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if (RectA.X1 < RectB.X2 && RectA.X2 > RectB.X1 &&
    RectA.Y1 < RectB.Y2 && RectA.Y2 > RectB.Y1)

say you have Rect A, and Rect B. Proof is by contradiction. Any one of four conditions guarantees that NO OVERLAP CAN EXIST.

Cond1.  If A's left edge is to the right of the B's right edge. ,
           -  then A is Totally to right Of B
Cond2.  If A's right edge is to the left of the B's left edge. ,
           -  then A is Totally to left Of B
Cond3.  If A's top edge is below B's bottom  edge. ,
           -  then A is Totally below B
Cond4.  If A's bottom edge is above B's top edge. ,
           -  then A is Totally above B

So condition for Non-Overlap is 

Cond1 Or Cond2 Or Cond3 Or Cond4

Therefore, a sufficient condition for Overlap is the opposite (De Morgan)

Not Cond1 AND Not Cond2 And Not Cond3 And Not Cond4

this is equivilent to 

A's Left Edge to left of B's right edge  And
A's right edge to right of B's left edge And
A's top above B's bottom And
A's bottom below B's Top
show/hide this revision's text 4 <pre>'d <code> blocks, to disable prettification for non-code 
if (RectA.X1 < RectB.X2 && RectA.X2 > RectB.X1 &&
    RectA.Y1 < RectB.Y2 && RectA.Y2 > RectB.Y1)

say you have Rect A, and Rect B. Proof is by contradiction. Any one of four conditions guarantees that NO OVERLAP CAN EXIST.

Cond1.  If A's left edge is to the right of the B's right edge. A is Totally to right Of B
Cond2.  If A's right edge is to the left of the B's left edge. A is Totally to left Of B
Cond3.  If A's top edge is below B's bottom  edge. A is Totally below B
Cond4.  If A's bottom edge is above B's top edge. A is Totally above B

So condition for Non-Overlap is 

Cond1 Or Cond2 Or Cond3 Or Cond4

Therefore, a sufficient condition for Overlap is the opposite (De Morgan)

Not Cond1 AND Not Cond2 And Not Cond3 And Not Cond4

this is equivilent to 

A's Left Edge to left of B's right edge  And
A's right edge to right of B's left edge And
A's top above B's bottom And
A's bottom below B's Top
show/hide this revision's text 3 added 1 characters in body 
if (RectA.X1 < RectB.X2 && RectA.X2 > RectB.X1 &&
    RectA.Y1 < RectB.Y2 && RectA.Y2 > RectB.Y1)

say you have Rect A, and Rect B. Proof is by contradiction. Any one of four conditions gaurantee guarantees that NO OVERLAP CAN EXIST.

Cond1.  If A's left edge is to the right of the B's right edge. A is Totally to right Of B
Cond2.  If A's right edge is to the left of the B's left edge. A is Totally to left Of B
Cond3.  If A's top edge is below B's bottom  edge. A is Totally below B
Cond4.  If A's bottom edge is above B's top edge. A is Totally above B

So condition for Non-Overlap is 

Cond1 Or Cond2 Or Cond3 Or Cond4

Therefore, a sufficient condition for Overlap is the opposite (De Morgan)

Not COnd1 Cond1 AND Not COnd2 Cond2 And Not Cond3 And Not Cond4

this is equivilent to 

A's Left Edge to left of B's right edge  And
A's right edge to right of B's left edge And
A's top above B's bottom And
A's bottom below B's Top
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