subject:"\[algogeeks\] Re\: Area of Intersection of two rectangles which can be intersecting at any angle"

Re: [algogeeks] Re: Area of Intersection of two rectangles which can be intersecting at any angle

2012-11-20 Thread shashi kant

@don thanks for the link *Shashi Kant * ***"Think positive and find fuel in failure"* http://thinkndoawesome.blogspot.com/ On Tue, Nov 20, 2012 at 10:18 PM, Don wrote: > This might be helpful too: > http://www.mathopenref.com/coordpolygonarea2.html > > > On Nov 20, 11:09 am, shashi kant wro

[algogeeks] Re: Area of Intersection of two rectangles which can be intersecting at any angle

2012-11-20 Thread Don

This might be helpful too: http://www.mathopenref.com/coordpolygonarea2.html On Nov 20, 11:09 am, shashi kant wrote: > Area of Intersection of two rectangles which can be intersecting at any > angle ...can result into a polygon. > > My solution was to find the point of intersections and then tri

[algogeeks] Re: Area of Intersection of two rectangles which can be intersecting at any angle

2012-11-20 Thread Don

It might be easier to start with the area of one rectangle and subtract off any regions which are outside of the other triangle. Don On Nov 20, 11:09 am, shashi kant wrote: > Area of Intersection of two rectangles which can be intersecting at any > angle ...can result into a polygon. > > My solut