i know this is old but here goes.

W3C SVG 1.1 - 7 Coordinate Systems, Transformations and Units

In section 7.6 they describe the rotation transformation about a point (`cx`

,`cy`

)

Simply - it's this matrix multiplication:

```
translate(<cx>, <cy>) • rotate(<rotate-angle>) • translate(-<cx>, -<cy>)
```

To apply this to skewX use:

```
translate(<cx>, <cy>) • skewX(<skew-angle>) • translate(-<cx>, -<cy>)
```

generic matrix

translate matrix

skewX matrix

```
var skewer = function(element, angle, x, y) {
var box, radians, svg, transform;
// x and y are defined in terms of the elements bounding box
// (0,0)
// --------------
// | |
// | |
// --------------
// (1,1)
// it defaults to the center (0.5, 0.5)
// this can easily be modifed to use absolute coordinates
if (isNaN(x)) {
x = 0.5;
}
if (isNaN(y)) {
y = 0.5;
}
box = element.getBBox();
x = x * box.width + box.x;
y = y * box.height + box.y;
radians = angle * Math.PI / 180.0;
svg = document.querySelector('svg');
transform = svg.createSVGTransform();
//creates this matrix
// | 1 0 0 | => see first 2 rows of
// | 0 1 0 | generic matrix above for mapping
// translate(<cx>, <cy>)
transform.matrix.e = x;
transform.matrix.f = y;
// appending transform will perform matrix multiplications
element.transform.baseVal.appendItem(transform);
transform = svg.createSVGTransform();
// skewX(<skew-angle>)
transform.matrix.c = Math.tan(radians);
element.transform.baseVal.appendItem(transform);
transform = svg.createSVGTransform();
// translate(-<cx>, -<cy>)
transform.matrix.e = -x;
transform.matrix.f = -y;
element.transform.baseVal.appendItem(transform);
};
```

i forked your jsfiddle

update - a new fiddle using built-in SVGMatrix methods. I believe it's easier to read and understand