There is alot to read and learn on this subject. I'll give a basic answer, but be aware, if you are trying to do a game or animations this is NOT the way to do it.
a == sx and
d == sy, so you'll access these like this:
var r, ctm, sx, sy, rotation;
r = document.querySelector('rect'); // access the first rect element
ctm = r.getCTM();
sx = ctm.a;
sy = ctm.d;
Now for the rotation
a == cos(angle) and
b == sin(angle). Asin and acos can't alone give you the complete angle, but together they can. You want to use atan since
tan = sin/cos and for just this kind of problem you actually want to use
RAD2DEG = 180 / Math.PI;
rotation = Math.atan2( ctm.b, ctm.a ) * RAD2DEG;
If you study the inverse trigonometric functions and the unit circle you'll understand why this works.
Here is W3C's indespensible resource on SVG transformations: http://www.w3.org/TR/SVG/coords.html. Scroll down a bit and you can read alot more about what I've mentioned above.
UPDATE, example usage how to programmatically do animations. Keep the transformations stored separately and when these are updated, overwrite/update the SVG element transform.
var SVG, domElement, ...
SVG = document.querySelector( 'svg' );
domElement = SVG.querySelector( 'rect' );
transform = SVG.createSVGTransform();
matrix = SVG.createSVGMatrix();
position = SVG.createSVGPoint();
rotation = 0;
scale = 1;
// do every update, continuous use
matrix.a = scale;
matrix.d = scale;
matrix.e = position.x;
matrix.f = position.y;
transform.setMatrix( matrix.rotate( rotation ) );
domElement.transform.baseVal.initialize( transform ); // clear then put