pc < pb){
    if(pd < pb){
      //  overlap exists; CD falls entirely within AB
    }
    else {
      //  overlap exists; CB is the overlapping segment
    }
  }
  else {
    //  no overlap exists; AB lies before CD
  }
}
else {
  if(pa < pd){
    if(pb < pd){
      //  overlap exists; AB lies entirely within CD
    }
    else {
      //  overlap exists; AD is the overlapping segment
    }
  }
  else {
    //  no overlap exists; CD lies before AB
  }
}

Now, isn't there a simpler solution to do this?

Update:there is another way... compare the sum of the lengths of both segments with the distance between the outermost points. If the latter is the lesser, overlap exists.

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2 Answers 2

up vote 2 down vote accepted

Ensure A<B, C<D:

if (pb - pc >= 0 and pd - pa >=0 ) { // overlap
    OverlapInterval = [ max(pa, pc), min(pb, pd) ] // it could be a point [x, x]
} // else: not overlap

best regards

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Brilliant! Welcome to SO!! –  Agnel Kurian Apr 4 '13 at 16:28
    
Thank you. It's fun. –  Edoot Apr 4 '13 at 19:24

Ensure A<B, C<D, and A<=C (which you can do by simple swapping). Then:

  • if B<C, the segments are disjoint
  • if B=C, then the intersection is the single point B=C
  • if B>C, then the intersection is the segment [C, min(B, D)]
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Whqat do you mean with A < B? by means of A.x and B.x? for equal x who can you ensure that? –  AlexWien Nov 13 '14 at 21:32

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