# How to crop and rotate an image to bounding box?

• I have a dataset of thousands of images containing hands
• I also have .mat files which contain the coordinates of 4 corners of the bounding box
• However, the edges of these bounding boxes are at an angle with the x & y axis. For example,

• I want to crop out the hands using the bounding box coordinates & then rotate the hands such that they are aligned with the x or y axis.

EDIT:

The hand is represented as follows:

However, please keep in mind that the rectangle is NOT straight. So, I'll have to rotate it to straighten it out.

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can you show an example of how each rectangle is represented? –  Shai Jun 11 '13 at 13:53
Do you have the image processing toolbox? –  m_power Jun 11 '13 at 14:01
@m_power, Yes. I have image processing toolbox. –  P.C. Jun 11 '13 at 14:05
+1 nice drawing –  Sam Roberts Jun 11 '13 at 14:29

You can rotate images using the `imrotate` command.

You can crop images (once they are rotated properly) by using indexing. i.e.

``````subimg = img( c(1):b(1), c(2):d(2) )
``````

(note, the above line is assuming, you've tracked the corners through the `imrotate` command, so that c(2) == b(2), c(1) == d(1) etc.)

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Well, what do you mean by "indexing". The coordinates of the bounding box I have are of the image before rotation. So, how can I use indexing to crop the image? –  P.C. Jun 11 '13 at 14:36
How do I track the corners using imrotate? –  P.C. Jun 11 '13 at 14:41
en.wikipedia.org/wiki/Rotation_matrix –  John Jun 11 '13 at 14:44
Hmm... @John, the angle of imrotate and the rotation matrix are same or opposite? –  P.C. Jun 11 '13 at 14:54
should the angle of rotation be the angle between the line joining a & b and the x-axis? –  P.C. Jun 11 '13 at 14:58

Good one!

### First step:

Compute the size of the rectangle

`````` width = sqrt( sum( (b-a).^2 ) );
height = sqrt( sum( (c-b).^2 ) );
``````

### Second step:

Compute an affine transformation from `a`...`d` to an upright image

`````` Xin = [a(2) b(2) c(2) d(2)];
Yin = [a(1) b(1) c(1) d(1)];
Xout = [width 1 1 width];
Yout = [1 1 height height];
A = [Xin;Yin;ones(1,4)]';
B = [Xout; Yout]';
H = B \ A; % affine transformation
``````

Note that despite the fact that we allow fo `H` to be affine, the choise of corners (depending on `width` and `height`) will acertain that `H` will not distort the cropped rectangle.

optionally use `cp2tform`:

`````` H2 = cp2tform( [Xin;Yin]', [Xout;Yout]', 'nonreflectivesimilarity' );
``````

### Third step

Use the transformation to get the relevant image part

`````` thumb = tformarray( img, maketform( 'affine', H' ), ... %//'
makeresampler( 'cubic', 'fill' ), ...
1:2, 1:2, ceil( [height width] ), [], 0 );
``````

optionally use `imtransform`:

`````` thumb = imtransform( img, H2, 'bicubic' );
``````

### A note regarding vectorization:

depends on how the coordinates of the corners are stored (`a`...`d`) the first two steps can be easily vectorize.

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Are you sure that affine transformation is a good option? Affine transformation does NOT necessarily preserve angles or lengths. I would like the angles & lengths to be preserved. –  P.C. Jun 11 '13 at 14:52
@PrernaChikersal this is why we have the first step - making sure aspect ratio is preserved. –  Shai Jun 11 '13 at 14:55
preserving the aspect ration is one thing, however the lengths will vary right? What are the pros/cons of using ur method compared to the other answer? –  P.C. Jun 11 '13 at 15:00
@PrernaChikersal you tell me. have you managed to implement the other solution? –  Shai Jun 11 '13 at 15:03
Well, I am trying to decide on which one to use. My only concern with affine transformation is that it will not preserve the length, etc –  P.C. Jun 11 '13 at 15:52