# Get just the scaling transformation out of CGAffineTransform

I found a similar question about getting just the rotation, but as I understand scaling and rotating work different in the transform matrix.

Matrixes are not my strength, so if anybody would hint me how to get only the scaling out of a CGAffineTransform I'd greatly appreciate.

btw. I tried applying the CGAffineTransform on a CGSize and then get the height x width to see how much it scaled, but height x width have strange values (depending on the rotation found in the CGAffineTransform, so ... hm that does not work)

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Assuming that the transformation is a scaling followed by a rotation (possibly with a translation in there, but no skewing) the horizontal scale factor is `sqrt(a^2+c^2)`, the vertical scale factor is `sqrt(b^2+d^2)`, and the ratio of the horizontal scale factor to the vertical scale factor should be `a/d = -c/b`, where `a`, `b`, `c`, and `d` are four of the six members of the `CGAffineTransform`, per the documentation (`tx` and `ty` only represent translation, which does not affect the scale factors).

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The first answer gets the mark. Both a vote up. Thanks for putting some light on that one –  Marin Todorov Apr 22 '10 at 21:52
``````- (CGFloat)xscale {
CGAffineTransform t = self.transform;
return sqrt(t.a * t.a + t.c * t.c);
}

- (CGFloat)yscale {
CGAffineTransform t = self.transform;
return sqrt(t.b * t.b + t.d * t.d);
}
``````
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I'm not familiar with CGAffineTransform or Objective-C (you caught me with the math tag). In general, you need to back out the transforms individually. For instance if the affine transform A performs scaling, rotation and translation only (the order of scaling & rotation isn't important in the method below, but translation should be definitely be last):

Translation: Applying A to the vector (0,0) will return the result (tx, ty) where tx and ty are the translations in the X and Y directions respectively.

Scaling in X: Apply A to the vector (1, 0) and get (sx0 + tx, sx1 + ty). The scaling in X will be sqrt(sx0^2 + sx1^2)

Scaling in Y: Apply A to the vector (0, 1) and get (sy0 + tx, sy1 + ty). The scaling in Y will be sqrt(sy0^2 + sy1^2)

Since affine transformations are implemented by a simple trick with linear transformations and since linear transformations are not commutative, you need to understand how the transformations are ordered before actually working through how to pull the individual transformation out.

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That is an old question, but I still add more information in case someone needs.

For me, the good answer and sample code for getting scale, rotation of transformation and for reproducing it are from article:

http://www.informit.com/articles/article.aspx?p=1951182

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great article!!! –  Marin Todorov Jan 14 '13 at 13:39