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.