# Rectangle intersection algorithm [closed]

Hi I tried a question to check whether two rectangles intersect or not I have written code if rectangles are parallel to x-axis

``````struct point
{
int x;
int y;
};

struct rect
{
struct point left;
struct point right;
};

//1 - intersection
// 0- no intersection
int rectintersectioncheck(struct rect r1,struct rect r2)
{
int x_check = (r1.left.x > r2.right.x || r2.left.x > r1.right.x);
int y_check = (r1.right.y > r2.left.y || r2.right.y > r1.left.y);

if(x_check && y_check )
{
return 0;
}
return 1;
}
``````

its working fine for this case but i am confused for algo in case of rectangle not parallel to x-axis as only top left,right bottm points are givenn please help?

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## closed as not a real question by Shane MacLaughlin, ЯegDwight, tchrist, user97693321, GravitonSep 14 '12 at 3:13

It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center.If this question can be reworded to fit the rules in the help center, please edit the question.

If the rectangle is not parallel to X axis (or y axis), and you are given only two points (top left, bottom right) then you are screwed because there are infinitely many rectangles that fit this description. –  ElKamina Sep 12 '12 at 11:13
@ElKamina - That is not true. Those dimensions will be the extreme and therefore define the rectangle. –  Ed Heal Sep 12 '12 at 11:16
@Anshulgarg - WHo is that comment directed to? –  Ed Heal Sep 12 '12 at 11:25
@Ed Heal - If you're only given the two points, you don't know the rotation, so you still don't have sufficient information –  Shane MacLaughlin Sep 12 '12 at 11:29
@Ed, you still haven't said how you then get height an width for the rectangles, as per Goblin Alchemists diagram. If neither of the rectangles is parallel to the x axis, their relative difference in orientation does not give you this. You're still one dimension (i.e. rotation or height) short of a solution. –  Shane MacLaughlin Sep 13 '12 at 7:45

I will sketch out the answer.

1. Rotate both the rectangles so that one is in line with the x axis
2. You can then work out the formula (y=mx+c) for the edges
3. You will also know the formula for the sides of the other rectangle
4. See if any intersect.

The rotation can be performed using the link previously posed.

EDIT

Forgot translation - shift one rectangle to have 0,0 as one coordinate.

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but i don't know rotation angle as well so i have to check for every possible angle value? –  Anshul garg Sep 12 '12 at 11:32
You have two points. i.e. (x,y)*2 so use maths to work out the angle. –  Ed Heal Sep 12 '12 at 11:35
@Anshulgarg, if you don't know rotation then there is not enough source information to do anything. "Are the rectangles with unknown rotation intersecting?" The correct answer is: "I don't know". Please double-check what you really have. –  Goblin Alchemist Sep 12 '12 at 12:52
@GoblinAlchemist - but this person has two points - i.e. a straight line - quite easy to figure out the angle. I vaguely remember doing this in maths as a 14 year old! Had graph paper to do it! –  Ed Heal Sep 12 '12 at 12:57
@Ed Heal, utter nonsense. Diagonal gives you width and height if the rectangles base line is horizontal. If you use the bearing of the line for rotation, then both points lie on the base of the rectangle and you lose height, either that or you're constrained to a very small set of possible rectangles. e.g. all squares can only be rotated through 45 degrees. –  Shane MacLaughlin Sep 12 '12 at 14:57

A clarification first. If p1 and p2 are the top-left and bottom-right points of a rectangle, then the rectangle must be parallel to x axis (and y axis). So there is only exactly one rectangle satisfying these conditions. If the rectangle is not parallel to x axis, then the bottom cannot become right point simultaneously.

Since we are talking about rectangles that are not exactly parallel to x axis, let us drop that definition. Let us talk about rectangles whose two opposing vertices are p1 and p2 (not necessarily top-left and bottom-right).

Let p1 and p2 define the first rectangle, and p3 and p4 define the second rectangle.

If you take the union of all rectangle whose opposite corners are p1 and p2, you get a circle (with (p1+p2)/2 as center and |p1−p2| as diameter).

There are three cases:

1. If the p1–p2 line segment intersects the p3–p4 line segment, then the rectangles always intersect.
2. If the circle corresponding to p1,p2 intersects the circle corresponding to p3,p4, then those rectangles sometimes intersect.
3. Otherwise those rectangles never intersect.
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Please explain how circles are related to rectangles? Thanks –  Ed Heal Sep 12 '12 at 11:55
If you take the union of areas covered by all the rectangles that pass through two points (on the opposite corners) is a rectangle. –  ElKamina Sep 12 '12 at 12:06
Eh- A circle is a different shape to a rectangle. So please explain how they are related. –  Ed Heal Sep 12 '12 at 12:14
... Also you say sometimes –  Ed Heal Sep 12 '12 at 12:15
@EdHeal, please look here‌​. These rectangles have the same top left and bottom right corners. –  Goblin Alchemist Sep 12 '12 at 15:05

@ELKamina: the circle approach you discussed is quite fine, but it can be really hard to distinguish in the cases where cirles intersect but rectangles don't.

I have got his idea in mind, glad to share it.
Why don't we contruct our rectangles in array in the specific cases to find out they intersect or not.

`````` eg.  rect 1- points (1,3)(3,1)(6,4)(4,6)     rect2 points- (4,0)(5,0)(5,1)(4,1)
array represntation                                      array representation
6 [F F F F # F F F]                                      6 [F F F F F F F F]
5 [F F F # # # F F]                                      5 [F F F F F F F F]
4 [F F # # # # # F]                                      4 [F F F F F F F F]
3 [F # # # # # F F]                                      3 [F F F F F F F F]
2 [F F # # # F F F]                                      2 [F F F F F F F F]
1 [F F F # F F F F]                                      1 [F F F F # # F F]
0 [F F F F F F F F]                                      0 [F F F F # # F F]
0 1 2 3 4 5 6 7                                          0 1 2 3 4 5 6 7
``````

in the above case circles intersect but rectangles don't.

``````eg
g. rect 1- points (1,3)(3,1)(6,4)(4,6)     rect2 points- (3,0)(4,0)(3,1)(4,1)
array represntation                                      array representation
6 [F F F F # F F F]                                      6 [F F F F F F F F]
5 [F F F # # # F F]                                      5 [F F F F F F F F]
4 [F F # # # # # F]                                      4 [F F F F F F F F]
3 [F # # # # # F F]                                      3 [F F F F F F F F]
2 [F F # # # F F F]                                      2 [F F F F F F F F]
1 [F F F # F F F F]                                      1 [F F F # # F F F]
0 [F F F F F F F F]                                      0 [F F F # # F F F]
0 1 2 3 4 5 6 7                                          0 1 2 3 4 5 6 7
``````

in the above case (3,1) has same value so it can be found that they intersect.
Similar representations can be used to check whether triangles intersect or not.

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