# Simple 2D collision detection with vectors

I am trying to create collision algorithm and implement him in my Win32 2D GUI app. The task is that i got one vector that determinate mid-bottom of .bmp image and four more vectors in position of rhombus. I wanted to make it work so algorithm know if image is coming from left, right, up or bottom. There are a lot of tutorials over internet about collision detection of rectangle, circle and distance calculation but i am having difficulties in applying them for rhombus. There is also something called axis-aligned bounding but i think it is for 3d vectors. I am very weak when it comes to this topic, so if there is any skilled C++ programmer who could direct me to some good e-book that mention this topic or if the code is small maybe type it out. I tried doing iteration of X,Y coordinates over ABCD whole rhombus and failed miserably.

Thanks everyone who help.

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2 questions: 1) Is this homework? (It's perfectly fine if it is, but it should be tagged homework then) and 2) What have you tried so far? –  bitmask Apr 13 '12 at 16:25
Axis-aligned bounding boxes (AABB for short) are useful for 2d as well as 3d. The idea is to surround a complicated object with a simple shape that is easy to check for collisions. Then, if the bounding boxes don't collide, you don't need to check all the details of the complicated object inside. You will still need to write code to collide the real object -- but it won't need to run thousands of times each frame... –  comingstorm Apr 13 '12 at 17:10
It is. Sorry for not tagging as homework, this site is new for me. I know how to do collision for rectangle and circle and that was for previous homework. Other than that, i tried to do pixel perfect collision but then i realised that it is going to be more difficult to implement in my current code. –  Marko Apr 13 '12 at 19:15

@Marko: `A_iA_{i+1}` is vector starting at `A_i` and finishing at `A_{i+1}`, the same is `A_iX`: vector from `A_i` to `X`. Next, you need to calculate the vector product of these vectors. You are doing this for all possible `i`. Then you check if all the signs of the products are the same. –  Vlad Apr 14 '12 at 2:06