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?