# Transform Matrix into component pieces

Given an affine 2D transform matrix such as:

``````[a  b  tx]
[c  d  ty]
[0  0  1 ]
``````
• For a clockwise rotation about the origin, `a` is transformed by `cos (θ)` and `b` is transformed by `sin (θ)`

• For a scaleX of scaleFactor sx, `a` is transformed by `sx`

• For a shear parallel to the x axis, `x' = x + ky` `b` is transformed by `k`

In my example, `a` was transformed twice, by the rotation and the scale-x, `b` was transformed twice, once by the rotation, once by the shear.

Rotation is no longer just `arcsin(b)`

ScaleX is no longer just `1 / a`

ShearX is no longer just `x - ky`

How can I get the values of `rotation`, `shearX`, and `scaleX` back from that matrix?

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Homework? If yes, please tag it as such. –  duffymo Jun 17 '12 at 9:28
Not homework. Just curiosity. Check out my profile for evidence that I've finished school =] –  James Webster Jun 17 '12 at 9:32
No evidence that I can see, but that's okay. I'll take your word for it. –  duffymo Jun 17 '12 at 9:34
I'm 21 and employed as a software developer. –  James Webster Jun 17 '12 at 9:34
"On the Internet, no one can tell that you're a dog." - 21 is prime university age, and lots of students have part time jobs. –  duffymo Jun 17 '12 at 9:35

So rotation matrix (full) will be ( I leave out the boring part)

``````R=
a=cos(θ)  c=sin(θ)
b=-sin(θ) d=cos(θ)
``````

while scale and shear matrix will be (again, leaving out the boring part)

``````S=
a=s  b=k
c=0  d=1
``````

Now applying FIRST rotation (R), THEN scale and shear (S) will just be multiplying the matrices, which gives resulting matrix

``````S times R
a=s cos(θ) - k sin(θ)   b=s sin(θ)+k cos(θ)
c=-sin(theta)    d=cos(theta)
``````

If you would want to get back θ, s and k from that, you can determine θ =arcsin(-c). You know sin(θ) and cos(θ), so you can solve two linear equations (a=s cos(θ) - k sin(θ) b=s sin(θ)+k cos(θ)) with two unknowns to find s and k.

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Simultaneous equations! Ingenious! –  James Webster Jun 17 '12 at 14:35