# extract rotation, scale values from 2d transformation matrix

how can i extract rotation, scale and translation values from 2d transformation matrix? i mean a have a 2d transformation

``````matrix = [1, 0, 0, 1, 0, 0]

matrix.rotate(45 / 180 * PI)
matrix.scale(3, 4)
matrix.translate(50, 100)
matrix.rotate(30 / 180 * PI)
matrix.scale(-2, 4)
``````

now my matrix have values [a, b, c, d, tx, ty]

lets forget about the processes above and imagine that we have only the values a, b, c, d, tx, ty

how can i find total rotation and scale values via a, b, c, d, tx, ty

sorry for my english

EDIT

I think it should be an answer somewhere...

i just tried in Flash Builder (AS3) like this

``````   var m:Matrix = new Matrix;
m.rotate(.25 * Math.PI);
m.scale(4, 5);
m.translate(100, 50);
m.rotate(.33 * Math.PI);
m.scale(-3, 2.5);

var shape:Shape = new Shape;
shape.transform.matrix = m;

trace(shape.x, shape.y, shape.scaleX, shape.scaleY, shape.rotation);
``````

and the output is:

``````x = -23.6
y = 278.8
scaleX = 11.627334873920528
scaleY = -13.54222263865791
rotation = 65.56274134518259 (in degrees)
``````
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This question would be best suited to math.stackexchange.com - you will get a quicker response :-) –  Bojangles Dec 5 '10 at 21:18
i just did here: math.stackexchange.com/questions/13150/… thank you –  Tolgahan Albayrak Dec 5 '10 at 21:25
Give us an example a,b,c,d,tx,ty values and lets see if any answers match what you expect. –  ja72 Dec 5 '10 at 22:09
(a=4.810188218418486, b=10.58569820374103, c=13.4489075059838, d=-1.5870322791938274, tx=-23.60112067451982, ty=278.8156837197823) Thank you –  Tolgahan Albayrak Dec 5 '10 at 22:14

Not all values of a,b,c,d,tx,ty will yield a valid rotation sequence. I assume the above values are part of a 3x3 homogeneous rotation matrix in 2D

``````    | a  b  tx |
A = | c  d  ty |
| 0  0  1  |
``````

which transforms the coordinates `[x, y, 1]` into:

``````[x', y', 1] = A * |x|
|y|
|z|
``````
• Thus set the traslation into `[dx, dy]=[tx, ty]`
• The scale is `sx = sqrt(a² + c²)` and `sy = sqrt(b² + d²)`
• The rotation angle is `t = atan(c/d)` or `t = atan(-b/a)` as also they should be the same.

Otherwise you don't have a valid rotation matrix.

The above transformation is expanded to:

``````x' = tx + sx (x Cos θ - y Sin θ)
y' = ty + sy (x Sin θ + y Cos θ)
``````

when the order is rotation, followed by scale and then translation.

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The scale operation may be different in each direction ... the scaling is a vector ... –  belisarius Dec 5 '10 at 21:55
thank you for rotation and translation.. about scale, we got a calculated single value for scaling (s=sqrt(b^2+d^2)) is it possible to find scaleX and scaleY values? –  Tolgahan Albayrak Dec 5 '10 at 21:55
I updated the math with 2d scaling. I missed that in the original posting (my bad). –  ja72 Dec 5 '10 at 22:00
thank you again.. but in this method, sx and sy always will be positive because of power 2. what about negative scale values? –  Tolgahan Albayrak Dec 5 '10 at 22:12
remember `sign(a)=sign(sx)` and `sign(b)=sign(sy)` due to the nature of the `cos()` function. –  ja72 Dec 5 '10 at 22:32

If in scaling you'd scaled by the same amount in x and in y, then the determinant of the matrix, i.e. ad-bc, which tells you the area multiplier would tell you the linear change of scale too - it would be the square root of the determinant. atan( b/a ) or better atan2( b,a ) would tell you the total angle you have rotated through.

However, as your scaling isn't uniform, there is usually not going to be a way to condense your series of rotations and scaling to a single rotation followed by a single non-uniform scaling in x and y.

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I ran into this problem today and found the easiest solution to transform a point using the matrix. This way, you can extract the translation first, then rotation and scaling.

This only works if x and y are always scaled the same (uniform scaling).

Given your matrix m which has undergone a series of transforms,

``````var translate:Point;
var rotate:Number;
var scale:Number;

// extract translation
var p:Point = new Point();
translate = m.transformPoint(p);
m.translate( -translate.x, -translate.y);

// extract (uniform) scale
p.x = 1.0;
p.y = 0.0;
p = m.transformPoint(p);
scale = p.length;

// and rotation
rotate = Math.atan2(p.y, p.x);
``````

There you go!

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