How can I tell whether a circle and a rectangle intersect in 2D Euclidean space? (i.e. classic 2D geometry)
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Your insight is good, but it can be simplified.
Note that this does not require the rectangle to be axisparallel. With that insight, something like the following will work, where the circle has centre
If you're writing any geometry you probably have the above functions in your library already. Otherwise,
And The cool thing is that the same idea works not just for rectangles but for the intersection of a circle with any simple polygon — doesn't even have to be convex! 


Here is how I would do it:
Here's how it works:



Here is another solution that's pretty simple to implement (and pretty fast, too). It will catch all intersections, including when the sphere has fully entered the rectangle.
With any decent math library, that can be shortened to 3 or 4 lines. 


your sphere and rect intersect IIF P1 = [x1,y1] P2 = [x2,y2] Distance = sqrt(abs(x1  x2)+abs(y1y2)) pointline distance: L1 = [x1,y1],L2 = [x2,y2] (two points of your line, ie the vertex points) P1 = [px,py] some point Distance d = abs( (x2x1)(y1py)(x1px)(y2y1) ) / Distance(L1,L2)
you project the point on lines parallel to the sides of your rect and can then easily determine if they intersect. if they intersect not on all 4 projections, they (the point and the rectangle) can not intersect. you just need the innerproduct ( x= [x1,x2] , y = [y1,y2] , x*y = x1*y1 + x2*y2 ) your test would look like that: //rectangle edges: TL (top left), TR (top right), BL (bottom left), BR (bottom right) //point to test: POI seperated = false for egde in { {TL,TR}, {BL,BR}, {TL,BL},{TRBR} }: // the edges D = edge[0]  edge[1] innerProd = D * POI Interval_min = min(D*edge[0],D*edge[1]) Interval_max = max(D*edge[0],D*edge[1]) if not ( Interval_min ≤ innerProd ≤ Interval_max ) seperated = true break // end for loop end if end for if (seperated is true) return "no intersection" else return "intersection" end if this does not assume an axisaligned rectangle and is easily extendable for testing intersections between convex sets. 


This is the fastest solution:
Note the order of execution, and half the width/height is precomputed. Also the squaring is done "manually" to save some clock cycles. 


Here's my C code for resolving a collision between a sphere and a nonaxis aligned box. It relies on a couple of my own library routines, but it may prove useful to some. I'm using it in a game and it works perfectly.



Here is the modfied code 100% working:
Bassam Alugili 


The simplest solution I've come up with is pretty straightforward. It works by finding the point in the rectangle closest to the circle, then comparing the distance. You can do all of this with a few operations, and even avoid the sqrt function.
And that's it! The above solution assumes an origin in the upper left of the world with the xaxis pointing down. If you want a solution to handling collisions between a moving circle and rectangle, it's far more complicated and covered in another answer of mine. 


To visualise, take your keyboard's numpad. If the key '5' represents your rectangle, then all the keys 19 represent the 9 quadrants of space divided by the lines that make up your rectangle (with 5 being the inside.) 1) If the circle's center is in quadrant 5 (i.e. inside the rectangle) then the two shapes intersect. With that out of the way, there are two possible cases: a) The circle intersects with two or more neighboring edges of the rectangle. b) The circle intersects with one edge of the rectangle. The first case is simple. If the circle intersects with two neighboring edges of the rectangle, it must contain the corner connecting those two edges. (That, or its center lies in quadrant 5, which we have already covered. Also note that the case where the circle intersects with only two opposing edges of the rectangle is covered as well.) 2) If any of the corners A, B, C, D of the rectangle lie inside the circle, then the two shapes intersect. The second case is trickier. We should make note of that it may only happen when the circle's center lies in one of the quadrants 2, 4, 6 or 8. (In fact, if the center is on any of the quadrants 1, 3, 7, 8, the corresponding corner will be the closest point to it.) Now we have the case that the circle's center is in one of the 'edge' quadrants, and it only intersects with the corresponding edge. Then, the point on the edge that is closest to the circle's center, must lie inside the circle. 3) For each line AB, BC, CD, DA, construct perpendicular lines p(AB,P), p(BC,P), p(CD,P), p(DA,P) through the circle's center P. For each perpendicular line, if the intersection with the original edge lies inside the circle, then the two shapes intersect. There is a shortcut for this last step. If the circle's center is in quadrant 8 and the edge AB is the top edge, the point of intersection will have the ycoordinate of A and B, and the xcoordinate of center P. You can construct the four line intersections and check if they lie on their corresponding edges, or find out which quadrant P is in and check the corresponding intersection. Both should simplify to the same boolean equation. Be wary of that the step 2 above did not rule out P being in one of the 'corner' quadrants; it just looked for an intersection. Edit: As it turns out, I have overlooked the simple fact that #2 is a subcase of #3 above. After all, corners too are points on the edges. See @ShreevatsaR's answer below for a great explanation. And in the meanwhile, forget #2 above unless you want a quick but redundant check. 


I created class for work with shapes hope you enjoy



Actually, this is much more simple. You need only two things. First, you need to find four orthogonal distances from the circle centre to each line of the rectangle. Then your circle will not intersect the rectangle if any three of them are larger than the circle radius. Second, you need to find the distance between the circle centre and the rectangle centre, then you circle will not be inside of the rectangle if the distance is larger than a half of the rectangle diagonal length. Good luck! 


Here's a fast oneline test for this:
This is the axisaligned case where 


This function detect collisions (intersections) between Circle and Rectangle. He works like e.James method in his answer, but this one detect collisions for all angles of rectangle (not only right up corner). NOTE: aRect.origin.x and aRect.origin.y are coordinates of bottom left angle of rectangle! aCircle.x and aCircle.y are coordinates of Circle Center!



I've a method which avoids the expensive pythagoras if not necessary  ie. when bounding boxes of the rectangle and the circle do not intersect. And it'll work for noneuclidean too:
See the full BBox and Circle code of my GraphHopper project. 


For those have to calculate Circle/Rectangle collision in Geographic Coordinates with SQL, In input it requires circle coordinates, circle radius in km and two vertices coordinates of the rectangle:



It's efficient, because:



Works, just figured this out a week ago, and just now got to testing it.



Assuming you have the four edges of the rectangle check the distance from the edges to the center of the circle, if its less then the radius, then the shapes are intersecting.


