21

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

Thanks your advance

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)
40

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.

  • The scale operation may be different in each direction ... the scaling is a vector ... – Dr. belisarius Dec 5 '10 at 21:55
  • 3
    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
  • 2
    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
  • 1
    The conventions change. Like if using a left hand system, or right hand system. Or pre-multiply vs. post-multiply the transfrmations. Or representing the elements in row major vs. column major order. Or storing the last row of an affine transformation (3×3 planar) vs not storing (2×3 planar). And there is bound to be more. – ja72 Jan 8 '15 at 21:43
  • 1
    @ja72 Agree that there're different conventions used but in the answer, you've used the column vector convention used in most books for A. However, the multiplication with a row vector means you're multiplying 3 x 3 * 1 x 3 which is invalid. I've taken the liberty to fix it by making it a column vector, I hope it's ok. – legends2k Mar 25 '15 at 10:40
6

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!

4

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.

2

The term for this is matrix decomposition. Here is a solution that includes skew as described by Frédéric Wang.

function decompose_2d_matrix(mat) {
  var a = mat[0];
  var b = mat[1];
  var c = mat[2];
  var d = mat[3];
  var e = mat[4];
  var f = mat[5];

  var delta = a * d - b * c;

  let result = {
    translation: [e, f],
    rotation: 0,
    scale: [0, 0],
    skew: [0, 0],
  };

  // Apply the QR-like decomposition.
  if (a != 0 || b != 0) {
    var r = Math.sqrt(a * a + b * b);
    result.rotation = b > 0 ? Math.acos(a / r) : -Math.acos(a / r);
    result.scale = [r, delta / r];
    result.skew = [Math.atan((a * c + b * d) / (r * r)), 0];
  } else if (c != 0 || d != 0) {
    var s = Math.sqrt(c * c + d * d);
    result.rotation =
      Math.PI / 2 - (d > 0 ? Math.acos(-c / s) : -Math.acos(c / s));
    result.scale = [delta / s, s];
    result.skew = [0, Math.atan((a * c + b * d) / (s * s))];
  } else {
    // a = b = c = d = 0
  }

  return result;
}

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service, privacy policy and cookie policy

Not the answer you're looking for? Browse other questions tagged or ask your own question.