# RaphaelJS - I need help understanding a transform

I have a question about the following demo - http://raphaeljs.com/hand.html.

Here is code from the sample...

``````var r = Raphael("holder", 640, 480), angle = 0;
while (angle < 360) {
var color = Raphael.getColor();
(function(t, c) {
r.circle(320, 450, 20).attr({
stroke : c,
fill : c,
transform : t,
"fill-opacity" : .4
}).click(function() {
s.animate({
transform : t,
stroke : c
}, 2000, "bounce");
}).mouseover(function() {
this.animate({
"fill-opacity" : .75
}, 500);
}).mouseout(function() {
this.animate({
"fill-opacity" : .4
}, 500);
});
})("r" + angle + " 320 240", color);
angle += 30;
}
Raphael.getColor.reset();
var s = r.set();
s.push(r.path("M320,240c-50,100,50,110,0,190").attr({
fill : "none",
"stroke-width" : 2
}));
s.push(r.circle(320, 450, 20).attr({
fill : "none",
"stroke-width" : 2
}));
s.push(r.circle(320, 240, 5).attr({
fill : "none",
"stroke-width" : 10
}));
s.attr({
stroke : Raphael.getColor()
});
``````

The question I have is about the following line of code...

``````("r" + angle + " 320 240", color);
``````

In the anonymous function the circle is initially drawn at 320, 450 with a radius of 20. Then a transform is applied, for example ("r30 320 240") when the angle is 30.

How does this transform work? The way I read this transform is to rotate the circle 30 degrees around 320,450 , then move 320 horizontally (to the right) and 240 vertically down.

But i'm obviously reading this transform wrong because this is not what is happening.

What am i missing?

Thanks

-

The transform `"r30 320 240"` sets the rotation of the object about the point (320,240) by 30 degrees. It does not add to the rotation. It overrides any previous transformations.
You can see that I am setting the rotation of the circle about the point (0,0). If you consider the point (0,0) to be the centre of a clock, then the circle begins at 3 o'clock. If I use the transform `"r90 0 0"` the circle will be rotated from 3 o'clock to 6 o'clock. If I then later set the transform to be `"r30 0 0"` the circle will be at 4 o'clock, rotated 30 degrees from the original 3 o'clock position about the point (0,0).